(* Content-type: application/vnd.wolfram.mathematica *) (*** Wolfram Notebook File ***) (* http://www.wolfram.com/nb *) (* CreatedBy='Mathematica 9.0' *) (*CacheID: 234*) (* Internal cache information: NotebookFileLineBreakTest NotebookFileLineBreakTest NotebookDataPosition[ 157, 7] NotebookDataLength[ 2713817, 46955] NotebookOptionsPosition[ 2592021, 44594] NotebookOutlinePosition[ 2707769, 46761] CellTagsIndexPosition[ 2707687, 46756] WindowFrame->Normal*) (* Beginning of Notebook Content *) Notebook[{ Cell[CellGroupData[{ Cell["", "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell["Interactive geometry", "Title", CellChangeTimes->{{3.448190122176695*^9, 3.44819012385317*^9}, { 3.485609127497636*^9, 3.485609133015955*^9}, {3.514308355088097*^9, 3.514308374696691*^9}, 3.5146594348020153`*^9, 3.5146601881617107`*^9, { 3.6071801166601562`*^9, 3.607180117693161*^9}, {3.614152610037798*^9, 3.6141526175803223`*^9}}], Cell["Bruno Autin", "Subtitle", CellChangeTimes->{{3.485609136120798*^9, 3.4856091511532907`*^9}, { 3.4856091945334663`*^9, 3.485609199379443*^9}, {3.4951031489375*^9, 3.49510314984375*^9}, {3.495106455296875*^9, 3.495106455453125*^9}, { 3.5143083846926413`*^9, 3.514308395249558*^9}, 3.5443793532699003`*^9, { 3.614152624820751*^9, 3.614152630795364*^9}}], Cell["CERN honorary member", "Subsubtitle", CellChangeTimes->{ 3.483202458953512*^9, {3.495105345328125*^9, 3.495105347890625*^9}, { 3.49510644571875*^9, 3.495106448390625*^9}, {3.5143083980990458`*^9, 3.514308409442589*^9}, {3.6141526372680492`*^9, 3.614152645770893*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["", "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[CellGroupData[{ Cell["Introduction", "Section", CellChangeTimes->{ 3.483202458955147*^9, {3.514308340990994*^9, 3.514308352103572*^9}, { 3.61415269720122*^9, 3.614152702335693*^9}}], Cell[TextData[{ "In addition to the animations of the documentation, the package ", StyleBox["GeometricaPlus", FontSlant->"Italic"], " deals with two types of interactivity. The first one concerns libraries of \ geometrical objects, namely conics, quadrics, parametric curves and surfaces \ and platonic solids. For instance, by typing a statement such as \ PlatonicSolid[x], the user triggers the display of a menu containing the five \ platonic solids and clicking a window will transfer the selected solid to the \ dynamic variable x. For intersections, the two curves are displayed in a \ window and cursors are provided to displace a point on each curve. The points \ are moved until they approximately coincide close to an intersection. Then, \ by clicking a button Solve, the numerical coordinates of the intersection are \ calculated and the process can be repeated for any other intersection. In all \ the interactive applications, the dynamic results can be used for further \ treatment such as drawing or geometrical transformation." }], "Text", CellChangeTimes->{{3.495209008234375*^9, 3.49520915653125*^9}, 3.495209919765625*^9, 3.4952106014375*^9, {3.4952106824375*^9, 3.495210832234375*^9}, 3.514307848543872*^9, {3.514308058576482*^9, 3.514308065607885*^9}, {3.51430841745117*^9, 3.514308419642997*^9}, { 3.5149152616687326`*^9, 3.514915280523456*^9}, {3.514915328702818*^9, 3.5149153375415287`*^9}, 3.514915444638068*^9, 3.6141527492704906`*^9, { 3.614425753583312*^9, 3.6144258066496696`*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["Creating animations", "Section", CellChangeTimes->{ 3.483202458955147*^9, {3.51430857274755*^9, 3.514308578875259*^9}, { 3.614152798821786*^9, 3.6141528060834513`*^9}, {3.614322130714913*^9, 3.614322140344654*^9}, {3.621866249167593*^9, 3.621866256092843*^9}}], Cell[TextData[{ "Two functions in ", StyleBox["GeometricaPlus,", FontSlant->"Italic"], " Arc and Strip, are designed to generate curves and surfaces respectively." }], "Text", CellChangeTimes->{{3.614322660312937*^9, 3.614322663967559*^9}, { 3.614322694884161*^9, 3.61432302127462*^9}, 3.614323066361289*^9, { 3.614323130678301*^9, 3.614323287897341*^9}, {3.614323938752824*^9, 3.614324033357739*^9}, {3.614423216186777*^9, 3.614423217361268*^9}, { 3.621866075812099*^9, 3.621866078258478*^9}, {3.6218665471281147`*^9, 3.621866648268488*^9}, 3.6218666829542522`*^9}], Cell[CellGroupData[{ Cell["A special swing", "Subsection", CellChangeTimes->{{3.621866272912737*^9, 3.62186633500952*^9}, { 3.621866378837151*^9, 3.621866385313016*^9}, {3.622998795900137*^9, 3.622998802975554*^9}}], Cell[TextData[{ "The cissoid can be defined as the curve described by the vertex of a \ parabola Q rolling on another fixed parabola P. The parameter v is that of a \ point A of P. The construction is shown for the parabola P of equation ", Cell[BoxData[ SuperscriptBox["y", "2"]], "InlineFormula"], "-2x=0. Q is obtained by symmetry of P with respect to the tangent t at P in \ A. The vertices O of P and B of Q are symmetric with respect to t. ", "The cissoid is described by the point C symmetric of the vertex O of P with \ respect to t. 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Pi^2)^(-1) ( Rational[4602, 2401] Pi^2 + Pi^2 (-1 + Rational[1521, 2401] Pi^2)), (1 + Rational[1521, 2401] Pi^2)^(-1) (Rational[-152958, 117649] Pi^3 + Pi (-1 + Rational[1521, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1369, 2401] Pi^2)^(-1) ( Rational[4514, 2401] Pi^2 + Pi^2 (-1 + Rational[1369, 2401] Pi^2)), (1 + Rational[1369, 2401] Pi^2)^(-1) (Rational[-139490, 117649] Pi^3 + Pi (-1 + Rational[1369, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[25, 49] Pi^2)^(-1) (Rational[90, 49] Pi^2 + Pi^2 (-1 + Rational[25, 49] Pi^2)), (1 + Rational[25, 49] Pi^2)^(-1) (Rational[-370, 343] Pi^3 + Pi (-1 + Rational[25, 49] Pi^2))}, { Rational[1, 2] (1 + Rational[1089, 2401] Pi^2)^(-1) ( Rational[4290, 2401] Pi^2 + Pi^2 (-1 + Rational[1089, 2401] Pi^2)), (1 + Rational[1089, 2401] Pi^2)^(-1) (Rational[-115170, 117649] Pi^3 + Pi (-1 + Rational[1089, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[961, 2401] Pi^2)^(-1) ( Rational[4154, 2401] Pi^2 + Pi^2 (-1 + Rational[961, 2401] Pi^2)), (1 + Rational[961, 2401] Pi^2)^(-1) (Rational[-104222, 117649] Pi^3 + Pi (-1 + Rational[961, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[841, 2401] Pi^2)^(-1) ( Rational[4002, 2401] Pi^2 + Pi^2 (-1 + Rational[841, 2401] Pi^2)), (1 + Rational[841, 2401] Pi^2)^(-1) (Rational[-94018, 117649] Pi^3 + Pi (-1 + Rational[841, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[729, 2401] Pi^2)^(-1) ( Rational[3834, 2401] Pi^2 + Pi^2 (-1 + Rational[729, 2401] Pi^2)), (1 + Rational[729, 2401] Pi^2)^(-1) (Rational[-84510, 117649] Pi^3 + Pi (-1 + Rational[729, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[625, 2401] Pi^2)^(-1) ( Rational[3650, 2401] Pi^2 + Pi^2 (-1 + Rational[625, 2401] Pi^2)), (1 + Rational[625, 2401] Pi^2)^(-1) (Rational[-75650, 117649] Pi^3 + Pi (-1 + Rational[625, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[529, 2401] Pi^2)^(-1) ( Rational[3450, 2401] Pi^2 + Pi^2 (-1 + Rational[529, 2401] Pi^2)), (1 + Rational[529, 2401] Pi^2)^(-1) (Rational[-67390, 117649] Pi^3 + Pi (-1 + 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+ Pi^2 (-1 + Rational[169, 2401] Pi^2)), (1 + Rational[169, 2401] Pi^2)^(-1) (Rational[-33410, 117649] Pi^3 + Pi (-1 + Rational[169, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[121, 2401] Pi^2)^(-1) ( Rational[1914, 2401] Pi^2 + Pi^2 (-1 + Rational[121, 2401] Pi^2)), (1 + Rational[121, 2401] Pi^2)^(-1) (Rational[-27742, 117649] Pi^3 + Pi (-1 + Rational[121, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[81, 2401] Pi^2)^(-1) ( Rational[1602, 2401] Pi^2 + Pi^2 (-1 + Rational[81, 2401] Pi^2)), (1 + Rational[81, 2401] Pi^2)^(-1) (Rational[-22338, 117649] Pi^3 + Pi (-1 + Rational[81, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1, 49] Pi^2)^(-1) (Rational[26, 49] Pi^2 + Pi^2 (-1 + Rational[1, 49] Pi^2)), (1 + Rational[1, 49] Pi^2)^(-1) ( Rational[-50, 343] Pi^3 + Pi (-1 + Rational[1, 49] Pi^2))}, { Rational[1, 2] (1 + Rational[25, 2401] Pi^2)^(-1) ( Rational[930, 2401] Pi^2 + Pi^2 (-1 + Rational[25, 2401] Pi^2)), (1 + Rational[25, 2401] Pi^2)^(-1) (Rational[-12130, 117649] Pi^3 + Pi (-1 + Rational[25, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[9, 2401] Pi^2)^(-1) ( Rational[570, 2401] Pi^2 + Pi^2 (-1 + Rational[9, 2401] Pi^2)), (1 + Rational[9, 2401] Pi^2)^(-1) (Rational[-7230, 117649] Pi^3 + Pi (-1 + Rational[9, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1, 2401] Pi^2)^(-1) ( Rational[194, 2401] Pi^2 + Pi^2 (-1 + Rational[1, 2401] Pi^2)), (1 + Rational[1, 2401] Pi^2)^(-1) (Rational[-2402, 117649] Pi^3 + Pi (-1 + Rational[1, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1, 2401] Pi^2)^(-1) ( Rational[-198, 2401] Pi^2 + Pi^2 (-1 + Rational[1, 2401] Pi^2)), (1 + Rational[1, 2401] Pi^2)^(-1) (Rational[2402, 117649] Pi^3 + Pi (-1 + Rational[1, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[9, 2401] Pi^2)^(-1) ( Rational[-606, 2401] Pi^2 + Pi^2 (-1 + Rational[9, 2401] Pi^2)), (1 + Rational[9, 2401] Pi^2)^(-1) (Rational[7230, 117649] Pi^3 + Pi (-1 + Rational[9, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[25, 2401] Pi^2)^(-1) ( Rational[-1030, 2401] Pi^2 + Pi^2 (-1 + 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Rational[169, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[225, 2401] Pi^2)^(-1) ( Rational[-3390, 2401] Pi^2 + Pi^2 (-1 + Rational[225, 2401] Pi^2)), (1 + Rational[225, 2401] Pi^2)^(-1) (Rational[39390, 117649] Pi^3 + Pi (-1 + Rational[225, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[289, 2401] Pi^2)^(-1) ( Rational[-3910, 2401] Pi^2 + Pi^2 (-1 + Rational[289, 2401] Pi^2)), (1 + Rational[289, 2401] Pi^2)^(-1) (Rational[45730, 117649] Pi^3 + Pi (-1 + Rational[289, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[361, 2401] Pi^2)^(-1) ( Rational[-4446, 2401] Pi^2 + Pi^2 (-1 + Rational[361, 2401] Pi^2)), (1 + Rational[361, 2401] Pi^2)^(-1) (Rational[52478, 117649] Pi^3 + Pi (-1 + Rational[361, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[9, 49] Pi^2)^(-1) ( Rational[-102, 49] Pi^2 + Pi^2 (-1 + Rational[9, 49] Pi^2)), (1 + Rational[9, 49] Pi^2)^(-1) ( Rational[174, 343] Pi^3 + Pi (-1 + Rational[9, 49] Pi^2))}, { Rational[1, 2] (1 + Rational[529, 2401] Pi^2)^(-1) ( Rational[-5566, 2401] Pi^2 + Pi^2 (-1 + Rational[529, 2401] Pi^2)), (1 + Rational[529, 2401] Pi^2)^(-1) (Rational[67390, 117649] Pi^3 + Pi (-1 + Rational[529, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[625, 2401] Pi^2)^(-1) ( Rational[-6150, 2401] Pi^2 + Pi^2 (-1 + Rational[625, 2401] Pi^2)), (1 + Rational[625, 2401] Pi^2)^(-1) (Rational[75650, 117649] Pi^3 + Pi (-1 + Rational[625, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[729, 2401] Pi^2)^(-1) ( Rational[-6750, 2401] Pi^2 + Pi^2 (-1 + Rational[729, 2401] Pi^2)), (1 + Rational[729, 2401] Pi^2)^(-1) (Rational[84510, 117649] Pi^3 + Pi (-1 + Rational[729, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[841, 2401] Pi^2)^(-1) ( Rational[-7366, 2401] Pi^2 + Pi^2 (-1 + Rational[841, 2401] Pi^2)), (1 + Rational[841, 2401] Pi^2)^(-1) (Rational[94018, 117649] Pi^3 + Pi (-1 + Rational[841, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[961, 2401] Pi^2)^(-1) ( Rational[-7998, 2401] Pi^2 + Pi^2 (-1 + Rational[961, 2401] Pi^2)), (1 + Rational[961, 2401] Pi^2)^(-1) (Rational[104222, 117649] Pi^3 + Pi (-1 + Rational[961, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1089, 2401] Pi^2)^(-1) ( Rational[-8646, 2401] Pi^2 + Pi^2 (-1 + Rational[1089, 2401] Pi^2)), (1 + Rational[1089, 2401] Pi^2)^(-1) (Rational[115170, 117649] Pi^3 + Pi (-1 + Rational[1089, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[25, 49] Pi^2)^(-1) ( Rational[-190, 49] Pi^2 + Pi^2 (-1 + Rational[25, 49] Pi^2)), (1 + Rational[25, 49] Pi^2)^(-1) (Rational[370, 343] Pi^3 + Pi (-1 + Rational[25, 49] Pi^2))}, { Rational[1, 2] (1 + Rational[1369, 2401] Pi^2)^(-1) ( Rational[-9990, 2401] Pi^2 + Pi^2 (-1 + Rational[1369, 2401] Pi^2)), (1 + Rational[1369, 2401] Pi^2)^(-1) (Rational[139490, 117649] Pi^3 + Pi (-1 + Rational[1369, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1521, 2401] Pi^2)^(-1) ( Rational[-10686, 2401] Pi^2 + Pi^2 (-1 + Rational[1521, 2401] Pi^2)), (1 + Rational[1521, 2401] Pi^2)^(-1) (Rational[152958, 117649] Pi^3 + Pi (-1 + Rational[1521, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1681, 2401] Pi^2)^(-1) ( Rational[-11398, 2401] Pi^2 + Pi^2 (-1 + Rational[1681, 2401] Pi^2)), (1 + Rational[1681, 2401] Pi^2)^(-1) (Rational[167362, 117649] Pi^3 + Pi (-1 + Rational[1681, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[1849, 2401] Pi^2)^(-1) ( Rational[-12126, 2401] Pi^2 + Pi^2 (-1 + Rational[1849, 2401] Pi^2)), (1 + Rational[1849, 2401] Pi^2)^(-1) (Rational[182750, 117649] Pi^3 + Pi (-1 + Rational[1849, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[2025, 2401] Pi^2)^(-1) ( Rational[-12870, 2401] Pi^2 + Pi^2 (-1 + Rational[2025, 2401] Pi^2)), (1 + Rational[2025, 2401] Pi^2)^(-1) (Rational[199170, 117649] Pi^3 + Pi (-1 + Rational[2025, 2401] Pi^2))}, { Rational[1, 2] (1 + Rational[2209, 2401] Pi^2)^(-1) ( Rational[-13630, 2401] Pi^2 + Pi^2 (-1 + Rational[2209, 2401] Pi^2)), (1 + Rational[2209, 2401] Pi^2)^(-1) (Rational[216670, 117649] Pi^3 + Pi (-1 + Rational[2209, 2401] Pi^2))}, { Rational[1, 2] (1 + Pi^2)^(-1) ((-6) Pi^2 + Pi^2 (-1 + Pi^2)), (1 + 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other problems such as the normals from a \ point to a conic, the position of a Serret-Frenet system along a 2D or 3D \ curve, parallel curves and surfaces at fixed or variable distance, pipes of \ fixed or variable radius or generation of ruled surfaces, \ \>", "Text", CellChangeTimes->{{3.61432609703683*^9, 3.6143261060108967`*^9}, { 3.6143261444076643`*^9, 3.6143262775616903`*^9}, {3.614327926229478*^9, 3.614328059403844*^9}, {3.614328092296558*^9, 3.614328104048154*^9}, { 3.614328141174996*^9, 3.614328148598777*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["\<\ Generating surfaces with the Strip function\ \>", "Subsection", CellChangeTimes->{{3.621866272912737*^9, 3.62186633500952*^9}, { 3.621866378837151*^9, 3.621866385313016*^9}, {3.621866777847074*^9, 3.6218667881382236`*^9}}], Cell["\<\ The surface investigated here uses a Viviani\[CloseCurlyQuote]s window, a \ curve which is the intersection of a cylinder of revolution with a sphere. \ The cylinder is tangent to the sphere and 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Cos[Rational[19, 198] Pi] Sin[Rational[19, 198] Pi], - Cos[Rational[19, 198] Pi]}, { 0.05558227567253826, Cos[Rational[5, 66] Pi] Sin[Rational[5, 66] Pi], - Cos[Rational[5, 66] Pi]}, {-0.24441772432746178`, Cos[Rational[5, 66] Pi] Sin[Rational[5, 66] Pi], - Cos[Rational[5, 66] Pi]}, { 0.030153689607045786`, Cos[Rational[1, 18] Pi] Sin[Rational[1, 18] Pi], - Cos[Rational[1, 18] Pi]}, {-0.26984631039295426`, Cos[Rational[1, 18] Pi] Sin[Rational[1, 18] Pi], - Cos[Rational[1, 18] Pi]}, { 0.012285106557296477`, Cos[Rational[7, 198] Pi] Sin[Rational[7, 198] Pi], - Cos[Rational[7, 198] Pi]}, {-0.28771489344270357`, Cos[Rational[7, 198] Pi] Sin[Rational[7, 198] Pi], - Cos[Rational[7, 198] Pi]}, { 0.0022640387134577056`, Cos[Rational[1, 66] Pi] Sin[Rational[1, 66] Pi], - Cos[Rational[1, 66] Pi]}, {-0.29773596128654234`, Cos[Rational[1, 66] Pi] Sin[Rational[1, 66] Pi], - Cos[Rational[1, 66] Pi]}, { 0.0002517288084074587, -Cos[Rational[1, 198] Pi] Sin[Rational[1, 198] Pi], - Cos[Rational[1, 198] Pi]}, {-0.2997482711915926, - Cos[Rational[1, 198] Pi] Sin[Rational[1, 198] Pi], - Cos[Rational[1, 198] Pi]}, { 0.006280555661802856, -Cos[Rational[5, 198] Pi] Sin[Rational[5, 198] Pi], - Cos[Rational[5, 198] Pi]}, {-0.2937194443381972, - Cos[Rational[5, 198] Pi] Sin[Rational[5, 198] Pi], - Cos[Rational[5, 198] Pi]}, { 0.020253513192751316`, -Cos[Rational[1, 22] Pi] Sin[Rational[1, 22] Pi], - Cos[Rational[1, 22] Pi]}, {-0.27974648680724873`, - Cos[Rational[1, 22] Pi] Sin[Rational[1, 22] Pi], - Cos[Rational[1, 22] Pi]}, { 0.041945771283965205`, -Cos[Rational[13, 198] Pi] Sin[Rational[13, 198] Pi], - Cos[Rational[13, 198] Pi]}, {-0.25805422871603484`, - Cos[Rational[13, 198] Pi] Sin[Rational[13, 198] Pi], - Cos[Rational[13, 198] Pi]}, { 0.07100829338251147, -Cos[Rational[17, 198] Pi] Sin[Rational[17, 198] Pi], - Cos[Rational[17, 198] Pi]}, {-0.22899170661748858`, - Cos[Rational[17, 198] Pi] Sin[Rational[17, 198] Pi], - Cos[Rational[17, 198] Pi]}, { 0.10697345262860625`, -Cos[Rational[7, 66] Pi] Sin[Rational[7, 66] Pi], - Cos[Rational[7, 66] Pi]}, {-0.1930265473713938, - Cos[Rational[7, 66] Pi] Sin[Rational[7, 66] Pi], - Cos[Rational[7, 66] Pi]}, { 0.14926255614683936`, -Cos[Rational[25, 198] Pi] Sin[Rational[25, 198] Pi], - Cos[Rational[25, 198] Pi]}, {-0.15073744385316068`, - Cos[Rational[25, 198] Pi] Sin[Rational[25, 198] Pi], - Cos[Rational[25, 198] Pi]}, { 0.19719515643116664`, -Cos[Rational[29, 198] Pi] Sin[Rational[29, 198] Pi], - Cos[Rational[29, 198] Pi]}, {-0.1028048435688334, - Cos[Rational[29, 198] Pi] Sin[Rational[29, 198] Pi], - Cos[Rational[29, 198] Pi]}, { 0.25, Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, {-0.050000000000000044`, Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { 0.30682743715343563`, -Cos[Rational[37, 198] Pi] Sin[Rational[37, 198] Pi], -Cos[Rational[37, 198] Pi]}, { 0.006827437153435617, -Cos[Rational[37, 198] Pi] Sin[Rational[37, 198] Pi], -Cos[Rational[37, 198] Pi]}, { 0.3667630931549825, -Cos[Rational[41, 198] Pi] Sin[Rational[41, 198] Pi], -Cos[Rational[41, 198] Pi]}, { 0.06676309315498247, -Cos[Rational[41, 198] Pi] Sin[Rational[41, 198] Pi], -Cos[Rational[41, 198] Pi]}, { 0.4288425808633574, -Cos[Rational[5, 22] Pi] Sin[Rational[5, 22] Pi], - Cos[Rational[5, 22] Pi]}, { 0.12884258086335737`, -Cos[Rational[5, 22] Pi] Sin[Rational[5, 22] Pi], -Cos[Rational[5, 22] Pi]}, { 0.492067018082596, -Cos[Rational[49, 198] Pi] Sin[Rational[49, 198] Pi], -Cos[Rational[49, 198] Pi]}, { 0.192067018082596, -Cos[Rational[49, 198] Pi] Sin[Rational[49, 198] Pi], -Cos[Rational[49, 198] Pi]}, { 0.5554190999505055, -Cos[Rational[23, 99] Pi] Sin[Rational[23, 99] Pi], -Sin[Rational[23, 99] Pi]}, { 0.25541909995050543`, -Cos[Rational[23, 99] Pi] Sin[Rational[23, 99] Pi], -Sin[Rational[23, 99] Pi]}, { 0.6178794677547136, -Cos[Rational[7, 33] Pi] Sin[Rational[7, 33] Pi], - Sin[Rational[7, 33] Pi]}, { 0.31787946775471354`, -Cos[Rational[7, 33] Pi] Sin[Rational[7, 33] Pi], -Sin[Rational[7, 33] Pi]}, { 0.6784431107959359, -Cos[Rational[19, 99] Pi] Sin[Rational[19, 99] Pi], -Sin[Rational[19, 99] Pi]}, { 0.37844311079593584`, -Cos[Rational[19, 99] Pi] Sin[Rational[19, 99] Pi], -Sin[Rational[19, 99] Pi]}, { 0.7361355373863414, -Cos[Rational[17, 99] Pi] Sin[Rational[17, 99] Pi], -Sin[Rational[17, 99] Pi]}, { 0.4361355373863413, -Cos[Rational[17, 99] Pi] Sin[Rational[17, 99] Pi], -Sin[Rational[17, 99] Pi]}, { 0.7900284547855991, -Cos[Rational[5, 33] Pi] Sin[Rational[5, 33] Pi], - Sin[Rational[5, 33] Pi]}, { 0.49002845478559903`, -Cos[Rational[5, 33] Pi] Sin[Rational[5, 33] Pi], -Sin[Rational[5, 33] Pi]}, { 0.8392547057785661, -Cos[Rational[13, 99] Pi] Sin[Rational[13, 99] Pi], -Sin[Rational[13, 99] Pi]}, { 0.539254705778566, -Cos[Rational[13, 99] Pi] Sin[Rational[13, 99] Pi], -Sin[Rational[13, 99] Pi]}, { 0.883022221559489, -Cos[Rational[1, 9] Pi] Sin[Rational[1, 9] Pi], - Sin[Rational[1, 9] Pi]}, { 0.5830222215594889, -Cos[Rational[1, 9] Pi] Sin[Rational[1, 9] Pi], - Sin[Rational[1, 9] Pi]}, { 0.9206267664155906, -Cos[Rational[1, 11] Pi] Sin[Rational[1, 11] Pi], - Sin[Rational[1, 11] Pi]}, { 0.6206267664155906, -Cos[Rational[1, 11] Pi] Sin[Rational[1, 11] Pi], - Sin[Rational[1, 11] Pi]}, { 0.9514632691433107, -Cos[Rational[7, 99] Pi] Sin[Rational[7, 99] Pi], - Sin[Rational[7, 99] Pi]}, { 0.6514632691433107, -Cos[Rational[7, 99] Pi] Sin[Rational[7, 99] Pi], - Sin[Rational[7, 99] Pi]}, { 0.9750355588704727, -Cos[Rational[5, 99] Pi] Sin[Rational[5, 99] Pi], - Sin[Rational[5, 99] Pi]}, { 0.6750355588704726, -Cos[Rational[5, 99] Pi] Sin[Rational[5, 99] Pi], - Sin[Rational[5, 99] Pi]}, { 0.9909643486313533, -Cos[Rational[1, 33] Pi] Sin[Rational[1, 33] Pi], - Sin[Rational[1, 33] Pi]}, { 0.6909643486313533, -Cos[Rational[1, 33] Pi] Sin[Rational[1, 33] Pi], - Sin[Rational[1, 33] Pi]}, { 0.9989933382359422, -Cos[Rational[1, 99] Pi] Sin[Rational[1, 99] Pi], - Sin[Rational[1, 99] Pi]}, { 0.6989933382359421, -Cos[Rational[1, 99] Pi] Sin[Rational[1, 99] Pi], - Sin[Rational[1, 99] Pi]}, { 0.9989933382359422, Cos[Rational[1, 99] Pi] Sin[Rational[1, 99] Pi], Sin[Rational[1, 99] Pi]}, { 0.6989933382359421, Cos[Rational[1, 99] Pi] Sin[Rational[1, 99] Pi], Sin[Rational[1, 99] Pi]}, { 0.9909643486313533, Cos[Rational[1, 33] Pi] Sin[Rational[1, 33] Pi], Sin[Rational[1, 33] Pi]}, { 0.6909643486313533, Cos[Rational[1, 33] Pi] Sin[Rational[1, 33] Pi], Sin[Rational[1, 33] Pi]}, { 0.9750355588704727, Cos[Rational[5, 99] Pi] Sin[Rational[5, 99] Pi], Sin[Rational[5, 99] Pi]}, { 0.6750355588704726, Cos[Rational[5, 99] Pi] Sin[Rational[5, 99] Pi], Sin[Rational[5, 99] Pi]}, { 0.9514632691433107, Cos[Rational[7, 99] Pi] Sin[Rational[7, 99] Pi], Sin[Rational[7, 99] Pi]}, { 0.6514632691433107, Cos[Rational[7, 99] Pi] Sin[Rational[7, 99] Pi], Sin[Rational[7, 99] Pi]}, { 0.9206267664155906, Cos[Rational[1, 11] Pi] Sin[Rational[1, 11] Pi], Sin[Rational[1, 11] Pi]}, { 0.6206267664155906, Cos[Rational[1, 11] Pi] Sin[Rational[1, 11] Pi], Sin[Rational[1, 11] Pi]}, { 0.883022221559489, Cos[Rational[1, 9] Pi] Sin[Rational[1, 9] Pi], Sin[ Rational[1, 9] Pi]}, { 0.5830222215594889, Cos[Rational[1, 9] Pi] Sin[Rational[1, 9] Pi], Sin[ Rational[1, 9] Pi]}, { 0.8392547057785661, Cos[Rational[13, 99] Pi] Sin[Rational[13, 99] Pi], Sin[Rational[13, 99] Pi]}, { 0.539254705778566, Cos[Rational[13, 99] Pi] Sin[Rational[13, 99] Pi], Sin[Rational[13, 99] Pi]}, { 0.7900284547855991, Cos[Rational[5, 33] Pi] Sin[Rational[5, 33] Pi], Sin[Rational[5, 33] Pi]}, { 0.49002845478559903`, Cos[Rational[5, 33] Pi] Sin[Rational[5, 33] Pi], Sin[Rational[5, 33] Pi]}, { 0.7361355373863414, Cos[Rational[17, 99] Pi] Sin[Rational[17, 99] Pi], Sin[Rational[17, 99] Pi]}, { 0.4361355373863413, Cos[Rational[17, 99] Pi] Sin[Rational[17, 99] Pi], Sin[Rational[17, 99] Pi]}, { 0.6784431107959359, Cos[Rational[19, 99] Pi] Sin[Rational[19, 99] Pi], Sin[Rational[19, 99] Pi]}, { 0.37844311079593584`, Cos[Rational[19, 99] Pi] Sin[Rational[19, 99] Pi], Sin[Rational[19, 99] Pi]}, { 0.6178794677547136, Cos[Rational[7, 33] Pi] Sin[Rational[7, 33] Pi], Sin[Rational[7, 33] Pi]}, { 0.31787946775471354`, Cos[Rational[7, 33] Pi] Sin[Rational[7, 33] Pi], Sin[Rational[7, 33] Pi]}, { 0.5554190999505055, Cos[Rational[23, 99] Pi] Sin[Rational[23, 99] Pi], Sin[Rational[23, 99] Pi]}, { 0.25541909995050543`, Cos[Rational[23, 99] Pi] Sin[Rational[23, 99] Pi], Sin[Rational[23, 99] Pi]}, { 0.492067018082596, Cos[Rational[49, 198] Pi] Sin[Rational[49, 198] Pi], Cos[Rational[49, 198] Pi]}, { 0.192067018082596, Cos[Rational[49, 198] Pi] Sin[Rational[49, 198] Pi], Cos[Rational[49, 198] Pi]}, { 0.4288425808633574, Cos[Rational[5, 22] Pi] Sin[Rational[5, 22] Pi], Cos[Rational[5, 22] Pi]}, { 0.12884258086335737`, Cos[Rational[5, 22] Pi] Sin[Rational[5, 22] Pi], Cos[Rational[5, 22] Pi]}, { 0.3667630931549825, Cos[Rational[41, 198] Pi] Sin[Rational[41, 198] Pi], Cos[Rational[41, 198] Pi]}, { 0.06676309315498247, Cos[Rational[41, 198] Pi] Sin[Rational[41, 198] Pi], Cos[Rational[41, 198] Pi]}, { 0.30682743715343563`, Cos[Rational[37, 198] Pi] Sin[Rational[37, 198] Pi], Cos[Rational[37, 198] Pi]}, { 0.006827437153435617, Cos[Rational[37, 198] Pi] Sin[Rational[37, 198] Pi], Cos[Rational[37, 198] Pi]}, { 0.25, Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, {-0.050000000000000044`, Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { 0.19719515643116664`, Cos[Rational[29, 198] Pi] Sin[Rational[29, 198] Pi], Cos[ Rational[29, 198] Pi]}, {-0.1028048435688334, Cos[Rational[29, 198] Pi] Sin[Rational[29, 198] Pi], Cos[ Rational[29, 198] Pi]}, { 0.14926255614683936`, Cos[Rational[25, 198] Pi] Sin[Rational[25, 198] Pi], Cos[ Rational[25, 198] Pi]}, {-0.15073744385316068`, Cos[Rational[25, 198] Pi] Sin[Rational[25, 198] Pi], Cos[ Rational[25, 198] Pi]}, { 0.10697345262860625`, Cos[Rational[7, 66] Pi] Sin[Rational[7, 66] Pi], Cos[Rational[7, 66] Pi]}, {-0.1930265473713938, Cos[Rational[7, 66] Pi] Sin[Rational[7, 66] Pi], Cos[ Rational[7, 66] Pi]}, { 0.07100829338251147, Cos[Rational[17, 198] Pi] Sin[Rational[17, 198] Pi], Cos[ Rational[17, 198] Pi]}, {-0.22899170661748858`, Cos[Rational[17, 198] Pi] Sin[Rational[17, 198] Pi], Cos[ Rational[17, 198] Pi]}, { 0.041945771283965205`, Cos[Rational[13, 198] Pi] Sin[Rational[13, 198] Pi], Cos[ Rational[13, 198] Pi]}, {-0.25805422871603484`, Cos[Rational[13, 198] Pi] Sin[Rational[13, 198] Pi], Cos[ Rational[13, 198] Pi]}, { 0.020253513192751316`, Cos[Rational[1, 22] Pi] Sin[Rational[1, 22] Pi], Cos[Rational[1, 22] Pi]}, {-0.27974648680724873`, Cos[Rational[1, 22] Pi] Sin[Rational[1, 22] Pi], Cos[ Rational[1, 22] Pi]}, { 0.006280555661802856, Cos[Rational[5, 198] Pi] Sin[Rational[5, 198] Pi], Cos[ Rational[5, 198] Pi]}, {-0.2937194443381972, Cos[Rational[5, 198] Pi] Sin[Rational[5, 198] Pi], Cos[Rational[5, 198] Pi]}, { 0.0002517288084074587, Cos[Rational[1, 198] Pi] Sin[Rational[1, 198] Pi], Cos[ Rational[1, 198] Pi]}, {-0.2997482711915926, Cos[Rational[1, 198] Pi] Sin[Rational[1, 198] Pi], Cos[Rational[1, 198] Pi]}, { 0.0022640387134577056`, -Cos[Rational[1, 66] Pi] Sin[Rational[1, 66] Pi], Cos[ Rational[1, 66] Pi]}, {-0.29773596128654234`, - Cos[Rational[1, 66] Pi] Sin[Rational[1, 66] Pi], Cos[ Rational[1, 66] Pi]}, { 0.012285106557296477`, -Cos[Rational[7, 198] Pi] Sin[Rational[7, 198] Pi], Cos[ Rational[7, 198] Pi]}, {-0.28771489344270357`, - Cos[Rational[7, 198] Pi] Sin[Rational[7, 198] Pi], Cos[ Rational[7, 198] Pi]}, { 0.030153689607045786`, -Cos[Rational[1, 18] Pi] Sin[Rational[1, 18] Pi], Cos[ Rational[1, 18] Pi]}, {-0.26984631039295426`, - Cos[Rational[1, 18] Pi] Sin[Rational[1, 18] Pi], Cos[ Rational[1, 18] Pi]}, { 0.05558227567253826, -Cos[Rational[5, 66] Pi] Sin[Rational[5, 66] Pi], Cos[Rational[5, 66] Pi]}, {-0.24441772432746178`, - Cos[Rational[5, 66] Pi] Sin[Rational[5, 66] Pi], Cos[ Rational[5, 66] Pi]}, { 0.0881617092850836, -Cos[Rational[19, 198] Pi] Sin[Rational[19, 198] Pi], Cos[ Rational[19, 198] Pi]}, {-0.21183829071491644`, - Cos[Rational[19, 198] Pi] Sin[Rational[19, 198] Pi], Cos[ Rational[19, 198] Pi]}, { 0.1273677751621226, -Cos[Rational[23, 198] Pi] Sin[Rational[23, 198] Pi], Cos[ Rational[23, 198] Pi]}, {-0.17263222483787743`, - Cos[Rational[23, 198] Pi] Sin[Rational[23, 198] Pi], Cos[ Rational[23, 198] Pi]}, { 0.1725696330273575, -Cos[Rational[3, 22] Pi] Sin[Rational[3, 22] Pi], Cos[Rational[3, 22] Pi]}, {-0.12743036697264254`, - Cos[Rational[3, 22] Pi] Sin[Rational[3, 22] Pi], Cos[ Rational[3, 22] Pi]}, { 0.22303996806694487`, -Cos[Rational[31, 198] Pi] Sin[Rational[31, 198] Pi], Cos[ Rational[31, 198] Pi]}, {-0.07696003193305517, - Cos[Rational[31, 198] Pi] Sin[Rational[31, 198] Pi], Cos[ Rational[31, 198] Pi]}, { 0.27796669369711297`, -Cos[Rational[35, 198] Pi] Sin[Rational[35, 198] Pi], Cos[ Rational[35, 198] Pi]}, {-0.02203330630288708, - Cos[Rational[35, 198] Pi] Sin[Rational[35, 198] Pi], Cos[ Rational[35, 198] Pi]}, { 0.3364660183412892, -Cos[Rational[13, 66] Pi] Sin[Rational[13, 66] Pi], 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Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Cos[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4] 2^Rational[-1, 2], Rational[-1, 4]}, {-Cos[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4], Rational[-1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[-1, 2] 2^Rational[-1, 2], Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4], Rational[-1, 2] 2^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4] 2^Rational[-1, 2], Rational[-1, 4]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi], -6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi], -6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4], Rational[-1, 2] 6^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi], -6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi], -6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi], -6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi], -6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, {0, Rational[-1, 2], -6^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi], -6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi], -6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi], -6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi], -6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4], Rational[-1, 2] 6^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi], -6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi], -6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[-1, 2]}, {- Cos[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 6^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-3, 4] 2^Rational[-1, 2], Rational[-1, 4]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[-1, 2] Rational[3, 2]^Rational[1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-3, 4] 2^Rational[-1, 2], Rational[-1, 4]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[-1, 2] 6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, {- Cos[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Sin[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (-1 - 3^Rational[1, 2]), Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, { Cos[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], -2^Rational[-1, 2] Sin[Rational[1, 24] Pi], 0}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (1 - 3^Rational[1, 2]), 0}, {- Cos[Rational[1, 8] Pi], -2^Rational[-1, 2] Sin[Rational[1, 8] Pi], 0}, {Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, {-Cos[Rational[5, 24] Pi], -2^Rational[-1, 2] Sin[Rational[5, 24] Pi], 0}, {-2^Rational[-1, 2], Rational[-1, 2], 0}, {-Sin[Rational[5, 24] Pi], -2^Rational[-1, 2] Cos[Rational[5, 24] Pi], 0}, { Rational[-1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, {- Sin[Rational[1, 8] Pi], -2^Rational[-1, 2] Cos[Rational[1, 8] Pi], 0}, {Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, {- Sin[Rational[1, 24] Pi], -2^Rational[-1, 2] Cos[Rational[1, 24] Pi], 0}, {0, -2^Rational[-1, 2], 0}, { Sin[Rational[1, 24] Pi], -2^Rational[-1, 2] Cos[Rational[1, 24] Pi], 0}, {Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, { Sin[Rational[1, 8] Pi], -2^Rational[-1, 2] Cos[Rational[1, 8] Pi], 0}, {Rational[1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, {Sin[Rational[5, 24] Pi], -2^Rational[-1, 2] Cos[Rational[5, 24] Pi], 0}, { 2^Rational[-1, 2], Rational[-1, 2], 0}, { Cos[Rational[5, 24] Pi], -2^Rational[-1, 2] Sin[Rational[5, 24] Pi], 0}, {Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, { Cos[Rational[1, 8] Pi], -2^Rational[-1, 2] Sin[Rational[1, 8] Pi], 0}, {Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (1 - 3^Rational[1, 2]), 0}, { Cos[Rational[1, 24] Pi], -2^Rational[-1, 2] Sin[Rational[1, 24] Pi], 0}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, {- Cos[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Sin[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (-1 - 3^Rational[1, 2]), Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, { Cos[Rational[1, 24] Pi], Rational[-1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[-1, 2]}, {- Cos[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[1, 2] 6^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-3, 4] 2^Rational[-1, 2], Rational[ 1, 4]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[-1, 2] Rational[3, 2]^Rational[1, 2], Rational[1, 2] 3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-3, 4] 2^Rational[-1, 2], Rational[1, 4]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[1, 2] 6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi], 6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi], 6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4], Rational[1, 2] 6^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi], 6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi], 6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi], 6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi], 6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[-1, 2], 6^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi], 6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi], 6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi], 6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi], 6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4], Rational[1, 2] 6^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi], 6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi], 6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Cos[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 4] 2^Rational[-1, 2], Rational[1, 4]}, {-Cos[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4], Rational[1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[-1, 2] 2^Rational[-1, 2], Rational[1, 2]}, { Sin[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (-1 - 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[1, 2]}, { Sin[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4], Rational[1, 2] 2^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 4] 2^Rational[-1, 2], Rational[1, 4]}, { Cos[Rational[1, 8] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Cos[Rational[5, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[5, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, {- Sin[Rational[1, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (1 - 3^Rational[1, 2]), Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, { Sin[Rational[1, 8] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[-1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (1 - 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[-1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], 0, 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 0, Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], 0, 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], 0, Rational[1, 2] 3^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], 0, 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], 0, 6^ Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], 0, 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], 0, Rational[1, 2]}, {-Sin[Rational[1, 8] Pi], 0, 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 0, Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], 0, 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, {0, 0, 3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], 0, 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 0, Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], 0, 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, {Rational[1, 2], 0, Rational[1, 2]}, { Sin[Rational[5, 24] Pi], 0, 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], 0, 6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], 0, 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], 0, Rational[1, 2] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], 0, 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 0, Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], 0, 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Cos[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, {- Sin[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (-1 + 3^Rational[1, 2]), Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, { Sin[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Cos[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4] 2^Rational[-1, 2], Rational[1, 4]}, {-Cos[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4], Rational[1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 2] 2^Rational[-1, 2], Rational[1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[1, 2]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4], Rational[1, 2] 2^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] 2^Rational[-1, 2], Rational[1, 4]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi], 6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi], 6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4], Rational[1, 2] 6^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi], 6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi], 6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi], 6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi], 6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 2], 6^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi], 6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi], 6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi], 6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi], 6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4], Rational[1, 2] 6^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi], 6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi], 6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[-1, 2]}, {- Cos[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 6^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[3, 4] 2^Rational[-1, 2], Rational[1, 4]}, {- Sin[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 2] Rational[3, 2]^Rational[1, 2], Rational[1, 2] 3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[3, 4] 2^Rational[-1, 2], Rational[1, 4]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[1, 2] 6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[1, 4] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, {- Cos[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Sin[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (1 + 3^Rational[1, 2]), Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, { Cos[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], 0}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, {-Cos[Rational[1, 8] Pi], 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], 0}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, {-Cos[Rational[5, 24] Pi], 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], 0}, {-2^Rational[-1, 2], Rational[1, 2], 0}, {-Sin[Rational[5, 24] Pi], 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], 0}, { Rational[-1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, {- Sin[Rational[1, 8] Pi], 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], 0}, {Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, {-Sin[Rational[1, 24] Pi], 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], 0}, { 0, 2^Rational[-1, 2], 0}, { Sin[Rational[1, 24] Pi], 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], 0}, {Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, { Sin[Rational[1, 8] Pi], 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], 0}, {Rational[1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, {Sin[Rational[5, 24] Pi], 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], 0}, { 2^Rational[-1, 2], Rational[1, 2], 0}, { Cos[Rational[5, 24] Pi], 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], 0}, {Rational[1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, { Cos[Rational[1, 8] Pi], 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], 0}, {Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, { Cos[Rational[1, 24] Pi], 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], 0}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, {- Cos[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Sin[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (1 + 3^Rational[1, 2]), Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2}, { Cos[Rational[1, 24] Pi], Rational[1, 4] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[-1, 2]}, {- Cos[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[-1, 2] 6^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[3, 4] 2^Rational[-1, 2], Rational[-1, 4]}, {-Sin[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 2] Rational[3, 2]^Rational[1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[3, 4] 2^Rational[-1, 2], Rational[-1, 4]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[-1, 2] 6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] Rational[3, 2]^Rational[1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] 3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi], -6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi], -6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4], Rational[-1, 2] 6^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi], -6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, {- Sin[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi], -6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi], -6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi], -6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, {0, Rational[1, 2], -6^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] Cos[Rational[1, 24] Pi], -6^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] Cos[Rational[1, 8] Pi], -6^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 4] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] Cos[Rational[5, 24] Pi], -6^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] Sin[Rational[5, 24] Pi], -6^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4], Rational[-1, 2] 6^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] Sin[Rational[1, 8] Pi], -6^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] Sin[Rational[1, 24] Pi], -6^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {-Cos[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 4] 2^Rational[-1, 2], Rational[-1, 4]}, {-Cos[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4], Rational[-1, 2] 2^Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2]}, {-Sin[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 2] 2^Rational[-1, 2], Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 24] Pi], Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] (1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[1, 8] Pi], Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 4] Rational[3, 2]^Rational[1, 2], Rational[-1, 4] 3^Rational[1, 2]}, { Sin[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Cos[Rational[5, 24] Pi], Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4], Rational[-1, 2] 2^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[5, 24] Pi], Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 4] 2^Rational[-1, 2], Rational[-1, 4]}, { Cos[Rational[1, 8] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 8] Pi], Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 2] 2^Rational[-1, 2] Sin[Rational[1, 24] Pi], Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Cos[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {-Sin[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, {- Sin[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { 0, Rational[1, 4] (-1 + 3^Rational[1, 2]), Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 8] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])^2}, { Sin[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[1, 8] Pi]}, { Rational[1, 2], Rational[1, 8] 3^Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 3^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[5, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 8] (-1 + 3^Rational[1, 2]), Rational[-1, 4] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 8] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])^2, Rational[-1, 8] 3^Rational[-1, 2] (-1 + 3^Rational[1, 2]) (1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], Rational[1, 4] (-1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi], Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2]) Sin[Rational[1, 24] Pi]}, { 1, 0, 0}, {-1, 0, 0}, {-Cos[Rational[1, 24] Pi], 0, -3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 0, Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, {- Cos[Rational[1, 8] Pi], 0, -3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[-1, 2] 3^Rational[1, 2], 0, Rational[-1, 2] 3^Rational[-1, 2]}, {-Cos[Rational[5, 24] Pi], 0, -3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, {-2^Rational[-1, 2], 0, -6^Rational[-1, 2]}, {-Sin[Rational[5, 24] Pi], 0, -3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { Rational[-1, 2], 0, Rational[-1, 2]}, {-Sin[Rational[1, 8] Pi], 0, -3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 0, Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {- Sin[Rational[1, 24] Pi], 0, -3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, {0, 0, -3^Rational[-1, 2]}, { Sin[Rational[1, 24] Pi], 0, -3^Rational[-1, 2] Cos[Rational[1, 24] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 0, Rational[-1, 2] 6^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Sin[Rational[1, 8] Pi], 0, -3^Rational[-1, 2] Cos[Rational[1, 8] Pi]}, {Rational[1, 2], 0, Rational[-1, 2]}, { Sin[Rational[5, 24] Pi], 0, -3^Rational[-1, 2] Cos[Rational[5, 24] Pi]}, { 2^Rational[-1, 2], 0, -6^Rational[-1, 2]}, { Cos[Rational[5, 24] Pi], 0, -3^Rational[-1, 2] Sin[Rational[5, 24] Pi]}, { Rational[1, 2] 3^Rational[1, 2], 0, Rational[-1, 2] 3^Rational[-1, 2]}, { Cos[Rational[1, 8] Pi], 0, -3^Rational[-1, 2] Sin[Rational[1, 8] Pi]}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 0, Rational[-1, 2] 6^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Cos[Rational[1, 24] Pi], 0, -3^Rational[-1, 2] Sin[Rational[1, 24] Pi]}, {1, 0, 0}}, {{-1, 0, 0}, {-0.9914448613738104, 0, -0.07535933221454362}, {-0.9659258262890682, 0, -0.14942924536134225`}, {-0.9238795325112867, 0, -0.22094238269039457`}, {-0.8660254037844386, 0, -0.2886751345948129}, {-0.7933533402912352, 0, -0.3514685749104462}, {-0.7071067811865475, 0, -0.4082482904638631}, {-0.6087614290087207, 0, -0.45804276457963344`}, {-0.5, 0, -0.5}, {-0.3826834323650898, 0, -0.533402096794177}, {-0.2588190451025207, 0, -0.5576775358252053}, {-0.13052619222005157`, 0, -0.5724109576008407}, {0, 0, -0.5773502691896258}, { 0.13052619222005157`, 0, -0.5724109576008407}, { 0.2588190451025207, 0, -0.5576775358252053}, { 0.3826834323650898, 0, -0.533402096794177}, {0.5, 0, -0.5}, { 0.6087614290087207, 0, -0.45804276457963344`}, { 0.7071067811865475, 0, -0.4082482904638631}, { 0.7933533402912352, 0, -0.3514685749104462}, { 0.8660254037844386, 0, -0.2886751345948129}, { 0.9238795325112867, 0, -0.22094238269039457`}, { 0.9659258262890682, 0, -0.14942924536134225`}, { 0.9914448613738104, 0, -0.07535933221454362}, {1, 0, 0}, {-1, 0, 0}, {-0.9914448613738104, -0.02388795110589481, \ -0.07279152523792545}, {-0.9659258262890682, -0.04736717274537648, \ -0.14433756729740643`}, {-0.9238795325112867, -0.07003592892652344, \ -0.21341395356249493`}, {-0.8660254037844386, -0.09150635094610965, \ -0.27883876791260265`}, {-0.7933533402912352, -0.11141107393065441`, \ -0.339492573635014}, {-0.7071067811865475, -0.12940952255126034`, \ -0.3943375672974065}, {-0.6087614290087207, -0.14519373836191624`, \ -0.44243533585231154`}, {-0.5, -0.1584936490538903, -0.4829629131445341}, \ {-0.3826834323650898, -0.16908168946781105`, -0.5152268610902371}, \ {-0.2588190451025207, -0.17677669529663684`, -0.538675134594813}, \ {-0.13052619222005157`, -0.18144700285717785`, -0.5529065271975089}, { 0, -0.1830127018922193, -0.5576775358252053}, { 0.13052619222005157`, -0.18144700285717785`, -0.5529065271975089}, { 0.2588190451025207, -0.17677669529663684`, -0.538675134594813}, { 0.3826834323650898, -0.16908168946781105`, -0.5152268610902371}, { 0.5, -0.1584936490538903, -0.4829629131445341}, { 0.6087614290087207, -0.14519373836191624`, -0.44243533585231154`}, { 0.7071067811865475, -0.12940952255126034`, -0.3943375672974065}, { 0.7933533402912352, -0.11141107393065441`, -0.339492573635014}, { 0.8660254037844386, -0.09150635094610965, -0.27883876791260265`}, { 0.9238795325112867, -0.07003592892652344, -0.21341395356249493`}, { 0.9659258262890682, -0.04736717274537648, -0.14433756729740643`}, { 0.9914448613738104, -0.02388795110589481, -0.07279152523792545}, {1, 0, 0}, {-1, 0, 0}, {-0.9914448613738104, -0.04614797782062862, \ -0.06526309611002579}, {-0.9659258262890682, -0.09150635094610965, \ -0.12940952255126034`}, {-0.9238795325112867, -0.13529902503654923`, \ -0.1913417161825449}, {-0.8660254037844386, -0.17677669529663687`, -0.25}, \ {-0.7933533402912352, -0.2152296672884397, -0.30438071450436033`}, \ {-0.7071067811865475, -0.25, -0.35355339059327373`}, {-0.6087614290087207, \ -0.28049276339846546`, -0.3966766701456176}, {-0.5, -0.30618621784789724`, \ -0.4330127018922193}, {-0.3826834323650898, -0.3266407412190941, \ -0.46193976625564337`}, {-0.2588190451025207, -0.34150635094610965`, \ -0.4829629131445341}, {-0.13052619222005157`, -0.3505286923249889, \ -0.4957224306869052}, {0, -0.35355339059327373`, -0.5}, { 0.13052619222005157`, -0.3505286923249889, -0.4957224306869052}, { 0.2588190451025207, -0.34150635094610965`, -0.4829629131445341}, { 0.3826834323650898, -0.3266407412190941, -0.46193976625564337`}, { 0.5, -0.30618621784789724`, -0.4330127018922193}, { 0.6087614290087207, -0.28049276339846546`, -0.3966766701456176}, { 0.7071067811865475, -0.25, -0.35355339059327373`}, { 0.7933533402912352, -0.2152296672884397, -0.30438071450436033`}, { 0.8660254037844386, -0.17677669529663687`, -0.25}, { 0.9238795325112867, -0.13529902503654923`, -0.1913417161825449}, { 0.9659258262890682, -0.09150635094610965, -0.12940952255126034`}, { 0.9914448613738104, -0.04614797782062862, -0.06526309611002579}, {1, 0, 0}, {-1, 0, 0}, {-0.9914448613738104, -0.06526309611002579, \ -0.05328709483459364}, {-0.9659258262890682, -0.12940952255126034`, \ -0.10566243270259355`}, {-0.9238795325112867, -0.1913417161825449, \ -0.15622985705189127`}, {-0.8660254037844386, -0.25, -0.20412414523193154`}, \ {-0.7933533402912352, -0.30438071450436033`, -0.24852581269314855`}, \ {-0.7071067811865475, 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2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (1 - 3^Rational[1, 2]), 0}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + 3^Rational[-1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, {Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] - 3^Rational[-1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), -3^ Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, {2^Rational[-1, 2], Rational[-1, 2], 0}, { 2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { Pi, -2^Rational[-1, 2], -3^Rational[-1, 2] Pi}, { Rational[11, 12] Pi, -2^Rational[-1, 2], Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[5, 6] Pi, -2^Rational[-1, 2], Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[3, 4] Pi, -2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[2, 3] Pi, -2^Rational[-1, 2], Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[7, 12] Pi, -2^Rational[-1, 2], Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] Pi, -2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[5, 12] Pi, -2^Rational[-1, 2], Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 3] Pi, -2^Rational[-1, 2], Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 4] Pi, -2^Rational[-1, 2], Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 6] Pi, -2^Rational[-1, 2], Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 12] Pi, -2^Rational[-1, 2], Rational[-1, 12] 3^Rational[-1, 2] Pi}, {0, -2^Rational[-1, 2], 0}, { Rational[-1, 12] Pi, -2^Rational[-1, 2], Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 6] Pi, -2^Rational[-1, 2], Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 4] Pi, -2^Rational[-1, 2], Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 3] Pi, -2^Rational[-1, 2], Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-5, 12] Pi, -2^Rational[-1, 2], Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] Pi, -2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-7, 12] Pi, -2^Rational[-1, 2], Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-2, 3] Pi, -2^Rational[-1, 2], Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-3, 4] Pi, -2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-5, 6] Pi, -2^Rational[-1, 2], Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-11, 12] Pi, -2^Rational[-1, 2], Rational[11, 12] 3^Rational[-1, 2] Pi}, {-Pi, -2^Rational[-1, 2], 3^Rational[-1, 2] Pi}, {Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[-1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), -3^ Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2], Rational[-1, 2], 0}, {-2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] - 3^Rational[-1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, {Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + 3^Rational[-1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (1 - 3^Rational[1, 2]), 0}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, {-1, -2^Rational[-1, 2] Pi, -3^Rational[-1, 2] Pi}, {-1, Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-11, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-5, 6] 3^Rational[-1, 2] Pi}, {-1, Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 4] 3^Rational[1, 2] Pi}, {-1, Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-2, 3] 3^Rational[-1, 2] Pi}, {-1, Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-7, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 2] 3^Rational[-1, 2] Pi}, {-1, Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 3] 3^Rational[-1, 2] Pi}, {-1, Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 4] 3^Rational[-1, 2] Pi}, {-1, Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] 3^Rational[-1, 2] Pi}, {-1, Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 12] 3^Rational[-1, 2] Pi}, {-1, 0, 0}, {-1, Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[1, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] 3^Rational[-1, 2] Pi}, {-1, Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[1, 4] 3^Rational[-1, 2] Pi}, {-1, Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 3] 3^Rational[-1, 2] Pi}, {-1, Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[5, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 2] 3^Rational[-1, 2] Pi}, {-1, Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[7, 12] 3^Rational[-1, 2] Pi}, {-1, Rational[1, 3] 2^Rational[1, 2] Pi, Rational[2, 3] 3^Rational[-1, 2] Pi}, {-1, Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[1, 4] 3^Rational[1, 2] Pi}, {-1, Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[5, 6] 3^Rational[-1, 2] Pi}, {-1, Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[11, 12] 3^Rational[-1, 2] Pi}, {-1, 2^Rational[-1, 2] Pi, 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] - 3^Rational[-1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, {Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] + 3^Rational[-1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), -3^ Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2], Rational[1, 2], 0}, {-2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, {-2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[-1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, {-Pi, 2^Rational[-1, 2], -3^Rational[-1, 2] Pi}, {Rational[-11, 12] Pi, 2^Rational[-1, 2], Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[-5, 6] Pi, 2^Rational[-1, 2], Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[-3, 4] Pi, 2^Rational[-1, 2], Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[-2, 3] Pi, 2^Rational[-1, 2], Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[-7, 12] Pi, 2^Rational[-1, 2], Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 2] Pi, 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[-5, 12] Pi, 2^Rational[-1, 2], Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[-1, 3] Pi, 2^Rational[-1, 2], Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[-1, 4] Pi, 2^Rational[-1, 2], Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[-1, 6] Pi, 2^Rational[-1, 2], Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[-1, 12] Pi, 2^Rational[-1, 2], Rational[-1, 12] 3^Rational[-1, 2] Pi}, {0, 2^Rational[-1, 2], 0}, { Rational[1, 12] Pi, 2^Rational[-1, 2], Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 6] Pi, 2^Rational[-1, 2], Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 4] Pi, 2^Rational[-1, 2], Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 3] Pi, 2^Rational[-1, 2], Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[5, 12] Pi, 2^Rational[-1, 2], Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] Pi, 2^Rational[-1, 2], Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[7, 12] Pi, 2^Rational[-1, 2], Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[2, 3] Pi, 2^Rational[-1, 2], Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[3, 4] Pi, 2^Rational[-1, 2], Rational[1, 4] 3^Rational[1, 2] Pi}, {Rational[5, 6] Pi, 2^Rational[-1, 2], Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[11, 12] Pi, 2^Rational[-1, 2], Rational[11, 12] 3^Rational[-1, 2] Pi}, { Pi, 2^Rational[-1, 2], 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), -3^ Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, {2^Rational[-1, 2], Rational[1, 2], 0}, { 2^Rational[-1, 2] + Rational[1, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 12] 2^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 6] 2^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 3] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[5, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-5, 12] 2^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 2] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 2] 2^Rational[-1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[7, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-7, 12] 2^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[1, 3] 2^Rational[1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-1, 3] 2^Rational[1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[3, 4] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-3, 4] 2^Rational[-1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { 2^Rational[-1, 2] + Rational[5, 6] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-5, 6] 2^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + Rational[11, 12] 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + Rational[-11, 12] 2^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 2] 3^Rational[1, 2] Pi), -3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[11, 8] 3^Rational[-1, 2] Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[5, 4] 3^Rational[-1, 2] Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[3, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] + 3^Rational[-1, 2] Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[7, 8] 3^Rational[-1, 2] Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 4] 3^Rational[1, 2] Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[5, 8] 3^Rational[-1, 2] Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 2] 3^Rational[-1, 2] Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 8] 3^Rational[1, 2] Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 4] 3^Rational[-1, 2] Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[1, 8] 3^Rational[-1, 2] Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 8] 3^Rational[-1, 2] Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 4] 3^Rational[-1, 2] Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 2] 3^Rational[-1, 2] Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-5, 8] 3^Rational[-1, 2] Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 4] 3^Rational[1, 2] Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-7, 8] 3^Rational[-1, 2] Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] - 3^Rational[-1, 2] Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-3, 8] 3^Rational[1, 2] Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-5, 4] 3^Rational[-1, 2] Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-11, 8] 3^Rational[-1, 2] Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] + Rational[-1, 2] 3^Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), -3^ Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[-1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 6] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 6] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 4] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 4] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 2] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[7, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-7, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[7, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 3] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 3] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[2, 3] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[3, 8] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-3, 8] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[1, 4] 3^Rational[1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[5, 12] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-5, 12] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[5, 6] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[11, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-11, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), Rational[11, 12] 3^Rational[-1, 2] Pi}, { Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) + Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]) + Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { 1, 2^Rational[-1, 2] Pi, -3^Rational[-1, 2] Pi}, { 1, Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-11, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-5, 6] 3^Rational[-1, 2] Pi}, { 1, Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 4] 3^Rational[1, 2] Pi}, { 1, Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-2, 3] 3^Rational[-1, 2] Pi}, { 1, Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-7, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 2] 3^Rational[-1, 2] Pi}, { 1, Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 3] 3^Rational[-1, 2] Pi}, { 1, Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 4] 3^Rational[-1, 2] Pi}, { 1, Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] 3^Rational[-1, 2] Pi}, { 1, Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 12] 3^Rational[-1, 2] Pi}, {1, 0, 0}, { 1, Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[1, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] 3^Rational[-1, 2] Pi}, { 1, Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[1, 4] 3^Rational[-1, 2] Pi}, { 1, Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 3] 3^Rational[-1, 2] Pi}, { 1, Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[5, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 2] 3^Rational[-1, 2] Pi}, { 1, Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[7, 12] 3^Rational[-1, 2] Pi}, { 1, Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[2, 3] 3^Rational[-1, 2] Pi}, { 1, Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[1, 4] 3^Rational[1, 2] Pi}, { 1, Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[5, 6] 3^Rational[-1, 2] Pi}, { 1, Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[11, 12] 3^Rational[-1, 2] Pi}, { 1, -2^Rational[-1, 2] Pi, 3^Rational[-1, 2] Pi}}, {{ 1, 2.221441469079183, -1.813799364234218}, { 1, 2.0363213466559174`, -1.6626494172146997`}, { 1, 1.8512012242326525`, -1.5114994701951818`}, { 1, 1.666081101809387, -1.3603495231756633`}, { 1, 1.480960979386122, -1.2091995761561452`}, { 1, 1.2958408569628568`, -1.0580496291366273`}, { 1, 1.1107207345395915`, -0.906899682117109}, { 1, 0.9256006121163263, -0.7557497350975909}, { 1, 0.7404804896930609, -0.6045997880780726}, { 1, 0.5553603672697958, -0.4534498410585545}, { 1, 0.37024024484653045`, -0.3022998940390363}, { 1, 0.18512012242326523`, -0.15114994701951814`}, {1, 0, 0}, { 1, -0.18512012242326523`, 0.15114994701951814`}, { 1, -0.37024024484653045`, 0.3022998940390363}, { 1, -0.5553603672697958, 0.4534498410585545}, { 1, -0.7404804896930609, 0.6045997880780726}, { 1, -0.9256006121163263, 0.7557497350975909}, { 1, -1.1107207345395915`, 0.906899682117109}, { 1, -1.2958408569628568`, 1.0580496291366273`}, { 1, -1.480960979386122, 1.2091995761561452`}, { 1, -1.666081101809387, 1.3603495231756633`}, { 1, -1.8512012242326525`, 1.5114994701951818`}, { 1, -2.0363213466559174`, 1.6626494172146997`}, { 1, -2.221441469079183, 1.813799364234218}, {1.7790298369922726`, 1.9627349846808915`, -1.813799364234218}, {1.711271169433672, 1.7839226774664656`, -1.6626494172146997`}, {1.643512501875072, 1.60511037025204, -1.5114994701951818`}, {1.5757538343164716`, 1.426298063037614, -1.3603495231756633`}, {1.5079951667578713`, 1.247485755823188, -1.2091995761561452`}, {1.4402364991992709`, 1.0686734486087621`, -1.0580496291366273`}, {1.3724778316406705`, 0.8898611413943361, -0.906899682117109}, {1.3047191640820701`, 0.7110488341799104, -0.7557497350975909}, {1.2369604965234697`, 0.5322365269654844, -0.6045997880780726}, {1.1692018289648693`, 0.3534242197510585, -0.4534498410585545}, {1.101443161406269, 0.17461191253663258`, -0.3022998940390363}, { 1.0336844938476686`, -0.004200394677793336, -0.15114994701951814`}, { 0.9659258262890682, -0.1830127018922193, 0}, { 0.8981671587304678, -0.36182500910664517`, 0.15114994701951814`}, { 0.8304084911718674, -0.540637316321071, 0.3022998940390363}, { 0.762649823613267, -0.719449623535497, 0.4534498410585545}, { 0.6948911560546667, 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Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { 0, Rational[-15, 8] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8], 0, Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { 0, Rational[15, 8] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { 0, Rational[14105, 7872] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[14105, 31488] (1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744], Rational[14105, 5248] 6^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872] 2^Rational[-1, 2], Rational[14105, 15744], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 5248] 3^Rational[-1, 2], Rational[14105, 15744] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[14105, 31488] (-1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872], 0, Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-14105, 31488] (-1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 5248] 3^Rational[-1, 2], Rational[-14105, 15744] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872] 2^Rational[-1, 2], Rational[-14105, 15744], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744], Rational[-14105, 5248] 6^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-14105, 31488] (1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[-14105, 7872] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-14105, 31488] (1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744], Rational[-14105, 5248] 6^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872] 2^Rational[-1, 2], Rational[-14105, 15744], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 5248] 3^Rational[-1, 2], Rational[-14105, 15744] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-14105, 31488] (-1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872], 0, Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[14105, 31488] (-1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 5248] 3^Rational[-1, 2], Rational[14105, 15744] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872] 2^Rational[-1, 2], Rational[14105, 15744], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744], Rational[14105, 5248] 6^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[14105, 31488] (1 + 3^Rational[1, 2]), Rational[-16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[14105, 7872] 2^Rational[-1, 2], Rational[-16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[3225, 1888] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[3225, 7552] (1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776], Rational[3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888] 2^Rational[-1, 2], Rational[3225, 3776], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 3^Rational[1, 2], Rational[3225, 3776] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[3225, 7552] (-1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888], 0, Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-3225, 7552] (-1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 3^Rational[1, 2], Rational[-3225, 3776] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888] 2^Rational[-1, 2], Rational[-3225, 3776], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776], Rational[-3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-3225, 7552] (1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[-3225, 1888] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-3225, 7552] (1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776], Rational[-3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888] 2^Rational[-1, 2], Rational[-3225, 3776], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 3^Rational[1, 2], Rational[-3225, 3776] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-3225, 7552] (-1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888], 0, Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[3225, 7552] (-1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 3^Rational[1, 2], Rational[3225, 3776] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888] 2^Rational[-1, 2], Rational[3225, 3776], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776], Rational[3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[3225, 7552] (1 + 3^Rational[1, 2]), Rational[-3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[3225, 1888] 2^Rational[-1, 2], Rational[-3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[11745, 7232] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[11745, 28928] (1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464], Rational[11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232] 2^Rational[-1, 2], Rational[11745, 14464], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 3^Rational[1, 2], Rational[11745, 14464] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[11745, 28928] (-1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232], 0, Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-11745, 28928] (-1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 3^Rational[1, 2], Rational[-11745, 14464] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232] 2^Rational[-1, 2], Rational[-11745, 14464], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464], Rational[-11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-11745, 28928] (1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[-11745, 7232] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-11745, 28928] (1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464], Rational[-11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232] 2^Rational[-1, 2], Rational[-11745, 14464], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 3^Rational[1, 2], Rational[-11745, 14464] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-11745, 28928] (-1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232], 0, Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[11745, 28928] (-1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 3^Rational[1, 2], Rational[11745, 14464] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232] 2^Rational[-1, 2], Rational[11745, 14464], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464], Rational[11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[11745, 28928] (1 + 3^Rational[1, 2]), Rational[-13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[11745, 7232] 2^Rational[-1, 2], Rational[-13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[665, 432] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[665, 1728] (1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864], Rational[665, 288] 6^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 432] 2^Rational[-1, 2], Rational[665, 864], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 288] 3^Rational[-1, 2], Rational[665, 864] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[665, 1728] (-1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 432], 0, Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-665, 1728] (-1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 288] 3^Rational[-1, 2], Rational[-665, 864] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 432] 2^Rational[-1, 2], Rational[-665, 864], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864], Rational[-665, 288] 6^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-665, 1728] (1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { 0, Rational[-665, 432] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-665, 1728] (1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864], Rational[-665, 288] 6^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432] 2^Rational[-1, 2], Rational[-665, 864], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 288] 3^Rational[-1, 2], Rational[-665, 864] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-665, 1728] (-1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432], 0, Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[665, 1728] (-1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 288] 3^Rational[-1, 2], Rational[665, 864] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432] 2^Rational[-1, 2], Rational[665, 864], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864], Rational[665, 288] 6^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[665, 1728] (1 + 3^Rational[1, 2]), Rational[-793, 432] 3^Rational[-1, 2]}, { 0, Rational[665, 432] 2^Rational[-1, 2], Rational[-793, 432] 3^Rational[-1, 2]}, { 0, Rational[9585, 6592] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[9585, 26368] (1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184], Rational[9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592] 2^Rational[-1, 2], Rational[9585, 13184], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 3^Rational[1, 2], Rational[9585, 13184] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[9585, 26368] (-1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592], 0, Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-9585, 26368] (-1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 3^Rational[1, 2], Rational[-9585, 13184] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592] 2^Rational[-1, 2], Rational[-9585, 13184], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184], Rational[-9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-9585, 26368] (1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[-9585, 6592] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-9585, 26368] (1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184], Rational[-9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592] 2^Rational[-1, 2], Rational[-9585, 13184], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 3^Rational[1, 2], Rational[-9585, 13184] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-9585, 26368] (-1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592], 0, Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[9585, 26368] (-1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 3^Rational[1, 2], Rational[9585, 13184] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592] 2^Rational[-1, 2], Rational[9585, 13184], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184], Rational[9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[9585, 26368] (1 + 3^Rational[1, 2]), Rational[-11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[9585, 6592] 2^Rational[-1, 2], Rational[-11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[2145, 1568] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2145, 6272] (1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136], Rational[2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568] 2^Rational[-1, 2], Rational[2145, 3136], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 3^Rational[1, 2], Rational[2145, 3136] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2145, 6272] (-1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568], 0, Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2145, 6272] (-1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 3^Rational[1, 2], Rational[-2145, 3136] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568] 2^Rational[-1, 2], Rational[-2145, 3136], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136], Rational[-2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2145, 6272] (1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[-2145, 1568] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2145, 6272] (1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136], Rational[-2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568] 2^Rational[-1, 2], Rational[-2145, 3136], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 3^Rational[1, 2], Rational[-2145, 3136] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2145, 6272] (-1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568], 0, Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2145, 6272] (-1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 3^Rational[1, 2], Rational[2145, 3136] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568] 2^Rational[-1, 2], Rational[2145, 3136], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136], Rational[2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2145, 6272] (1 + 3^Rational[1, 2]), Rational[-2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[2145, 1568] 2^Rational[-1, 2], Rational[-2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[7625, 5952] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[7625, 23808] (1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904], Rational[7625, 3968] 6^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952] 2^Rational[-1, 2], Rational[7625, 11904], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 3968] 3^Rational[-1, 2], Rational[7625, 11904] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[7625, 23808] (-1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952], 0, Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-7625, 23808] (-1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 3968] 3^Rational[-1, 2], Rational[-7625, 11904] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952] 2^Rational[-1, 2], Rational[-7625, 11904], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904], Rational[-7625, 3968] 6^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-7625, 23808] (1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[-7625, 5952] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-7625, 23808] (1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904], Rational[-7625, 3968] 6^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952] 2^Rational[-1, 2], Rational[-7625, 11904], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 3968] 3^Rational[-1, 2], Rational[-7625, 11904] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-7625, 23808] (-1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952], 0, Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[7625, 23808] (-1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 3968] 3^Rational[-1, 2], Rational[7625, 11904] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952] 2^Rational[-1, 2], Rational[7625, 11904], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904], Rational[7625, 3968] 6^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[7625, 23808] (1 + 3^Rational[1, 2]), Rational[-9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[7625, 5952] 2^Rational[-1, 2], Rational[-9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[105, 88] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 352] (1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176], Rational[105, 176] Rational[3, 2]^Rational[1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 88] 2^Rational[-1, 2], Rational[105, 176], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 3^Rational[1, 2], Rational[105, 176] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 352] (-1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 88], 0, Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 352] (-1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 3^Rational[1, 2], Rational[-105, 176] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 88] 2^Rational[-1, 2], Rational[-105, 176], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176], Rational[-105, 176] Rational[3, 2]^Rational[1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 352] (1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { 0, Rational[-105, 88] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 352] (1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176], Rational[-105, 176] Rational[3, 2]^Rational[1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88] 2^Rational[-1, 2], Rational[-105, 176], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 3^Rational[1, 2], Rational[-105, 176] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 352] (-1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88], 0, Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 352] (-1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 3^Rational[1, 2], Rational[105, 176] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88] 2^Rational[-1, 2], Rational[105, 176], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176], Rational[105, 176] Rational[3, 2]^Rational[1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 352] (1 + 3^Rational[1, 2]), Rational[-137, 88] 3^Rational[-1, 2]}, { 0, Rational[105, 88] 2^Rational[-1, 2], Rational[-137, 88] 3^Rational[-1, 2]}, { 0, Rational[5865, 5312] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5865, 21248] (1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624], Rational[5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312] 2^Rational[-1, 2], Rational[5865, 10624], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 3^Rational[1, 2], Rational[5865, 10624] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5865, 21248] (-1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312], 0, Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5865, 21248] (-1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 3^Rational[1, 2], Rational[-5865, 10624] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312] 2^Rational[-1, 2], Rational[-5865, 10624], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624], Rational[-5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5865, 21248] (1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[-5865, 5312] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5865, 21248] (1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624], Rational[-5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312] 2^Rational[-1, 2], Rational[-5865, 10624], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 3^Rational[1, 2], Rational[-5865, 10624] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5865, 21248] (-1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312], 0, Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5865, 21248] (-1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 3^Rational[1, 2], Rational[5865, 10624] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312] 2^Rational[-1, 2], Rational[5865, 10624], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624], Rational[5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5865, 21248] (1 + 3^Rational[1, 2]), Rational[-7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[5865, 5312] 2^Rational[-1, 2], Rational[-7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[1265, 1248] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1265, 4992] (1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496], Rational[1265, 832] 6^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248] 2^Rational[-1, 2], Rational[1265, 2496], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 832] 3^Rational[-1, 2], Rational[1265, 2496] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1265, 4992] (-1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248], 0, Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1265, 4992] (-1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 832] 3^Rational[-1, 2], Rational[-1265, 2496] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248] 2^Rational[-1, 2], Rational[-1265, 2496], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496], Rational[-1265, 832] 6^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1265, 4992] (1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[-1265, 1248] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1265, 4992] (1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496], Rational[-1265, 832] 6^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248] 2^Rational[-1, 2], Rational[-1265, 2496], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 832] 3^Rational[-1, 2], Rational[-1265, 2496] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1265, 4992] (-1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248], 0, Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1265, 4992] (-1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 832] 3^Rational[-1, 2], Rational[1265, 2496] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248] 2^Rational[-1, 2], Rational[1265, 2496], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496], Rational[1265, 832] 6^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1265, 4992] (1 + 3^Rational[1, 2]), Rational[-1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[1265, 1248] 2^Rational[-1, 2], Rational[-1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[4305, 4672] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[4305, 18688] (1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344], Rational[4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672] 2^Rational[-1, 2], Rational[4305, 9344], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 3^Rational[1, 2], Rational[4305, 9344] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[4305, 18688] (-1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672], 0, Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-4305, 18688] (-1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 3^Rational[1, 2], Rational[-4305, 9344] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672] 2^Rational[-1, 2], Rational[-4305, 9344], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344], Rational[-4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-4305, 18688] (1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[-4305, 4672] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-4305, 18688] (1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344], Rational[-4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672] 2^Rational[-1, 2], Rational[-4305, 9344], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 3^Rational[1, 2], Rational[-4305, 9344] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-4305, 18688] (-1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672], 0, Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[4305, 18688] (-1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 3^Rational[1, 2], Rational[4305, 9344] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672] 2^Rational[-1, 2], Rational[4305, 9344], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344], Rational[4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[4305, 18688] (1 + 3^Rational[1, 2]), Rational[-6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[4305, 4672] 2^Rational[-1, 2], Rational[-6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[225, 272] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[225, 1088] (1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544], Rational[225, 544] Rational[3, 2]^Rational[1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 272] 2^Rational[-1, 2], Rational[225, 544], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 3^Rational[1, 2], Rational[225, 544] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[225, 1088] (-1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 272], 0, Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-225, 1088] (-1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 3^Rational[1, 2], Rational[-225, 544] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 272] 2^Rational[-1, 2], Rational[-225, 544], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544], Rational[-225, 544] Rational[3, 2]^Rational[1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-225, 1088] (1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { 0, Rational[-225, 272] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-225, 1088] (1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544], Rational[-225, 544] Rational[3, 2]^Rational[1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272] 2^Rational[-1, 2], Rational[-225, 544], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 3^Rational[1, 2], Rational[-225, 544] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-225, 1088] (-1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272], 0, Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[225, 1088] (-1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 3^Rational[1, 2], Rational[225, 544] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272] 2^Rational[-1, 2], Rational[225, 544], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544], Rational[225, 544] Rational[3, 2]^Rational[1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[225, 1088] (1 + 3^Rational[1, 2]), Rational[-353, 272] 3^Rational[-1, 2]}, { 0, Rational[225, 272] 2^Rational[-1, 2], Rational[-353, 272] 3^Rational[-1, 2]}, { 0, Rational[2945, 4032] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2945, 16128] (1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064], Rational[2945, 2688] 6^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032] 2^Rational[-1, 2], Rational[2945, 8064], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 2688] 3^Rational[-1, 2], Rational[2945, 8064] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2945, 16128] (-1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032], 0, Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2945, 16128] (-1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 2688] 3^Rational[-1, 2], Rational[-2945, 8064] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032] 2^Rational[-1, 2], Rational[-2945, 8064], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064], Rational[-2945, 2688] 6^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2945, 16128] (1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[-2945, 4032] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2945, 16128] (1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064], Rational[-2945, 2688] 6^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032] 2^Rational[-1, 2], Rational[-2945, 8064], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 2688] 3^Rational[-1, 2], Rational[-2945, 8064] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2945, 16128] (-1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032], 0, Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2945, 16128] (-1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 2688] 3^Rational[-1, 2], Rational[2945, 8064] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032] 2^Rational[-1, 2], Rational[2945, 8064], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064], Rational[2945, 2688] 6^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2945, 16128] (1 + 3^Rational[1, 2]), Rational[-4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[2945, 4032] 2^Rational[-1, 2], Rational[-4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[585, 928] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[585, 3712] (1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856], Rational[585, 1856] Rational[3, 2]^Rational[1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928] 2^Rational[-1, 2], Rational[585, 1856], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 3^Rational[1, 2], Rational[585, 1856] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[585, 3712] (-1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928], 0, Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-585, 3712] (-1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 3^Rational[1, 2], Rational[-585, 1856] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928] 2^Rational[-1, 2], Rational[-585, 1856], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856], Rational[-585, 1856] Rational[3, 2]^Rational[1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-585, 3712] (1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { 0, Rational[-585, 928] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-585, 3712] (1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856], Rational[-585, 1856] Rational[3, 2]^Rational[1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928] 2^Rational[-1, 2], Rational[-585, 1856], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 3^Rational[1, 2], Rational[-585, 1856] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-585, 3712] (-1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928], 0, Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[585, 3712] (-1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 3^Rational[1, 2], Rational[585, 1856] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928] 2^Rational[-1, 2], Rational[585, 1856], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856], Rational[585, 1856] Rational[3, 2]^Rational[1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[585, 3712] (1 + 3^Rational[1, 2]), Rational[-1097, 928] 3^Rational[-1, 2]}, { 0, Rational[585, 928] 2^Rational[-1, 2], Rational[-1097, 928] 3^Rational[-1, 2]}, { 0, Rational[1785, 3392] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1785, 13568] (1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784], Rational[1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392] 2^Rational[-1, 2], Rational[1785, 6784], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 3^Rational[1, 2], Rational[1785, 6784] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1785, 13568] (-1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392], 0, Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1785, 13568] (-1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 3^Rational[1, 2], Rational[-1785, 6784] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392] 2^Rational[-1, 2], Rational[-1785, 6784], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784], Rational[-1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1785, 13568] (1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[-1785, 3392] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1785, 13568] (1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784], Rational[-1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392] 2^Rational[-1, 2], Rational[-1785, 6784], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 3^Rational[1, 2], Rational[-1785, 6784] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1785, 13568] (-1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392], 0, Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1785, 13568] (-1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 3^Rational[1, 2], Rational[1785, 6784] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392] 2^Rational[-1, 2], Rational[1785, 6784], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784], Rational[1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1785, 13568] (1 + 3^Rational[1, 2]), Rational[-3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[1785, 3392] 2^Rational[-1, 2], Rational[-3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[5, 12] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5, 48] (1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24], Rational[5, 8] 6^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 12] 2^Rational[-1, 2], Rational[5, 24], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 8] 3^Rational[-1, 2], Rational[5, 24] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5, 48] (-1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 12], 0, Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5, 48] (-1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 8] 3^Rational[-1, 2], Rational[-5, 24] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 12] 2^Rational[-1, 2], Rational[-5, 24], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24], Rational[-5, 8] 6^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5, 48] (1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { 0, Rational[-5, 12] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5, 48] (1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24], Rational[-5, 8] 6^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12] 2^Rational[-1, 2], Rational[-5, 24], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 8] 3^Rational[-1, 2], Rational[-5, 24] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5, 48] (-1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12], 0, Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5, 48] (-1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 8] 3^Rational[-1, 2], Rational[5, 24] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12] 2^Rational[-1, 2], Rational[5, 24], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24], Rational[5, 8] 6^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5, 48] (1 + 3^Rational[1, 2]), Rational[-13, 12] 3^Rational[-1, 2]}, { 0, Rational[5, 12] 2^Rational[-1, 2], Rational[-13, 12] 3^Rational[-1, 2]}, { 0, Rational[825, 2752] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[825, 11008] (1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504], Rational[825, 5504] Rational[3, 2]^Rational[1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752] 2^Rational[-1, 2], Rational[825, 5504], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 3^Rational[1, 2], Rational[825, 5504] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[825, 11008] (-1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752], 0, Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-825, 11008] (-1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 3^Rational[1, 2], Rational[-825, 5504] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752] 2^Rational[-1, 2], Rational[-825, 5504], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504], Rational[-825, 5504] Rational[3, 2]^Rational[1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-825, 11008] (1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[-825, 2752] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-825, 11008] (1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504], Rational[-825, 5504] Rational[3, 2]^Rational[1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752] 2^Rational[-1, 2], Rational[-825, 5504], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 3^Rational[1, 2], Rational[-825, 5504] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-825, 11008] (-1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752], 0, Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[825, 11008] (-1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 3^Rational[1, 2], Rational[825, 5504] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752] 2^Rational[-1, 2], Rational[825, 5504], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504], Rational[825, 5504] Rational[3, 2]^Rational[1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[825, 11008] (1 + 3^Rational[1, 2]), Rational[-2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[825, 2752] 2^Rational[-1, 2], Rational[-2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[105, 608] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 2432] (1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216], Rational[105, 1216] Rational[3, 2]^Rational[1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 608] 2^Rational[-1, 2], Rational[105, 1216], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 3^Rational[1, 2], Rational[105, 1216] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 2432] (-1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 608], 0, Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 2432] (-1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 3^Rational[1, 2], Rational[-105, 1216] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 608] 2^Rational[-1, 2], Rational[-105, 1216], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216], Rational[-105, 1216] Rational[3, 2]^Rational[1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 2432] (1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { 0, Rational[-105, 608] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 2432] (1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216], Rational[-105, 1216] Rational[3, 2]^Rational[1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608] 2^Rational[-1, 2], Rational[-105, 1216], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 3^Rational[1, 2], Rational[-105, 1216] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 2432] (-1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608], 0, Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 2432] (-1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 3^Rational[1, 2], Rational[105, 1216] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608] 2^Rational[-1, 2], Rational[105, 1216], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216], Rational[105, 1216] Rational[3, 2]^Rational[1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 2432] (1 + 3^Rational[1, 2]), Rational[-617, 608] 3^Rational[-1, 2]}, { 0, Rational[105, 608] 2^Rational[-1, 2], Rational[-617, 608] 3^Rational[-1, 2]}, { 0, Rational[65, 2112] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[65, 8448] (1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224], Rational[65, 1408] 6^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112] 2^Rational[-1, 2], Rational[65, 4224], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 1408] 3^Rational[-1, 2], Rational[65, 4224] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[65, 8448] (-1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112], 0, Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-65, 8448] (-1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 1408] 3^Rational[-1, 2], Rational[-65, 4224] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112] 2^Rational[-1, 2], Rational[-65, 4224], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224], Rational[-65, 1408] 6^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-65, 8448] (1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[-65, 2112] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-65, 8448] (1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224], Rational[-65, 1408] 6^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112] 2^Rational[-1, 2], Rational[-65, 4224], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 1408] 3^Rational[-1, 2], Rational[-65, 4224] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-65, 8448] (-1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112], 0, Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[65, 8448] (-1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 1408] 3^Rational[-1, 2], Rational[65, 4224] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112] 2^Rational[-1, 2], Rational[65, 4224], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224], Rational[65, 1408] 6^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[65, 8448] (1 + 3^Rational[1, 2]), Rational[-2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[65, 2112] 2^Rational[-1, 2], Rational[-2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[-15, 112] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 448] (1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224], Rational[-15, 224] Rational[3, 2]^Rational[1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112] 2^Rational[-1, 2], Rational[-15, 224], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 3^Rational[1, 2], Rational[-15, 224] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 448] (-1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112], 0, Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 448] (-1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 3^Rational[1, 2], Rational[15, 224] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112] 2^Rational[-1, 2], Rational[15, 224], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224], Rational[15, 224] Rational[3, 2]^Rational[1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 448] (1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { 0, Rational[15, 112] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 448] (1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224], Rational[15, 224] Rational[3, 2]^Rational[1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 112] 2^Rational[-1, 2], Rational[15, 224], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 3^Rational[1, 2], Rational[15, 224] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 448] (-1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 112], 0, Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 448] (-1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 3^Rational[1, 2], Rational[-15, 224] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 112] 2^Rational[-1, 2], Rational[-15, 224], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224], Rational[-15, 224] Rational[3, 2]^Rational[1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 448] (1 + 3^Rational[1, 2]), Rational[-113, 112] 3^Rational[-1, 2]}, { 0, Rational[-15, 112] 2^Rational[-1, 2], Rational[-113, 112] 3^Rational[-1, 2]}, { 0, Rational[-495, 1472] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-495, 5888] (1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944], Rational[-495, 2944] Rational[3, 2]^Rational[1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472] 2^Rational[-1, 2], Rational[-495, 2944], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 3^Rational[1, 2], Rational[-495, 2944] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-495, 5888] (-1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472], 0, Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[495, 5888] (-1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 3^Rational[1, 2], Rational[495, 2944] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472] 2^Rational[-1, 2], Rational[495, 2944], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944], Rational[495, 2944] Rational[3, 2]^Rational[1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[495, 5888] (1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[495, 1472] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[495, 5888] (1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944], Rational[495, 2944] Rational[3, 2]^Rational[1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472] 2^Rational[-1, 2], Rational[495, 2944], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 3^Rational[1, 2], Rational[495, 2944] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[495, 5888] (-1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472], 0, Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-495, 5888] (-1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 3^Rational[1, 2], Rational[-495, 2944] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472] 2^Rational[-1, 2], Rational[-495, 2944], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944], Rational[-495, 2944] Rational[3, 2]^Rational[1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-495, 5888] (1 + 3^Rational[1, 2]), Rational[-1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[-495, 1472] 2^Rational[-1, 2], Rational[-1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[-175, 288] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-175, 1152] (1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576], Rational[-175, 192] 6^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288] 2^Rational[-1, 2], Rational[-175, 576], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 192] 3^Rational[-1, 2], Rational[-175, 576] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-175, 1152] (-1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288], 0, Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[175, 1152] (-1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 192] 3^Rational[-1, 2], Rational[175, 576] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288] 2^Rational[-1, 2], Rational[175, 576], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576], Rational[175, 192] 6^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[175, 1152] (1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { 0, Rational[175, 288] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[175, 1152] (1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576], Rational[175, 192] 6^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 288] 2^Rational[-1, 2], Rational[175, 576], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 192] 3^Rational[-1, 2], Rational[175, 576] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[175, 1152] (-1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 288], 0, Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-175, 1152] (-1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 192] 3^Rational[-1, 2], Rational[-175, 576] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 288] 2^Rational[-1, 2], Rational[-175, 576], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576], Rational[-175, 192] 6^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-175, 1152] (1 + 3^Rational[1, 2]), Rational[-337, 288] 3^Rational[-1, 2]}, { 0, Rational[-175, 288] 2^Rational[-1, 2], Rational[-337, 288] 3^Rational[-1, 2]}, { 0, Rational[-855, 832] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-855, 3328] (1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664], Rational[-855, 1664] Rational[3, 2]^Rational[1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832] 2^Rational[-1, 2], Rational[-855, 1664], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 3^Rational[1, 2], Rational[-855, 1664] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-855, 3328] (-1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832], 0, Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[855, 3328] (-1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 3^Rational[1, 2], Rational[855, 1664] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832] 2^Rational[-1, 2], Rational[855, 1664], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664], Rational[855, 1664] Rational[3, 2]^Rational[1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[855, 3328] (1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { 0, Rational[855, 832] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[855, 3328] (1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664], Rational[855, 1664] Rational[3, 2]^Rational[1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832] 2^Rational[-1, 2], Rational[855, 1664], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 3^Rational[1, 2], Rational[855, 1664] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[855, 3328] (-1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832], 0, Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-855, 3328] (-1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 3^Rational[1, 2], Rational[-855, 1664] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832] 2^Rational[-1, 2], Rational[-855, 1664], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664], Rational[-855, 1664] Rational[3, 2]^Rational[1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-855, 3328] (1 + 3^Rational[1, 2]), Rational[-1193, 832] 3^Rational[-1, 2]}, { 0, Rational[-855, 832] 2^Rational[-1, 2], Rational[-1193, 832] 3^Rational[-1, 2]}, { 0, Rational[-15, 8] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8], 0, Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { 0, Rational[15, 8] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 8], 0, Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[-17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[-17, 8] 3^Rational[-1, 2]}, { 0, Rational[-15, 8] 2^Rational[-1, 2], Rational[-17, 8] 3^Rational[-1, 2]}}, {{ 0, 1.3258252147247764`, -1.226869322027955}, {0.4852857095672263, 1.2806488160479113`, -1.226869322027955}, {0.9375, 1.1481983169296146`, -1.226869322027955}, {1.3258252147247764`, 0.9375, -1.226869322027955}, {1.6237976320958223`, 0.6629126073623882, -1.226869322027955}, {1.8111109242920027`, 0.3431488160479112, -1.226869322027955}, { 1.875, 0, -1.226869322027955}, { 1.8111109242920027`, -0.3431488160479112, -1.226869322027955}, { 1.6237976320958223`, -0.6629126073623882, -1.226869322027955}, { 1.3258252147247764`, -0.9375, -1.226869322027955}, { 0.9375, -1.1481983169296146`, -1.226869322027955}, { 0.4852857095672263, -1.2806488160479113`, -1.226869322027955}, { 0, -1.3258252147247764`, -1.226869322027955}, {-0.4852857095672263, \ -1.2806488160479113`, -1.226869322027955}, {-0.9375, -1.1481983169296146`, \ -1.226869322027955}, {-1.3258252147247764`, -0.9375, -1.226869322027955}, \ {-1.6237976320958223`, -0.6629126073623882, -1.226869322027955}, \ {-1.8111109242920027`, -0.3431488160479112, -1.226869322027955}, {-1.875, 0, -1.226869322027955}, {-1.8111109242920027`, 0.3431488160479112, -1.226869322027955}, {-1.6237976320958223`, 0.6629126073623882, -1.226869322027955}, {-1.3258252147247764`, 0.9375, -1.226869322027955}, {-0.9375, 1.1481983169296146`, -1.226869322027955}, {-0.4852857095672263, 1.2806488160479113`, -1.226869322027955}, { 0, 1.3258252147247764`, -1.226869322027955}, { 0, 1.2669894751824506`, -1.184697522639739}, {0.46375033424429046`, 1.2238178557151618`, -1.184697522639739}, {0.8958968495934959, 1.097245071835516, -1.184697522639739}, {1.2669894751824506`, 0.8958968495934959, -1.184697522639739}, {1.5517388618368277`, 0.6334947375912253, -1.184697522639739}, {1.730739809426741, 0.3279210061216658, -1.184697522639739}, { 1.7917936991869918`, 0, -1.184697522639739}, { 1.730739809426741, -0.3279210061216658, -1.184697522639739}, { 1.5517388618368277`, -0.6334947375912253, -1.184697522639739}, { 1.2669894751824506`, -0.8958968495934959, -1.184697522639739}, { 0.8958968495934959, -1.097245071835516, -1.184697522639739}, { 0.46375033424429046`, -1.2238178557151618`, -1.184697522639739}, { 0, -1.2669894751824506`, -1.184697522639739}, \ {-0.46375033424429046`, -1.2238178557151618`, -1.184697522639739}, \ {-0.8958968495934959, -1.097245071835516, -1.184697522639739}, \ {-1.2669894751824506`, -0.8958968495934959, -1.184697522639739}, \ {-1.5517388618368277`, -0.6334947375912253, -1.184697522639739}, \ {-1.730739809426741, -0.3279210061216658, -1.184697522639739}, \ {-1.7917936991869918`, 0, -1.184697522639739}, {-1.730739809426741, 0.3279210061216658, -1.184697522639739}, {-1.5517388618368277`, 0.6334947375912253, -1.184697522639739}, {-1.2669894751824506`, 0.8958968495934959, -1.184697522639739}, {-0.8958968495934959, 1.097245071835516, -1.184697522639739}, {-0.46375033424429046`, 1.2238178557151618`, -1.184697522639739}, { 0, 1.2669894751824506`, -1.184697522639739}, { 0, 1.2078492422280802`, -1.1427743410813729`}, {0.4421035065972612, 1.1666927773317834`, -1.1427743410813729`}, {0.8540783898305084, 1.0460281277113015`, -1.1427743410813729`}, {1.2078492422280802`, 0.8540783898305084, -1.1427743410813729`}, {1.4793071648330585`, 0.6039246211140401, -1.1427743410813729`}, {1.6499527488253414`, 0.312614387501275, -1.1427743410813729`}, { 1.7081567796610169`, 0, -1.1427743410813729`}, { 1.6499527488253414`, -0.312614387501275, -1.1427743410813729`}, { 1.4793071648330585`, -0.6039246211140401, -1.1427743410813729`}, { 1.2078492422280802`, -0.8540783898305084, -1.1427743410813729`}, { 0.8540783898305084, -1.0460281277113015`, -1.1427743410813729`}, { 0.4421035065972612, -1.1666927773317834`, -1.1427743410813729`}, { 0, -1.2078492422280802`, -1.1427743410813729`}, \ {-0.4421035065972612, -1.1666927773317834`, -1.1427743410813729`}, \ {-0.8540783898305084, -1.0460281277113015`, -1.1427743410813729`}, \ {-1.2078492422280802`, -0.8540783898305084, 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8] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8], 0, Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { 0, Rational[15, 8] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { 0, Rational[855, 832] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[855, 3328] (1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664], Rational[855, 1664] Rational[3, 2]^Rational[1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832] 2^Rational[-1, 2], Rational[855, 1664], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 3^Rational[1, 2], Rational[855, 1664] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[855, 3328] (-1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832], 0, Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-855, 3328] (-1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 3^Rational[1, 2], Rational[-855, 1664] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 832] 2^Rational[-1, 2], Rational[-855, 1664], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664], Rational[-855, 1664] Rational[3, 2]^Rational[1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-855, 3328] (1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { 0, Rational[-855, 832] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-855, 3328] (1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664], Rational[-855, 1664] Rational[3, 2]^Rational[1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832] 2^Rational[-1, 2], Rational[-855, 1664], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 3^Rational[1, 2], Rational[-855, 1664] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-855, 3328] (-1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832], 0, Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[855, 3328] (-1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 3^Rational[1, 2], Rational[855, 1664] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 832] 2^Rational[-1, 2], Rational[855, 1664], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664], Rational[855, 1664] Rational[3, 2]^Rational[1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { Rational[-855, 1664] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[855, 3328] (1 + 3^Rational[1, 2]), Rational[1193, 832] 3^Rational[-1, 2]}, { 0, Rational[855, 832] 2^Rational[-1, 2], Rational[1193, 832] 3^Rational[-1, 2]}, { 0, Rational[175, 288] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[175, 1152] (1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576], Rational[175, 192] 6^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 288] 2^Rational[-1, 2], Rational[175, 576], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 192] 3^Rational[-1, 2], Rational[175, 576] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[175, 1152] (-1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 288], 0, Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-175, 1152] (-1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 192] 3^Rational[-1, 2], Rational[-175, 576] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 288] 2^Rational[-1, 2], Rational[-175, 576], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576], Rational[-175, 192] 6^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-175, 1152] (1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { 0, Rational[-175, 288] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-175, 1152] (1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576], Rational[-175, 192] 6^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288] 2^Rational[-1, 2], Rational[-175, 576], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 192] 3^Rational[-1, 2], Rational[-175, 576] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-175, 1152] (-1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288], 0, Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[175, 1152] (-1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 192] 3^Rational[-1, 2], Rational[175, 576] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 288] 2^Rational[-1, 2], Rational[175, 576], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576], Rational[175, 192] 6^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { Rational[-175, 576] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[175, 1152] (1 + 3^Rational[1, 2]), Rational[337, 288] 3^Rational[-1, 2]}, { 0, Rational[175, 288] 2^Rational[-1, 2], Rational[337, 288] 3^Rational[-1, 2]}, { 0, Rational[495, 1472] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[495, 5888] (1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944], Rational[495, 2944] Rational[3, 2]^Rational[1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472] 2^Rational[-1, 2], Rational[495, 2944], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 3^Rational[1, 2], Rational[495, 2944] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[495, 5888] (-1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472], 0, Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-495, 5888] (-1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 3^Rational[1, 2], Rational[-495, 2944] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 1472] 2^Rational[-1, 2], Rational[-495, 2944], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944], Rational[-495, 2944] Rational[3, 2]^Rational[1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-495, 5888] (1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[-495, 1472] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-495, 5888] (1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944], Rational[-495, 2944] Rational[3, 2]^Rational[1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472] 2^Rational[-1, 2], Rational[-495, 2944], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 3^Rational[1, 2], Rational[-495, 2944] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-495, 5888] (-1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472], 0, Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[495, 5888] (-1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 3^Rational[1, 2], Rational[495, 2944] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 1472] 2^Rational[-1, 2], Rational[495, 2944], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944], Rational[495, 2944] Rational[3, 2]^Rational[1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { Rational[-495, 2944] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[495, 5888] (1 + 3^Rational[1, 2]), Rational[1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[495, 1472] 2^Rational[-1, 2], Rational[1553, 1472] 3^Rational[-1, 2]}, { 0, Rational[15, 112] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 448] (1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224], Rational[15, 224] Rational[3, 2]^Rational[1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 112] 2^Rational[-1, 2], Rational[15, 224], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 3^Rational[1, 2], Rational[15, 224] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 448] (-1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 112], 0, Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 448] (-1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 3^Rational[1, 2], Rational[-15, 224] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 112] 2^Rational[-1, 2], Rational[-15, 224], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224], Rational[-15, 224] Rational[3, 2]^Rational[1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 448] (1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { 0, Rational[-15, 112] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 448] (1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224], Rational[-15, 224] Rational[3, 2]^Rational[1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112] 2^Rational[-1, 2], Rational[-15, 224], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 3^Rational[1, 2], Rational[-15, 224] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 448] (-1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112], 0, Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 448] (-1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 3^Rational[1, 2], Rational[15, 224] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 112] 2^Rational[-1, 2], Rational[15, 224], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224], Rational[15, 224] Rational[3, 2]^Rational[1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { Rational[-15, 224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 448] (1 + 3^Rational[1, 2]), Rational[113, 112] 3^Rational[-1, 2]}, { 0, Rational[15, 112] 2^Rational[-1, 2], Rational[113, 112] 3^Rational[-1, 2]}, { 0, Rational[-65, 2112] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-65, 8448] (1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224], Rational[-65, 1408] 6^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112] 2^Rational[-1, 2], Rational[-65, 4224], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 1408] 3^Rational[-1, 2], Rational[-65, 4224] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-65, 8448] (-1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112], 0, Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[65, 8448] (-1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 1408] 3^Rational[-1, 2], Rational[65, 4224] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 2112] 2^Rational[-1, 2], Rational[65, 4224], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224], Rational[65, 1408] 6^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[-65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[65, 8448] (1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[65, 2112] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[65, 8448] (1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224], Rational[65, 1408] 6^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112] 2^Rational[-1, 2], Rational[65, 4224], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 1408] 3^Rational[-1, 2], Rational[65, 4224] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[65, 8448] (-1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112], 0, Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-65, 8448] (-1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 1408] 3^Rational[-1, 2], Rational[-65, 4224] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 2112] 2^Rational[-1, 2], Rational[-65, 4224], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224], Rational[-65, 1408] 6^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { Rational[65, 4224] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-65, 8448] (1 + 3^Rational[1, 2]), Rational[2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[-65, 2112] 2^Rational[-1, 2], Rational[2113, 2112] 3^Rational[-1, 2]}, { 0, Rational[-105, 608] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 2432] (1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216], Rational[-105, 1216] Rational[3, 2]^Rational[1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608] 2^Rational[-1, 2], Rational[-105, 1216], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 3^Rational[1, 2], Rational[-105, 1216] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 2432] (-1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608], 0, Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 2432] (-1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 3^Rational[1, 2], Rational[105, 1216] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 608] 2^Rational[-1, 2], Rational[105, 1216], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216], Rational[105, 1216] Rational[3, 2]^Rational[1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[-105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 2432] (1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { 0, Rational[105, 608] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 2432] (1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216], Rational[105, 1216] Rational[3, 2]^Rational[1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 608] 2^Rational[-1, 2], Rational[105, 1216], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 3^Rational[1, 2], Rational[105, 1216] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 2432] (-1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 608], 0, Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 2432] (-1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 3^Rational[1, 2], Rational[-105, 1216] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 608] 2^Rational[-1, 2], Rational[-105, 1216], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216], Rational[-105, 1216] Rational[3, 2]^Rational[1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { Rational[105, 1216] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 2432] (1 + 3^Rational[1, 2]), Rational[617, 608] 3^Rational[-1, 2]}, { 0, Rational[-105, 608] 2^Rational[-1, 2], Rational[617, 608] 3^Rational[-1, 2]}, { 0, Rational[-825, 2752] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-825, 11008] (1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504], Rational[-825, 5504] Rational[3, 2]^Rational[1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752] 2^Rational[-1, 2], Rational[-825, 5504], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 3^Rational[1, 2], Rational[-825, 5504] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-825, 11008] (-1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752], 0, Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[825, 11008] (-1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 3^Rational[1, 2], Rational[825, 5504] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 2752] 2^Rational[-1, 2], Rational[825, 5504], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504], Rational[825, 5504] Rational[3, 2]^Rational[1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[-825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[825, 11008] (1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[825, 2752] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[825, 11008] (1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504], Rational[825, 5504] Rational[3, 2]^Rational[1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752] 2^Rational[-1, 2], Rational[825, 5504], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 3^Rational[1, 2], Rational[825, 5504] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[825, 11008] (-1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752], 0, Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-825, 11008] (-1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 3^Rational[1, 2], Rational[-825, 5504] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 2752] 2^Rational[-1, 2], Rational[-825, 5504], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504], Rational[-825, 5504] Rational[3, 2]^Rational[1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { Rational[825, 5504] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-825, 11008] (1 + 3^Rational[1, 2]), Rational[2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[-825, 2752] 2^Rational[-1, 2], Rational[2873, 2752] 3^Rational[-1, 2]}, { 0, Rational[-5, 12] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5, 48] (1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24], Rational[-5, 8] 6^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12] 2^Rational[-1, 2], Rational[-5, 24], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 8] 3^Rational[-1, 2], Rational[-5, 24] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5, 48] (-1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12], 0, Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5, 48] (-1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 8] 3^Rational[-1, 2], Rational[5, 24] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 12] 2^Rational[-1, 2], Rational[5, 24], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24], Rational[5, 8] 6^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[-5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5, 48] (1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { 0, Rational[5, 12] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5, 48] (1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24], Rational[5, 8] 6^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 12] 2^Rational[-1, 2], Rational[5, 24], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 8] 3^Rational[-1, 2], Rational[5, 24] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5, 48] (-1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 12], 0, Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5, 48] (-1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 8] 3^Rational[-1, 2], Rational[-5, 24] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 12] 2^Rational[-1, 2], Rational[-5, 24], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24], Rational[-5, 8] 6^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { Rational[5, 24] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5, 48] (1 + 3^Rational[1, 2]), Rational[13, 12] 3^Rational[-1, 2]}, { 0, Rational[-5, 12] 2^Rational[-1, 2], Rational[13, 12] 3^Rational[-1, 2]}, { 0, Rational[-1785, 3392] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1785, 13568] (1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784], Rational[-1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392] 2^Rational[-1, 2], Rational[-1785, 6784], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 3^Rational[1, 2], Rational[-1785, 6784] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1785, 13568] (-1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392], 0, Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1785, 13568] (-1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 3^Rational[1, 2], Rational[1785, 6784] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 3392] 2^Rational[-1, 2], Rational[1785, 6784], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784], Rational[1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[-1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1785, 13568] (1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[1785, 3392] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1785, 13568] (1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784], Rational[1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392] 2^Rational[-1, 2], Rational[1785, 6784], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 3^Rational[1, 2], Rational[1785, 6784] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1785, 13568] (-1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392], 0, Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1785, 13568] (-1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 3^Rational[1, 2], Rational[-1785, 6784] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 3392] 2^Rational[-1, 2], Rational[-1785, 6784], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784], Rational[-1785, 6784] Rational[3, 2]^Rational[1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { Rational[1785, 6784] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1785, 13568] (1 + 3^Rational[1, 2]), Rational[3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[-1785, 3392] 2^Rational[-1, 2], Rational[3833, 3392] 3^Rational[-1, 2]}, { 0, Rational[-585, 928] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-585, 3712] (1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856], Rational[-585, 1856] Rational[3, 2]^Rational[1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928] 2^Rational[-1, 2], Rational[-585, 1856], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 3^Rational[1, 2], Rational[-585, 1856] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-585, 3712] (-1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928], 0, Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[585, 3712] (-1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 3^Rational[1, 2], Rational[585, 1856] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 928] 2^Rational[-1, 2], Rational[585, 1856], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856], Rational[585, 1856] Rational[3, 2]^Rational[1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[-585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[585, 3712] (1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { 0, Rational[585, 928] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[585, 3712] (1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856], Rational[585, 1856] Rational[3, 2]^Rational[1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928] 2^Rational[-1, 2], Rational[585, 1856], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 3^Rational[1, 2], Rational[585, 1856] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[585, 3712] (-1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928], 0, Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-585, 3712] (-1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 3^Rational[1, 2], Rational[-585, 1856] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 928] 2^Rational[-1, 2], Rational[-585, 1856], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856], Rational[-585, 1856] Rational[3, 2]^Rational[1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { Rational[585, 1856] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-585, 3712] (1 + 3^Rational[1, 2]), Rational[1097, 928] 3^Rational[-1, 2]}, { 0, Rational[-585, 928] 2^Rational[-1, 2], Rational[1097, 928] 3^Rational[-1, 2]}, { 0, Rational[-2945, 4032] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2945, 16128] (1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064], Rational[-2945, 2688] 6^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032] 2^Rational[-1, 2], Rational[-2945, 8064], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 2688] 3^Rational[-1, 2], Rational[-2945, 8064] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2945, 16128] (-1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032], 0, Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2945, 16128] (-1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 2688] 3^Rational[-1, 2], Rational[2945, 8064] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 4032] 2^Rational[-1, 2], Rational[2945, 8064], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064], Rational[2945, 2688] 6^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[-2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2945, 16128] (1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[2945, 4032] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2945, 16128] (1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064], Rational[2945, 2688] 6^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032] 2^Rational[-1, 2], Rational[2945, 8064], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 2688] 3^Rational[-1, 2], Rational[2945, 8064] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2945, 16128] (-1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032], 0, Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2945, 16128] (-1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 2688] 3^Rational[-1, 2], Rational[-2945, 8064] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 4032] 2^Rational[-1, 2], Rational[-2945, 8064], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064], Rational[-2945, 2688] 6^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { Rational[2945, 8064] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2945, 16128] (1 + 3^Rational[1, 2]), Rational[4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[-2945, 4032] 2^Rational[-1, 2], Rational[4993, 4032] 3^Rational[-1, 2]}, { 0, Rational[-225, 272] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-225, 1088] (1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544], Rational[-225, 544] Rational[3, 2]^Rational[1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272] 2^Rational[-1, 2], Rational[-225, 544], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 3^Rational[1, 2], Rational[-225, 544] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-225, 1088] (-1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272], 0, Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[225, 1088] (-1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 3^Rational[1, 2], Rational[225, 544] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 272] 2^Rational[-1, 2], Rational[225, 544], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544], Rational[225, 544] Rational[3, 2]^Rational[1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[-225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[225, 1088] (1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { 0, Rational[225, 272] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[225, 1088] (1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544], Rational[225, 544] Rational[3, 2]^Rational[1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 272] 2^Rational[-1, 2], Rational[225, 544], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 3^Rational[1, 2], Rational[225, 544] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[225, 1088] (-1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 272], 0, Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-225, 1088] (-1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 3^Rational[1, 2], Rational[-225, 544] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 272] 2^Rational[-1, 2], Rational[-225, 544], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544], Rational[-225, 544] Rational[3, 2]^Rational[1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { Rational[225, 544] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-225, 1088] (1 + 3^Rational[1, 2]), Rational[353, 272] 3^Rational[-1, 2]}, { 0, Rational[-225, 272] 2^Rational[-1, 2], Rational[353, 272] 3^Rational[-1, 2]}, { 0, Rational[-4305, 4672] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-4305, 18688] (1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344], Rational[-4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672] 2^Rational[-1, 2], Rational[-4305, 9344], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 3^Rational[1, 2], Rational[-4305, 9344] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-4305, 18688] (-1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672], 0, Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[4305, 18688] (-1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 3^Rational[1, 2], Rational[4305, 9344] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 4672] 2^Rational[-1, 2], Rational[4305, 9344], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344], Rational[4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[-4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[4305, 18688] (1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[4305, 4672] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[4305, 18688] (1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344], Rational[4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672] 2^Rational[-1, 2], Rational[4305, 9344], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 3^Rational[1, 2], Rational[4305, 9344] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[4305, 18688] (-1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672], 0, Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-4305, 18688] (-1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 3^Rational[1, 2], Rational[-4305, 9344] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 4672] 2^Rational[-1, 2], Rational[-4305, 9344], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344], Rational[-4305, 9344] Rational[3, 2]^Rational[1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { Rational[4305, 9344] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-4305, 18688] (1 + 3^Rational[1, 2]), Rational[6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[-4305, 4672] 2^Rational[-1, 2], Rational[6353, 4672] 3^Rational[-1, 2]}, { 0, Rational[-1265, 1248] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1265, 4992] (1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496], Rational[-1265, 832] 6^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248] 2^Rational[-1, 2], Rational[-1265, 2496], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 832] 3^Rational[-1, 2], Rational[-1265, 2496] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1265, 4992] (-1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248], 0, Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1265, 4992] (-1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 832] 3^Rational[-1, 2], Rational[1265, 2496] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 1248] 2^Rational[-1, 2], Rational[1265, 2496], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496], Rational[1265, 832] 6^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[-1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1265, 4992] (1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[1265, 1248] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[1265, 4992] (1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496], Rational[1265, 832] 6^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248] 2^Rational[-1, 2], Rational[1265, 2496], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 832] 3^Rational[-1, 2], Rational[1265, 2496] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[1265, 4992] (-1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248], 0, Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-1265, 4992] (-1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 832] 3^Rational[-1, 2], Rational[-1265, 2496] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 1248] 2^Rational[-1, 2], Rational[-1265, 2496], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496], Rational[-1265, 832] 6^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { Rational[1265, 2496] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-1265, 4992] (1 + 3^Rational[1, 2]), Rational[1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[-1265, 1248] 2^Rational[-1, 2], Rational[1777, 1248] 3^Rational[-1, 2]}, { 0, Rational[-5865, 5312] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5865, 21248] (1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624], Rational[-5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312] 2^Rational[-1, 2], Rational[-5865, 10624], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 3^Rational[1, 2], Rational[-5865, 10624] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5865, 21248] (-1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312], 0, Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5865, 21248] (-1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 3^Rational[1, 2], Rational[5865, 10624] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 5312] 2^Rational[-1, 2], Rational[5865, 10624], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624], Rational[5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[-5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5865, 21248] (1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[5865, 5312] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[5865, 21248] (1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624], Rational[5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312] 2^Rational[-1, 2], Rational[5865, 10624], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 3^Rational[1, 2], Rational[5865, 10624] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[5865, 21248] (-1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312], 0, Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-5865, 21248] (-1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 3^Rational[1, 2], Rational[-5865, 10624] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 5312] 2^Rational[-1, 2], Rational[-5865, 10624], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624], Rational[-5865, 10624] Rational[3, 2]^Rational[1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { Rational[5865, 10624] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-5865, 21248] (1 + 3^Rational[1, 2]), Rational[7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[-5865, 5312] 2^Rational[-1, 2], Rational[7913, 5312] 3^Rational[-1, 2]}, { 0, Rational[-105, 88] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 352] (1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176], Rational[-105, 176] Rational[3, 2]^Rational[1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88] 2^Rational[-1, 2], Rational[-105, 176], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 3^Rational[1, 2], Rational[-105, 176] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 352] (-1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88], 0, Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 352] (-1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 3^Rational[1, 2], Rational[105, 176] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 88] 2^Rational[-1, 2], Rational[105, 176], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176], Rational[105, 176] Rational[3, 2]^Rational[1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[-105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 352] (1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { 0, Rational[105, 88] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[105, 352] (1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176], Rational[105, 176] Rational[3, 2]^Rational[1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 88] 2^Rational[-1, 2], Rational[105, 176], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 3^Rational[1, 2], Rational[105, 176] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[105, 352] (-1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 88], 0, Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-105, 352] (-1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 3^Rational[1, 2], Rational[-105, 176] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 88] 2^Rational[-1, 2], Rational[-105, 176], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176], Rational[-105, 176] Rational[3, 2]^Rational[1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { Rational[105, 176] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-105, 352] (1 + 3^Rational[1, 2]), Rational[137, 88] 3^Rational[-1, 2]}, { 0, Rational[-105, 88] 2^Rational[-1, 2], Rational[137, 88] 3^Rational[-1, 2]}, { 0, Rational[-7625, 5952] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-7625, 23808] (1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904], Rational[-7625, 3968] 6^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952] 2^Rational[-1, 2], Rational[-7625, 11904], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 3968] 3^Rational[-1, 2], Rational[-7625, 11904] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-7625, 23808] (-1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952], 0, Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[7625, 23808] (-1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 3968] 3^Rational[-1, 2], Rational[7625, 11904] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 5952] 2^Rational[-1, 2], Rational[7625, 11904], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904], Rational[7625, 3968] 6^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[-7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[7625, 23808] (1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[7625, 5952] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[7625, 23808] (1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904], Rational[7625, 3968] 6^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952] 2^Rational[-1, 2], Rational[7625, 11904], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 3968] 3^Rational[-1, 2], Rational[7625, 11904] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[7625, 23808] (-1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952], 0, Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-7625, 23808] (-1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 3968] 3^Rational[-1, 2], Rational[-7625, 11904] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 5952] 2^Rational[-1, 2], Rational[-7625, 11904], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904], Rational[-7625, 3968] 6^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { Rational[7625, 11904] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-7625, 23808] (1 + 3^Rational[1, 2]), Rational[9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[-7625, 5952] 2^Rational[-1, 2], Rational[9673, 5952] 3^Rational[-1, 2]}, { 0, Rational[-2145, 1568] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2145, 6272] (1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136], Rational[-2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568] 2^Rational[-1, 2], Rational[-2145, 3136], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 3^Rational[1, 2], Rational[-2145, 3136] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2145, 6272] (-1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568], 0, Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2145, 6272] (-1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 3^Rational[1, 2], Rational[2145, 3136] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 1568] 2^Rational[-1, 2], Rational[2145, 3136], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136], Rational[2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[-2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2145, 6272] (1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[2145, 1568] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[2145, 6272] (1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136], Rational[2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568] 2^Rational[-1, 2], Rational[2145, 3136], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 3^Rational[1, 2], Rational[2145, 3136] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[2145, 6272] (-1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568], 0, Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-2145, 6272] (-1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 3^Rational[1, 2], Rational[-2145, 3136] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 1568] 2^Rational[-1, 2], Rational[-2145, 3136], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136], Rational[-2145, 3136] Rational[3, 2]^Rational[1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { Rational[2145, 3136] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-2145, 6272] (1 + 3^Rational[1, 2]), Rational[2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[-2145, 1568] 2^Rational[-1, 2], Rational[2657, 1568] 3^Rational[-1, 2]}, { 0, Rational[-9585, 6592] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-9585, 26368] (1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184], Rational[-9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592] 2^Rational[-1, 2], Rational[-9585, 13184], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 3^Rational[1, 2], Rational[-9585, 13184] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-9585, 26368] (-1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592], 0, Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[9585, 26368] (-1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 3^Rational[1, 2], Rational[9585, 13184] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 6592] 2^Rational[-1, 2], Rational[9585, 13184], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184], Rational[9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[-9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[9585, 26368] (1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[9585, 6592] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[9585, 26368] (1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184], Rational[9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592] 2^Rational[-1, 2], Rational[9585, 13184], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 3^Rational[1, 2], Rational[9585, 13184] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[9585, 26368] (-1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592], 0, Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-9585, 26368] (-1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 3^Rational[1, 2], Rational[-9585, 13184] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 6592] 2^Rational[-1, 2], Rational[-9585, 13184], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184], Rational[-9585, 13184] Rational[3, 2]^Rational[1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { Rational[9585, 13184] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-9585, 26368] (1 + 3^Rational[1, 2]), Rational[11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[-9585, 6592] 2^Rational[-1, 2], Rational[11633, 6592] 3^Rational[-1, 2]}, { 0, Rational[-665, 432] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-665, 1728] (1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864], Rational[-665, 288] 6^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432] 2^Rational[-1, 2], Rational[-665, 864], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 288] 3^Rational[-1, 2], Rational[-665, 864] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-665, 1728] (-1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432], 0, Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[665, 1728] (-1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 288] 3^Rational[-1, 2], Rational[665, 864] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 432] 2^Rational[-1, 2], Rational[665, 864], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864], Rational[665, 288] 6^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[-665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[665, 1728] (1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { 0, Rational[665, 432] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[665, 1728] (1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864], Rational[665, 288] 6^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 432] 2^Rational[-1, 2], Rational[665, 864], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 288] 3^Rational[-1, 2], Rational[665, 864] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[665, 1728] (-1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 432], 0, Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-665, 1728] (-1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 288] 3^Rational[-1, 2], Rational[-665, 864] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 432] 2^Rational[-1, 2], Rational[-665, 864], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864], Rational[-665, 288] 6^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { Rational[665, 864] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-665, 1728] (1 + 3^Rational[1, 2]), Rational[793, 432] 3^Rational[-1, 2]}, { 0, Rational[-665, 432] 2^Rational[-1, 2], Rational[793, 432] 3^Rational[-1, 2]}, { 0, Rational[-11745, 7232] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-11745, 28928] (1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464], Rational[-11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232] 2^Rational[-1, 2], Rational[-11745, 14464], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 3^Rational[1, 2], Rational[-11745, 14464] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-11745, 28928] (-1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232], 0, Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[11745, 28928] (-1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 3^Rational[1, 2], Rational[11745, 14464] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 7232] 2^Rational[-1, 2], Rational[11745, 14464], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464], Rational[11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[-11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[11745, 28928] (1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[11745, 7232] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[11745, 28928] (1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464], Rational[11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232] 2^Rational[-1, 2], Rational[11745, 14464], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 3^Rational[1, 2], Rational[11745, 14464] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[11745, 28928] (-1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232], 0, Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-11745, 28928] (-1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 3^Rational[1, 2], Rational[-11745, 14464] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 7232] 2^Rational[-1, 2], Rational[-11745, 14464], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464], Rational[-11745, 14464] Rational[3, 2]^Rational[1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { Rational[11745, 14464] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-11745, 28928] (1 + 3^Rational[1, 2]), Rational[13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[-11745, 7232] 2^Rational[-1, 2], Rational[13793, 7232] 3^Rational[-1, 2]}, { 0, Rational[-3225, 1888] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-3225, 7552] (1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776], Rational[-3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888] 2^Rational[-1, 2], Rational[-3225, 3776], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 3^Rational[1, 2], Rational[-3225, 3776] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-3225, 7552] (-1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888], 0, Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[3225, 7552] (-1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 3^Rational[1, 2], Rational[3225, 3776] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 1888] 2^Rational[-1, 2], Rational[3225, 3776], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776], Rational[3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[-3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[3225, 7552] (1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[3225, 1888] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[3225, 7552] (1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776], Rational[3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888] 2^Rational[-1, 2], Rational[3225, 3776], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 3^Rational[1, 2], Rational[3225, 3776] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[3225, 7552] (-1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888], 0, Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-3225, 7552] (-1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 3^Rational[1, 2], Rational[-3225, 3776] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 1888] 2^Rational[-1, 2], Rational[-3225, 3776], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776], Rational[-3225, 3776] Rational[3, 2]^Rational[1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { Rational[3225, 3776] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-3225, 7552] (1 + 3^Rational[1, 2]), Rational[3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[-3225, 1888] 2^Rational[-1, 2], Rational[3737, 1888] 3^Rational[-1, 2]}, { 0, Rational[-14105, 7872] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-14105, 31488] (1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744], Rational[-14105, 5248] 6^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872] 2^Rational[-1, 2], Rational[-14105, 15744], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 5248] 3^Rational[-1, 2], Rational[-14105, 15744] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-14105, 31488] (-1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872], 0, Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[14105, 31488] (-1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 5248] 3^Rational[-1, 2], Rational[14105, 15744] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 7872] 2^Rational[-1, 2], Rational[14105, 15744], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744], Rational[14105, 5248] 6^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[-14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[14105, 31488] (1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[14105, 7872] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[14105, 31488] (1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744], Rational[14105, 5248] 6^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872] 2^Rational[-1, 2], Rational[14105, 15744], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 5248] 3^Rational[-1, 2], Rational[14105, 15744] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[14105, 31488] (-1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872], 0, Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-14105, 31488] (-1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 5248] 3^Rational[-1, 2], Rational[-14105, 15744] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 7872] 2^Rational[-1, 2], Rational[-14105, 15744], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744], Rational[-14105, 5248] 6^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { Rational[14105, 15744] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-14105, 31488] (1 + 3^Rational[1, 2]), Rational[16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[-14105, 7872] 2^Rational[-1, 2], Rational[16153, 7872] 3^Rational[-1, 2]}, { 0, Rational[-15, 8] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8], 0, Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[-15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { 0, Rational[15, 8] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16], Rational[15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 8] 2^Rational[-1, 2], Rational[15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 3^Rational[1, 2], Rational[15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 8], 0, Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), Rational[-15, 32] (-1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 3^Rational[1, 2], Rational[-15, 16] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 8] 2^Rational[-1, 2], Rational[-15, 16], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16], Rational[-15, 16] Rational[3, 2]^Rational[1, 2], Rational[17, 8] 3^Rational[-1, 2]}, { Rational[15, 16] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), Rational[-15, 32] (1 + 3^Rational[1, 2]), Rational[17, 8] 3^Rational[-1, 2]}, { 0, Rational[-15, 8] 2^Rational[-1, 2], Rational[17, 8] 3^Rational[-1, 2]}}, {{0, 1.3258252147247764`, 1.226869322027955}, { 0.4852857095672263, 1.2806488160479113`, 1.226869322027955}, {0.9375, 1.1481983169296146`, 1.226869322027955}, {1.3258252147247764`, 0.9375, 1.226869322027955}, {1.6237976320958223`, 0.6629126073623882, 1.226869322027955}, {1.8111109242920027`, 0.3431488160479112, 1.226869322027955}, {1.875, 0, 1.226869322027955}, { 1.8111109242920027`, -0.3431488160479112, 1.226869322027955}, { 1.6237976320958223`, -0.6629126073623882, 1.226869322027955}, { 1.3258252147247764`, -0.9375, 1.226869322027955}, { 0.9375, -1.1481983169296146`, 1.226869322027955}, { 0.4852857095672263, -1.2806488160479113`, 1.226869322027955}, { 0, -1.3258252147247764`, 1.226869322027955}, {-0.4852857095672263, -1.2806488160479113`, 1.226869322027955}, {-0.9375, -1.1481983169296146`, 1.226869322027955}, {-1.3258252147247764`, -0.9375, 1.226869322027955}, {-1.6237976320958223`, -0.6629126073623882, 1.226869322027955}, {-1.8111109242920027`, -0.3431488160479112, 1.226869322027955}, {-1.875, 0, 1.226869322027955}, {-1.8111109242920027`, 0.3431488160479112, 1.226869322027955}, {-1.6237976320958223`, 0.6629126073623882, 1.226869322027955}, {-1.3258252147247764`, 0.9375, 1.226869322027955}, {-0.9375, 1.1481983169296146`, 1.226869322027955}, {-0.4852857095672263, 1.2806488160479113`, 1.226869322027955}, {0, 1.3258252147247764`, 1.226869322027955}, { 0, 0.7266542042241564, 0.8278592201240669}, {0.26597389851280673`, 0.7018940626416437, 0.8278592201240669}, {0.5138221153846154, 0.629301000624885, 0.8278592201240669}, {0.7266542042241564, 0.5138221153846154, 0.8278592201240669}, {0.8899660098986719, 0.3633271021120782, 0.8278592201240669}, {0.9926281027369631, 0.18807194725702825`, 0.8278592201240669}, { 1.0276442307692308`, 0, 0.8278592201240669}, { 0.9926281027369631, -0.18807194725702825`, 0.8278592201240669}, { 0.8899660098986719, -0.3633271021120782, 0.8278592201240669}, { 0.7266542042241564, -0.5138221153846154, 0.8278592201240669}, { 0.5138221153846154, -0.629301000624885, 0.8278592201240669}, { 0.26597389851280673`, -0.7018940626416437, 0.8278592201240669}, { 0, -0.7266542042241564, 0.8278592201240669}, {-0.26597389851280673`, -0.7018940626416437, 0.8278592201240669}, {-0.5138221153846154, -0.629301000624885, 0.8278592201240669}, {-0.7266542042241564, -0.5138221153846154, 0.8278592201240669}, {-0.8899660098986719, -0.3633271021120782, 0.8278592201240669}, {-0.9926281027369631, -0.18807194725702825`, 0.8278592201240669}, {-1.0276442307692308`, 0, 0.8278592201240669}, {-0.9926281027369631, 0.18807194725702825`, 0.8278592201240669}, {-0.8899660098986719, 0.3633271021120782, 0.8278592201240669}, {-0.7266542042241564, 0.5138221153846154, 0.8278592201240669}, {-0.5138221153846154, 0.629301000624885, 0.8278592201240669}, {-0.26597389851280673`, 0.7018940626416437, 0.8278592201240669}, {0, 0.7266542042241564, 0.8278592201240669}, { 0, 0.4296655788459923, 0.6755800024892497}, {0.15726851698937888`, 0.415025079274786, 0.6755800024892497}, {0.3038194444444444, 0.3721013064123752, 0.6755800024892497}, {0.4296655788459923, 0.3038194444444444, 0.6755800024892497}, {0.5262307141051278, 0.21483278942299616`, 0.6755800024892497}, {0.5869340958353712, 0.11120563483034158`, 0.6755800024892497}, { 0.6076388888888888, 0, 0.6755800024892497}, { 0.5869340958353712, -0.11120563483034158`, 0.6755800024892497}, { 0.5262307141051278, -0.21483278942299616`, 0.6755800024892497}, { 0.4296655788459923, -0.3038194444444444, 0.6755800024892497}, { 0.3038194444444444, -0.3721013064123752, 0.6755800024892497}, { 0.15726851698937888`, -0.415025079274786, 0.6755800024892497}, { 0, -0.4296655788459923, 0.6755800024892497}, {-0.15726851698937888`, -0.415025079274786, 0.6755800024892497}, {-0.3038194444444444, -0.3721013064123752, 0.6755800024892497}, {-0.4296655788459923, -0.3038194444444444, 0.6755800024892497}, {-0.5262307141051278, -0.21483278942299616`, 0.6755800024892497}, {-0.5869340958353712, -0.11120563483034158`, 0.6755800024892497}, {-0.6076388888888888, 0, 0.6755800024892497}, {-0.5869340958353712, 0.11120563483034158`, 0.6755800024892497}, {-0.5262307141051278, 0.21483278942299616`, 0.6755800024892497}, {-0.4296655788459923, 0.3038194444444444, 0.6755800024892497}, {-0.3038194444444444, 0.3721013064123752, 0.6755800024892497}, {-0.15726851698937888`, 0.415025079274786, 0.6755800024892497}, {0, 0.4296655788459923, 0.6755800024892497}, { 0, 0.23778387003216098`, 0.6091202228610658}, {0.08703493704194819, 0.22968158113902754`, 0.6091202228610658}, {0.16813858695652173`, 0.2059268720580287, 0.6091202228610658}, {0.23778387003216098`, 0.16813858695652173`, 0.6091202228610658}, {0.29122457532153334`, 0.11889193501608049`, 0.6091202228610658}, {0.32481880707410915`, 0.061542994182505806`, 0.6091202228610658}, { 0.33627717391304346`, 0, 0.6091202228610658}, { 0.32481880707410915`, -0.061542994182505806`, 0.6091202228610658}, { 0.29122457532153334`, -0.11889193501608049`, 0.6091202228610658}, { 0.23778387003216098`, -0.16813858695652173`, 0.6091202228610658}, { 0.16813858695652173`, -0.2059268720580287, 0.6091202228610658}, { 0.08703493704194819, -0.22968158113902754`, 0.6091202228610658}, { 0, -0.23778387003216098`, 0.6091202228610658}, {-0.08703493704194819, -0.22968158113902754`, 0.6091202228610658}, {-0.16813858695652173`, -0.2059268720580287, 0.6091202228610658}, {-0.23778387003216098`, -0.16813858695652173`, 0.6091202228610658}, {-0.29122457532153334`, -0.11889193501608049`, 0.6091202228610658}, {-0.32481880707410915`, -0.061542994182505806`, 0.6091202228610658}, {-0.33627717391304346`, 0, 0.6091202228610658}, {-0.32481880707410915`, 0.061542994182505806`, 0.6091202228610658}, {-0.29122457532153334`, 0.11889193501608049`, 0.6091202228610658}, {-0.23778387003216098`, 0.16813858695652173`, 0.6091202228610658}, {-0.16813858695652173`, 0.2059268720580287, 0.6091202228610658}, {-0.08703493704194819, 0.22968158113902754`, 0.6091202228610658}, {0, 0.23778387003216098`, 0.6091202228610658}, { 0, 0.09470180105176974, 0.5825051823073903}, {0.034663264969087594`, 0.09147491543199365, 0.5825051823073903}, {0.06696428571428571, 0.08201416549497247, 0.5825051823073903}, {0.09470180105176974, 0.06696428571428571, 0.5825051823073903}, {0.1159855451497016, 0.04735090052588487, 0.5825051823073903}, {0.12936506602085734`, 0.02451062971770794, 0.5825051823073903}, { 0.13392857142857142`, 0, 0.5825051823073903}, { 0.12936506602085734`, -0.02451062971770794, 0.5825051823073903}, { 0.1159855451497016, -0.04735090052588487, 0.5825051823073903}, { 0.09470180105176974, -0.06696428571428571, 0.5825051823073903}, { 0.06696428571428571, -0.08201416549497247, 0.5825051823073903}, { 0.034663264969087594`, -0.09147491543199365, 0.5825051823073903}, { 0, -0.09470180105176974, 0.5825051823073903}, {-0.034663264969087594`, -0.09147491543199365, 0.5825051823073903}, {-0.06696428571428571, -0.08201416549497247, 0.5825051823073903}, {-0.09470180105176974, 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(1 + 3^Rational[1, 2])}, { Rational[16, 2401], 0, Rational[4, 49]}, { Rational[16, 2401], Rational[-2, 49] (-1 + 3^Rational[1, 2]), Rational[1, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[16, 2401], Rational[-2, 49] 2^Rational[1, 2], Rational[2, 49] 3^Rational[1, 2]}, { Rational[16, 2401], Rational[-4, 49], Rational[2, 49] 2^Rational[1, 2]}, { Rational[16, 2401], Rational[-2, 49] 6^Rational[1, 2], Rational[ 2, 49]}, { Rational[16, 2401], Rational[-2, 49] (1 + 3^Rational[1, 2]), Rational[1, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[16, 2401], Rational[-4, 49] 2^Rational[1, 2], 0}, { Rational[25, 2401], Rational[-5, 49] 2^Rational[1, 2], 0}, { Rational[25, 2401], Rational[-5, 98] (1 + 3^Rational[1, 2]), Rational[-5, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[-5, 49] Rational[3, 2]^Rational[1, 2], Rational[-5, 98]}, { Rational[25, 2401], Rational[-5, 49], Rational[-5, 49] 2^Rational[-1, 2]}, { Rational[25, 2401], Rational[-5, 49] 2^Rational[-1, 2], Rational[-5, 98] 3^Rational[1, 2]}, { Rational[25, 2401], Rational[-5, 98] (-1 + 3^Rational[1, 2]), Rational[-5, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 2401], 0, Rational[-5, 49]}, { Rational[25, 2401], Rational[5, 98] (-1 + 3^Rational[1, 2]), Rational[-5, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[5, 49] 2^Rational[-1, 2], Rational[-5, 98] 3^Rational[1, 2]}, { Rational[25, 2401], Rational[5, 49], Rational[-5, 49] 2^Rational[-1, 2]}, { Rational[25, 2401], Rational[5, 49] Rational[3, 2]^Rational[1, 2], Rational[-5, 98]}, { Rational[25, 2401], Rational[5, 98] (1 + 3^Rational[1, 2]), Rational[-5, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[5, 49] 2^Rational[1, 2], 0}, { Rational[25, 2401], Rational[5, 98] (1 + 3^Rational[1, 2]), Rational[5, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[5, 49] Rational[3, 2]^Rational[1, 2], Rational[5, 98]}, { Rational[25, 2401], Rational[5, 49], Rational[5, 49] 2^Rational[-1, 2]}, { Rational[25, 2401], Rational[5, 49] 2^Rational[-1, 2], Rational[5, 98] 3^Rational[1, 2]}, { Rational[25, 2401], Rational[5, 98] (-1 + 3^Rational[1, 2]), Rational[5, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 2401], 0, Rational[5, 49]}, { Rational[25, 2401], Rational[-5, 98] (-1 + 3^Rational[1, 2]), Rational[5, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[-5, 49] 2^Rational[-1, 2], Rational[5, 98] 3^Rational[1, 2]}, { Rational[25, 2401], Rational[-5, 49], Rational[5, 49] 2^Rational[-1, 2]}, { Rational[25, 2401], Rational[-5, 49] Rational[3, 2]^Rational[1, 2], Rational[5, 98]}, { Rational[25, 2401], Rational[-5, 98] (1 + 3^Rational[1, 2]), Rational[5, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 2401], Rational[-5, 49] 2^Rational[1, 2], 0}, { Rational[36, 2401], Rational[-6, 49] 2^Rational[1, 2], 0}, { Rational[36, 2401], Rational[-3, 49] (1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[-3, 49] 6^Rational[1, 2], Rational[-3, 49]}, { Rational[36, 2401], Rational[-6, 49], Rational[-3, 49] 2^Rational[1, 2]}, { Rational[36, 2401], Rational[-3, 49] 2^Rational[1, 2], Rational[-3, 49] 3^Rational[1, 2]}, { Rational[36, 2401], Rational[-3, 49] (-1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 2401], 0, Rational[-6, 49]}, { Rational[36, 2401], Rational[3, 49] (-1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[3, 49] 2^Rational[1, 2], Rational[-3, 49] 3^Rational[1, 2]}, { Rational[36, 2401], Rational[6, 49], Rational[-3, 49] 2^Rational[1, 2]}, { Rational[36, 2401], Rational[3, 49] 6^Rational[1, 2], Rational[-3, 49]}, { Rational[36, 2401], Rational[3, 49] (1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[6, 49] 2^Rational[1, 2], 0}, { Rational[36, 2401], Rational[3, 49] (1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[3, 49] 6^Rational[1, 2], Rational[ 3, 49]}, { Rational[36, 2401], Rational[6, 49], Rational[3, 49] 2^Rational[1, 2]}, { Rational[36, 2401], Rational[3, 49] 2^Rational[1, 2], Rational[3, 49] 3^Rational[1, 2]}, { Rational[36, 2401], Rational[3, 49] (-1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 2401], 0, Rational[6, 49]}, { Rational[36, 2401], Rational[-3, 49] (-1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[-3, 49] 2^Rational[1, 2], Rational[3, 49] 3^Rational[1, 2]}, { Rational[36, 2401], Rational[-6, 49], Rational[3, 49] 2^Rational[1, 2]}, { Rational[36, 2401], Rational[-3, 49] 6^Rational[1, 2], Rational[ 3, 49]}, { Rational[36, 2401], Rational[-3, 49] (1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 2401], Rational[-6, 49] 2^Rational[1, 2], 0}, { Rational[1, 49], Rational[-1, 7] 2^Rational[1, 2], 0}, { Rational[1, 49], Rational[1, 14] (-1 - 3^Rational[1, 2]), Rational[-1, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[-1, 7] Rational[3, 2]^Rational[1, 2], Rational[-1, 14]}, { Rational[1, 49], Rational[-1, 7], Rational[-1, 7] 2^Rational[-1, 2]}, { Rational[1, 49], Rational[-1, 7] 2^Rational[-1, 2], Rational[-1, 14] 3^Rational[1, 2]}, { Rational[1, 49], Rational[1, 14] (1 - 3^Rational[1, 2]), Rational[-1, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 49], 0, Rational[-1, 7]}, { Rational[1, 49], Rational[1, 14] (-1 + 3^Rational[1, 2]), Rational[-1, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[1, 7] 2^Rational[-1, 2], Rational[-1, 14] 3^Rational[1, 2]}, { Rational[1, 49], Rational[1, 7], Rational[-1, 7] 2^Rational[-1, 2]}, { Rational[1, 49], Rational[1, 7] Rational[3, 2]^Rational[1, 2], Rational[-1, 14]}, { Rational[1, 49], Rational[1, 14] (1 + 3^Rational[1, 2]), Rational[-1, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[1, 7] 2^Rational[1, 2], 0}, { Rational[1, 49], Rational[1, 14] (1 + 3^Rational[1, 2]), Rational[1, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[1, 7] Rational[3, 2]^Rational[1, 2], Rational[1, 14]}, { Rational[1, 49], Rational[1, 7], Rational[1, 7] 2^Rational[-1, 2]}, { Rational[1, 49], Rational[1, 7] 2^Rational[-1, 2], Rational[1, 14] 3^Rational[1, 2]}, { Rational[1, 49], Rational[1, 14] (-1 + 3^Rational[1, 2]), Rational[1, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 49], 0, Rational[1, 7]}, { Rational[1, 49], Rational[1, 14] (1 - 3^Rational[1, 2]), Rational[1, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[-1, 7] 2^Rational[-1, 2], Rational[1, 14] 3^Rational[1, 2]}, { Rational[1, 49], Rational[-1, 7], Rational[1, 7] 2^Rational[-1, 2]}, { Rational[1, 49], Rational[-1, 7] Rational[3, 2]^Rational[1, 2], Rational[1, 14]}, { Rational[1, 49], Rational[1, 14] (-1 - 3^Rational[1, 2]), Rational[1, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1, 49], Rational[-1, 7] 2^Rational[1, 2], 0}, { Rational[64, 2401], Rational[-8, 49] 2^Rational[1, 2], 0}, { Rational[64, 2401], Rational[-4, 49] (1 + 3^Rational[1, 2]), Rational[-2, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[-4, 49] 6^Rational[1, 2], Rational[-4, 49]}, { Rational[64, 2401], Rational[-8, 49], Rational[-4, 49] 2^Rational[1, 2]}, { Rational[64, 2401], Rational[-4, 49] 2^Rational[1, 2], Rational[-4, 49] 3^Rational[1, 2]}, { Rational[64, 2401], Rational[-4, 49] (-1 + 3^Rational[1, 2]), Rational[-2, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[64, 2401], 0, Rational[-8, 49]}, { Rational[64, 2401], Rational[4, 49] (-1 + 3^Rational[1, 2]), Rational[-2, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[4, 49] 2^Rational[1, 2], Rational[-4, 49] 3^Rational[1, 2]}, { Rational[64, 2401], Rational[8, 49], Rational[-4, 49] 2^Rational[1, 2]}, { Rational[64, 2401], Rational[4, 49] 6^Rational[1, 2], Rational[-4, 49]}, { Rational[64, 2401], Rational[4, 49] (1 + 3^Rational[1, 2]), Rational[-2, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[8, 49] 2^Rational[1, 2], 0}, { Rational[64, 2401], Rational[4, 49] (1 + 3^Rational[1, 2]), Rational[2, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[4, 49] 6^Rational[1, 2], Rational[ 4, 49]}, { Rational[64, 2401], Rational[8, 49], Rational[4, 49] 2^Rational[1, 2]}, { Rational[64, 2401], Rational[4, 49] 2^Rational[1, 2], Rational[4, 49] 3^Rational[1, 2]}, { Rational[64, 2401], Rational[4, 49] (-1 + 3^Rational[1, 2]), Rational[2, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[64, 2401], 0, Rational[8, 49]}, { Rational[64, 2401], Rational[-4, 49] (-1 + 3^Rational[1, 2]), Rational[2, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[-4, 49] 2^Rational[1, 2], Rational[4, 49] 3^Rational[1, 2]}, { Rational[64, 2401], Rational[-8, 49], Rational[4, 49] 2^Rational[1, 2]}, { Rational[64, 2401], Rational[-4, 49] 6^Rational[1, 2], Rational[ 4, 49]}, { Rational[64, 2401], Rational[-4, 49] (1 + 3^Rational[1, 2]), Rational[2, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[64, 2401], Rational[-8, 49] 2^Rational[1, 2], 0}, { Rational[81, 2401], Rational[-9, 49] 2^Rational[1, 2], 0}, { Rational[81, 2401], Rational[-9, 98] (1 + 3^Rational[1, 2]), Rational[-9, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[-9, 49] Rational[3, 2]^Rational[1, 2], Rational[-9, 98]}, { Rational[81, 2401], Rational[-9, 49], Rational[-9, 49] 2^Rational[-1, 2]}, { Rational[81, 2401], Rational[-9, 49] 2^Rational[-1, 2], Rational[-9, 98] 3^Rational[1, 2]}, { Rational[81, 2401], Rational[-9, 98] (-1 + 3^Rational[1, 2]), Rational[-9, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[81, 2401], 0, Rational[-9, 49]}, { Rational[81, 2401], Rational[9, 98] (-1 + 3^Rational[1, 2]), Rational[-9, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[9, 49] 2^Rational[-1, 2], Rational[-9, 98] 3^Rational[1, 2]}, { Rational[81, 2401], Rational[9, 49], Rational[-9, 49] 2^Rational[-1, 2]}, { Rational[81, 2401], Rational[9, 49] Rational[3, 2]^Rational[1, 2], Rational[-9, 98]}, { Rational[81, 2401], Rational[9, 98] (1 + 3^Rational[1, 2]), Rational[-9, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[9, 49] 2^Rational[1, 2], 0}, { Rational[81, 2401], Rational[9, 98] (1 + 3^Rational[1, 2]), Rational[9, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[9, 49] Rational[3, 2]^Rational[1, 2], Rational[9, 98]}, { Rational[81, 2401], Rational[9, 49], Rational[9, 49] 2^Rational[-1, 2]}, { Rational[81, 2401], Rational[9, 49] 2^Rational[-1, 2], Rational[9, 98] 3^Rational[1, 2]}, { Rational[81, 2401], Rational[9, 98] (-1 + 3^Rational[1, 2]), Rational[9, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[81, 2401], 0, Rational[9, 49]}, { Rational[81, 2401], Rational[-9, 98] (-1 + 3^Rational[1, 2]), Rational[9, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[-9, 49] 2^Rational[-1, 2], Rational[9, 98] 3^Rational[1, 2]}, { Rational[81, 2401], Rational[-9, 49], Rational[9, 49] 2^Rational[-1, 2]}, { Rational[81, 2401], Rational[-9, 49] Rational[3, 2]^Rational[1, 2], Rational[9, 98]}, { Rational[81, 2401], Rational[-9, 98] (1 + 3^Rational[1, 2]), Rational[9, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[81, 2401], Rational[-9, 49] 2^Rational[1, 2], 0}, { Rational[100, 2401], Rational[-10, 49] 2^Rational[1, 2], 0}, { Rational[100, 2401], Rational[-5, 49] (1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[-5, 49] 6^Rational[1, 2], Rational[-5, 49]}, { Rational[100, 2401], Rational[-10, 49], Rational[-5, 49] 2^Rational[1, 2]}, { Rational[100, 2401], Rational[-5, 49] 2^Rational[1, 2], Rational[-5, 49] 3^Rational[1, 2]}, { Rational[100, 2401], Rational[-5, 49] (-1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[100, 2401], 0, Rational[-10, 49]}, { Rational[100, 2401], Rational[5, 49] (-1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[5, 49] 2^Rational[1, 2], Rational[-5, 49] 3^Rational[1, 2]}, { Rational[100, 2401], Rational[10, 49], Rational[-5, 49] 2^Rational[1, 2]}, { Rational[100, 2401], Rational[5, 49] 6^Rational[1, 2], Rational[-5, 49]}, { Rational[100, 2401], Rational[5, 49] (1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[10, 49] 2^Rational[1, 2], 0}, { Rational[100, 2401], Rational[5, 49] (1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[5, 49] 6^Rational[1, 2], Rational[ 5, 49]}, { Rational[100, 2401], Rational[10, 49], Rational[5, 49] 2^Rational[1, 2]}, { Rational[100, 2401], Rational[5, 49] 2^Rational[1, 2], Rational[5, 49] 3^Rational[1, 2]}, { Rational[100, 2401], Rational[5, 49] (-1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[100, 2401], 0, Rational[10, 49]}, { Rational[100, 2401], Rational[-5, 49] (-1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[-5, 49] 2^Rational[1, 2], Rational[5, 49] 3^Rational[1, 2]}, { Rational[100, 2401], Rational[-10, 49], Rational[5, 49] 2^Rational[1, 2]}, { Rational[100, 2401], Rational[-5, 49] 6^Rational[1, 2], Rational[ 5, 49]}, { Rational[100, 2401], Rational[-5, 49] (1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[100, 2401], Rational[-10, 49] 2^Rational[1, 2], 0}, { Rational[121, 2401], Rational[-11, 49] 2^Rational[1, 2], 0}, { Rational[121, 2401], Rational[-11, 98] (1 + 3^Rational[1, 2]), Rational[-11, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[-11, 49] Rational[3, 2]^Rational[1, 2], Rational[-11, 98]}, { Rational[121, 2401], Rational[-11, 49], Rational[-11, 49] 2^Rational[-1, 2]}, { Rational[121, 2401], Rational[-11, 49] 2^Rational[-1, 2], Rational[-11, 98] 3^Rational[1, 2]}, { Rational[121, 2401], Rational[-11, 98] (-1 + 3^Rational[1, 2]), Rational[-11, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[121, 2401], 0, Rational[-11, 49]}, { Rational[121, 2401], Rational[11, 98] (-1 + 3^Rational[1, 2]), Rational[-11, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[11, 49] 2^Rational[-1, 2], Rational[-11, 98] 3^Rational[1, 2]}, { Rational[121, 2401], Rational[11, 49], Rational[-11, 49] 2^Rational[-1, 2]}, { Rational[121, 2401], Rational[11, 49] Rational[3, 2]^Rational[1, 2], Rational[-11, 98]}, { Rational[121, 2401], Rational[11, 98] (1 + 3^Rational[1, 2]), Rational[-11, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[11, 49] 2^Rational[1, 2], 0}, { Rational[121, 2401], Rational[11, 98] (1 + 3^Rational[1, 2]), Rational[11, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[11, 49] Rational[3, 2]^Rational[1, 2], Rational[11, 98]}, { Rational[121, 2401], Rational[11, 49], Rational[11, 49] 2^Rational[-1, 2]}, { Rational[121, 2401], Rational[11, 49] 2^Rational[-1, 2], Rational[11, 98] 3^Rational[1, 2]}, { Rational[121, 2401], Rational[11, 98] (-1 + 3^Rational[1, 2]), Rational[11, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[121, 2401], 0, Rational[11, 49]}, { Rational[121, 2401], Rational[-11, 98] (-1 + 3^Rational[1, 2]), Rational[11, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[-11, 49] 2^Rational[-1, 2], Rational[11, 98] 3^Rational[1, 2]}, { Rational[121, 2401], Rational[-11, 49], Rational[11, 49] 2^Rational[-1, 2]}, { Rational[121, 2401], Rational[-11, 49] Rational[3, 2]^Rational[1, 2], Rational[11, 98]}, { Rational[121, 2401], Rational[-11, 98] (1 + 3^Rational[1, 2]), Rational[11, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[121, 2401], Rational[-11, 49] 2^Rational[1, 2], 0}, { Rational[144, 2401], Rational[-12, 49] 2^Rational[1, 2], 0}, { Rational[144, 2401], Rational[-6, 49] (1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[-6, 49] 6^Rational[1, 2], Rational[-6, 49]}, { Rational[144, 2401], Rational[-12, 49], Rational[-6, 49] 2^Rational[1, 2]}, { Rational[144, 2401], Rational[-6, 49] 2^Rational[1, 2], Rational[-6, 49] 3^Rational[1, 2]}, { Rational[144, 2401], Rational[-6, 49] (-1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[144, 2401], 0, Rational[-12, 49]}, { Rational[144, 2401], Rational[6, 49] (-1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[6, 49] 2^Rational[1, 2], Rational[-6, 49] 3^Rational[1, 2]}, { Rational[144, 2401], Rational[12, 49], Rational[-6, 49] 2^Rational[1, 2]}, { Rational[144, 2401], Rational[6, 49] 6^Rational[1, 2], Rational[-6, 49]}, { Rational[144, 2401], Rational[6, 49] (1 + 3^Rational[1, 2]), Rational[-3, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[12, 49] 2^Rational[1, 2], 0}, { Rational[144, 2401], Rational[6, 49] (1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[6, 49] 6^Rational[1, 2], Rational[ 6, 49]}, { Rational[144, 2401], Rational[12, 49], Rational[6, 49] 2^Rational[1, 2]}, { Rational[144, 2401], Rational[6, 49] 2^Rational[1, 2], Rational[6, 49] 3^Rational[1, 2]}, { Rational[144, 2401], Rational[6, 49] (-1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[144, 2401], 0, Rational[12, 49]}, { Rational[144, 2401], Rational[-6, 49] (-1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[-6, 49] 2^Rational[1, 2], Rational[6, 49] 3^Rational[1, 2]}, { Rational[144, 2401], Rational[-12, 49], Rational[6, 49] 2^Rational[1, 2]}, { Rational[144, 2401], Rational[-6, 49] 6^Rational[1, 2], Rational[ 6, 49]}, { Rational[144, 2401], Rational[-6, 49] (1 + 3^Rational[1, 2]), Rational[3, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[144, 2401], Rational[-12, 49] 2^Rational[1, 2], 0}, { Rational[169, 2401], Rational[-13, 49] 2^Rational[1, 2], 0}, { Rational[169, 2401], Rational[-13, 98] (1 + 3^Rational[1, 2]), Rational[-13, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[-13, 49] Rational[3, 2]^Rational[1, 2], Rational[-13, 98]}, { Rational[169, 2401], Rational[-13, 49], Rational[-13, 49] 2^Rational[-1, 2]}, { Rational[169, 2401], Rational[-13, 49] 2^Rational[-1, 2], Rational[-13, 98] 3^Rational[1, 2]}, { Rational[169, 2401], Rational[-13, 98] (-1 + 3^Rational[1, 2]), Rational[-13, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[169, 2401], 0, Rational[-13, 49]}, { Rational[169, 2401], Rational[13, 98] (-1 + 3^Rational[1, 2]), Rational[-13, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[13, 49] 2^Rational[-1, 2], Rational[-13, 98] 3^Rational[1, 2]}, { Rational[169, 2401], Rational[13, 49], Rational[-13, 49] 2^Rational[-1, 2]}, { Rational[169, 2401], Rational[13, 49] Rational[3, 2]^Rational[1, 2], Rational[-13, 98]}, { Rational[169, 2401], Rational[13, 98] (1 + 3^Rational[1, 2]), Rational[-13, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[13, 49] 2^Rational[1, 2], 0}, { Rational[169, 2401], Rational[13, 98] (1 + 3^Rational[1, 2]), Rational[13, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[13, 49] Rational[3, 2]^Rational[1, 2], Rational[13, 98]}, { Rational[169, 2401], Rational[13, 49], Rational[13, 49] 2^Rational[-1, 2]}, { Rational[169, 2401], Rational[13, 49] 2^Rational[-1, 2], Rational[13, 98] 3^Rational[1, 2]}, { Rational[169, 2401], Rational[13, 98] (-1 + 3^Rational[1, 2]), Rational[13, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[169, 2401], 0, Rational[13, 49]}, { Rational[169, 2401], Rational[-13, 98] (-1 + 3^Rational[1, 2]), Rational[13, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[-13, 49] 2^Rational[-1, 2], Rational[13, 98] 3^Rational[1, 2]}, { Rational[169, 2401], Rational[-13, 49], Rational[13, 49] 2^Rational[-1, 2]}, { Rational[169, 2401], Rational[-13, 49] Rational[3, 2]^Rational[1, 2], Rational[13, 98]}, { Rational[169, 2401], Rational[-13, 98] (1 + 3^Rational[1, 2]), Rational[13, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[169, 2401], Rational[-13, 49] 2^Rational[1, 2], 0}, { Rational[4, 49], Rational[-2, 7] 2^Rational[1, 2], 0}, { Rational[4, 49], Rational[1, 7] (-1 - 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[-1, 7] 6^Rational[1, 2], Rational[-1, 7]}, { Rational[4, 49], Rational[-2, 7], Rational[-1, 7] 2^Rational[1, 2]}, { Rational[4, 49], Rational[-1, 7] 2^Rational[1, 2], Rational[-1, 7] 3^Rational[1, 2]}, { Rational[4, 49], Rational[1, 7] (1 - 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[4, 49], 0, Rational[-2, 7]}, { Rational[4, 49], Rational[1, 7] (-1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[1, 7] 2^Rational[1, 2], Rational[-1, 7] 3^Rational[1, 2]}, { Rational[4, 49], Rational[2, 7], Rational[-1, 7] 2^Rational[1, 2]}, { Rational[4, 49], Rational[1, 7] 6^Rational[1, 2], Rational[-1, 7]}, { Rational[4, 49], Rational[1, 7] (1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[2, 7] 2^Rational[1, 2], 0}, { Rational[4, 49], Rational[1, 7] (1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[1, 7] 6^Rational[1, 2], Rational[1, 7]}, { Rational[4, 49], Rational[2, 7], Rational[1, 7] 2^Rational[1, 2]}, { Rational[4, 49], Rational[1, 7] 2^Rational[1, 2], Rational[1, 7] 3^Rational[1, 2]}, { Rational[4, 49], Rational[1, 7] (-1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[4, 49], 0, Rational[2, 7]}, { Rational[4, 49], Rational[1, 7] (1 - 3^Rational[1, 2]), Rational[1, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[-1, 7] 2^Rational[1, 2], Rational[1, 7] 3^Rational[1, 2]}, { Rational[4, 49], Rational[-2, 7], Rational[1, 7] 2^Rational[1, 2]}, { Rational[4, 49], Rational[-1, 7] 6^Rational[1, 2], Rational[1, 7]}, { Rational[4, 49], Rational[1, 7] (-1 - 3^Rational[1, 2]), Rational[1, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[4, 49], Rational[-2, 7] 2^Rational[1, 2], 0}, { Rational[225, 2401], Rational[-15, 49] 2^Rational[1, 2], 0}, { Rational[225, 2401], Rational[-15, 98] (1 + 3^Rational[1, 2]), Rational[-15, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[-15, 49] Rational[3, 2]^Rational[1, 2], Rational[-15, 98]}, { Rational[225, 2401], Rational[-15, 49], Rational[-15, 49] 2^Rational[-1, 2]}, { Rational[225, 2401], Rational[-15, 49] 2^Rational[-1, 2], Rational[-15, 98] 3^Rational[1, 2]}, { Rational[225, 2401], Rational[-15, 98] (-1 + 3^Rational[1, 2]), Rational[-15, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[225, 2401], 0, Rational[-15, 49]}, { Rational[225, 2401], Rational[15, 98] (-1 + 3^Rational[1, 2]), Rational[-15, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[15, 49] 2^Rational[-1, 2], Rational[-15, 98] 3^Rational[1, 2]}, { Rational[225, 2401], Rational[15, 49], Rational[-15, 49] 2^Rational[-1, 2]}, { Rational[225, 2401], Rational[15, 49] Rational[3, 2]^Rational[1, 2], Rational[-15, 98]}, { Rational[225, 2401], Rational[15, 98] (1 + 3^Rational[1, 2]), Rational[-15, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[15, 49] 2^Rational[1, 2], 0}, { Rational[225, 2401], Rational[15, 98] (1 + 3^Rational[1, 2]), Rational[15, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[15, 49] Rational[3, 2]^Rational[1, 2], Rational[15, 98]}, { Rational[225, 2401], Rational[15, 49], Rational[15, 49] 2^Rational[-1, 2]}, { Rational[225, 2401], Rational[15, 49] 2^Rational[-1, 2], Rational[15, 98] 3^Rational[1, 2]}, { Rational[225, 2401], Rational[15, 98] (-1 + 3^Rational[1, 2]), Rational[15, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[225, 2401], 0, Rational[15, 49]}, { Rational[225, 2401], Rational[-15, 98] (-1 + 3^Rational[1, 2]), Rational[15, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[-15, 49] 2^Rational[-1, 2], Rational[15, 98] 3^Rational[1, 2]}, { Rational[225, 2401], Rational[-15, 49], Rational[15, 49] 2^Rational[-1, 2]}, { Rational[225, 2401], Rational[-15, 49] Rational[3, 2]^Rational[1, 2], Rational[15, 98]}, { Rational[225, 2401], Rational[-15, 98] (1 + 3^Rational[1, 2]), Rational[15, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[225, 2401], Rational[-15, 49] 2^Rational[1, 2], 0}, { Rational[256, 2401], Rational[-16, 49] 2^Rational[1, 2], 0}, { Rational[256, 2401], Rational[-8, 49] (1 + 3^Rational[1, 2]), Rational[-4, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[-8, 49] 6^Rational[1, 2], Rational[-8, 49]}, { Rational[256, 2401], Rational[-16, 49], Rational[-8, 49] 2^Rational[1, 2]}, { Rational[256, 2401], Rational[-8, 49] 2^Rational[1, 2], Rational[-8, 49] 3^Rational[1, 2]}, { Rational[256, 2401], Rational[-8, 49] (-1 + 3^Rational[1, 2]), Rational[-4, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[256, 2401], 0, Rational[-16, 49]}, { Rational[256, 2401], Rational[8, 49] (-1 + 3^Rational[1, 2]), Rational[-4, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[8, 49] 2^Rational[1, 2], Rational[-8, 49] 3^Rational[1, 2]}, { Rational[256, 2401], Rational[16, 49], Rational[-8, 49] 2^Rational[1, 2]}, { Rational[256, 2401], Rational[8, 49] 6^Rational[1, 2], Rational[-8, 49]}, { Rational[256, 2401], Rational[8, 49] (1 + 3^Rational[1, 2]), Rational[-4, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[16, 49] 2^Rational[1, 2], 0}, { Rational[256, 2401], Rational[8, 49] (1 + 3^Rational[1, 2]), Rational[4, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[8, 49] 6^Rational[1, 2], Rational[ 8, 49]}, { Rational[256, 2401], Rational[16, 49], Rational[8, 49] 2^Rational[1, 2]}, { Rational[256, 2401], Rational[8, 49] 2^Rational[1, 2], Rational[8, 49] 3^Rational[1, 2]}, { Rational[256, 2401], Rational[8, 49] (-1 + 3^Rational[1, 2]), Rational[4, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[256, 2401], 0, Rational[16, 49]}, { Rational[256, 2401], Rational[-8, 49] (-1 + 3^Rational[1, 2]), Rational[4, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[-8, 49] 2^Rational[1, 2], Rational[8, 49] 3^Rational[1, 2]}, { Rational[256, 2401], Rational[-16, 49], Rational[8, 49] 2^Rational[1, 2]}, { Rational[256, 2401], Rational[-8, 49] 6^Rational[1, 2], Rational[ 8, 49]}, { Rational[256, 2401], Rational[-8, 49] (1 + 3^Rational[1, 2]), Rational[4, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[256, 2401], Rational[-16, 49] 2^Rational[1, 2], 0}, { Rational[289, 2401], Rational[-17, 49] 2^Rational[1, 2], 0}, { Rational[289, 2401], Rational[-17, 98] (1 + 3^Rational[1, 2]), Rational[-17, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[-17, 49] Rational[3, 2]^Rational[1, 2], Rational[-17, 98]}, { Rational[289, 2401], Rational[-17, 49], Rational[-17, 49] 2^Rational[-1, 2]}, { Rational[289, 2401], Rational[-17, 49] 2^Rational[-1, 2], Rational[-17, 98] 3^Rational[1, 2]}, { Rational[289, 2401], Rational[-17, 98] (-1 + 3^Rational[1, 2]), Rational[-17, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[289, 2401], 0, Rational[-17, 49]}, { Rational[289, 2401], Rational[17, 98] (-1 + 3^Rational[1, 2]), Rational[-17, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[17, 49] 2^Rational[-1, 2], Rational[-17, 98] 3^Rational[1, 2]}, { Rational[289, 2401], Rational[17, 49], Rational[-17, 49] 2^Rational[-1, 2]}, { Rational[289, 2401], Rational[17, 49] Rational[3, 2]^Rational[1, 2], Rational[-17, 98]}, { Rational[289, 2401], Rational[17, 98] (1 + 3^Rational[1, 2]), Rational[-17, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[17, 49] 2^Rational[1, 2], 0}, { Rational[289, 2401], Rational[17, 98] (1 + 3^Rational[1, 2]), Rational[17, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[17, 49] Rational[3, 2]^Rational[1, 2], Rational[17, 98]}, { Rational[289, 2401], Rational[17, 49], Rational[17, 49] 2^Rational[-1, 2]}, { Rational[289, 2401], Rational[17, 49] 2^Rational[-1, 2], Rational[17, 98] 3^Rational[1, 2]}, { Rational[289, 2401], Rational[17, 98] (-1 + 3^Rational[1, 2]), Rational[17, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[289, 2401], 0, Rational[17, 49]}, { Rational[289, 2401], Rational[-17, 98] (-1 + 3^Rational[1, 2]), Rational[17, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[-17, 49] 2^Rational[-1, 2], Rational[17, 98] 3^Rational[1, 2]}, { Rational[289, 2401], Rational[-17, 49], Rational[17, 49] 2^Rational[-1, 2]}, { Rational[289, 2401], Rational[-17, 49] Rational[3, 2]^Rational[1, 2], Rational[17, 98]}, { Rational[289, 2401], Rational[-17, 98] (1 + 3^Rational[1, 2]), Rational[17, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[289, 2401], Rational[-17, 49] 2^Rational[1, 2], 0}, { Rational[324, 2401], Rational[-18, 49] 2^Rational[1, 2], 0}, { Rational[324, 2401], Rational[-9, 49] (1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[-9, 49] 6^Rational[1, 2], Rational[-9, 49]}, { Rational[324, 2401], Rational[-18, 49], Rational[-9, 49] 2^Rational[1, 2]}, { Rational[324, 2401], Rational[-9, 49] 2^Rational[1, 2], Rational[-9, 49] 3^Rational[1, 2]}, { Rational[324, 2401], Rational[-9, 49] (-1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[324, 2401], 0, Rational[-18, 49]}, { Rational[324, 2401], Rational[9, 49] (-1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[9, 49] 2^Rational[1, 2], Rational[-9, 49] 3^Rational[1, 2]}, { Rational[324, 2401], Rational[18, 49], Rational[-9, 49] 2^Rational[1, 2]}, { Rational[324, 2401], Rational[9, 49] 6^Rational[1, 2], Rational[-9, 49]}, { Rational[324, 2401], Rational[9, 49] (1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[18, 49] 2^Rational[1, 2], 0}, { Rational[324, 2401], Rational[9, 49] (1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[9, 49] 6^Rational[1, 2], Rational[ 9, 49]}, { Rational[324, 2401], Rational[18, 49], Rational[9, 49] 2^Rational[1, 2]}, { Rational[324, 2401], Rational[9, 49] 2^Rational[1, 2], Rational[9, 49] 3^Rational[1, 2]}, { Rational[324, 2401], Rational[9, 49] (-1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[324, 2401], 0, Rational[18, 49]}, { Rational[324, 2401], Rational[-9, 49] (-1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[-9, 49] 2^Rational[1, 2], Rational[9, 49] 3^Rational[1, 2]}, { Rational[324, 2401], Rational[-18, 49], Rational[9, 49] 2^Rational[1, 2]}, { Rational[324, 2401], Rational[-9, 49] 6^Rational[1, 2], Rational[ 9, 49]}, { Rational[324, 2401], Rational[-9, 49] (1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[324, 2401], Rational[-18, 49] 2^Rational[1, 2], 0}, { Rational[361, 2401], Rational[-19, 49] 2^Rational[1, 2], 0}, { Rational[361, 2401], Rational[-19, 98] (1 + 3^Rational[1, 2]), Rational[-19, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[-19, 49] Rational[3, 2]^Rational[1, 2], Rational[-19, 98]}, { Rational[361, 2401], Rational[-19, 49], Rational[-19, 49] 2^Rational[-1, 2]}, { Rational[361, 2401], Rational[-19, 49] 2^Rational[-1, 2], Rational[-19, 98] 3^Rational[1, 2]}, { Rational[361, 2401], Rational[-19, 98] (-1 + 3^Rational[1, 2]), Rational[-19, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[361, 2401], 0, Rational[-19, 49]}, { Rational[361, 2401], Rational[19, 98] (-1 + 3^Rational[1, 2]), Rational[-19, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[19, 49] 2^Rational[-1, 2], Rational[-19, 98] 3^Rational[1, 2]}, { Rational[361, 2401], Rational[19, 49], Rational[-19, 49] 2^Rational[-1, 2]}, { Rational[361, 2401], Rational[19, 49] Rational[3, 2]^Rational[1, 2], Rational[-19, 98]}, { Rational[361, 2401], Rational[19, 98] (1 + 3^Rational[1, 2]), Rational[-19, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[19, 49] 2^Rational[1, 2], 0}, { Rational[361, 2401], Rational[19, 98] (1 + 3^Rational[1, 2]), Rational[19, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[19, 49] Rational[3, 2]^Rational[1, 2], Rational[19, 98]}, { Rational[361, 2401], Rational[19, 49], Rational[19, 49] 2^Rational[-1, 2]}, { Rational[361, 2401], Rational[19, 49] 2^Rational[-1, 2], Rational[19, 98] 3^Rational[1, 2]}, { Rational[361, 2401], Rational[19, 98] (-1 + 3^Rational[1, 2]), Rational[19, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[361, 2401], 0, Rational[19, 49]}, { Rational[361, 2401], Rational[-19, 98] (-1 + 3^Rational[1, 2]), Rational[19, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[-19, 49] 2^Rational[-1, 2], Rational[19, 98] 3^Rational[1, 2]}, { Rational[361, 2401], Rational[-19, 49], Rational[19, 49] 2^Rational[-1, 2]}, { Rational[361, 2401], Rational[-19, 49] Rational[3, 2]^Rational[1, 2], Rational[19, 98]}, { Rational[361, 2401], Rational[-19, 98] (1 + 3^Rational[1, 2]), Rational[19, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[361, 2401], Rational[-19, 49] 2^Rational[1, 2], 0}, { Rational[400, 2401], Rational[-20, 49] 2^Rational[1, 2], 0}, { Rational[400, 2401], Rational[-10, 49] (1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[-10, 49] 6^Rational[1, 2], Rational[-10, 49]}, { Rational[400, 2401], Rational[-20, 49], Rational[-10, 49] 2^Rational[1, 2]}, { Rational[400, 2401], Rational[-10, 49] 2^Rational[1, 2], Rational[-10, 49] 3^Rational[1, 2]}, { Rational[400, 2401], Rational[-10, 49] (-1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[400, 2401], 0, Rational[-20, 49]}, { Rational[400, 2401], Rational[10, 49] (-1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[10, 49] 2^Rational[1, 2], Rational[-10, 49] 3^Rational[1, 2]}, { Rational[400, 2401], Rational[20, 49], Rational[-10, 49] 2^Rational[1, 2]}, { Rational[400, 2401], Rational[10, 49] 6^Rational[1, 2], Rational[-10, 49]}, { Rational[400, 2401], Rational[10, 49] (1 + 3^Rational[1, 2]), Rational[-5, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[20, 49] 2^Rational[1, 2], 0}, { Rational[400, 2401], Rational[10, 49] (1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[10, 49] 6^Rational[1, 2], Rational[ 10, 49]}, { Rational[400, 2401], Rational[20, 49], Rational[10, 49] 2^Rational[1, 2]}, { Rational[400, 2401], Rational[10, 49] 2^Rational[1, 2], Rational[10, 49] 3^Rational[1, 2]}, { Rational[400, 2401], Rational[10, 49] (-1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[400, 2401], 0, Rational[20, 49]}, { Rational[400, 2401], Rational[-10, 49] (-1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[-10, 49] 2^Rational[1, 2], Rational[10, 49] 3^Rational[1, 2]}, { Rational[400, 2401], Rational[-20, 49], Rational[10, 49] 2^Rational[1, 2]}, { Rational[400, 2401], Rational[-10, 49] 6^Rational[1, 2], Rational[ 10, 49]}, { Rational[400, 2401], Rational[-10, 49] (1 + 3^Rational[1, 2]), Rational[5, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[400, 2401], Rational[-20, 49] 2^Rational[1, 2], 0}, { Rational[9, 49], Rational[-3, 7] 2^Rational[1, 2], 0}, { Rational[9, 49], Rational[-3, 14] (1 + 3^Rational[1, 2]), Rational[-3, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[-3, 7] Rational[3, 2]^Rational[1, 2], Rational[-3, 14]}, { Rational[9, 49], Rational[-3, 7], Rational[-3, 7] 2^Rational[-1, 2]}, { Rational[9, 49], Rational[-3, 7] 2^Rational[-1, 2], Rational[-3, 14] 3^Rational[1, 2]}, { Rational[9, 49], Rational[-3, 14] (-1 + 3^Rational[1, 2]), Rational[-3, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[9, 49], 0, Rational[-3, 7]}, { Rational[9, 49], Rational[3, 14] (-1 + 3^Rational[1, 2]), Rational[-3, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[3, 7] 2^Rational[-1, 2], Rational[-3, 14] 3^Rational[1, 2]}, { Rational[9, 49], Rational[3, 7], Rational[-3, 7] 2^Rational[-1, 2]}, { Rational[9, 49], Rational[3, 7] Rational[3, 2]^Rational[1, 2], Rational[-3, 14]}, { Rational[9, 49], Rational[3, 14] (1 + 3^Rational[1, 2]), Rational[-3, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[3, 7] 2^Rational[1, 2], 0}, { Rational[9, 49], Rational[3, 14] (1 + 3^Rational[1, 2]), Rational[3, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[3, 7] Rational[3, 2]^Rational[1, 2], Rational[3, 14]}, { Rational[9, 49], Rational[3, 7], Rational[3, 7] 2^Rational[-1, 2]}, { Rational[9, 49], Rational[3, 7] 2^Rational[-1, 2], Rational[3, 14] 3^Rational[1, 2]}, { Rational[9, 49], Rational[3, 14] (-1 + 3^Rational[1, 2]), Rational[3, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[9, 49], 0, Rational[3, 7]}, { Rational[9, 49], Rational[-3, 14] (-1 + 3^Rational[1, 2]), Rational[3, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[-3, 7] 2^Rational[-1, 2], Rational[3, 14] 3^Rational[1, 2]}, { Rational[9, 49], Rational[-3, 7], Rational[3, 7] 2^Rational[-1, 2]}, { Rational[9, 49], Rational[-3, 7] Rational[3, 2]^Rational[1, 2], Rational[3, 14]}, { Rational[9, 49], Rational[-3, 14] (1 + 3^Rational[1, 2]), Rational[3, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[9, 49], Rational[-3, 7] 2^Rational[1, 2], 0}, { Rational[484, 2401], Rational[-22, 49] 2^Rational[1, 2], 0}, { Rational[484, 2401], Rational[-11, 49] (1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[-11, 49] 6^Rational[1, 2], Rational[-11, 49]}, { Rational[484, 2401], Rational[-22, 49], Rational[-11, 49] 2^Rational[1, 2]}, { Rational[484, 2401], Rational[-11, 49] 2^Rational[1, 2], Rational[-11, 49] 3^Rational[1, 2]}, { Rational[484, 2401], Rational[-11, 49] (-1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[484, 2401], 0, Rational[-22, 49]}, { Rational[484, 2401], Rational[11, 49] (-1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[11, 49] 2^Rational[1, 2], Rational[-11, 49] 3^Rational[1, 2]}, { Rational[484, 2401], Rational[22, 49], Rational[-11, 49] 2^Rational[1, 2]}, { Rational[484, 2401], Rational[11, 49] 6^Rational[1, 2], Rational[-11, 49]}, { Rational[484, 2401], Rational[11, 49] (1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[22, 49] 2^Rational[1, 2], 0}, { Rational[484, 2401], Rational[11, 49] (1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[11, 49] 6^Rational[1, 2], Rational[ 11, 49]}, { Rational[484, 2401], Rational[22, 49], Rational[11, 49] 2^Rational[1, 2]}, { Rational[484, 2401], Rational[11, 49] 2^Rational[1, 2], Rational[11, 49] 3^Rational[1, 2]}, { Rational[484, 2401], Rational[11, 49] (-1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[484, 2401], 0, Rational[22, 49]}, { Rational[484, 2401], Rational[-11, 49] (-1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[-11, 49] 2^Rational[1, 2], Rational[11, 49] 3^Rational[1, 2]}, { Rational[484, 2401], Rational[-22, 49], Rational[11, 49] 2^Rational[1, 2]}, { Rational[484, 2401], Rational[-11, 49] 6^Rational[1, 2], Rational[ 11, 49]}, { Rational[484, 2401], Rational[-11, 49] (1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[484, 2401], Rational[-22, 49] 2^Rational[1, 2], 0}, { Rational[529, 2401], Rational[-23, 49] 2^Rational[1, 2], 0}, { Rational[529, 2401], Rational[-23, 98] (1 + 3^Rational[1, 2]), Rational[-23, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[-23, 49] Rational[3, 2]^Rational[1, 2], Rational[-23, 98]}, { Rational[529, 2401], Rational[-23, 49], Rational[-23, 49] 2^Rational[-1, 2]}, { Rational[529, 2401], Rational[-23, 49] 2^Rational[-1, 2], Rational[-23, 98] 3^Rational[1, 2]}, { Rational[529, 2401], Rational[-23, 98] (-1 + 3^Rational[1, 2]), Rational[-23, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[529, 2401], 0, Rational[-23, 49]}, { Rational[529, 2401], Rational[23, 98] (-1 + 3^Rational[1, 2]), Rational[-23, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[23, 49] 2^Rational[-1, 2], Rational[-23, 98] 3^Rational[1, 2]}, { Rational[529, 2401], Rational[23, 49], Rational[-23, 49] 2^Rational[-1, 2]}, { Rational[529, 2401], Rational[23, 49] Rational[3, 2]^Rational[1, 2], Rational[-23, 98]}, { Rational[529, 2401], Rational[23, 98] (1 + 3^Rational[1, 2]), Rational[-23, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[23, 49] 2^Rational[1, 2], 0}, { Rational[529, 2401], Rational[23, 98] (1 + 3^Rational[1, 2]), Rational[23, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[23, 49] Rational[3, 2]^Rational[1, 2], Rational[23, 98]}, { Rational[529, 2401], Rational[23, 49], Rational[23, 49] 2^Rational[-1, 2]}, { Rational[529, 2401], Rational[23, 49] 2^Rational[-1, 2], Rational[23, 98] 3^Rational[1, 2]}, { Rational[529, 2401], Rational[23, 98] (-1 + 3^Rational[1, 2]), Rational[23, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[529, 2401], 0, Rational[23, 49]}, { Rational[529, 2401], Rational[-23, 98] (-1 + 3^Rational[1, 2]), Rational[23, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[-23, 49] 2^Rational[-1, 2], Rational[23, 98] 3^Rational[1, 2]}, { Rational[529, 2401], Rational[-23, 49], Rational[23, 49] 2^Rational[-1, 2]}, { Rational[529, 2401], Rational[-23, 49] Rational[3, 2]^Rational[1, 2], Rational[23, 98]}, { Rational[529, 2401], Rational[-23, 98] (1 + 3^Rational[1, 2]), Rational[23, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[529, 2401], Rational[-23, 49] 2^Rational[1, 2], 0}, { Rational[576, 2401], Rational[-24, 49] 2^Rational[1, 2], 0}, { Rational[576, 2401], Rational[-12, 49] (1 + 3^Rational[1, 2]), Rational[-6, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[-12, 49] 6^Rational[1, 2], Rational[-12, 49]}, { Rational[576, 2401], Rational[-24, 49], Rational[-12, 49] 2^Rational[1, 2]}, { Rational[576, 2401], Rational[-12, 49] 2^Rational[1, 2], Rational[-12, 49] 3^Rational[1, 2]}, { Rational[576, 2401], Rational[-12, 49] (-1 + 3^Rational[1, 2]), Rational[-6, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[576, 2401], 0, Rational[-24, 49]}, { Rational[576, 2401], Rational[12, 49] (-1 + 3^Rational[1, 2]), Rational[-6, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[12, 49] 2^Rational[1, 2], Rational[-12, 49] 3^Rational[1, 2]}, { Rational[576, 2401], Rational[24, 49], Rational[-12, 49] 2^Rational[1, 2]}, { Rational[576, 2401], Rational[12, 49] 6^Rational[1, 2], Rational[-12, 49]}, { Rational[576, 2401], Rational[12, 49] (1 + 3^Rational[1, 2]), Rational[-6, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[24, 49] 2^Rational[1, 2], 0}, { Rational[576, 2401], Rational[12, 49] (1 + 3^Rational[1, 2]), Rational[6, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[12, 49] 6^Rational[1, 2], Rational[ 12, 49]}, { Rational[576, 2401], Rational[24, 49], Rational[12, 49] 2^Rational[1, 2]}, { Rational[576, 2401], Rational[12, 49] 2^Rational[1, 2], Rational[12, 49] 3^Rational[1, 2]}, { Rational[576, 2401], Rational[12, 49] (-1 + 3^Rational[1, 2]), Rational[6, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[576, 2401], 0, Rational[24, 49]}, { Rational[576, 2401], Rational[-12, 49] (-1 + 3^Rational[1, 2]), Rational[6, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[-12, 49] 2^Rational[1, 2], Rational[12, 49] 3^Rational[1, 2]}, { Rational[576, 2401], Rational[-24, 49], Rational[12, 49] 2^Rational[1, 2]}, { Rational[576, 2401], Rational[-12, 49] 6^Rational[1, 2], Rational[ 12, 49]}, { Rational[576, 2401], Rational[-12, 49] (1 + 3^Rational[1, 2]), Rational[6, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[576, 2401], Rational[-24, 49] 2^Rational[1, 2], 0}, { Rational[625, 2401], Rational[-25, 49] 2^Rational[1, 2], 0}, { Rational[625, 2401], Rational[-25, 98] (1 + 3^Rational[1, 2]), Rational[-25, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[-25, 49] Rational[3, 2]^Rational[1, 2], Rational[-25, 98]}, { Rational[625, 2401], Rational[-25, 49], Rational[-25, 49] 2^Rational[-1, 2]}, { Rational[625, 2401], Rational[-25, 49] 2^Rational[-1, 2], Rational[-25, 98] 3^Rational[1, 2]}, { Rational[625, 2401], Rational[-25, 98] (-1 + 3^Rational[1, 2]), Rational[-25, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[625, 2401], 0, Rational[-25, 49]}, { Rational[625, 2401], Rational[25, 98] (-1 + 3^Rational[1, 2]), Rational[-25, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[25, 49] 2^Rational[-1, 2], Rational[-25, 98] 3^Rational[1, 2]}, { Rational[625, 2401], Rational[25, 49], Rational[-25, 49] 2^Rational[-1, 2]}, { Rational[625, 2401], Rational[25, 49] Rational[3, 2]^Rational[1, 2], Rational[-25, 98]}, { Rational[625, 2401], Rational[25, 98] (1 + 3^Rational[1, 2]), Rational[-25, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[25, 49] 2^Rational[1, 2], 0}, { Rational[625, 2401], Rational[25, 98] (1 + 3^Rational[1, 2]), Rational[25, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[25, 49] Rational[3, 2]^Rational[1, 2], Rational[25, 98]}, { Rational[625, 2401], Rational[25, 49], Rational[25, 49] 2^Rational[-1, 2]}, { Rational[625, 2401], Rational[25, 49] 2^Rational[-1, 2], Rational[25, 98] 3^Rational[1, 2]}, { Rational[625, 2401], Rational[25, 98] (-1 + 3^Rational[1, 2]), Rational[25, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[625, 2401], 0, Rational[25, 49]}, { Rational[625, 2401], Rational[-25, 98] (-1 + 3^Rational[1, 2]), Rational[25, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[-25, 49] 2^Rational[-1, 2], Rational[25, 98] 3^Rational[1, 2]}, { Rational[625, 2401], Rational[-25, 49], Rational[25, 49] 2^Rational[-1, 2]}, { Rational[625, 2401], Rational[-25, 49] Rational[3, 2]^Rational[1, 2], Rational[25, 98]}, { Rational[625, 2401], Rational[-25, 98] (1 + 3^Rational[1, 2]), Rational[25, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[625, 2401], Rational[-25, 49] 2^Rational[1, 2], 0}, { Rational[676, 2401], Rational[-26, 49] 2^Rational[1, 2], 0}, { Rational[676, 2401], Rational[-13, 49] (1 + 3^Rational[1, 2]), Rational[-13, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[-13, 49] 6^Rational[1, 2], Rational[-13, 49]}, { Rational[676, 2401], Rational[-26, 49], Rational[-13, 49] 2^Rational[1, 2]}, { Rational[676, 2401], Rational[-13, 49] 2^Rational[1, 2], Rational[-13, 49] 3^Rational[1, 2]}, { Rational[676, 2401], Rational[-13, 49] (-1 + 3^Rational[1, 2]), Rational[-13, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[676, 2401], 0, Rational[-26, 49]}, { Rational[676, 2401], Rational[13, 49] (-1 + 3^Rational[1, 2]), Rational[-13, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[13, 49] 2^Rational[1, 2], Rational[-13, 49] 3^Rational[1, 2]}, { Rational[676, 2401], Rational[26, 49], Rational[-13, 49] 2^Rational[1, 2]}, { Rational[676, 2401], Rational[13, 49] 6^Rational[1, 2], Rational[-13, 49]}, { Rational[676, 2401], Rational[13, 49] (1 + 3^Rational[1, 2]), Rational[-13, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[26, 49] 2^Rational[1, 2], 0}, { Rational[676, 2401], Rational[13, 49] (1 + 3^Rational[1, 2]), Rational[13, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[13, 49] 6^Rational[1, 2], Rational[ 13, 49]}, { Rational[676, 2401], Rational[26, 49], Rational[13, 49] 2^Rational[1, 2]}, { Rational[676, 2401], Rational[13, 49] 2^Rational[1, 2], Rational[13, 49] 3^Rational[1, 2]}, { Rational[676, 2401], Rational[13, 49] (-1 + 3^Rational[1, 2]), Rational[13, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[676, 2401], 0, Rational[26, 49]}, { Rational[676, 2401], Rational[-13, 49] (-1 + 3^Rational[1, 2]), Rational[13, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[-13, 49] 2^Rational[1, 2], Rational[13, 49] 3^Rational[1, 2]}, { Rational[676, 2401], Rational[-26, 49], Rational[13, 49] 2^Rational[1, 2]}, { Rational[676, 2401], Rational[-13, 49] 6^Rational[1, 2], Rational[ 13, 49]}, { Rational[676, 2401], Rational[-13, 49] (1 + 3^Rational[1, 2]), Rational[13, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[676, 2401], Rational[-26, 49] 2^Rational[1, 2], 0}, { Rational[729, 2401], Rational[-27, 49] 2^Rational[1, 2], 0}, { Rational[729, 2401], Rational[-27, 98] (1 + 3^Rational[1, 2]), Rational[-27, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[-27, 49] Rational[3, 2]^Rational[1, 2], Rational[-27, 98]}, { Rational[729, 2401], Rational[-27, 49], Rational[-27, 49] 2^Rational[-1, 2]}, { Rational[729, 2401], Rational[-27, 49] 2^Rational[-1, 2], Rational[-27, 98] 3^Rational[1, 2]}, { Rational[729, 2401], Rational[-27, 98] (-1 + 3^Rational[1, 2]), Rational[-27, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[729, 2401], 0, Rational[-27, 49]}, { Rational[729, 2401], Rational[27, 98] (-1 + 3^Rational[1, 2]), Rational[-27, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[27, 49] 2^Rational[-1, 2], Rational[-27, 98] 3^Rational[1, 2]}, { Rational[729, 2401], Rational[27, 49], Rational[-27, 49] 2^Rational[-1, 2]}, { Rational[729, 2401], Rational[27, 49] Rational[3, 2]^Rational[1, 2], Rational[-27, 98]}, { Rational[729, 2401], Rational[27, 98] (1 + 3^Rational[1, 2]), Rational[-27, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[27, 49] 2^Rational[1, 2], 0}, { Rational[729, 2401], Rational[27, 98] (1 + 3^Rational[1, 2]), Rational[27, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[27, 49] Rational[3, 2]^Rational[1, 2], Rational[27, 98]}, { Rational[729, 2401], Rational[27, 49], Rational[27, 49] 2^Rational[-1, 2]}, { Rational[729, 2401], Rational[27, 49] 2^Rational[-1, 2], Rational[27, 98] 3^Rational[1, 2]}, { Rational[729, 2401], Rational[27, 98] (-1 + 3^Rational[1, 2]), Rational[27, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[729, 2401], 0, Rational[27, 49]}, { Rational[729, 2401], Rational[-27, 98] (-1 + 3^Rational[1, 2]), Rational[27, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[-27, 49] 2^Rational[-1, 2], Rational[27, 98] 3^Rational[1, 2]}, { Rational[729, 2401], Rational[-27, 49], Rational[27, 49] 2^Rational[-1, 2]}, { Rational[729, 2401], Rational[-27, 49] Rational[3, 2]^Rational[1, 2], Rational[27, 98]}, { Rational[729, 2401], Rational[-27, 98] (1 + 3^Rational[1, 2]), Rational[27, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[729, 2401], Rational[-27, 49] 2^Rational[1, 2], 0}, { Rational[16, 49], Rational[-4, 7] 2^Rational[1, 2], 0}, { Rational[16, 49], Rational[-2, 7] (1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[-2, 7] 6^Rational[1, 2], Rational[-2, 7]}, { Rational[16, 49], Rational[-4, 7], Rational[-2, 7] 2^Rational[1, 2]}, { Rational[16, 49], Rational[-2, 7] 2^Rational[1, 2], Rational[-2, 7] 3^Rational[1, 2]}, { Rational[16, 49], Rational[-2, 7] (-1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[16, 49], 0, Rational[-4, 7]}, { Rational[16, 49], Rational[2, 7] (-1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[2, 7] 2^Rational[1, 2], Rational[-2, 7] 3^Rational[1, 2]}, { Rational[16, 49], Rational[4, 7], Rational[-2, 7] 2^Rational[1, 2]}, { Rational[16, 49], Rational[2, 7] 6^Rational[1, 2], Rational[-2, 7]}, { Rational[16, 49], Rational[2, 7] (1 + 3^Rational[1, 2]), Rational[-1, 7] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[4, 7] 2^Rational[1, 2], 0}, { Rational[16, 49], Rational[2, 7] (1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[2, 7] 6^Rational[1, 2], Rational[2, 7]}, { Rational[16, 49], Rational[4, 7], Rational[2, 7] 2^Rational[1, 2]}, { Rational[16, 49], Rational[2, 7] 2^Rational[1, 2], Rational[2, 7] 3^Rational[1, 2]}, { Rational[16, 49], Rational[2, 7] (-1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[16, 49], 0, Rational[4, 7]}, { Rational[16, 49], Rational[-2, 7] (-1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[-2, 7] 2^Rational[1, 2], Rational[2, 7] 3^Rational[1, 2]}, { Rational[16, 49], Rational[-4, 7], Rational[2, 7] 2^Rational[1, 2]}, { Rational[16, 49], Rational[-2, 7] 6^Rational[1, 2], Rational[2, 7]}, { Rational[16, 49], Rational[-2, 7] (1 + 3^Rational[1, 2]), Rational[1, 7] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[16, 49], Rational[-4, 7] 2^Rational[1, 2], 0}, { Rational[841, 2401], Rational[-29, 49] 2^Rational[1, 2], 0}, { Rational[841, 2401], Rational[-29, 98] (1 + 3^Rational[1, 2]), Rational[-29, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[-29, 49] Rational[3, 2]^Rational[1, 2], Rational[-29, 98]}, { Rational[841, 2401], Rational[-29, 49], Rational[-29, 49] 2^Rational[-1, 2]}, { Rational[841, 2401], Rational[-29, 49] 2^Rational[-1, 2], Rational[-29, 98] 3^Rational[1, 2]}, { Rational[841, 2401], Rational[-29, 98] (-1 + 3^Rational[1, 2]), Rational[-29, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[841, 2401], 0, Rational[-29, 49]}, { Rational[841, 2401], Rational[29, 98] (-1 + 3^Rational[1, 2]), Rational[-29, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[29, 49] 2^Rational[-1, 2], Rational[-29, 98] 3^Rational[1, 2]}, { Rational[841, 2401], Rational[29, 49], Rational[-29, 49] 2^Rational[-1, 2]}, { Rational[841, 2401], Rational[29, 49] Rational[3, 2]^Rational[1, 2], Rational[-29, 98]}, { Rational[841, 2401], Rational[29, 98] (1 + 3^Rational[1, 2]), Rational[-29, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[29, 49] 2^Rational[1, 2], 0}, { Rational[841, 2401], Rational[29, 98] (1 + 3^Rational[1, 2]), Rational[29, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[29, 49] Rational[3, 2]^Rational[1, 2], Rational[29, 98]}, { Rational[841, 2401], Rational[29, 49], Rational[29, 49] 2^Rational[-1, 2]}, { Rational[841, 2401], Rational[29, 49] 2^Rational[-1, 2], Rational[29, 98] 3^Rational[1, 2]}, { Rational[841, 2401], Rational[29, 98] (-1 + 3^Rational[1, 2]), Rational[29, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[841, 2401], 0, Rational[29, 49]}, { Rational[841, 2401], Rational[-29, 98] (-1 + 3^Rational[1, 2]), Rational[29, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[-29, 49] 2^Rational[-1, 2], Rational[29, 98] 3^Rational[1, 2]}, { Rational[841, 2401], Rational[-29, 49], Rational[29, 49] 2^Rational[-1, 2]}, { Rational[841, 2401], Rational[-29, 49] Rational[3, 2]^Rational[1, 2], Rational[29, 98]}, { Rational[841, 2401], Rational[-29, 98] (1 + 3^Rational[1, 2]), Rational[29, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[841, 2401], Rational[-29, 49] 2^Rational[1, 2], 0}, { Rational[900, 2401], Rational[-30, 49] 2^Rational[1, 2], 0}, { Rational[900, 2401], Rational[-15, 49] (1 + 3^Rational[1, 2]), Rational[-15, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[-15, 49] 6^Rational[1, 2], Rational[-15, 49]}, { Rational[900, 2401], Rational[-30, 49], Rational[-15, 49] 2^Rational[1, 2]}, { Rational[900, 2401], Rational[-15, 49] 2^Rational[1, 2], Rational[-15, 49] 3^Rational[1, 2]}, { Rational[900, 2401], Rational[-15, 49] (-1 + 3^Rational[1, 2]), Rational[-15, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[900, 2401], 0, Rational[-30, 49]}, { Rational[900, 2401], Rational[15, 49] (-1 + 3^Rational[1, 2]), Rational[-15, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[15, 49] 2^Rational[1, 2], Rational[-15, 49] 3^Rational[1, 2]}, { Rational[900, 2401], Rational[30, 49], Rational[-15, 49] 2^Rational[1, 2]}, { Rational[900, 2401], Rational[15, 49] 6^Rational[1, 2], Rational[-15, 49]}, { Rational[900, 2401], Rational[15, 49] (1 + 3^Rational[1, 2]), Rational[-15, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[30, 49] 2^Rational[1, 2], 0}, { Rational[900, 2401], Rational[15, 49] (1 + 3^Rational[1, 2]), Rational[15, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[15, 49] 6^Rational[1, 2], Rational[ 15, 49]}, { Rational[900, 2401], Rational[30, 49], Rational[15, 49] 2^Rational[1, 2]}, { Rational[900, 2401], Rational[15, 49] 2^Rational[1, 2], Rational[15, 49] 3^Rational[1, 2]}, { Rational[900, 2401], Rational[15, 49] (-1 + 3^Rational[1, 2]), Rational[15, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[900, 2401], 0, Rational[30, 49]}, { Rational[900, 2401], Rational[-15, 49] (-1 + 3^Rational[1, 2]), Rational[15, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[-15, 49] 2^Rational[1, 2], Rational[15, 49] 3^Rational[1, 2]}, { Rational[900, 2401], Rational[-30, 49], Rational[15, 49] 2^Rational[1, 2]}, { Rational[900, 2401], Rational[-15, 49] 6^Rational[1, 2], Rational[ 15, 49]}, { Rational[900, 2401], Rational[-15, 49] (1 + 3^Rational[1, 2]), Rational[15, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[900, 2401], Rational[-30, 49] 2^Rational[1, 2], 0}, { Rational[961, 2401], Rational[-31, 49] 2^Rational[1, 2], 0}, { Rational[961, 2401], Rational[-31, 98] (1 + 3^Rational[1, 2]), Rational[-31, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[-31, 49] Rational[3, 2]^Rational[1, 2], Rational[-31, 98]}, { Rational[961, 2401], Rational[-31, 49], Rational[-31, 49] 2^Rational[-1, 2]}, { Rational[961, 2401], Rational[-31, 49] 2^Rational[-1, 2], Rational[-31, 98] 3^Rational[1, 2]}, { Rational[961, 2401], Rational[-31, 98] (-1 + 3^Rational[1, 2]), Rational[-31, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[961, 2401], 0, Rational[-31, 49]}, { Rational[961, 2401], Rational[31, 98] (-1 + 3^Rational[1, 2]), Rational[-31, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[31, 49] 2^Rational[-1, 2], Rational[-31, 98] 3^Rational[1, 2]}, { Rational[961, 2401], Rational[31, 49], Rational[-31, 49] 2^Rational[-1, 2]}, { Rational[961, 2401], Rational[31, 49] Rational[3, 2]^Rational[1, 2], Rational[-31, 98]}, { Rational[961, 2401], Rational[31, 98] (1 + 3^Rational[1, 2]), Rational[-31, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[31, 49] 2^Rational[1, 2], 0}, { Rational[961, 2401], Rational[31, 98] (1 + 3^Rational[1, 2]), Rational[31, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[31, 49] Rational[3, 2]^Rational[1, 2], Rational[31, 98]}, { Rational[961, 2401], Rational[31, 49], Rational[31, 49] 2^Rational[-1, 2]}, { Rational[961, 2401], Rational[31, 49] 2^Rational[-1, 2], Rational[31, 98] 3^Rational[1, 2]}, { Rational[961, 2401], Rational[31, 98] (-1 + 3^Rational[1, 2]), Rational[31, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[961, 2401], 0, Rational[31, 49]}, { Rational[961, 2401], Rational[-31, 98] (-1 + 3^Rational[1, 2]), Rational[31, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[-31, 49] 2^Rational[-1, 2], Rational[31, 98] 3^Rational[1, 2]}, { Rational[961, 2401], Rational[-31, 49], Rational[31, 49] 2^Rational[-1, 2]}, { Rational[961, 2401], Rational[-31, 49] Rational[3, 2]^Rational[1, 2], Rational[31, 98]}, { Rational[961, 2401], Rational[-31, 98] (1 + 3^Rational[1, 2]), Rational[31, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[961, 2401], Rational[-31, 49] 2^Rational[1, 2], 0}, { Rational[1024, 2401], Rational[-32, 49] 2^Rational[1, 2], 0}, { Rational[1024, 2401], Rational[-16, 49] (1 + 3^Rational[1, 2]), Rational[-8, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[-16, 49] 6^Rational[1, 2], Rational[-16, 49]}, { Rational[1024, 2401], Rational[-32, 49], Rational[-16, 49] 2^Rational[1, 2]}, { Rational[1024, 2401], Rational[-16, 49] 2^Rational[1, 2], Rational[-16, 49] 3^Rational[1, 2]}, { Rational[1024, 2401], Rational[-16, 49] (-1 + 3^Rational[1, 2]), Rational[-8, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1024, 2401], 0, Rational[-32, 49]}, { Rational[1024, 2401], Rational[16, 49] (-1 + 3^Rational[1, 2]), Rational[-8, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[16, 49] 2^Rational[1, 2], Rational[-16, 49] 3^Rational[1, 2]}, { Rational[1024, 2401], Rational[32, 49], Rational[-16, 49] 2^Rational[1, 2]}, { Rational[1024, 2401], Rational[16, 49] 6^Rational[1, 2], Rational[-16, 49]}, { Rational[1024, 2401], Rational[16, 49] (1 + 3^Rational[1, 2]), Rational[-8, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[32, 49] 2^Rational[1, 2], 0}, { Rational[1024, 2401], Rational[16, 49] (1 + 3^Rational[1, 2]), Rational[8, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[16, 49] 6^Rational[1, 2], Rational[ 16, 49]}, { Rational[1024, 2401], Rational[32, 49], Rational[16, 49] 2^Rational[1, 2]}, { Rational[1024, 2401], Rational[16, 49] 2^Rational[1, 2], Rational[16, 49] 3^Rational[1, 2]}, { Rational[1024, 2401], Rational[16, 49] (-1 + 3^Rational[1, 2]), Rational[8, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1024, 2401], 0, Rational[32, 49]}, { Rational[1024, 2401], Rational[-16, 49] (-1 + 3^Rational[1, 2]), Rational[8, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[-16, 49] 2^Rational[1, 2], Rational[16, 49] 3^Rational[1, 2]}, { Rational[1024, 2401], Rational[-32, 49], Rational[16, 49] 2^Rational[1, 2]}, { Rational[1024, 2401], Rational[-16, 49] 6^Rational[1, 2], Rational[ 16, 49]}, { Rational[1024, 2401], Rational[-16, 49] (1 + 3^Rational[1, 2]), Rational[8, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1024, 2401], Rational[-32, 49] 2^Rational[1, 2], 0}, { Rational[1089, 2401], Rational[-33, 49] 2^Rational[1, 2], 0}, { Rational[1089, 2401], Rational[-33, 98] (1 + 3^Rational[1, 2]), Rational[-33, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[-33, 49] Rational[3, 2]^Rational[1, 2], Rational[-33, 98]}, { Rational[1089, 2401], Rational[-33, 49], Rational[-33, 49] 2^Rational[-1, 2]}, { Rational[1089, 2401], Rational[-33, 49] 2^Rational[-1, 2], Rational[-33, 98] 3^Rational[1, 2]}, { Rational[1089, 2401], Rational[-33, 98] (-1 + 3^Rational[1, 2]), Rational[-33, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1089, 2401], 0, Rational[-33, 49]}, { Rational[1089, 2401], Rational[33, 98] (-1 + 3^Rational[1, 2]), Rational[-33, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[33, 49] 2^Rational[-1, 2], Rational[-33, 98] 3^Rational[1, 2]}, { Rational[1089, 2401], Rational[33, 49], Rational[-33, 49] 2^Rational[-1, 2]}, { Rational[1089, 2401], Rational[33, 49] Rational[3, 2]^Rational[1, 2], Rational[-33, 98]}, { Rational[1089, 2401], Rational[33, 98] (1 + 3^Rational[1, 2]), Rational[-33, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[33, 49] 2^Rational[1, 2], 0}, { Rational[1089, 2401], Rational[33, 98] (1 + 3^Rational[1, 2]), Rational[33, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[33, 49] Rational[3, 2]^Rational[1, 2], Rational[33, 98]}, { Rational[1089, 2401], Rational[33, 49], Rational[33, 49] 2^Rational[-1, 2]}, { Rational[1089, 2401], Rational[33, 49] 2^Rational[-1, 2], Rational[33, 98] 3^Rational[1, 2]}, { Rational[1089, 2401], Rational[33, 98] (-1 + 3^Rational[1, 2]), Rational[33, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1089, 2401], 0, Rational[33, 49]}, { Rational[1089, 2401], Rational[-33, 98] (-1 + 3^Rational[1, 2]), Rational[33, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[-33, 49] 2^Rational[-1, 2], Rational[33, 98] 3^Rational[1, 2]}, { Rational[1089, 2401], Rational[-33, 49], Rational[33, 49] 2^Rational[-1, 2]}, { Rational[1089, 2401], Rational[-33, 49] Rational[3, 2]^Rational[1, 2], Rational[33, 98]}, { Rational[1089, 2401], Rational[-33, 98] (1 + 3^Rational[1, 2]), Rational[33, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1089, 2401], Rational[-33, 49] 2^Rational[1, 2], 0}, { Rational[1156, 2401], Rational[-34, 49] 2^Rational[1, 2], 0}, { Rational[1156, 2401], Rational[-17, 49] (1 + 3^Rational[1, 2]), Rational[-17, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[-17, 49] 6^Rational[1, 2], Rational[-17, 49]}, { Rational[1156, 2401], Rational[-34, 49], Rational[-17, 49] 2^Rational[1, 2]}, { Rational[1156, 2401], Rational[-17, 49] 2^Rational[1, 2], Rational[-17, 49] 3^Rational[1, 2]}, { Rational[1156, 2401], Rational[-17, 49] (-1 + 3^Rational[1, 2]), Rational[-17, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1156, 2401], 0, Rational[-34, 49]}, { Rational[1156, 2401], Rational[17, 49] (-1 + 3^Rational[1, 2]), Rational[-17, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[17, 49] 2^Rational[1, 2], Rational[-17, 49] 3^Rational[1, 2]}, { Rational[1156, 2401], Rational[34, 49], Rational[-17, 49] 2^Rational[1, 2]}, { Rational[1156, 2401], Rational[17, 49] 6^Rational[1, 2], Rational[-17, 49]}, { Rational[1156, 2401], Rational[17, 49] (1 + 3^Rational[1, 2]), Rational[-17, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[34, 49] 2^Rational[1, 2], 0}, { Rational[1156, 2401], Rational[17, 49] (1 + 3^Rational[1, 2]), Rational[17, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[17, 49] 6^Rational[1, 2], Rational[ 17, 49]}, { Rational[1156, 2401], Rational[34, 49], Rational[17, 49] 2^Rational[1, 2]}, { Rational[1156, 2401], Rational[17, 49] 2^Rational[1, 2], Rational[17, 49] 3^Rational[1, 2]}, { Rational[1156, 2401], Rational[17, 49] (-1 + 3^Rational[1, 2]), Rational[17, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1156, 2401], 0, Rational[34, 49]}, { Rational[1156, 2401], Rational[-17, 49] (-1 + 3^Rational[1, 2]), Rational[17, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[-17, 49] 2^Rational[1, 2], Rational[17, 49] 3^Rational[1, 2]}, { Rational[1156, 2401], Rational[-34, 49], Rational[17, 49] 2^Rational[1, 2]}, { Rational[1156, 2401], Rational[-17, 49] 6^Rational[1, 2], Rational[ 17, 49]}, { Rational[1156, 2401], Rational[-17, 49] (1 + 3^Rational[1, 2]), Rational[17, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1156, 2401], Rational[-34, 49] 2^Rational[1, 2], 0}, { Rational[25, 49], Rational[-5, 7] 2^Rational[1, 2], 0}, { Rational[25, 49], Rational[-5, 14] (1 + 3^Rational[1, 2]), Rational[-5, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[-5, 7] Rational[3, 2]^Rational[1, 2], Rational[-5, 14]}, { Rational[25, 49], Rational[-5, 7], Rational[-5, 7] 2^Rational[-1, 2]}, { Rational[25, 49], Rational[-5, 7] 2^Rational[-1, 2], Rational[-5, 14] 3^Rational[1, 2]}, { Rational[25, 49], Rational[-5, 14] (-1 + 3^Rational[1, 2]), Rational[-5, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 49], 0, Rational[-5, 7]}, { Rational[25, 49], Rational[5, 14] (-1 + 3^Rational[1, 2]), Rational[-5, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[5, 7] 2^Rational[-1, 2], Rational[-5, 14] 3^Rational[1, 2]}, { Rational[25, 49], Rational[5, 7], Rational[-5, 7] 2^Rational[-1, 2]}, { Rational[25, 49], Rational[5, 7] Rational[3, 2]^Rational[1, 2], Rational[-5, 14]}, { Rational[25, 49], Rational[5, 14] (1 + 3^Rational[1, 2]), Rational[-5, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[5, 7] 2^Rational[1, 2], 0}, { Rational[25, 49], Rational[5, 14] (1 + 3^Rational[1, 2]), Rational[5, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[5, 7] Rational[3, 2]^Rational[1, 2], Rational[5, 14]}, { Rational[25, 49], Rational[5, 7], Rational[5, 7] 2^Rational[-1, 2]}, { Rational[25, 49], Rational[5, 7] 2^Rational[-1, 2], Rational[5, 14] 3^Rational[1, 2]}, { Rational[25, 49], Rational[5, 14] (-1 + 3^Rational[1, 2]), Rational[5, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 49], 0, Rational[5, 7]}, { Rational[25, 49], Rational[-5, 14] (-1 + 3^Rational[1, 2]), Rational[5, 14] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[-5, 7] 2^Rational[-1, 2], Rational[5, 14] 3^Rational[1, 2]}, { Rational[25, 49], Rational[-5, 7], Rational[5, 7] 2^Rational[-1, 2]}, { Rational[25, 49], Rational[-5, 7] Rational[3, 2]^Rational[1, 2], Rational[5, 14]}, { Rational[25, 49], Rational[-5, 14] (1 + 3^Rational[1, 2]), Rational[5, 14] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[25, 49], Rational[-5, 7] 2^Rational[1, 2], 0}, { Rational[1296, 2401], Rational[-36, 49] 2^Rational[1, 2], 0}, { Rational[1296, 2401], Rational[-18, 49] (1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[-18, 49] 6^Rational[1, 2], Rational[-18, 49]}, { Rational[1296, 2401], Rational[-36, 49], Rational[-18, 49] 2^Rational[1, 2]}, { Rational[1296, 2401], Rational[-18, 49] 2^Rational[1, 2], Rational[-18, 49] 3^Rational[1, 2]}, { Rational[1296, 2401], Rational[-18, 49] (-1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1296, 2401], 0, Rational[-36, 49]}, { Rational[1296, 2401], Rational[18, 49] (-1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[18, 49] 2^Rational[1, 2], Rational[-18, 49] 3^Rational[1, 2]}, { Rational[1296, 2401], Rational[36, 49], Rational[-18, 49] 2^Rational[1, 2]}, { Rational[1296, 2401], Rational[18, 49] 6^Rational[1, 2], Rational[-18, 49]}, { Rational[1296, 2401], Rational[18, 49] (1 + 3^Rational[1, 2]), Rational[-9, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[36, 49] 2^Rational[1, 2], 0}, { Rational[1296, 2401], Rational[18, 49] (1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[18, 49] 6^Rational[1, 2], Rational[ 18, 49]}, { Rational[1296, 2401], Rational[36, 49], Rational[18, 49] 2^Rational[1, 2]}, { Rational[1296, 2401], Rational[18, 49] 2^Rational[1, 2], Rational[18, 49] 3^Rational[1, 2]}, { Rational[1296, 2401], Rational[18, 49] (-1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1296, 2401], 0, Rational[36, 49]}, { Rational[1296, 2401], Rational[-18, 49] (-1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[-18, 49] 2^Rational[1, 2], Rational[18, 49] 3^Rational[1, 2]}, { Rational[1296, 2401], Rational[-36, 49], Rational[18, 49] 2^Rational[1, 2]}, { Rational[1296, 2401], Rational[-18, 49] 6^Rational[1, 2], Rational[ 18, 49]}, { Rational[1296, 2401], Rational[-18, 49] (1 + 3^Rational[1, 2]), Rational[9, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1296, 2401], Rational[-36, 49] 2^Rational[1, 2], 0}, { Rational[1369, 2401], Rational[-37, 49] 2^Rational[1, 2], 0}, { Rational[1369, 2401], Rational[-37, 98] (1 + 3^Rational[1, 2]), Rational[-37, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[-37, 49] Rational[3, 2]^Rational[1, 2], Rational[-37, 98]}, { Rational[1369, 2401], Rational[-37, 49], Rational[-37, 49] 2^Rational[-1, 2]}, { Rational[1369, 2401], Rational[-37, 49] 2^Rational[-1, 2], Rational[-37, 98] 3^Rational[1, 2]}, { Rational[1369, 2401], Rational[-37, 98] (-1 + 3^Rational[1, 2]), Rational[-37, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1369, 2401], 0, Rational[-37, 49]}, { Rational[1369, 2401], Rational[37, 98] (-1 + 3^Rational[1, 2]), Rational[-37, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[37, 49] 2^Rational[-1, 2], Rational[-37, 98] 3^Rational[1, 2]}, { Rational[1369, 2401], Rational[37, 49], Rational[-37, 49] 2^Rational[-1, 2]}, { Rational[1369, 2401], Rational[37, 49] Rational[3, 2]^Rational[1, 2], Rational[-37, 98]}, { Rational[1369, 2401], Rational[37, 98] (1 + 3^Rational[1, 2]), Rational[-37, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[37, 49] 2^Rational[1, 2], 0}, { Rational[1369, 2401], Rational[37, 98] (1 + 3^Rational[1, 2]), Rational[37, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[37, 49] Rational[3, 2]^Rational[1, 2], Rational[37, 98]}, { Rational[1369, 2401], Rational[37, 49], Rational[37, 49] 2^Rational[-1, 2]}, { Rational[1369, 2401], Rational[37, 49] 2^Rational[-1, 2], Rational[37, 98] 3^Rational[1, 2]}, { Rational[1369, 2401], Rational[37, 98] (-1 + 3^Rational[1, 2]), Rational[37, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1369, 2401], 0, Rational[37, 49]}, { Rational[1369, 2401], Rational[-37, 98] (-1 + 3^Rational[1, 2]), Rational[37, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[-37, 49] 2^Rational[-1, 2], Rational[37, 98] 3^Rational[1, 2]}, { Rational[1369, 2401], Rational[-37, 49], Rational[37, 49] 2^Rational[-1, 2]}, { Rational[1369, 2401], Rational[-37, 49] Rational[3, 2]^Rational[1, 2], Rational[37, 98]}, { Rational[1369, 2401], Rational[-37, 98] (1 + 3^Rational[1, 2]), Rational[37, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1369, 2401], Rational[-37, 49] 2^Rational[1, 2], 0}, { Rational[1444, 2401], Rational[-38, 49] 2^Rational[1, 2], 0}, { Rational[1444, 2401], Rational[-19, 49] (1 + 3^Rational[1, 2]), Rational[-19, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[-19, 49] 6^Rational[1, 2], Rational[-19, 49]}, { Rational[1444, 2401], Rational[-38, 49], Rational[-19, 49] 2^Rational[1, 2]}, { Rational[1444, 2401], Rational[-19, 49] 2^Rational[1, 2], Rational[-19, 49] 3^Rational[1, 2]}, { Rational[1444, 2401], Rational[-19, 49] (-1 + 3^Rational[1, 2]), Rational[-19, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1444, 2401], 0, Rational[-38, 49]}, { Rational[1444, 2401], Rational[19, 49] (-1 + 3^Rational[1, 2]), Rational[-19, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[19, 49] 2^Rational[1, 2], Rational[-19, 49] 3^Rational[1, 2]}, { Rational[1444, 2401], Rational[38, 49], Rational[-19, 49] 2^Rational[1, 2]}, { Rational[1444, 2401], Rational[19, 49] 6^Rational[1, 2], Rational[-19, 49]}, { Rational[1444, 2401], Rational[19, 49] (1 + 3^Rational[1, 2]), Rational[-19, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[38, 49] 2^Rational[1, 2], 0}, { Rational[1444, 2401], Rational[19, 49] (1 + 3^Rational[1, 2]), Rational[19, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[19, 49] 6^Rational[1, 2], Rational[ 19, 49]}, { Rational[1444, 2401], Rational[38, 49], Rational[19, 49] 2^Rational[1, 2]}, { Rational[1444, 2401], Rational[19, 49] 2^Rational[1, 2], Rational[19, 49] 3^Rational[1, 2]}, { Rational[1444, 2401], Rational[19, 49] (-1 + 3^Rational[1, 2]), Rational[19, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1444, 2401], 0, Rational[38, 49]}, { Rational[1444, 2401], Rational[-19, 49] (-1 + 3^Rational[1, 2]), Rational[19, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[-19, 49] 2^Rational[1, 2], Rational[19, 49] 3^Rational[1, 2]}, { Rational[1444, 2401], Rational[-38, 49], Rational[19, 49] 2^Rational[1, 2]}, { Rational[1444, 2401], Rational[-19, 49] 6^Rational[1, 2], Rational[ 19, 49]}, { Rational[1444, 2401], Rational[-19, 49] (1 + 3^Rational[1, 2]), Rational[19, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1444, 2401], Rational[-38, 49] 2^Rational[1, 2], 0}, { Rational[1521, 2401], Rational[-39, 49] 2^Rational[1, 2], 0}, { Rational[1521, 2401], Rational[-39, 98] (1 + 3^Rational[1, 2]), Rational[-39, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[-39, 49] Rational[3, 2]^Rational[1, 2], Rational[-39, 98]}, { Rational[1521, 2401], Rational[-39, 49], Rational[-39, 49] 2^Rational[-1, 2]}, { Rational[1521, 2401], Rational[-39, 49] 2^Rational[-1, 2], Rational[-39, 98] 3^Rational[1, 2]}, { Rational[1521, 2401], Rational[-39, 98] (-1 + 3^Rational[1, 2]), Rational[-39, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1521, 2401], 0, Rational[-39, 49]}, { Rational[1521, 2401], Rational[39, 98] (-1 + 3^Rational[1, 2]), Rational[-39, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[39, 49] 2^Rational[-1, 2], Rational[-39, 98] 3^Rational[1, 2]}, { Rational[1521, 2401], Rational[39, 49], Rational[-39, 49] 2^Rational[-1, 2]}, { Rational[1521, 2401], Rational[39, 49] Rational[3, 2]^Rational[1, 2], Rational[-39, 98]}, { Rational[1521, 2401], Rational[39, 98] (1 + 3^Rational[1, 2]), Rational[-39, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[39, 49] 2^Rational[1, 2], 0}, { Rational[1521, 2401], Rational[39, 98] (1 + 3^Rational[1, 2]), Rational[39, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[39, 49] Rational[3, 2]^Rational[1, 2], Rational[39, 98]}, { Rational[1521, 2401], Rational[39, 49], Rational[39, 49] 2^Rational[-1, 2]}, { Rational[1521, 2401], Rational[39, 49] 2^Rational[-1, 2], Rational[39, 98] 3^Rational[1, 2]}, { Rational[1521, 2401], Rational[39, 98] (-1 + 3^Rational[1, 2]), Rational[39, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1521, 2401], 0, Rational[39, 49]}, { Rational[1521, 2401], Rational[-39, 98] (-1 + 3^Rational[1, 2]), Rational[39, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[-39, 49] 2^Rational[-1, 2], Rational[39, 98] 3^Rational[1, 2]}, { Rational[1521, 2401], Rational[-39, 49], Rational[39, 49] 2^Rational[-1, 2]}, { Rational[1521, 2401], Rational[-39, 49] Rational[3, 2]^Rational[1, 2], Rational[39, 98]}, { Rational[1521, 2401], Rational[-39, 98] (1 + 3^Rational[1, 2]), Rational[39, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1521, 2401], Rational[-39, 49] 2^Rational[1, 2], 0}, { Rational[1600, 2401], Rational[-40, 49] 2^Rational[1, 2], 0}, { Rational[1600, 2401], Rational[-20, 49] (1 + 3^Rational[1, 2]), Rational[-10, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[-20, 49] 6^Rational[1, 2], Rational[-20, 49]}, { Rational[1600, 2401], Rational[-40, 49], Rational[-20, 49] 2^Rational[1, 2]}, { Rational[1600, 2401], Rational[-20, 49] 2^Rational[1, 2], Rational[-20, 49] 3^Rational[1, 2]}, { Rational[1600, 2401], Rational[-20, 49] (-1 + 3^Rational[1, 2]), Rational[-10, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1600, 2401], 0, Rational[-40, 49]}, { Rational[1600, 2401], Rational[20, 49] (-1 + 3^Rational[1, 2]), Rational[-10, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[20, 49] 2^Rational[1, 2], Rational[-20, 49] 3^Rational[1, 2]}, { Rational[1600, 2401], Rational[40, 49], Rational[-20, 49] 2^Rational[1, 2]}, { Rational[1600, 2401], Rational[20, 49] 6^Rational[1, 2], Rational[-20, 49]}, { Rational[1600, 2401], Rational[20, 49] (1 + 3^Rational[1, 2]), Rational[-10, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[40, 49] 2^Rational[1, 2], 0}, { Rational[1600, 2401], Rational[20, 49] (1 + 3^Rational[1, 2]), Rational[10, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[20, 49] 6^Rational[1, 2], Rational[ 20, 49]}, { Rational[1600, 2401], Rational[40, 49], Rational[20, 49] 2^Rational[1, 2]}, { Rational[1600, 2401], Rational[20, 49] 2^Rational[1, 2], Rational[20, 49] 3^Rational[1, 2]}, { Rational[1600, 2401], Rational[20, 49] (-1 + 3^Rational[1, 2]), Rational[10, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1600, 2401], 0, Rational[40, 49]}, { Rational[1600, 2401], Rational[-20, 49] (-1 + 3^Rational[1, 2]), Rational[10, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[-20, 49] 2^Rational[1, 2], Rational[20, 49] 3^Rational[1, 2]}, { Rational[1600, 2401], Rational[-40, 49], Rational[20, 49] 2^Rational[1, 2]}, { Rational[1600, 2401], Rational[-20, 49] 6^Rational[1, 2], Rational[ 20, 49]}, { Rational[1600, 2401], Rational[-20, 49] (1 + 3^Rational[1, 2]), Rational[10, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1600, 2401], Rational[-40, 49] 2^Rational[1, 2], 0}, { Rational[1681, 2401], Rational[-41, 49] 2^Rational[1, 2], 0}, { Rational[1681, 2401], Rational[-41, 98] (1 + 3^Rational[1, 2]), Rational[-41, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[-41, 49] Rational[3, 2]^Rational[1, 2], Rational[-41, 98]}, { Rational[1681, 2401], Rational[-41, 49], Rational[-41, 49] 2^Rational[-1, 2]}, { Rational[1681, 2401], Rational[-41, 49] 2^Rational[-1, 2], Rational[-41, 98] 3^Rational[1, 2]}, { Rational[1681, 2401], Rational[-41, 98] (-1 + 3^Rational[1, 2]), Rational[-41, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1681, 2401], 0, Rational[-41, 49]}, { Rational[1681, 2401], Rational[41, 98] (-1 + 3^Rational[1, 2]), Rational[-41, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[41, 49] 2^Rational[-1, 2], Rational[-41, 98] 3^Rational[1, 2]}, { Rational[1681, 2401], Rational[41, 49], Rational[-41, 49] 2^Rational[-1, 2]}, { Rational[1681, 2401], Rational[41, 49] Rational[3, 2]^Rational[1, 2], Rational[-41, 98]}, { Rational[1681, 2401], Rational[41, 98] (1 + 3^Rational[1, 2]), Rational[-41, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[41, 49] 2^Rational[1, 2], 0}, { Rational[1681, 2401], Rational[41, 98] (1 + 3^Rational[1, 2]), Rational[41, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[41, 49] Rational[3, 2]^Rational[1, 2], Rational[41, 98]}, { Rational[1681, 2401], Rational[41, 49], Rational[41, 49] 2^Rational[-1, 2]}, { Rational[1681, 2401], Rational[41, 49] 2^Rational[-1, 2], Rational[41, 98] 3^Rational[1, 2]}, { Rational[1681, 2401], Rational[41, 98] (-1 + 3^Rational[1, 2]), Rational[41, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1681, 2401], 0, Rational[41, 49]}, { Rational[1681, 2401], Rational[-41, 98] (-1 + 3^Rational[1, 2]), Rational[41, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[-41, 49] 2^Rational[-1, 2], Rational[41, 98] 3^Rational[1, 2]}, { Rational[1681, 2401], Rational[-41, 49], Rational[41, 49] 2^Rational[-1, 2]}, { Rational[1681, 2401], Rational[-41, 49] Rational[3, 2]^Rational[1, 2], Rational[41, 98]}, { Rational[1681, 2401], Rational[-41, 98] (1 + 3^Rational[1, 2]), Rational[41, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1681, 2401], Rational[-41, 49] 2^Rational[1, 2], 0}, { Rational[36, 49], Rational[-6, 7] 2^Rational[1, 2], 0}, { Rational[36, 49], Rational[-3, 7] (1 + 3^Rational[1, 2]), Rational[-3, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[-3, 7] 6^Rational[1, 2], Rational[-3, 7]}, { Rational[36, 49], Rational[-6, 7], Rational[-3, 7] 2^Rational[1, 2]}, { Rational[36, 49], Rational[-3, 7] 2^Rational[1, 2], Rational[-3, 7] 3^Rational[1, 2]}, { Rational[36, 49], Rational[-3, 7] (-1 + 3^Rational[1, 2]), Rational[-3, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 49], 0, Rational[-6, 7]}, { Rational[36, 49], Rational[3, 7] (-1 + 3^Rational[1, 2]), Rational[-3, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[3, 7] 2^Rational[1, 2], Rational[-3, 7] 3^Rational[1, 2]}, { Rational[36, 49], Rational[6, 7], Rational[-3, 7] 2^Rational[1, 2]}, { Rational[36, 49], Rational[3, 7] 6^Rational[1, 2], Rational[-3, 7]}, { Rational[36, 49], Rational[3, 7] (1 + 3^Rational[1, 2]), Rational[-3, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[6, 7] 2^Rational[1, 2], 0}, { Rational[36, 49], Rational[3, 7] (1 + 3^Rational[1, 2]), Rational[3, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[3, 7] 6^Rational[1, 2], Rational[3, 7]}, { Rational[36, 49], Rational[6, 7], Rational[3, 7] 2^Rational[1, 2]}, { Rational[36, 49], Rational[3, 7] 2^Rational[1, 2], Rational[3, 7] 3^Rational[1, 2]}, { Rational[36, 49], Rational[3, 7] (-1 + 3^Rational[1, 2]), Rational[3, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 49], 0, Rational[6, 7]}, { Rational[36, 49], Rational[-3, 7] (-1 + 3^Rational[1, 2]), Rational[3, 7] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[-3, 7] 2^Rational[1, 2], Rational[3, 7] 3^Rational[1, 2]}, { Rational[36, 49], Rational[-6, 7], Rational[3, 7] 2^Rational[1, 2]}, { Rational[36, 49], Rational[-3, 7] 6^Rational[1, 2], Rational[3, 7]}, { Rational[36, 49], Rational[-3, 7] (1 + 3^Rational[1, 2]), Rational[3, 7] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[36, 49], Rational[-6, 7] 2^Rational[1, 2], 0}, { Rational[1849, 2401], Rational[-43, 49] 2^Rational[1, 2], 0}, { Rational[1849, 2401], Rational[-43, 98] (1 + 3^Rational[1, 2]), Rational[-43, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[-43, 49] Rational[3, 2]^Rational[1, 2], Rational[-43, 98]}, { Rational[1849, 2401], Rational[-43, 49], Rational[-43, 49] 2^Rational[-1, 2]}, { Rational[1849, 2401], Rational[-43, 49] 2^Rational[-1, 2], Rational[-43, 98] 3^Rational[1, 2]}, { Rational[1849, 2401], Rational[-43, 98] (-1 + 3^Rational[1, 2]), Rational[-43, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1849, 2401], 0, Rational[-43, 49]}, { Rational[1849, 2401], Rational[43, 98] (-1 + 3^Rational[1, 2]), Rational[-43, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[43, 49] 2^Rational[-1, 2], Rational[-43, 98] 3^Rational[1, 2]}, { Rational[1849, 2401], Rational[43, 49], Rational[-43, 49] 2^Rational[-1, 2]}, { Rational[1849, 2401], Rational[43, 49] Rational[3, 2]^Rational[1, 2], Rational[-43, 98]}, { Rational[1849, 2401], Rational[43, 98] (1 + 3^Rational[1, 2]), Rational[-43, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[43, 49] 2^Rational[1, 2], 0}, { Rational[1849, 2401], Rational[43, 98] (1 + 3^Rational[1, 2]), Rational[43, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[43, 49] Rational[3, 2]^Rational[1, 2], Rational[43, 98]}, { Rational[1849, 2401], Rational[43, 49], Rational[43, 49] 2^Rational[-1, 2]}, { Rational[1849, 2401], Rational[43, 49] 2^Rational[-1, 2], Rational[43, 98] 3^Rational[1, 2]}, { Rational[1849, 2401], Rational[43, 98] (-1 + 3^Rational[1, 2]), Rational[43, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1849, 2401], 0, Rational[43, 49]}, { Rational[1849, 2401], Rational[-43, 98] (-1 + 3^Rational[1, 2]), Rational[43, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[-43, 49] 2^Rational[-1, 2], Rational[43, 98] 3^Rational[1, 2]}, { Rational[1849, 2401], Rational[-43, 49], Rational[43, 49] 2^Rational[-1, 2]}, { Rational[1849, 2401], Rational[-43, 49] Rational[3, 2]^Rational[1, 2], Rational[43, 98]}, { Rational[1849, 2401], Rational[-43, 98] (1 + 3^Rational[1, 2]), Rational[43, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1849, 2401], Rational[-43, 49] 2^Rational[1, 2], 0}, { Rational[1936, 2401], Rational[-44, 49] 2^Rational[1, 2], 0}, { Rational[1936, 2401], Rational[-22, 49] (1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[-22, 49] 6^Rational[1, 2], Rational[-22, 49]}, { Rational[1936, 2401], Rational[-44, 49], Rational[-22, 49] 2^Rational[1, 2]}, { Rational[1936, 2401], Rational[-22, 49] 2^Rational[1, 2], Rational[-22, 49] 3^Rational[1, 2]}, { Rational[1936, 2401], Rational[-22, 49] (-1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1936, 2401], 0, Rational[-44, 49]}, { Rational[1936, 2401], Rational[22, 49] (-1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[22, 49] 2^Rational[1, 2], Rational[-22, 49] 3^Rational[1, 2]}, { Rational[1936, 2401], Rational[44, 49], Rational[-22, 49] 2^Rational[1, 2]}, { Rational[1936, 2401], Rational[22, 49] 6^Rational[1, 2], Rational[-22, 49]}, { Rational[1936, 2401], Rational[22, 49] (1 + 3^Rational[1, 2]), Rational[-11, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[44, 49] 2^Rational[1, 2], 0}, { Rational[1936, 2401], Rational[22, 49] (1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[22, 49] 6^Rational[1, 2], Rational[ 22, 49]}, { Rational[1936, 2401], Rational[44, 49], Rational[22, 49] 2^Rational[1, 2]}, { Rational[1936, 2401], Rational[22, 49] 2^Rational[1, 2], Rational[22, 49] 3^Rational[1, 2]}, { Rational[1936, 2401], Rational[22, 49] (-1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1936, 2401], 0, Rational[44, 49]}, { Rational[1936, 2401], Rational[-22, 49] (-1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[-22, 49] 2^Rational[1, 2], Rational[22, 49] 3^Rational[1, 2]}, { Rational[1936, 2401], Rational[-44, 49], Rational[22, 49] 2^Rational[1, 2]}, { Rational[1936, 2401], Rational[-22, 49] 6^Rational[1, 2], Rational[ 22, 49]}, { Rational[1936, 2401], Rational[-22, 49] (1 + 3^Rational[1, 2]), Rational[11, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[1936, 2401], Rational[-44, 49] 2^Rational[1, 2], 0}, { Rational[2025, 2401], Rational[-45, 49] 2^Rational[1, 2], 0}, { Rational[2025, 2401], Rational[-45, 98] (1 + 3^Rational[1, 2]), Rational[-45, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[-45, 49] Rational[3, 2]^Rational[1, 2], Rational[-45, 98]}, { Rational[2025, 2401], Rational[-45, 49], Rational[-45, 49] 2^Rational[-1, 2]}, { Rational[2025, 2401], Rational[-45, 49] 2^Rational[-1, 2], Rational[-45, 98] 3^Rational[1, 2]}, { Rational[2025, 2401], Rational[-45, 98] (-1 + 3^Rational[1, 2]), Rational[-45, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2025, 2401], 0, Rational[-45, 49]}, { Rational[2025, 2401], Rational[45, 98] (-1 + 3^Rational[1, 2]), Rational[-45, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[45, 49] 2^Rational[-1, 2], Rational[-45, 98] 3^Rational[1, 2]}, { Rational[2025, 2401], Rational[45, 49], Rational[-45, 49] 2^Rational[-1, 2]}, { Rational[2025, 2401], Rational[45, 49] Rational[3, 2]^Rational[1, 2], Rational[-45, 98]}, { Rational[2025, 2401], Rational[45, 98] (1 + 3^Rational[1, 2]), Rational[-45, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[45, 49] 2^Rational[1, 2], 0}, { Rational[2025, 2401], Rational[45, 98] (1 + 3^Rational[1, 2]), Rational[45, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[45, 49] Rational[3, 2]^Rational[1, 2], Rational[45, 98]}, { Rational[2025, 2401], Rational[45, 49], Rational[45, 49] 2^Rational[-1, 2]}, { Rational[2025, 2401], Rational[45, 49] 2^Rational[-1, 2], Rational[45, 98] 3^Rational[1, 2]}, { Rational[2025, 2401], Rational[45, 98] (-1 + 3^Rational[1, 2]), Rational[45, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2025, 2401], 0, Rational[45, 49]}, { Rational[2025, 2401], Rational[-45, 98] (-1 + 3^Rational[1, 2]), Rational[45, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[-45, 49] 2^Rational[-1, 2], Rational[45, 98] 3^Rational[1, 2]}, { Rational[2025, 2401], Rational[-45, 49], Rational[45, 49] 2^Rational[-1, 2]}, { Rational[2025, 2401], Rational[-45, 49] Rational[3, 2]^Rational[1, 2], Rational[45, 98]}, { Rational[2025, 2401], Rational[-45, 98] (1 + 3^Rational[1, 2]), Rational[45, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2025, 2401], Rational[-45, 49] 2^Rational[1, 2], 0}, { Rational[2116, 2401], Rational[-46, 49] 2^Rational[1, 2], 0}, { Rational[2116, 2401], Rational[-23, 49] (1 + 3^Rational[1, 2]), Rational[-23, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[-23, 49] 6^Rational[1, 2], Rational[-23, 49]}, { Rational[2116, 2401], Rational[-46, 49], Rational[-23, 49] 2^Rational[1, 2]}, { Rational[2116, 2401], Rational[-23, 49] 2^Rational[1, 2], Rational[-23, 49] 3^Rational[1, 2]}, { Rational[2116, 2401], Rational[-23, 49] (-1 + 3^Rational[1, 2]), Rational[-23, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2116, 2401], 0, Rational[-46, 49]}, { Rational[2116, 2401], Rational[23, 49] (-1 + 3^Rational[1, 2]), Rational[-23, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[23, 49] 2^Rational[1, 2], Rational[-23, 49] 3^Rational[1, 2]}, { Rational[2116, 2401], Rational[46, 49], Rational[-23, 49] 2^Rational[1, 2]}, { Rational[2116, 2401], Rational[23, 49] 6^Rational[1, 2], Rational[-23, 49]}, { Rational[2116, 2401], Rational[23, 49] (1 + 3^Rational[1, 2]), Rational[-23, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[46, 49] 2^Rational[1, 2], 0}, { Rational[2116, 2401], Rational[23, 49] (1 + 3^Rational[1, 2]), Rational[23, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[23, 49] 6^Rational[1, 2], Rational[ 23, 49]}, { Rational[2116, 2401], Rational[46, 49], Rational[23, 49] 2^Rational[1, 2]}, { Rational[2116, 2401], Rational[23, 49] 2^Rational[1, 2], Rational[23, 49] 3^Rational[1, 2]}, { Rational[2116, 2401], Rational[23, 49] (-1 + 3^Rational[1, 2]), Rational[23, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2116, 2401], 0, Rational[46, 49]}, { Rational[2116, 2401], Rational[-23, 49] (-1 + 3^Rational[1, 2]), Rational[23, 49] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[-23, 49] 2^Rational[1, 2], Rational[23, 49] 3^Rational[1, 2]}, { Rational[2116, 2401], Rational[-46, 49], Rational[23, 49] 2^Rational[1, 2]}, { Rational[2116, 2401], Rational[-23, 49] 6^Rational[1, 2], Rational[ 23, 49]}, { Rational[2116, 2401], Rational[-23, 49] (1 + 3^Rational[1, 2]), Rational[23, 49] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2116, 2401], Rational[-46, 49] 2^Rational[1, 2], 0}, { Rational[2209, 2401], Rational[-47, 49] 2^Rational[1, 2], 0}, { Rational[2209, 2401], Rational[-47, 98] (1 + 3^Rational[1, 2]), Rational[-47, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[-47, 49] Rational[3, 2]^Rational[1, 2], Rational[-47, 98]}, { Rational[2209, 2401], Rational[-47, 49], Rational[-47, 49] 2^Rational[-1, 2]}, { Rational[2209, 2401], Rational[-47, 49] 2^Rational[-1, 2], Rational[-47, 98] 3^Rational[1, 2]}, { Rational[2209, 2401], Rational[-47, 98] (-1 + 3^Rational[1, 2]), Rational[-47, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2209, 2401], 0, Rational[-47, 49]}, { Rational[2209, 2401], Rational[47, 98] (-1 + 3^Rational[1, 2]), Rational[-47, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[47, 49] 2^Rational[-1, 2], Rational[-47, 98] 3^Rational[1, 2]}, { Rational[2209, 2401], Rational[47, 49], Rational[-47, 49] 2^Rational[-1, 2]}, { Rational[2209, 2401], Rational[47, 49] Rational[3, 2]^Rational[1, 2], Rational[-47, 98]}, { Rational[2209, 2401], Rational[47, 98] (1 + 3^Rational[1, 2]), Rational[-47, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[47, 49] 2^Rational[1, 2], 0}, { Rational[2209, 2401], Rational[47, 98] (1 + 3^Rational[1, 2]), Rational[47, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[47, 49] Rational[3, 2]^Rational[1, 2], Rational[47, 98]}, { Rational[2209, 2401], Rational[47, 49], Rational[47, 49] 2^Rational[-1, 2]}, { Rational[2209, 2401], Rational[47, 49] 2^Rational[-1, 2], Rational[47, 98] 3^Rational[1, 2]}, { Rational[2209, 2401], Rational[47, 98] (-1 + 3^Rational[1, 2]), Rational[47, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2209, 2401], 0, Rational[47, 49]}, { Rational[2209, 2401], Rational[-47, 98] (-1 + 3^Rational[1, 2]), Rational[47, 98] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[-47, 49] 2^Rational[-1, 2], Rational[47, 98] 3^Rational[1, 2]}, { Rational[2209, 2401], Rational[-47, 49], Rational[47, 49] 2^Rational[-1, 2]}, { Rational[2209, 2401], Rational[-47, 49] Rational[3, 2]^Rational[1, 2], Rational[47, 98]}, { Rational[2209, 2401], Rational[-47, 98] (1 + 3^Rational[1, 2]), Rational[47, 98] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2209, 2401], Rational[-47, 49] 2^Rational[1, 2], 0}, { Rational[2304, 2401], Rational[-48, 49] 2^Rational[1, 2], 0}, { Rational[2304, 2401], Rational[-24, 49] (1 + 3^Rational[1, 2]), Rational[-12, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[-24, 49] 6^Rational[1, 2], Rational[-24, 49]}, { Rational[2304, 2401], Rational[-48, 49], Rational[-24, 49] 2^Rational[1, 2]}, { Rational[2304, 2401], Rational[-24, 49] 2^Rational[1, 2], Rational[-24, 49] 3^Rational[1, 2]}, { Rational[2304, 2401], Rational[-24, 49] (-1 + 3^Rational[1, 2]), Rational[-12, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[2304, 2401], 0, Rational[-48, 49]}, { Rational[2304, 2401], Rational[24, 49] (-1 + 3^Rational[1, 2]), Rational[-12, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[24, 49] 2^Rational[1, 2], Rational[-24, 49] 3^Rational[1, 2]}, { Rational[2304, 2401], Rational[48, 49], Rational[-24, 49] 2^Rational[1, 2]}, { Rational[2304, 2401], Rational[24, 49] 6^Rational[1, 2], Rational[-24, 49]}, { Rational[2304, 2401], Rational[24, 49] (1 + 3^Rational[1, 2]), Rational[-12, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[48, 49] 2^Rational[1, 2], 0}, { Rational[2304, 2401], Rational[24, 49] (1 + 3^Rational[1, 2]), Rational[12, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[24, 49] 6^Rational[1, 2], Rational[ 24, 49]}, { Rational[2304, 2401], Rational[48, 49], Rational[24, 49] 2^Rational[1, 2]}, { Rational[2304, 2401], Rational[24, 49] 2^Rational[1, 2], Rational[24, 49] 3^Rational[1, 2]}, { Rational[2304, 2401], Rational[24, 49] (-1 + 3^Rational[1, 2]), Rational[12, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[2304, 2401], 0, Rational[48, 49]}, { Rational[2304, 2401], Rational[-24, 49] (-1 + 3^Rational[1, 2]), Rational[12, 49] 2^Rational[1, 2] (1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[-24, 49] 2^Rational[1, 2], Rational[24, 49] 3^Rational[1, 2]}, { Rational[2304, 2401], Rational[-48, 49], Rational[24, 49] 2^Rational[1, 2]}, { Rational[2304, 2401], Rational[-24, 49] 6^Rational[1, 2], Rational[ 24, 49]}, { Rational[2304, 2401], Rational[-24, 49] (1 + 3^Rational[1, 2]), Rational[12, 49] 2^Rational[1, 2] (-1 + 3^Rational[1, 2])}, { Rational[2304, 2401], Rational[-48, 49] 2^Rational[1, 2], 0}, { 1, -2^Rational[1, 2], 0}, { 1, Rational[1, 2] (-1 - 3^Rational[1, 2]), Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { 1, -Rational[3, 2]^Rational[1, 2], Rational[-1, 2]}, { 1, -1, -2^Rational[-1, 2]}, { 1, -2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { 1, Rational[1, 2] (1 - 3^Rational[1, 2]), Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {1, 0, -1}, { 1, Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[-1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { 1, 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { 1, 1, -2^Rational[-1, 2]}, { 1, Rational[3, 2]^Rational[1, 2], Rational[-1, 2]}, { 1, Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[-1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { 1, 2^Rational[1, 2], 0}, { 1, Rational[1, 2] (1 + 3^Rational[1, 2]), Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { 1, Rational[3, 2]^Rational[1, 2], Rational[1, 2]}, { 1, 1, 2^Rational[-1, 2]}, { 1, 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { 1, Rational[1, 2] (-1 + 3^Rational[1, 2]), Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, {1, 0, 1}, { 1, Rational[1, 2] (1 - 3^Rational[1, 2]), Rational[1, 2] 2^Rational[-1, 2] (1 + 3^Rational[1, 2])}, { 1, -2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { 1, -1, 2^Rational[-1, 2]}, { 1, -Rational[3, 2]^Rational[1, 2], Rational[1, 2]}, { 1, Rational[1, 2] (-1 - 3^Rational[1, 2]), Rational[1, 2] 2^Rational[-1, 2] (-1 + 3^Rational[1, 2])}, { 1, -2^Rational[1, 2], 0}}, {{0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, {0, 0, 0}, { 0.00041649312786339027`, -0.028861501272920306`, 0}, { 0.00041649312786339027`, -0.02787806946498854, \ -0.005282021328622871}, { 0.00041649312786339027`, -0.024994793293705894`, \ 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12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[11, 24] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[-1, 4] Pi, Rational[55, 144] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[11, 36] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[11, 48] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[11, 72] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[11, 144] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, 0}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-11, 144] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-11, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-7, 12] Pi, Rational[-11, 48] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-11, 36] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-55, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-11, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-3, 4] Pi, Rational[-77, 144] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-19, 24] Pi, Rational[-11, 18] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-5, 6] Pi, Rational[-11, 16] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-7, 8] Pi, Rational[-55, 72] Pi^2}, { 0, Rational[-11, 12] Pi, Rational[-121, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-23, 24] Pi, Rational[-11, 12] Pi^2}, { Rational[-11, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[5, 6] Pi^2}, { Rational[-7, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[55, 72] Pi^2}, { Rational[-5, 3] 2^Rational[-1, 2] Pi, 0, Rational[25, 36] Pi^2}, { Rational[-19, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 8] Pi^2}, { Rational[-3, 2] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[5, 9] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[35, 72] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 12] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[25, 72] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[5, 18] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[5, 24] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[5, 36] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[5, 72] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, 0}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-1, 2] Pi, Rational[-5, 36] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-5, 18] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-25, 72] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-5, 12] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-35, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-3, 4] Pi, Rational[-5, 9] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-19, 24] Pi, Rational[-5, 8] Pi^2}, { 0, Rational[-5, 6] Pi, Rational[-25, 36] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-7, 8] Pi, Rational[-55, 72] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-11, 12] Pi, Rational[-5, 6] Pi^2}, { Rational[-7, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[3, 4] Pi^2}, { Rational[-5, 3] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[11, 16] Pi^2}, { Rational[-19, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 8] Pi^2}, { Rational[-3, 2] 2^Rational[-1, 2] Pi, 0, Rational[9, 16] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 2] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[-1, 12] Pi, Rational[7, 16] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[3, 8] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 16] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 4] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[3, 16] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[1, 8] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[1, 16] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, 0}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 16] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-1, 8] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-3, 16] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-1, 4] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-5, 16] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-3, 8] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-7, 16] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-1, 2] Pi^2}, { 0, Rational[-3, 4] Pi, Rational[-9, 16] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-19, 24] Pi, Rational[-5, 8] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-5, 6] Pi, Rational[-11, 16] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-7, 8] Pi, Rational[-3, 4] Pi^2}, { Rational[-5, 3] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[2, 3] Pi^2}, { Rational[-19, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[11, 18] Pi^2}, { Rational[-3, 2] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[5, 9] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 2] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, 0, Rational[4, 9] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[7, 18] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 3] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[5, 18] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[2, 9] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 6] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[1, 9] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[1, 18] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-1, 3] Pi, 0}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-1, 18] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 9] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-1, 6] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-2, 9] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-5, 18] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-1, 3] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-7, 18] Pi^2}, { 0, Rational[-2, 3] Pi, Rational[-4, 9] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-1, 2] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-3, 4] Pi, Rational[-5, 9] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-19, 24] Pi, Rational[-11, 18] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-5, 6] Pi, Rational[-2, 3] Pi^2}, { Rational[-19, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[7, 12] Pi^2}, { Rational[-3, 2] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[77, 144] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[35, 72] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[1, 12] Pi, Rational[7, 16] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[7, 18] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, 0, Rational[49, 144] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[7, 24] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[35, 144] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[7, 36] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[7, 48] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[7, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-1, 4] Pi, Rational[7, 144] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, 0}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-7, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-7, 72] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-7, 48] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-7, 36] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-35, 144] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-7, 24] Pi^2}, { 0, Rational[-7, 12] Pi, Rational[-49, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-7, 18] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-7, 16] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-35, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-3, 4] Pi, Rational[-77, 144] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-19, 24] Pi, Rational[-7, 12] Pi^2}, { Rational[-3, 2] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[1, 2] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[11, 24] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[1, 6] Pi, Rational[5, 12] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[3, 8] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 3] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[7, 24] Pi^2}, {-2^Rational[-1, 2] Pi, 0, Rational[1, 4] Pi^2}, {Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 24] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 6] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[1, 8] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-1, 6] Pi, Rational[1, 12] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 24] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, 0}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-1, 12] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-1, 8] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-5, 24] Pi^2}, { 0, Rational[-1, 2] Pi, Rational[-1, 4] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-7, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-1, 3] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-3, 8] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-5, 12] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-11, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-3, 4] Pi, Rational[-1, 2] Pi^2}, { Rational[-17, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[5, 12] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[1, 4] Pi, Rational[55, 144] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[25, 72] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[5, 16] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[5, 18] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[35, 144] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 24] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, 0, Rational[25, 144] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 36] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[-1, 12] Pi, Rational[5, 48] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[5, 72] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, 0}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[-5, 144] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-5, 48] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-5, 36] Pi^2}, { 0, Rational[-5, 12] Pi, Rational[-25, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-35, 144] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-5, 18] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-5, 16] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-25, 72] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-2, 3] Pi, Rational[-55, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-17, 24] Pi, Rational[-5, 12] Pi^2}, { Rational[-2, 3] 2^Rational[1, 2] Pi, Rational[1, 3] Pi, Rational[1, 3] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[11, 36] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[5, 18] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 4] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[2, 9] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[7, 36] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 6] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 36] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, 0, Rational[1, 9] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 12] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 18] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[1, 36] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, 0}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[-1, 36] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[-1, 18] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-1, 12] Pi^2}, { 0, Rational[-1, 3] Pi, Rational[-1, 9] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-5, 36] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-7, 36] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-2, 9] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-1, 4] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-5, 18] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-11, 36] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-2, 3] Pi, Rational[-1, 3] Pi^2}, { Rational[-5, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[1, 4] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[11, 48] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[5, 24] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[3, 16] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 6] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[7, 48] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[1, 8] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[1, 12] Pi, Rational[5, 48] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 12] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, 0, Rational[1, 16] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 48] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, 0}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[-1, 48] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[-1, 24] Pi^2}, { 0, Rational[-1, 4] Pi, Rational[-1, 16] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-1, 12] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-5, 48] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-1, 8] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-7, 48] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-1, 6] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-3, 16] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-7, 12] Pi, Rational[-11, 48] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-5, 8] Pi, Rational[-1, 4] Pi^2}, { Rational[-7, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[1, 6] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[11, 72] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[5, 36] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[1, 8] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[1, 9] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[7, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[1, 6] Pi, Rational[1, 12] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[5, 72] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 18] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, 0, Rational[1, 36] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, 0}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[-1, 72] Pi^2}, { 0, Rational[-1, 6] Pi, Rational[-1, 36] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[-1, 18] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-1, 12] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-7, 72] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 9] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-1, 8] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-1, 2] Pi, Rational[-5, 36] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-11, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-7, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[-13, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[1, 12] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[11, 144] Pi^2}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[5, 72] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[1, 16] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[1, 18] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[1, 4] Pi, Rational[7, 144] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 24] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[5, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[1, 36] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 48] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, 0, Rational[1, 144] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, 0}, { 0, Rational[-1, 12] Pi, Rational[-1, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[-1, 72] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[-1, 48] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[-1, 36] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[-5, 144] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[-7, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[-1, 18] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-5, 12] Pi, Rational[-1, 16] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, Rational[-11, 144] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-13, 24] Pi, Rational[-1, 12] Pi^2}, {-2^Rational[-1, 2] Pi, Rational[1, 2] Pi, 0}, {Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, 0}, {Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, 0}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, 0}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[1, 3] Pi, 0}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, 0}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, 0}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, 0}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, 0}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, 0}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, 0}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, 0}, {0, 0, 0}, {Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, 0}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, 0}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, 0}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, 0}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, 0}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, 0}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, 0}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-1, 3] Pi, 0}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, 0}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, 0}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, 0}, { 2^Rational[-1, 2] Pi, Rational[-1, 2] Pi, 0}, { Rational[-11, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-1, 12] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-11, 144] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 16] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-1, 18] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-7, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[-5, 144] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[-1, 36] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[-1, 48] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[-1, 72] Pi^2}, { 0, Rational[1, 12] Pi, Rational[-1, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, 0}, { Rational[1, 6] 2^Rational[-1, 2] Pi, 0, Rational[1, 144] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 48] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[1, 36] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 24] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-1, 4] Pi, Rational[7, 144] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[1, 18] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[1, 16] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[5, 72] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[11, 144] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-11, 24] Pi, Rational[1, 12] Pi^2}, { Rational[-5, 6] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-11, 72] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[1, 2] Pi, Rational[-5, 36] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-1, 8] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 9] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-7, 72] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-1, 12] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[-1, 18] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[-1, 24] Pi^2}, { 0, Rational[1, 6] Pi, Rational[-1, 36] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[-1, 72] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, 0}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, 0, Rational[1, 36] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 18] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[5, 72] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-1, 6] Pi, Rational[1, 12] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[7, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[1, 9] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[1, 8] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[5, 36] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[11, 72] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[-5, 12] Pi, Rational[1, 6] Pi^2}, { Rational[-3, 4] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-1, 4] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[7, 12] Pi, Rational[-11, 48] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-3, 16] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-1, 6] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-7, 48] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-1, 8] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-5, 48] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-1, 12] Pi^2}, { 0, Rational[1, 4] Pi, Rational[-1, 16] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[-1, 48] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, 0}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 48] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, 0, Rational[1, 16] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 12] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[-1, 12] Pi, Rational[5, 48] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[1, 8] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[7, 48] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 6] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[3, 16] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[5, 24] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 3] Pi, Rational[11, 48] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[-3, 8] Pi, Rational[1, 4] Pi^2}, { Rational[-1, 3] 2^Rational[1, 2] Pi, Rational[2, 3] Pi, Rational[-1, 3] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-11, 36] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-5, 18] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-1, 4] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-2, 9] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-7, 36] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-5, 36] Pi^2}, { 0, Rational[1, 3] Pi, Rational[-1, 9] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-1, 12] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[-1, 18] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[-1, 36] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, 0}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[1, 36] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 18] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 12] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, 0, Rational[1, 9] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 36] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 6] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[7, 36] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[2, 9] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[1, 4] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[5, 18] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[11, 36] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[-1, 3] Pi, Rational[1, 3] Pi^2}, { Rational[-7, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-5, 12] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-55, 144] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-25, 72] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-5, 16] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-5, 18] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-35, 144] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-5, 24] Pi^2}, { 0, Rational[5, 12] Pi, Rational[-25, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-5, 36] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-5, 48] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[-5, 144] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, 0}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[5, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[5, 72] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[1, 12] Pi, Rational[5, 48] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 36] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, 0, Rational[25, 144] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 24] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[35, 144] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[5, 18] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 16] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[25, 72] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[-1, 4] Pi, Rational[55, 144] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[-7, 24] Pi, Rational[5, 12] Pi^2}, { Rational[-1, 2] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-1, 2] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-11, 24] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-5, 12] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-3, 8] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-1, 3] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-7, 24] Pi^2}, { 0, Rational[1, 2] Pi, Rational[-1, 4] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-1, 8] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-1, 12] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[-1, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, 0}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 24] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[1, 6] Pi, Rational[1, 12] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[1, 8] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 6] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 24] Pi^2}, { 2^Rational[-1, 2] Pi, 0, Rational[1, 4] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[7, 24] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[1, 3] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[3, 8] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[-1, 6] Pi, Rational[5, 12] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[11, 24] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[-1, 4] Pi, Rational[1, 2] Pi^2}, { Rational[-5, 12] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-7, 12] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-77, 144] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-35, 72] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-7, 16] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-7, 18] Pi^2}, { 0, Rational[7, 12] Pi, Rational[-49, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-7, 24] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-35, 144] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-7, 36] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-7, 48] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-7, 72] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[-7, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, 0}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[1, 4] Pi, Rational[7, 144] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[7, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[7, 48] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[7, 36] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[35, 144] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[7, 24] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, 0, Rational[49, 144] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[7, 18] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[-1, 12] Pi, Rational[7, 16] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[35, 72] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[77, 144] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[-5, 24] Pi, Rational[7, 12] Pi^2}, { Rational[-1, 3] 2^Rational[-1, 2] Pi, Rational[5, 6] Pi, Rational[-2, 3] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-11, 18] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-5, 9] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-1, 2] Pi^2}, { 0, Rational[2, 3] Pi, Rational[-4, 9] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-7, 18] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-1, 3] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-5, 18] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-2, 9] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-1, 6] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 9] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[-1, 18] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[1, 3] Pi, 0}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[1, 18] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[1, 9] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 6] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[2, 9] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[5, 18] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[1, 3] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[7, 18] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, 0, Rational[4, 9] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[1, 2] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[5, 9] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[11, 18] Pi^2}, { Rational[5, 3] 2^Rational[-1, 2] Pi, Rational[-1, 6] Pi, Rational[2, 3] Pi^2}, { Rational[-1, 4] 2^Rational[-1, 2] Pi, Rational[7, 8] Pi, Rational[-3, 4] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[5, 6] Pi, Rational[-11, 16] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-5, 8] Pi^2}, { 0, Rational[3, 4] Pi, Rational[-9, 16] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-1, 2] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-7, 16] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-3, 8] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-5, 16] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-1, 4] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-3, 16] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-1, 8] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[5, 12] Pi, Rational[-1, 16] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, 0}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[1, 16] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[1, 8] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[3, 16] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[1, 4] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[5, 16] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[3, 8] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[1, 12] Pi, Rational[7, 16] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[1, 2] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, 0, Rational[9, 16] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[5, 8] Pi^2}, { Rational[5, 3] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[11, 16] Pi^2}, { Rational[7, 4] 2^Rational[-1, 2] Pi, Rational[-1, 8] Pi, Rational[3, 4] Pi^2}, { Rational[-1, 6] 2^Rational[-1, 2] Pi, Rational[11, 12] Pi, Rational[-5, 6] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[7, 8] Pi, Rational[-55, 72] Pi^2}, { 0, Rational[5, 6] Pi, Rational[-25, 36] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-5, 8] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-5, 9] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-35, 72] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-5, 12] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-25, 72] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-5, 18] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-5, 24] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[1, 2] Pi, Rational[-5, 36] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[-5, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, 0}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[5, 72] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[5, 36] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[5, 24] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[5, 18] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[25, 72] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[1, 6] Pi, Rational[5, 12] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[35, 72] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[5, 9] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[5, 8] Pi^2}, { Rational[5, 3] 2^Rational[-1, 2] Pi, 0, Rational[25, 36] Pi^2}, { Rational[7, 4] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[55, 72] Pi^2}, { Rational[11, 6] 2^Rational[-1, 2] Pi, Rational[-1, 12] Pi, Rational[5, 6] Pi^2}, { Rational[-1, 12] 2^Rational[-1, 2] Pi, Rational[23, 24] Pi, Rational[-11, 12] Pi^2}, { 0, Rational[11, 12] Pi, Rational[-121, 144] Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[7, 8] Pi, Rational[-55, 72] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[5, 6] Pi, Rational[-11, 16] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-11, 18] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-77, 144] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-11, 24] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[2, 3] Pi, Rational[-55, 144] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-11, 36] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[7, 12] Pi, Rational[-11, 48] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-11, 72] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, Rational[-11, 144] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, 0}, { 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[11, 144] Pi^2}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[11, 72] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[1, 3] Pi, Rational[11, 48] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[11, 36] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[1, 4] Pi, Rational[55, 144] Pi^2}, { Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[11, 24] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[77, 144] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[11, 18] Pi^2}, { Rational[5, 3] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[11, 16] Pi^2}, { Rational[7, 4] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[55, 72] Pi^2}, { Rational[11, 6] 2^Rational[-1, 2] Pi, 0, Rational[121, 144] Pi^2}, { Rational[23, 12] 2^Rational[-1, 2] Pi, Rational[-1, 24] Pi, Rational[11, 12] Pi^2}, {0, Pi, -Pi^2}, { Rational[1, 12] 2^Rational[-1, 2] Pi, Rational[23, 24] Pi, Rational[-11, 12] Pi^2}, { Rational[1, 6] 2^Rational[-1, 2] Pi, Rational[11, 12] Pi, Rational[-5, 6] Pi^2}, { Rational[1, 4] 2^Rational[-1, 2] Pi, Rational[7, 8] Pi, Rational[-3, 4] Pi^2}, { Rational[1, 3] 2^Rational[-1, 2] Pi, Rational[5, 6] Pi, Rational[-2, 3] Pi^2}, { Rational[5, 12] 2^Rational[-1, 2] Pi, Rational[19, 24] Pi, Rational[-7, 12] Pi^2}, { Rational[1, 2] 2^Rational[-1, 2] Pi, Rational[3, 4] Pi, Rational[-1, 2] Pi^2}, { Rational[7, 12] 2^Rational[-1, 2] Pi, Rational[17, 24] Pi, Rational[-5, 12] Pi^2}, { Rational[1, 3] 2^Rational[1, 2] Pi, Rational[2, 3] Pi, Rational[-1, 3] Pi^2}, { Rational[3, 4] 2^Rational[-1, 2] Pi, Rational[5, 8] Pi, Rational[-1, 4] Pi^2}, { Rational[5, 6] 2^Rational[-1, 2] Pi, Rational[7, 12] Pi, Rational[-1, 6] Pi^2}, { Rational[11, 12] 2^Rational[-1, 2] Pi, Rational[13, 24] Pi, Rational[-1, 12] Pi^2}, { 2^Rational[-1, 2] Pi, Rational[1, 2] Pi, 0}, { Rational[13, 12] 2^Rational[-1, 2] Pi, Rational[11, 24] Pi, Rational[1, 12] Pi^2}, { Rational[7, 6] 2^Rational[-1, 2] Pi, Rational[5, 12] Pi, Rational[1, 6] Pi^2}, { Rational[5, 4] 2^Rational[-1, 2] Pi, Rational[3, 8] Pi, Rational[1, 4] Pi^2}, { Rational[2, 3] 2^Rational[1, 2] Pi, Rational[1, 3] Pi, Rational[1, 3] Pi^2}, {Rational[17, 12] 2^Rational[-1, 2] Pi, Rational[7, 24] Pi, Rational[5, 12] Pi^2}, { Rational[3, 2] 2^Rational[-1, 2] Pi, Rational[1, 4] Pi, Rational[1, 2] Pi^2}, { Rational[19, 12] 2^Rational[-1, 2] Pi, Rational[5, 24] Pi, Rational[7, 12] Pi^2}, { Rational[5, 3] 2^Rational[-1, 2] Pi, Rational[1, 6] Pi, Rational[2, 3] Pi^2}, { Rational[7, 4] 2^Rational[-1, 2] Pi, Rational[1, 8] Pi, Rational[3, 4] Pi^2}, { Rational[11, 6] 2^Rational[-1, 2] Pi, Rational[1, 12] Pi, Rational[5, 6] Pi^2}, { Rational[23, 12] 2^Rational[-1, 2] Pi, Rational[1, 24] Pi, Rational[11, 12] Pi^2}, { 2^Rational[1, 2] Pi, 0, Pi^2}}, {{-4.442882938158366, 0, 9.869604401089358}, {-4.2577628157351, -0.1308996938995747, 9.047137367665245}, {-4.072642693311835, -0.2617993877991494, 8.224670334241132}, {-3.8875225708885695`, -0.39269908169872414`, 7.4022033008170185`}, {-3.702402448465305, -0.5235987755982988, 6.579736267392905}, {-3.5172823260420394`, -0.6544984694978736, 5.757269233968793}, {-3.332162203618774, -0.7853981633974483, 4.934802200544679}, {-3.1470420811955093`, -0.9162978572970231, 4.112335167120566}, {-2.961921958772244, -1.0471975511965976`, 3.2898681336964524`}, {-2.7768018363489784`, -1.1780972450961724`, 2.4674011002723395`}, {-2.5916817139257136`, -1.3089969389957472`, 1.6449340668482262`}, {-2.406561591502448, -1.4398966328953218`, 0.8224670334241131}, {-2.221441469079183, -1.5707963267948966`, 0}, {-2.0363213466559174`, -1.7016960206944711`, \ -0.8224670334241131}, {-1.8512012242326525`, -1.8325957145940461`, \ -1.6449340668482262`}, {-1.666081101809387, -1.9634954084936207`, \ -2.4674011002723395`}, {-1.480960979386122, -2.0943951023931953`, \ -3.2898681336964524`}, {-1.2958408569628568`, -2.2252947962927703`, \ -4.112335167120566}, {-1.1107207345395915`, -2.356194490192345, \ -4.934802200544679}, {-0.9256006121163263, -2.4870941840919194`, \ -5.757269233968793}, {-0.7404804896930609, -2.6179938779914944`, \ -6.579736267392905}, {-0.5553603672697958, -2.748893571891069, \ -7.4022033008170185`}, {-0.37024024484653045`, -2.8797932657906435`, \ -8.224670334241132}, {-0.18512012242326523`, -3.0106929596902186`, \ -9.047137367665245}, { 0, -3.141592653589793, -9.869604401089358}, {-4.2577628157351, 0.1308996938995747, 9.047137367665245}, {-4.072642693311835, 0, 8.29320925369314}, {-3.8875225708885695`, -0.1308996938995747, 7.539281139721037}, {-3.702402448465305, -0.2617993877991494, 6.785353025748933}, {-3.5172823260420394`, -0.39269908169872414`, 6.03142491177683}, {-3.332162203618774, -0.5235987755982988, 5.2774967978047265`}, {-3.1470420811955093`, -0.6544984694978736, 4.523568683832623}, {-2.961921958772244, -0.7853981633974483, 3.7696405698605187`}, {-2.7768018363489784`, -0.9162978572970231, 3.015712455888415}, {-2.5916817139257136`, -1.0471975511965976`, 2.2617843419163113`}, {-2.406561591502448, -1.1780972450961724`, 1.5078562279442076`}, {-2.221441469079183, -1.3089969389957472`, 0.7539281139721038}, {-2.0363213466559174`, -1.4398966328953218`, 0}, {-1.8512012242326525`, -1.5707963267948966`, \ -0.7539281139721038}, {-1.666081101809387, -1.7016960206944711`, \ -1.5078562279442076`}, {-1.480960979386122, -1.8325957145940461`, \ -2.2617843419163113`}, {-1.2958408569628568`, -1.9634954084936207`, \ -3.015712455888415}, {-1.1107207345395915`, -2.0943951023931953`, \ -3.7696405698605187`}, {-0.9256006121163263, -2.2252947962927703`, \ -4.523568683832623}, {-0.7404804896930609, -2.356194490192345, \ -5.2774967978047265`}, {-0.5553603672697958, -2.4870941840919194`, \ -6.03142491177683}, {-0.37024024484653045`, -2.6179938779914944`, \ -6.785353025748933}, {-0.18512012242326523`, -2.748893571891069, \ -7.539281139721037}, {0, -2.8797932657906435`, -8.29320925369314}, { 0.18512012242326523`, -3.0106929596902186`, -9.047137367665245}, \ {-4.072642693311835, 0.2617993877991494, 8.224670334241132}, {-3.8875225708885695`, 0.1308996938995747, 7.539281139721037}, {-3.702402448465305, 0, 6.853891945200943}, {-3.5172823260420394`, -0.1308996938995747, 6.168502750680849}, {-3.332162203618774, -0.2617993877991494, 5.483113556160754}, {-3.1470420811955093`, -0.39269908169872414`, 4.79772436164066}, {-2.961921958772244, -0.5235987755982988, 4.112335167120566}, {-2.7768018363489784`, -0.6544984694978736, 3.4269459726004716`}, {-2.5916817139257136`, -0.7853981633974483, 2.741556778080377}, {-2.406561591502448, -0.9162978572970231, 2.056167583560283}, {-2.221441469079183, -1.0471975511965976`, 1.3707783890401886`}, {-2.0363213466559174`, -1.1780972450961724`, 0.6853891945200943}, {-1.8512012242326525`, -1.3089969389957472`, 0}, {-1.666081101809387, -1.4398966328953218`, -0.6853891945200943}, \ {-1.480960979386122, -1.5707963267948966`, -1.3707783890401886`}, \ {-1.2958408569628568`, -1.7016960206944711`, -2.056167583560283}, \ {-1.1107207345395915`, -1.8325957145940461`, -2.741556778080377}, \ {-0.9256006121163263, -1.9634954084936207`, -3.4269459726004716`}, \ {-0.7404804896930609, -2.0943951023931953`, -4.112335167120566}, \ {-0.5553603672697958, -2.2252947962927703`, -4.79772436164066}, \ {-0.37024024484653045`, -2.356194490192345, -5.483113556160754}, \ {-0.18512012242326523`, -2.4870941840919194`, -6.168502750680849}, { 0, -2.6179938779914944`, -6.853891945200943}, { 0.18512012242326523`, -2.748893571891069, -7.539281139721037}, { 0.37024024484653045`, -2.8797932657906435`, -8.224670334241132}, \ {-3.8875225708885695`, 0.39269908169872414`, 7.4022033008170185`}, 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{Rational[-5273, 3752], Rational[-3705, 3752] 2^Rational[-1, 2], -Pi}, { Rational[-5273, 3752], Rational[-3705, 3752] 2^Rational[-1, 2], Pi}, {Rational[-61133, 44492], Rational[-41925, 44492] 2^Rational[-1, 2], -Pi}, { Rational[-61133, 44492], Rational[-41925, 44492] 2^Rational[-1, 2], Pi}, {Rational[-231137, 172088], Rational[-154305, 172088] 2^Rational[-1, 2], -Pi}, { Rational[-231137, 172088], Rational[-154305, 172088] 2^Rational[-1, 2], Pi}, { Rational[-13637, 10388], Rational[-8835, 10388] 2^Rational[-1, 2], - Pi}, {Rational[-13637, 10388], Rational[-8835, 10388] 2^Rational[-1, 2], Pi}, { Rational[-205697, 160328], Rational[-128865, 160328] 2^Rational[-1, 2], -Pi}, { Rational[-205697, 160328], Rational[-128865, 160328] 2^Rational[-1, 2], Pi}, { Rational[-48413, 38612], Rational[-29205, 38612] 2^Rational[-1, 2], - Pi}, {Rational[-48413, 38612], Rational[-29205, 38612] 2^Rational[-1, 2], Pi}, { Rational[-182057, 148568], Rational[-105225, 148568] 2^Rational[-1, 2], -Pi}, { Rational[-182057, 148568], Rational[-105225, 148568] 2^Rational[-1, 2], Pi}, { Rational[-109, 91], Rational[-30, 91] 2^Rational[1, 2], -Pi}, { Rational[-109, 91], Rational[-30, 91] 2^Rational[1, 2], Pi}, { Rational[-160217, 136808], Rational[-83385, 136808] 2^Rational[-1, 2], -Pi}, { Rational[-160217, 136808], Rational[-83385, 136808] 2^Rational[-1, 2], Pi}, { Rational[-37493, 32732], Rational[-18285, 32732] 2^Rational[-1, 2], - Pi}, {Rational[-37493, 32732], Rational[-18285, 32732] 2^Rational[-1, 2], Pi}, { Rational[-140177, 125048], Rational[-63345, 125048] 2^Rational[-1, 2], -Pi}, { Rational[-140177, 125048], Rational[-63345, 125048] 2^Rational[-1, 2], Pi}, { Rational[-8177, 7448], Rational[-3375, 7448] 2^Rational[-1, 2], - Pi}, {Rational[-8177, 7448], Rational[-3375, 7448] 2^Rational[-1, 2], Pi}, { Rational[-121937, 113288], Rational[-45105, 113288] 2^Rational[-1, 2], -Pi}, { Rational[-121937, 113288], Rational[-45105, 113288] 2^Rational[-1, 2], Pi}, { Rational[-28373, 26852], 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Rational[-66977, 66248], Rational[9855, 66248] 2^Rational[-1, 2], - Pi}, {Rational[-66977, 66248], Rational[9855, 66248] 2^Rational[-1, 2], Pi}, { Rational[-317, 308], Rational[75, 308] 2^Rational[-1, 2], -Pi}, { Rational[-317, 308], Rational[75, 308] 2^Rational[-1, 2], Pi}, { Rational[-57737, 54488], Rational[19095, 54488] 2^Rational[-1, 2], - Pi}, {Rational[-57737, 54488], Rational[19095, 54488] 2^Rational[-1, 2], Pi}, { Rational[-1681, 1519], Rational[360, 1519] 2^Rational[1, 2], -Pi}, { Rational[-1681, 1519], Rational[360, 1519] 2^Rational[1, 2], Pi}, { Rational[-50297, 42728], Rational[26535, 42728] 2^Rational[-1, 2], - Pi}, {Rational[-50297, 42728], Rational[26535, 42728] 2^Rational[-1, 2], Pi}, { Rational[-11813, 9212], Rational[7395, 9212] 2^Rational[-1, 2], - Pi}, {Rational[-11813, 9212], Rational[7395, 9212] 2^Rational[-1, 2], Pi}, { Rational[-44657, 30968], Rational[32175, 30968] 2^Rational[-1, 2], - Pi}, {Rational[-44657, 30968], Rational[32175, 30968] 2^Rational[-1, 2], 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{Rational[78017, 78008], Rational[1185, 78008] 2^Rational[-1, 2], Pi}, { Rational[21053, 20972], Rational[1845, 20972] 2^Rational[-1, 2], - Pi}, {Rational[21053, 20972], Rational[1845, 20972] 2^Rational[-1, 2], Pi}, { Rational[90857, 89768], Rational[14025, 89768] 2^Rational[-1, 2], - Pi}, {Rational[90857, 89768], Rational[14025, 89768] 2^Rational[-1, 2], Pi}, { Rational[3061, 2989], Rational[330, 2989] 2^Rational[1, 2], -Pi}, { Rational[3061, 2989], Rational[330, 2989] 2^Rational[1, 2], Pi}, { Rational[2153, 2072], Rational[585, 2072] 2^Rational[-1, 2], -Pi}, { Rational[2153, 2072], Rational[585, 2072] 2^Rational[-1, 2], Pi}, { Rational[28373, 26852], Rational[9165, 26852] 2^Rational[-1, 2], - Pi}, {Rational[28373, 26852], Rational[9165, 26852] 2^Rational[-1, 2], Pi}, { Rational[121937, 113288], Rational[45105, 113288] 2^Rational[-1, 2], -Pi}, { Rational[121937, 113288], Rational[45105, 113288] 2^Rational[-1, 2], Pi}, {Rational[8177, 7448], Rational[3375, 7448] 2^Rational[-1, 2], 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Rational[56445, 50372] 2^Rational[-1, 2], -Pi}, { Rational[75653, 50372], Rational[56445, 50372] 2^Rational[-1, 2], Pi}, {Rational[318257, 207368], Rational[241425, 207368] 2^Rational[-1, 2], -Pi}, { Rational[318257, 207368], Rational[241425, 207368] 2^Rational[-1, 2], Pi}, {Rational[20897, 13328], Rational[16095, 13328] 2^Rational[-1, 2], -Pi}, { Rational[20897, 13328], Rational[16095, 13328] 2^Rational[-1, 2], Pi}, {Rational[350897, 219128], Rational[274065, 219128] 2^Rational[-1, 2], -Pi}, { Rational[350897, 219128], Rational[274065, 219128] 2^Rational[-1, 2], Pi}, {Rational[1877, 1148], Rational[1485, 1148] 2^Rational[-1, 2], -Pi}, { Rational[1877, 1148], Rational[1485, 1148] 2^Rational[-1, 2], Pi}, { Rational[385337, 230888], Rational[308505, 230888] 2^Rational[-1, 2], -Pi}, { Rational[385337, 230888], Rational[308505, 230888] 2^Rational[-1, 2], Pi}, {Rational[12601, 7399], Rational[5100, 7399] 2^Rational[1, 2], -Pi}, { Rational[12601, 7399], Rational[5100, 7399] 2^Rational[1, 2], 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The ten coordinates of the quadric are kept in list \ ls. The second coordinate is replaced by 0 and the function CQuadric applied \ to the new list rs so that it detects the new type of quadric.\ \>", "Text", CellChangeTimes->{{3.614172699658766*^9, 3.614172733897461*^9}, { 3.6141728581622066`*^9, 3.6141730284205017`*^9}, {3.614332182079842*^9, 3.61433218321257*^9}, 3.614424399819787*^9, {3.614424452637507*^9, 3.6144244846683893`*^9}}], Cell[CellGroupData[{ Cell[BoxData[{ RowBox[{ RowBox[{"ls", "=", RowBox[{"List", "@@", "s"}]}], ";"}], "\[IndentingNewLine]", RowBox[{ RowBox[{"rs", "=", RowBox[{"ReplacePart", "[", RowBox[{"ls", ",", RowBox[{"2", "\[Rule]", "0"}]}], "]"}]}], ";"}], "\[IndentingNewLine]", RowBox[{"cy", "=", RowBox[{"CQuadric", "@@", "rs"}]}]}], "Input", CellChangeTimes->{{3.614172770280952*^9, 3.61417282437176*^9}}], Cell[BoxData[ RowBox[{"EllipticCylinder", "[", RowBox[{ "1", ",", "0", ",", "1", ",", "0", ",", "0", ",", "0", ",", "0", ",", "0", ",", "0", ",", RowBox[{"-", "1"}]}], "]"}]], "Output", CellChangeTimes->{ 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2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi), (-3^ Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + 3^Rational[-1, 2] Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, {Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] - 3^Rational[-1, 2] Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2], Rational[-1, 2], 0}, { 2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { Pi, -2^Rational[-1, 2], (-3^Rational[-1, 2]) Pi}, { Rational[11, 12] Pi, -2^Rational[-1, 2], (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[5, 6] Pi, -2^Rational[-1, 2], (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[3, 4] Pi, -2^Rational[-1, 2], (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[2, 3] Pi, -2^Rational[-1, 2], (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[7, 12] Pi, -2^Rational[-1, 2], (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] Pi, -2^Rational[-1, 2], (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[5, 12] Pi, -2^Rational[-1, 2], (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 3] Pi, -2^Rational[-1, 2], (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 4] Pi, -2^Rational[-1, 2], (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 6] Pi, -2^Rational[-1, 2], (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 12] Pi, -2^Rational[-1, 2], (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { 0, -2^Rational[-1, 2], 0}, { Rational[-1, 12] Pi, -2^Rational[-1, 2], (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 6] Pi, -2^Rational[-1, 2], (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 4] Pi, -2^Rational[-1, 2], (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 3] Pi, -2^Rational[-1, 2], (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-5, 12] Pi, -2^Rational[-1, 2], (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] Pi, -2^Rational[-1, 2], (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-7, 12] Pi, -2^Rational[-1, 2], (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-2, 3] Pi, -2^Rational[-1, 2], (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-3, 4] Pi, -2^Rational[-1, 2], (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[-5, 6] Pi, -2^Rational[-1, 2], (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-11, 12] Pi, -2^Rational[-1, 2], (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {- Pi, -2^Rational[-1, 2], 3^Rational[-1, 2] Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 4] (-1 - 3^Rational[1, 2]), 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2], Rational[-1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[-1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2], Rational[-1, 2], 0}, {-2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi), (-3^ Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] - 3^Rational[-1, 2] Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2] 2^Rational[-1, 2], 0}, {Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[-1, 2] + 3^Rational[-1, 2] Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] ( Rational[-1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 4] (1 - 3^Rational[1, 2]), 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, {-1, (-2^Rational[-1, 2]) Pi, (-3^Rational[-1, 2]) Pi}, {-1, (Rational[-11, 12] 2^Rational[-1, 2]) Pi, (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-5, 6] 2^Rational[-1, 2]) Pi, (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-3, 4] 2^Rational[-1, 2]) Pi, (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {-1, (Rational[-1, 3] 2^Rational[1, 2]) Pi, (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-7, 12] 2^Rational[-1, 2]) Pi, (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-1, 2] 2^Rational[-1, 2]) Pi, (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-5, 12] 2^Rational[-1, 2]) Pi, (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-1, 3] 2^Rational[-1, 2]) Pi, (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-1, 4] 2^Rational[-1, 2]) Pi, (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-1, 6] 2^Rational[-1, 2]) Pi, (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {-1, (Rational[-1, 12] 2^Rational[-1, 2]) Pi, (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {-1, 0, 0}, {-1, (Rational[1, 12] 2^Rational[-1, 2]) Pi, (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[1, 6] 2^Rational[-1, 2]) Pi, (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {-1, (Rational[1, 4] 2^Rational[-1, 2]) Pi, (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {-1, (Rational[1, 3] 2^Rational[-1, 2]) Pi, (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {-1, (Rational[5, 12] 2^Rational[-1, 2]) Pi, (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[1, 2] 2^Rational[-1, 2]) Pi, (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {-1, (Rational[7, 12] 2^Rational[-1, 2]) Pi, (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {-1, (Rational[1, 3] 2^Rational[1, 2]) Pi, (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {-1, (Rational[3, 4] 2^Rational[-1, 2]) Pi, (Rational[1, 4] 3^Rational[1, 2]) Pi}, {-1, (Rational[5, 6] 2^Rational[-1, 2]) Pi, (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {-1, (Rational[11, 12] 2^Rational[-1, 2]) Pi, (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {-1, 2^Rational[-1, 2] Pi, 3^Rational[-1, 2] Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi), (-3^ Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] - 3^Rational[-1, 2] Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, {Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] + 3^Rational[-1, 2] Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, {-2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2], Rational[1, 2], 0}, {-2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, {-2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[-1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[-1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[-1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), 3^Rational[-1, 2] Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, {-Pi, 2^ Rational[-1, 2], (-3^Rational[-1, 2]) Pi}, { Rational[-11, 12] Pi, 2^ Rational[-1, 2], (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[-5, 6] Pi, 2^ Rational[-1, 2], (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[-3, 4] Pi, 2^ Rational[-1, 2], (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[-2, 3] Pi, 2^ Rational[-1, 2], (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[-7, 12] Pi, 2^ Rational[-1, 2], (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 2] Pi, 2^ Rational[-1, 2], (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[-5, 12] Pi, 2^ Rational[-1, 2], (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[-1, 3] Pi, 2^ Rational[-1, 2], (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[-1, 4] Pi, 2^ Rational[-1, 2], (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[-1, 6] Pi, 2^ Rational[-1, 2], (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[-1, 12] Pi, 2^ Rational[-1, 2], (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { 0, 2^Rational[-1, 2], 0}, { Rational[1, 12] Pi, 2^ Rational[-1, 2], (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 6] Pi, 2^ Rational[-1, 2], (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 4] Pi, 2^ Rational[-1, 2], (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 3] Pi, 2^ Rational[-1, 2], (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[5, 12] Pi, 2^ Rational[-1, 2], (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] Pi, 2^ Rational[-1, 2], (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[7, 12] Pi, 2^ Rational[-1, 2], (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[2, 3] Pi, 2^ Rational[-1, 2], (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[3, 4] Pi, 2^ Rational[-1, 2], (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[5, 6] Pi, 2^ Rational[-1, 2], (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[11, 12] Pi, 2^ Rational[-1, 2], (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Pi, 2^Rational[-1, 2], 3^Rational[-1, 2] Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 4] (1 + 3^Rational[1, 2]), 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] - 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2], Rational[1, 2] Rational[3, 2]^Rational[1, 2], 0}, { Rational[1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + 3^Rational[-1, 2] Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi, 2^Rational[-1, 2] (Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { 2^Rational[-1, 2] - 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] + 2^Rational[-1, 2] Pi), (-3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2], Rational[1, 2], 0}, { 2^Rational[-1, 2] + (Rational[1, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 12] 2^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 6] 2^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 4] 2^Rational[-1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[5, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-5, 12] 2^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 2] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 2] 2^Rational[-1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[7, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-7, 12] 2^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[1, 3] 2^Rational[1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-1, 3] 2^Rational[1, 2]) Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[3, 4] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-3, 4] 2^Rational[-1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[5, 6] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-5, 6] 2^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + (Rational[11, 12] 2^Rational[-1, 2]) Pi, 2^Rational[-1, 2] ( 2^Rational[-1, 2] + (Rational[-11, 12] 2^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, { 2^Rational[-1, 2] + 2^Rational[-1, 2] Pi, 2^Rational[-1, 2] (2^Rational[-1, 2] - 2^Rational[-1, 2] Pi), 3^Rational[-1, 2] Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 2] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 2] 3^Rational[1, 2]) Pi), (-3^ Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-11, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[11, 8] 3^Rational[-1, 2]) Pi), ( Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[5, 4] 3^Rational[-1, 2]) Pi), ( Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-3, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[3, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] + 3^Rational[-1, 2] Pi), ( Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-7, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[7, 8] 3^Rational[-1, 2]) Pi), ( Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 4] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 4] 3^Rational[1, 2]) Pi), ( Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-5, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[5, 8] 3^Rational[-1, 2]) Pi), ( Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 6] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 2] 3^Rational[-1, 2]) Pi), ( Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 8] 3^Rational[1, 2]) Pi), ( Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 4] 3^Rational[-1, 2]) Pi), ( Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[-1, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[1, 8] 3^Rational[-1, 2]) Pi), ( Rational[-1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 2] 2^Rational[-1, 2], 0}, {Rational[1, 2] 3^Rational[1, 2] + Rational[1, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 8] 3^Rational[-1, 2]) Pi), ( Rational[1, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 4] 3^Rational[-1, 2]) Pi), ( Rational[1, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 6] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 2] 3^Rational[-1, 2]) Pi), ( Rational[1, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-5, 8] 3^Rational[-1, 2]) Pi), ( Rational[5, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 4] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 4] 3^Rational[1, 2]) Pi), ( Rational[1, 2] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[7, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-7, 8] 3^Rational[-1, 2]) Pi), ( Rational[7, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 3] Pi, 2^Rational[-1, 2] (Rational[1, 2] - 3^Rational[-1, 2] Pi), ( Rational[2, 3] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[3, 8] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-3, 8] 3^Rational[1, 2]) Pi), ( Rational[1, 4] 3^Rational[1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[5, 12] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-5, 4] 3^Rational[-1, 2]) Pi), ( Rational[5, 6] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[11, 24] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-11, 8] 3^Rational[-1, 2]) Pi), ( Rational[11, 12] 3^Rational[-1, 2]) Pi}, { Rational[1, 2] 3^Rational[1, 2] + Rational[1, 2] Pi, 2^Rational[-1, 2] ( Rational[1, 2] + (Rational[-1, 2] 3^Rational[1, 2]) Pi), 3^Rational[-1, 2] Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (-3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 4] (-1 + 3^Rational[1, 2]), 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 6] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 6] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 2] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[7, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-7, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[7, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 3] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 3] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[2, 3] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[3, 8] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-3, 8] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[1, 4] 3^Rational[1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[5, 12] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-5, 12] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[5, 6] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[11, 24] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-11, 24] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), (Rational[11, 12] 3^Rational[-1, 2]) Pi}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]) + ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) Pi, 2^Rational[-1, 2] ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]) + ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) Pi), 3^Rational[-1, 2] Pi}, { 1, 2^Rational[-1, 2] Pi, (-3^Rational[-1, 2]) Pi}, { 1, (Rational[11, 12] 2^Rational[-1, 2]) Pi, (Rational[-11, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[5, 6] 2^Rational[-1, 2]) Pi, (Rational[-5, 6] 3^Rational[-1, 2]) Pi}, { 1, (Rational[3, 4] 2^Rational[-1, 2]) Pi, (Rational[-1, 4] 3^Rational[1, 2]) Pi}, { 1, (Rational[1, 3] 2^Rational[1, 2]) Pi, (Rational[-2, 3] 3^Rational[-1, 2]) Pi}, { 1, (Rational[7, 12] 2^Rational[-1, 2]) Pi, (Rational[-7, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[1, 2] 2^Rational[-1, 2]) Pi, (Rational[-1, 2] 3^Rational[-1, 2]) Pi}, { 1, (Rational[5, 12] 2^Rational[-1, 2]) Pi, (Rational[-5, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[1, 3] 2^Rational[-1, 2]) Pi, (Rational[-1, 3] 3^Rational[-1, 2]) Pi}, { 1, (Rational[1, 4] 2^Rational[-1, 2]) Pi, (Rational[-1, 4] 3^Rational[-1, 2]) Pi}, { 1, (Rational[1, 6] 2^Rational[-1, 2]) Pi, (Rational[-1, 6] 3^Rational[-1, 2]) Pi}, { 1, (Rational[1, 12] 2^Rational[-1, 2]) Pi, (Rational[-1, 12] 3^Rational[-1, 2]) Pi}, {1, 0, 0}, { 1, (Rational[-1, 12] 2^Rational[-1, 2]) Pi, (Rational[1, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-1, 6] 2^Rational[-1, 2]) Pi, (Rational[1, 6] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-1, 4] 2^Rational[-1, 2]) Pi, (Rational[1, 4] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-1, 3] 2^Rational[-1, 2]) Pi, (Rational[1, 3] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-5, 12] 2^Rational[-1, 2]) Pi, (Rational[5, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-1, 2] 2^Rational[-1, 2]) Pi, (Rational[1, 2] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-7, 12] 2^Rational[-1, 2]) Pi, (Rational[7, 12] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-1, 3] 2^Rational[1, 2]) Pi, (Rational[2, 3] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-3, 4] 2^Rational[-1, 2]) Pi, (Rational[1, 4] 3^Rational[1, 2]) Pi}, { 1, (Rational[-5, 6] 2^Rational[-1, 2]) Pi, (Rational[5, 6] 3^Rational[-1, 2]) Pi}, { 1, (Rational[-11, 12] 2^Rational[-1, 2]) Pi, (Rational[11, 12] 3^Rational[-1, 2]) Pi}, { 1, (-2^Rational[-1, 2]) Pi, 3^Rational[-1, 2] Pi}}, {{ 1, 2.221441469079183, -1.813799364234218}, { 1, 2.0363213466559174`, -1.6626494172146997`}, { 1, 1.8512012242326525`, -1.5114994701951818`}, { 1, 1.666081101809387, -1.3603495231756633`}, { 1, 1.480960979386122, -1.2091995761561452`}, { 1, 1.2958408569628568`, -1.0580496291366273`}, { 1, 1.1107207345395915`, -0.906899682117109}, { 1, 0.9256006121163263, -0.7557497350975909}, { 1, 0.7404804896930609, -0.6045997880780726}, { 1, 0.5553603672697958, -0.4534498410585545}, { 1, 0.37024024484653045`, -0.3022998940390363}, { 1, 0.18512012242326523`, -0.15114994701951814`}, {1, 0, 0}, { 1, -0.18512012242326523`, 0.15114994701951814`}, { 1, -0.37024024484653045`, 0.3022998940390363}, { 1, -0.5553603672697958, 0.4534498410585545}, { 1, -0.7404804896930609, 0.6045997880780726}, { 1, -0.9256006121163263, 0.7557497350975909}, { 1, -1.1107207345395915`, 0.906899682117109}, { 1, -1.2958408569628568`, 1.0580496291366273`}, { 1, -1.480960979386122, 1.2091995761561452`}, { 1, -1.666081101809387, 1.3603495231756633`}, { 1, -1.8512012242326525`, 1.5114994701951818`}, { 1, -2.0363213466559174`, 1.6626494172146997`}, { 1, -2.221441469079183, 1.813799364234218}, {1.7790298369922726`, 1.9627349846808915`, -1.813799364234218}, {1.711271169433672, 1.7839226774664656`, -1.6626494172146997`}, {1.643512501875072, 1.60511037025204, -1.5114994701951818`}, {1.5757538343164716`, 1.426298063037614, -1.3603495231756633`}, {1.5079951667578713`, 1.247485755823188, -1.2091995761561452`}, {1.4402364991992709`, 1.0686734486087621`, -1.0580496291366273`}, {1.3724778316406705`, 0.8898611413943361, -0.906899682117109}, {1.3047191640820701`, 0.7110488341799104, -0.7557497350975909}, {1.2369604965234697`, 0.5322365269654844, -0.6045997880780726}, {1.1692018289648693`, 0.3534242197510585, -0.4534498410585545}, {1.101443161406269, 0.17461191253663258`, -0.3022998940390363}, { 1.0336844938476686`, -0.004200394677793336, -0.15114994701951814`}, { 0.9659258262890682, -0.1830127018922193, 0}, { 0.8981671587304678, -0.36182500910664517`, 0.15114994701951814`}, { 0.8304084911718674, -0.540637316321071, 0.3022998940390363}, { 0.762649823613267, -0.719449623535497, 0.4534498410585545}, { 0.6948911560546667, -0.898261930749923, 0.6045997880780726}, { 0.6271324884960663, -1.077074237964349, 0.7557497350975909}, { 0.559373820937466, -1.2558865451787746`, 0.906899682117109}, { 0.49161515337886563`, -1.4346988523932007`, 1.0580496291366273`}, { 0.42385648582026525`, -1.6135111596076266`, 1.2091995761561452`}, { 0.35609781826166487`, -1.7923234668220527`, 1.3603495231756633`}, { 0.2883391507030645, -1.9711357740364785`, 1.5114994701951818`}, { 0.22058048314446432`, -2.149948081250904, 1.6626494172146997`}, { 0.15282181558586383`, -2.32876038846533, 1.813799364234218}, { 2.436821730579335, 1.5702713546495222`, -1.813799364234218}, { 2.3059220366797604`, 1.4099526258792894`, -1.6626494172146997`}, { 2.175022342780186, 1.2496338971090564`, -1.5114994701951818`}, { 2.0441226488806112`, 1.0893151683388231`, -1.3603495231756633`}, { 1.9132229549810362`, 0.9289964395685903, -1.2091995761561452`}, { 1.7823232610814617`, 0.7686777107983573, -1.0580496291366273`}, { 1.6514235671818869`, 0.6083589820281242, -0.906899682117109}, { 1.520523873282312, 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In this example, a lima\ \[CCedilla]on and a trochoid are plotted in the same graph. 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( Rational[9801, 10000] + Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]))^ 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( Cos[Rational[33, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[33, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[ Rational[13, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[ Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[ Rational[2, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 100] 199^Rational[1, 2], 0}, { Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[ Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[19, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[ Rational[29, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[33, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[33, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[17, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[7, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[37, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[37, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[37, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[37, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[19, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[39, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[39, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[39, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[39, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 5] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[4, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[41, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[41, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[41, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[41, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[21, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[43, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[43, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[43, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[43, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[22, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[22, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[22, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[22, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 10] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[9, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[23, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[47, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[47, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[47, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[47, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[24, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[24, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[24, 25] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[24, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[49, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[49, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[49, 50] ArcSin[Rational[9801, 10000]]] - (( Rational[9801, 10000] - Sin[ Rational[49, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, {(Rational[1, 100] 3940399^Rational[1, 4]) Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]], ( Rational[1, 100] 3940399^Rational[1, 4]) Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}}, {{(- Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Im[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])] + Re[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^ Rational[1, 4], ( Im[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])] + Re[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^Rational[1, 4] Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]}, { Rational[-1, 100] 199^Rational[1, 2], 0}, {(-Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[ 2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[ 2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])] - ((Rational[9801, 10000] - Sin[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[ 2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])] - (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Im[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])] + Re[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^ Rational[ 1, 4], (-( Im[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])] + Re[-((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^Rational[1, 4]) Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}}}, {{{ 0.3448973563418186, -0.28204644371375326`}, { 0.2697090372366595, -0.21445740046605516`}, { 0.24616221903982488`, -0.19028484049214836`}, { 0.2306310836556468, -0.17328063266108346`}, { 0.21906165808854974`, -0.1599371645379667}, { 0.2099121677587998, -0.1488887250233423}, { 0.20240725800057943`, -0.13943449425126195`}, { 0.19609582792826516`, -0.1311593104803347}, { 0.19069030159661596`, -0.1237941158533582}, { 0.1859953860624797, -0.1171533870816959}, { 0.1818721429475673, -0.11110323727012737`}, { 0.17821812835592338`, -0.10554360144900568`}, { 0.17495563163102162`, -0.10039758298285602`}, { 0.17202432511212218`, -0.09560473306616818}, { 0.16937646738568607`, -0.09111662556984608}, { 0.16697365949099224`, -0.0868938387806376}, { 0.16478458490336337`, -0.08290383511619505}, { 0.16278339448903886`, -0.07911943384137089}, { 0.1609485268805888, -0.07551768692671491}, { 0.15926183034268934`, -0.07207903593424514}, { 0.1577078980605578, -0.06878666913640553}, { 0.15627355748123067`, -0.06562602407474448}, { 0.15494747279478538`, -0.06258439757825421}, { 0.1537198318048847, -0.059650636399537944`}, { 0.15258209662787356`, -0.05681488916613075}, { 0.15152680328273493`, -0.05406840554678596}, { 0.15054739916333926`, -0.05140337218564148}, { 0.14963811017390397`, -0.04881277756312062}, { 0.14879383131799534`, -0.046290299828309754`}, { 0.14801003599820356`, -0.043830213030387165`}, { 0.14728270036755975`, -0.0414273082029692}, { 0.14660823988385596`, -0.03907682652542105}, { 0.145983455829815, -0.03677440236911104}, { 0.14540549002864084`, -0.03451601448353777}, { 0.14487178634355838`, -0.032297943922368906`}, { 0.1443800578286777, -0.03011673757808025}, { 0.14392825861663255`, -0.027969176404592355`}, { 0.1435145598004397, -0.02585224757371224}, { 0.14313732870366644`, -0.02376311994345173}, { 0.14279511104230586`, -0.021699122322020228`}, { 0.1424866155698555, -0.019657724096244163`}, { 0.14221070086855164`, -0.017636517861724064`}, { 0.14196636400813123`, -0.015633203747575757`}, { 0.1417527308415515, -0.013645575173698972`}, { 0.1415690477470079, -0.011671505815197433`}, { 0.14141467465898155`, -0.009708937578397013}, { 0.14128907925927, -0.007755869417098249}, { 0.14119183222307835`, -0.005810346837211366}, { 0.14112260343613642`, -0.0038704519534995888`}, { 0.14108115911719438`, -0.0019342939743762252`}, { 0.14106735979665885`, 0}, {0.14108115911719438`, 0.0019342939743762252`}, {0.14112260343613642`, 0.0038704519534995888`}, {0.14119183222307835`, 0.005810346837211366}, {0.14128907925927, 0.007755869417098249}, {0.14141467465898155`, 0.009708937578397013}, {0.1415690477470079, 0.011671505815197433`}, {0.1417527308415515, 0.013645575173698972`}, {0.14196636400813123`, 0.015633203747575757`}, {0.14221070086855164`, 0.017636517861724064`}, {0.1424866155698555, 0.019657724096244163`}, {0.14279511104230586`, 0.021699122322020228`}, {0.14313732870366644`, 0.02376311994345173}, {0.1435145598004397, 0.02585224757371224}, {0.14392825861663255`, 0.027969176404592355`}, {0.1443800578286777, 0.03011673757808025}, {0.14487178634355838`, 0.032297943922368906`}, {0.14540549002864084`, 0.03451601448353777}, {0.145983455829815, 0.03677440236911104}, { 0.14660823988385596`, 0.03907682652542105}, { 0.14728270036755975`, 0.0414273082029692}, {0.14801003599820356`, 0.043830213030387165`}, {0.14879383131799534`, 0.046290299828309754`}, {0.14963811017390397`, 0.04881277756312062}, {0.15054739916333926`, 0.05140337218564148}, {0.15152680328273493`, 0.05406840554678596}, {0.15258209662787356`, 0.05681488916613075}, {0.1537198318048847, 0.059650636399537944`}, {0.15494747279478538`, 0.06258439757825421}, {0.15627355748123067`, 0.06562602407474448}, {0.1577078980605578, 0.06878666913640553}, {0.15926183034268934`, 0.07207903593424514}, {0.1609485268805888, 0.07551768692671491}, {0.16278339448903886`, 0.07911943384137089}, {0.16478458490336337`, 0.08290383511619505}, {0.16697365949099224`, 0.0868938387806376}, {0.16937646738568607`, 0.09111662556984608}, {0.17202432511212218`, 0.09560473306616818}, {0.17495563163102162`, 0.10039758298285602`}, {0.17821812835592338`, 0.10554360144900568`}, {0.1818721429475673, 0.11110323727012737`}, {0.1859953860624797, 0.1171533870816959}, {0.19069030159661596`, 0.1237941158533582}, {0.19609582792826516`, 0.1311593104803347}, {0.20240725800057943`, 0.13943449425126195`}, {0.2099121677587998, 0.1488887250233423}, {0.21906165808854974`, 0.1599371645379667}, {0.2306310836556468, 0.17328063266108346`}, {0.24616221903982488`, 0.19028484049214836`}, {0.2697090372366595, 0.21445740046605516`}, {0.3448973563418186, 0.28204644371375326`}}, {{-0.3448973563418185, 0.28204644371375315`}, {-0.2697090372366601, 0.21445740046605563`}, {-0.24616221903982513`, 0.19028484049214858`}, {-0.23063108365564625`, 0.173280632661083}, {-0.21906165808855013`, 0.15993716453796697`}, {-0.2099121677587998, 0.1488887250233423}, {-0.20240725800057963`, 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ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[14, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[3, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], (- Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Rational[1, 100] 19801^Rational[1, 2], 0}, { Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[ Rational[1, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[7, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[23, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[13, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[13, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[27, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[27, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[14, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[14, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[29, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[29, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[3, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[3, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[31, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[31, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[16, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[16, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]] ( Cos[ Rational[33, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[33, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[33, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[17, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[17, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[7, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[7, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[18, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[18, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[37, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[37, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[37, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[19, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[19, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[39, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[39, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[39, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[4, 5] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[4, 5] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[41, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[41, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[41, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[ Rational[21, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[21, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[21, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[43, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[43, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[43, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[22, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[22, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[22, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[9, 10] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[9, 10] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[23, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[23, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[47, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[47, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[47, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[24, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[24, 25] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[24, 25] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, { Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[49, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2], Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]] ( Cos[Rational[49, 50] ArcSin[Rational[9801, 10000]]] + ((Rational[9801, 10000] - Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]) ( Rational[9801, 10000] + Sin[Rational[49, 50] ArcSin[Rational[9801, 10000]]]))^ Rational[1, 2])^Rational[1, 2]}, {(Rational[1, 100] 3940399^Rational[1, 4]) Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]], ( Rational[1, 100] 3940399^Rational[1, 4]) Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}}, {{(- Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Im[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])] + Re[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^ Rational[1, 4], ( Im[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])] + Re[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^Rational[1, 4] Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[ 2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[ 2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[ 2 (Pi + Rational[-13, 100] ArcSin[Rational[9801, 10000]])]))^Rational[1, 2])^ Rational[1, 2] Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[1, 2], ( Cos[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[-1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2] Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]}, { Rational[-1, 100] 19801^Rational[1, 2], 0}, {(-Cos[Rational[1, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[2, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[13, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[4, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[4, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[4, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[ 2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]))^Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[17, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[19, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[21, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[23, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[6, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[6, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[6, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 4] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 4] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[1, 4] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[13, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[13, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[13, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[27, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[27, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[27, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[29, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[29, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[29, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[3, 10] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[3, 10] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[3, 10] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[31, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[31, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[31, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[8, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[8, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[8, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[33, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[33, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[33, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[17, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[17, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[17, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[7, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[7, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[7, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[37, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[ 2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]))^Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[37, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[37, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[19, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[19, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[19, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[39, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[39, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[39, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[2, 5] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[2, 5] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[2, 5] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[41, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[41, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[41, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[21, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[21, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[21, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[43, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[43, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[43, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[11, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[11, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[11, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[9, 20] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[9, 20] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[9, 20] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[23, 50] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[23, 50] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[23, 50] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[47, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[47, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[47, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[12, 25] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[12, 25] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[12, 25] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[49, 100] ArcSin[Rational[9801, 10000]]]) ( Cos[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^ Rational[ 1, 2], (-( Cos[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])] + (( Rational[9801, 10000] - Sin[ 2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]) (Rational[9801, 10000] + Sin[2 (Pi + Rational[49, 100] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2])^Rational[1, 2]) Sin[Rational[49, 100] ArcSin[Rational[9801, 10000]]]}, {(- Cos[Rational[1, 2] ArcSin[Rational[9801, 10000]]]) ( Im[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])] + Re[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^ Rational[ 1, 4], (-( Im[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]]^2 + ( Cos[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])] + Re[((Rational[9801, 10000] - Sin[ 2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]) ( Rational[9801, 10000] + Sin[2 (Pi + Rational[1, 2] ArcSin[Rational[9801, 10000]])]))^ Rational[1, 2]])^2)^Rational[1, 4]) Sin[Rational[1, 2] ArcSin[Rational[9801, 10000]]]}}}, {{{ 0.3448973563418186, -0.28204644371375326`}, { 0.4509070822407731, -0.358535856639609}, { 0.5047745889192962, -0.3901937206759524}, { 0.5501442015096446, -0.41334122782318955`}, { 0.5910824600317629, -0.4315499731467957}, { 0.6291389801904498, -0.4462423575686933}, { 0.6650931640486384, -0.45816997806881027`}, { 0.699397092524957, -0.46779394226113435`}, { 0.7323368278714276, -0.4754252804370477}, { 0.7641041142237942, -0.4812882026778115}, { 0.7948326768495402, -0.4855525538703515}, { 0.8246183851975017, -0.48835208290927534`}, { 0.8535312640953572, -0.48979547052363287`}, { 0.88162305209499, -0.48997335990468277`}, { 0.9089321729630987, -0.4889630404422061}, { 0.935487127389676, -0.4868316827729679}, { 0.9613088791629795, -0.4836386416884755}, { 0.9864125785906429, -0.4794371379038519}, { 1.0108088358570544`, -0.4742755133487118}, { 1.0345046807458662`, -0.46819818595064217`}, { 1.057504298798554, -0.46124638782422045`}, { 1.0798096048954733`, -0.4534587441993939}, { 1.101420696485097, -0.4448717331520156}, { 1.1223362162842254`, -0.4355200546965217}, { 1.142553645890375, -0.42543692996916}, { 1.1620695459706256`, -0.4146543457916943}, { 1.180879754638006, -0.4032032560608204}, { 1.1989795527362626`, -0.39111374864617576`}, { 1.2163638026623236`, -0.37841518446559586`}, { 1.23302706582159, -0.36513631391758766`}, { 1.2489637026717502`, -0.35130537473700896`}, { 1.264167958454821, -0.33695017449680514`}, { 1.2786340370671263`, -0.3220981603337546}, { 1.2923561650184963`, -0.3067764779781108}, { 1.3053286470461816`, -0.2910120217788965}, { 1.317545914647772, -0.27483147711163436`}, { 1.3290025685603308`, -0.2582613563138371}, { 1.3396934160248557`, -0.24132802910106352`}, { 1.3496135035248575`, -0.2240577482618747}, { 1.3587581455668216`, -0.20647667130536881`}, { 1.367122949972205, -0.18861087863387077`}, { 1.3747038400705054`, -0.17048638873100194`}, { 1.381497074117063, -0.15212917078805238`}, { 1.387499262204668, -0.13356515513643866`}, { 1.3927073808924757`, -0.11482024180881353`}, { 1.3971187857373155`, -0.09592030751433699}, { 1.4007312218798385`, -0.07689121128333574}, { 1.403542832809839, -0.057758799011989534`}, { 1.4055521674106208`, -0.03854890711792948}, { 1.4067581853606317`, -0.01928736550205922}, { 1.4071602609511116`, 0}, {1.4067581853606317`, 0.01928736550205922}, {1.4055521674106208`, 0.03854890711792948}, {1.403542832809839, 0.057758799011989534`}, {1.4007312218798385`, 0.07689121128333574}, {1.3971187857373155`, 0.09592030751433699}, {1.3927073808924757`, 0.11482024180881353`}, {1.387499262204668, 0.13356515513643866`}, {1.381497074117063, 0.15212917078805238`}, 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Rational[81, 100] Pi}, {(-4) (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 - 5^Rational[1, 2], Rational[33, 40] Pi}, {(-4) Sin[Rational[7, 50] Pi], (-4) Cos[Rational[7, 50] Pi], Rational[21, 25] Pi}, {(-4) Sin[Rational[2, 25] Pi], (-4) Cos[Rational[2, 25] Pi], Rational[171, 200] Pi}, {(-4) Sin[Rational[1, 50] Pi], (-4) Cos[Rational[1, 50] Pi], Rational[87, 100] Pi}, { 4 Sin[Rational[1, 25] Pi], (-4) Cos[Rational[1, 25] Pi], Rational[177, 200] Pi}, {-1 + 5^Rational[1, 2], (-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[9, 10] Pi}, { 4 Sin[Rational[4, 25] Pi], (-4) Cos[Rational[4, 25] Pi], Rational[183, 200] Pi}, { 4 Sin[Rational[11, 50] Pi], (-4) Cos[Rational[11, 50] Pi], Rational[93, 100] Pi}, { 4 Cos[Rational[11, 50] Pi], (-4) Sin[Rational[11, 50] Pi], Rational[189, 200] Pi}, { 4 Cos[Rational[4, 25] Pi], (-4) Sin[Rational[4, 25] Pi], Rational[24, 25] Pi}, { 4 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 - 5^Rational[1, 2], Rational[39, 40] Pi}, { 4 Cos[Rational[1, 25] Pi], (-4) Sin[Rational[1, 25] Pi], Rational[99, 100] Pi}, { 4 Cos[Rational[1, 50] Pi], 4 Sin[Rational[1, 50] Pi], Rational[201, 200] Pi}, { 4 Cos[Rational[2, 25] Pi], 4 Sin[Rational[2, 25] Pi], Rational[51, 50] Pi}, { 4 Cos[Rational[7, 50] Pi], 4 Sin[Rational[7, 50] Pi], Rational[207, 200] Pi}, { 1 + 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[21, 20] Pi}, { 4 Sin[Rational[6, 25] Pi], 4 Cos[Rational[6, 25] Pi], Rational[213, 200] Pi}, { 4 Sin[Rational[9, 50] Pi], 4 Cos[Rational[9, 50] Pi], Rational[27, 25] Pi}, { 4 Sin[Rational[3, 25] Pi], 4 Cos[Rational[3, 25] Pi], Rational[219, 200] Pi}, { 4 Sin[Rational[3, 50] Pi], 4 Cos[Rational[3, 50] Pi], Rational[111, 100] Pi}, { 0, 4, Rational[9, 8] Pi}, {(-4) Sin[Rational[3, 50] Pi], 4 Cos[Rational[3, 50] Pi], Rational[57, 50] Pi}, {(-4) Sin[Rational[3, 25] Pi], 4 Cos[Rational[3, 25] Pi], Rational[231, 200] Pi}, {(-4) Sin[Rational[9, 50] Pi], 4 Cos[Rational[9, 50] Pi], Rational[117, 100] Pi}, {(-4) Sin[Rational[6, 25] Pi], 4 Cos[Rational[6, 25] Pi], Rational[237, 200] Pi}, {-1 - 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[6, 5] Pi}, {(-4) Cos[Rational[7, 50] Pi], 4 Sin[Rational[7, 50] Pi], Rational[243, 200] Pi}, {(-4) Cos[Rational[2, 25] Pi], 4 Sin[Rational[2, 25] Pi], Rational[123, 100] Pi}, {(-4) Cos[Rational[1, 50] Pi], 4 Sin[Rational[1, 50] Pi], Rational[249, 200] Pi}, {(-4) Cos[Rational[1, 25] Pi], (-4) Sin[Rational[1, 25] Pi], Rational[63, 50] Pi}, {(-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 - 5^Rational[1, 2], Rational[51, 40] Pi}, {(-4) Cos[Rational[4, 25] Pi], (-4) Sin[Rational[4, 25] Pi], Rational[129, 100] Pi}, {(-4) Cos[Rational[11, 50] Pi], (-4) Sin[Rational[11, 50] Pi], Rational[261, 200] Pi}, {(-4) Sin[Rational[11, 50] Pi], (-4) Cos[Rational[11, 50] Pi], Rational[33, 25] Pi}, {(-4) Sin[Rational[4, 25] Pi], (-4) Cos[Rational[4, 25] Pi], Rational[267, 200] Pi}, { 1 - 5^Rational[ 1, 2], (-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[27, 20] Pi}, {(-4) Sin[Rational[1, 25] Pi], (-4) Cos[Rational[1, 25] Pi], Rational[273, 200] Pi}, { 4 Sin[Rational[1, 50] Pi], (-4) Cos[Rational[1, 50] Pi], Rational[69, 50] Pi}, { 4 Sin[Rational[2, 25] Pi], (-4) Cos[Rational[2, 25] Pi], Rational[279, 200] Pi}, { 4 Sin[Rational[7, 50] Pi], (-4) Cos[Rational[7, 50] Pi], Rational[141, 100] Pi}, { 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 - 5^Rational[1, 2], Rational[57, 40] Pi}, { 4 Cos[Rational[6, 25] Pi], (-4) Sin[Rational[6, 25] Pi], Rational[36, 25] Pi}, { 4 Cos[Rational[9, 50] Pi], (-4) Sin[Rational[9, 50] Pi], Rational[291, 200] Pi}, { 4 Cos[Rational[3, 25] Pi], (-4) Sin[Rational[3, 25] Pi], Rational[147, 100] Pi}, { 4 Cos[Rational[3, 50] Pi], (-4) Sin[Rational[3, 50] Pi], Rational[297, 200] Pi}, {4, 0, Rational[3, 2] Pi}, { 4 Cos[Rational[3, 50] Pi], 4 Sin[Rational[3, 50] Pi], Rational[303, 200] Pi}, { 4 Cos[Rational[3, 25] Pi], 4 Sin[Rational[3, 25] Pi], Rational[153, 100] Pi}, { 4 Cos[Rational[9, 50] Pi], 4 Sin[Rational[9, 50] Pi], Rational[309, 200] Pi}, { 4 Cos[Rational[6, 25] Pi], 4 Sin[Rational[6, 25] Pi], Rational[39, 25] Pi}, { 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 + 5^Rational[1, 2], Rational[63, 40] Pi}, { 4 Sin[Rational[7, 50] Pi], 4 Cos[Rational[7, 50] Pi], Rational[159, 100] Pi}, { 4 Sin[Rational[2, 25] Pi], 4 Cos[Rational[2, 25] Pi], Rational[321, 200] Pi}, { 4 Sin[Rational[1, 50] Pi], 4 Cos[Rational[1, 50] Pi], Rational[81, 50] Pi}, {(-4) Sin[Rational[1, 25] Pi], 4 Cos[Rational[1, 25] Pi], Rational[327, 200] Pi}, { 1 - 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[33, 20] Pi}, {(-4) Sin[Rational[4, 25] Pi], 4 Cos[Rational[4, 25] Pi], Rational[333, 200] Pi}, {(-4) Sin[Rational[11, 50] Pi], 4 Cos[Rational[11, 50] Pi], Rational[42, 25] Pi}, {(-4) Cos[Rational[11, 50] Pi], 4 Sin[Rational[11, 50] Pi], Rational[339, 200] Pi}, {(-4) Cos[Rational[4, 25] Pi], 4 Sin[Rational[4, 25] Pi], Rational[171, 100] Pi}, {(-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 + 5^Rational[1, 2], Rational[69, 40] Pi}, {(-4) Cos[Rational[1, 25] Pi], 4 Sin[Rational[1, 25] Pi], Rational[87, 50] Pi}, {(-4) Cos[Rational[1, 50] Pi], (-4) Sin[Rational[1, 50] Pi], Rational[351, 200] Pi}, {(-4) Cos[Rational[2, 25] Pi], (-4) Sin[Rational[2, 25] Pi], Rational[177, 100] Pi}, {(-4) Cos[Rational[7, 50] Pi], (-4) Sin[Rational[7, 50] Pi], Rational[357, 200] Pi}, {-1 - 5^ Rational[ 1, 2], (-4) (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[9, 5] Pi}, {(-4) Sin[Rational[6, 25] Pi], (-4) Cos[Rational[6, 25] Pi], Rational[363, 200] Pi}, {(-4) Sin[Rational[9, 50] Pi], (-4) Cos[Rational[9, 50] Pi], Rational[183, 100] Pi}, {(-4) Sin[Rational[3, 25] Pi], (-4) Cos[Rational[3, 25] Pi], Rational[369, 200] Pi}, {(-4) Sin[Rational[3, 50] Pi], (-4) Cos[Rational[3, 50] Pi], Rational[93, 50] Pi}, { 0, -4, Rational[15, 8] Pi}, { 4 Sin[Rational[3, 50] Pi], (-4) Cos[Rational[3, 50] Pi], Rational[189, 100] Pi}, { 4 Sin[Rational[3, 25] Pi], (-4) Cos[Rational[3, 25] Pi], Rational[381, 200] Pi}, { 4 Sin[Rational[9, 50] Pi], (-4) Cos[Rational[9, 50] Pi], Rational[48, 25] Pi}, { 4 Sin[Rational[6, 25] Pi], (-4) Cos[Rational[6, 25] Pi], Rational[387, 200] Pi}, { 1 + 5^Rational[1, 2], (-4) (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[39, 20] Pi}, { 4 Cos[Rational[7, 50] Pi], (-4) Sin[Rational[7, 50] Pi], Rational[393, 200] Pi}, { 4 Cos[Rational[2, 25] Pi], (-4) Sin[Rational[2, 25] Pi], Rational[99, 50] Pi}, { 4 Cos[Rational[1, 50] Pi], (-4) Sin[Rational[1, 50] Pi], Rational[399, 200] Pi}, { 4 Cos[Rational[1, 25] Pi], 4 Sin[Rational[1, 25] Pi], Rational[201, 100] Pi}, { 4 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 + 5^Rational[1, 2], Rational[81, 40] Pi}, { 4 Cos[Rational[4, 25] Pi], 4 Sin[Rational[4, 25] Pi], Rational[51, 25] Pi}, { 4 Cos[Rational[11, 50] Pi], 4 Sin[Rational[11, 50] Pi], Rational[411, 200] Pi}, { 4 Sin[Rational[11, 50] Pi], 4 Cos[Rational[11, 50] Pi], Rational[207, 100] Pi}, { 4 Sin[Rational[4, 25] Pi], 4 Cos[Rational[4, 25] Pi], Rational[417, 200] Pi}, {-1 + 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[21, 10] Pi}, { 4 Sin[Rational[1, 25] Pi], 4 Cos[Rational[1, 25] Pi], Rational[423, 200] Pi}, {(-4) Sin[Rational[1, 50] Pi], 4 Cos[Rational[1, 50] Pi], Rational[213, 100] Pi}, {(-4) Sin[Rational[2, 25] Pi], 4 Cos[Rational[2, 25] Pi], Rational[429, 200] Pi}, {(-4) Sin[Rational[7, 50] Pi], 4 Cos[Rational[7, 50] Pi], Rational[54, 25] Pi}, {(-4) (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 + 5^Rational[1, 2], Rational[87, 40] Pi}, {(-4) Cos[Rational[6, 25] Pi], 4 Sin[Rational[6, 25] Pi], Rational[219, 100] Pi}, {(-4) Cos[Rational[9, 50] Pi], 4 Sin[Rational[9, 50] Pi], Rational[441, 200] Pi}, {(-4) Cos[Rational[3, 25] Pi], 4 Sin[Rational[3, 25] Pi], Rational[111, 50] Pi}, {(-4) Cos[Rational[3, 50] Pi], 4 Sin[Rational[3, 50] Pi], Rational[447, 200] Pi}, {-4, 0, Rational[9, 4] Pi}, {(-4) Cos[Rational[3, 50] Pi], (-4) Sin[Rational[3, 50] Pi], Rational[453, 200] Pi}, {(-4) Cos[Rational[3, 25] Pi], (-4) Sin[Rational[3, 25] Pi], Rational[57, 25] Pi}, {(-4) Cos[Rational[9, 50] Pi], (-4) Sin[Rational[9, 50] Pi], Rational[459, 200] Pi}, {(-4) Cos[Rational[6, 25] Pi], (-4) Sin[Rational[6, 25] Pi], Rational[231, 100] Pi}, {(-4) (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 - 5^Rational[1, 2], Rational[93, 40] Pi}, {(-4) Sin[Rational[7, 50] Pi], (-4) Cos[Rational[7, 50] Pi], Rational[117, 50] Pi}, {(-4) Sin[Rational[2, 25] Pi], (-4) Cos[Rational[2, 25] Pi], Rational[471, 200] Pi}, {(-4) Sin[Rational[1, 50] Pi], (-4) Cos[Rational[1, 50] Pi], Rational[237, 100] Pi}, { 4 Sin[Rational[1, 25] Pi], (-4) Cos[Rational[1, 25] Pi], Rational[477, 200] Pi}, {-1 + 5^Rational[1, 2], (-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^Rational[1, 2], Rational[12, 5] Pi}, { 4 Sin[Rational[4, 25] Pi], (-4) Cos[Rational[4, 25] Pi], Rational[483, 200] Pi}, { 4 Sin[Rational[11, 50] Pi], (-4) Cos[Rational[11, 50] Pi], Rational[243, 100] Pi}, { 4 Cos[Rational[11, 50] Pi], (-4) Sin[Rational[11, 50] Pi], Rational[489, 200] Pi}, { 4 Cos[Rational[4, 25] Pi], (-4) Sin[Rational[4, 25] Pi], Rational[123, 50] Pi}, { 4 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 - 5^Rational[1, 2], Rational[99, 40] Pi}, { 4 Cos[Rational[1, 25] Pi], (-4) Sin[Rational[1, 25] Pi], Rational[249, 100] Pi}, { 4 Cos[Rational[1, 50] Pi], 4 Sin[Rational[1, 50] Pi], Rational[501, 200] Pi}, { 4 Cos[Rational[2, 25] Pi], 4 Sin[Rational[2, 25] Pi], Rational[63, 25] Pi}, { 4 Cos[Rational[7, 50] Pi], 4 Sin[Rational[7, 50] Pi], Rational[507, 200] Pi}, { 1 + 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[51, 20] Pi}, { 4 Sin[Rational[6, 25] Pi], 4 Cos[Rational[6, 25] Pi], Rational[513, 200] Pi}, { 4 Sin[Rational[9, 50] Pi], 4 Cos[Rational[9, 50] Pi], Rational[129, 50] Pi}, { 4 Sin[Rational[3, 25] Pi], 4 Cos[Rational[3, 25] Pi], Rational[519, 200] Pi}, { 4 Sin[Rational[3, 50] Pi], 4 Cos[Rational[3, 50] Pi], Rational[261, 100] Pi}, { 0, 4, Rational[21, 8] Pi}, {(-4) Sin[Rational[3, 50] Pi], 4 Cos[Rational[3, 50] Pi], Rational[66, 25] Pi}, {(-4) Sin[Rational[3, 25] Pi], 4 Cos[Rational[3, 25] Pi], Rational[531, 200] Pi}, {(-4) Sin[Rational[9, 50] Pi], 4 Cos[Rational[9, 50] Pi], Rational[267, 100] Pi}, {(-4) Sin[Rational[6, 25] Pi], 4 Cos[Rational[6, 25] Pi], Rational[537, 200] Pi}, {-1 - 5^Rational[1, 2], 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[27, 10] Pi}, {(-4) Cos[Rational[7, 50] Pi], 4 Sin[Rational[7, 50] Pi], Rational[543, 200] Pi}, {(-4) Cos[Rational[2, 25] Pi], 4 Sin[Rational[2, 25] Pi], Rational[273, 100] Pi}, {(-4) Cos[Rational[1, 50] Pi], 4 Sin[Rational[1, 50] Pi], Rational[549, 200] Pi}, {(-4) Cos[Rational[1, 25] Pi], (-4) Sin[Rational[1, 25] Pi], Rational[69, 25] Pi}, {(-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], 1 - 5^Rational[1, 2], Rational[111, 40] Pi}, {(-4) Cos[Rational[4, 25] Pi], (-4) Sin[Rational[4, 25] Pi], Rational[279, 100] Pi}, {(-4) Cos[Rational[11, 50] Pi], (-4) Sin[Rational[11, 50] Pi], Rational[561, 200] Pi}, {(-4) Sin[Rational[11, 50] Pi], (-4) Cos[Rational[11, 50] Pi], Rational[141, 50] Pi}, {(-4) Sin[Rational[4, 25] Pi], (-4) Cos[Rational[4, 25] Pi], Rational[567, 200] Pi}, { 1 - 5^Rational[ 1, 2], (-4) (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2], Rational[57, 20] Pi}, {(-4) Sin[Rational[1, 25] Pi], (-4) Cos[Rational[1, 25] Pi], Rational[573, 200] Pi}, { 4 Sin[Rational[1, 50] Pi], (-4) Cos[Rational[1, 50] Pi], Rational[72, 25] Pi}, { 4 Sin[Rational[2, 25] Pi], (-4) Cos[Rational[2, 25] Pi], Rational[579, 200] Pi}, { 4 Sin[Rational[7, 50] Pi], (-4) Cos[Rational[7, 50] Pi], Rational[291, 100] Pi}, { 4 (Rational[5, 8] + Rational[-1, 8] 5^Rational[1, 2])^ Rational[1, 2], -1 - 5^Rational[1, 2], Rational[117, 40] Pi}, { 4 Cos[Rational[6, 25] Pi], (-4) Sin[Rational[6, 25] Pi], Rational[147, 50] Pi}, { 4 Cos[Rational[9, 50] Pi], (-4) Sin[Rational[9, 50] Pi], Rational[591, 200] Pi}, { 4 Cos[Rational[3, 25] Pi], (-4) Sin[Rational[3, 25] Pi], Rational[297, 100] Pi}, { 4 Cos[Rational[3, 50] Pi], (-4) Sin[Rational[3, 50] Pi], Rational[597, 200] Pi}, {4, 0, 3 Pi}}, {{4, 0, 0}, { 3.929149002914755, 0.7495252583428984, 0.047123889803846894`}, { 3.719105943553006, 1.4724982107387117`, 0.09424777960769379}, { 3.3773117020080603`, 2.1433071799159866`, 0.1413716694115407}, { 2.915874509685646, 2.7381884237147545`, 0.18849555921538758`}, { 2.3511410091698925`, 3.23606797749979, 0.23561944901923448`}, { 1.7031171662602909`, 3.619308209864078, 0.2827433388230814}, { 0.9947595486594192, 3.8743326445145243`, 0.32986722862692824`}, { 0.2511620781172535, 3.9921069137130862`, 0.37699111843077515`}, {-0.501332934257217, 3.9684588052579115`, 0.4241150082346221}, {-1.2360679774997898`, 3.804226065180614, 0.47123889803846897`}, {-1.9270146964068613`, 3.5052267201754543`, 0.5183627878423159}, {-2.5496959589947585`, 3.082052971103157, 0.5654866776461628}, {-3.082052971103157, 2.5496959589947585`, 0.6126105674500096}, {-3.5052267201754543`, 1.9270146964068613`, 0.6597344572538565}, {-3.804226065180614, 1.2360679774997898`, 0.7068583470577035}, {-3.9684588052579115`, 0.501332934257217, 0.7539822368615503}, {-3.9921069137130862`, -0.2511620781172535, 0.8011061266653973}, {-3.8743326445145243`, -0.9947595486594192, 0.8482300164692442}, {-3.619308209864078, -1.7031171662602909`, 0.895353906273091}, {-3.23606797749979, -2.3511410091698925`, 0.9424777960769379}, {-2.7381884237147545`, -2.915874509685646, 0.9896016858807848}, {-2.1433071799159866`, -3.3773117020080603`, 1.0367255756846319`}, {-1.4724982107387117`, -3.719105943553006, 1.0838494654884785`}, {-0.7495252583428984, -3.929149002914755, 1.1309733552923256`}, {0, -4, 1.1780972450961724`}, { 0.7495252583428984, -3.929149002914755, 1.2252211349000193`}, { 1.4724982107387117`, -3.719105943553006, 1.2723450247038663`}, { 2.1433071799159866`, -3.3773117020080603`, 1.319468914507713}, { 2.7381884237147545`, -2.915874509685646, 1.36659280431156}, { 3.23606797749979, -2.3511410091698925`, 1.413716694115407}, { 3.619308209864078, -1.7031171662602909`, 1.460840583919254}, { 3.8743326445145243`, -0.9947595486594192, 1.5079644737231006`}, { 3.9921069137130862`, -0.2511620781172535, 1.5550883635269477`}, { 3.9684588052579115`, 0.501332934257217, 1.6022122533307945`}, { 3.804226065180614, 1.2360679774997898`, 1.6493361431346414`}, { 3.5052267201754543`, 1.9270146964068613`, 1.6964600329384885`}, { 3.082052971103157, 2.5496959589947585`, 1.7435839227423353`}, { 2.5496959589947585`, 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2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { 0, -2 + Rational[-1, 2] 3^Rational[1, 2], Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[1, 2]}, { 2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { 0, 2 + Rational[1, 2] 3^Rational[1, 2], Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[1, 2]}, {-2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[1, 2]}, {-2 - 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (-2 - 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2]}, { 0, -2 - 2^Rational[-1, 2], 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (2 + 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { 2 + 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (2 + 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2]}, { 0, 2 + 2^Rational[-1, 2], 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (-2 - 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 - 2^ Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {-2 - 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, { Rational[-5, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 4] 3^Rational[1, 2], Rational[-5, 4], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 2] 2^Rational[-1, 2], Rational[-5, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 4], Rational[-5, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { 0, Rational[-5, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 4], Rational[-5, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 2] 2^Rational[-1, 2], Rational[-5, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 4] 3^Rational[1, 2], Rational[-5, 4], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 4] 3^Rational[1, 2], Rational[5, 4], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 2] 2^Rational[-1, 2], Rational[5, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[5, 4], Rational[5, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { 0, Rational[5, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 4], Rational[5, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 2] 2^Rational[-1, 2], Rational[5, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 4] 3^Rational[1, 2], Rational[5, 4], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-5, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2, 0, 1}, {(-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 1}, {-3^Rational[1, 2], -1, 1}, {-2^Rational[1, 2], -2^Rational[1, 2], 1}, {-1, -3^Rational[1, 2], 1}, {(-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 1}, {0, -2, 1}, { 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2]), 1}, {1, -3^Rational[1, 2], 1}, { 2^Rational[1, 2], -2^Rational[1, 2], 1}, { 3^Rational[1, 2], -1, 1}, { 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 1}, {2, 0, 1}, { 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 1}, { 3^Rational[1, 2], 1, 1}, { 2^Rational[1, 2], 2^Rational[1, 2], 1}, { 1, 3^Rational[1, 2], 1}, { 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 1}, {0, 2, 1}, {(-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 1}, {-1, 3^ Rational[1, 2], 1}, {-2^Rational[1, 2], 2^Rational[1, 2], 1}, {-3^Rational[1, 2], 1, 1}, {(-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 1}, {-2, 0, 1}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[-3, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 4] 3^Rational[1, 2], Rational[-3, 4], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 2] 2^Rational[-1, 2], Rational[-3, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 4], Rational[-3, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { 0, Rational[-3, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 4], Rational[-3, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 2] 2^Rational[-1, 2], Rational[-3, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 4] 3^Rational[1, 2], Rational[-3, 4], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 4] 3^Rational[1, 2], Rational[3, 4], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 2] 2^Rational[-1, 2], Rational[3, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[3, 4], Rational[3, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { 0, Rational[3, 2], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 4], Rational[3, 4] 3^Rational[1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 2] 2^Rational[-1, 2], Rational[3, 2] 2^Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 4] 3^Rational[1, 2], Rational[3, 4], Rational[1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[1, 2] 3^Rational[1, 2]}, { Rational[-3, 2], 0, Rational[1, 2] 3^Rational[1, 2]}, {-2 + 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (-2 + 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { 0, -2 + 2^Rational[-1, 2], 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { Rational[1, 2] (2 - 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { 2 - 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2]}, { Rational[1, 2] (2 - 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { 0, 2 - 2^Rational[-1, 2], 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, { Rational[1, 2] (-2 + 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (2 - 2^Rational[-1, 2]), 2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), 2^ Rational[-1, 2]}, {-2 + 2^Rational[-1, 2], 0, 2^ Rational[-1, 2]}, {-2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { 0, -2 + Rational[1, 2] 3^Rational[1, 2], Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[1, 2]}, { 2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { 0, 2 + Rational[-1, 2] 3^Rational[1, 2], Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[1, 2]}, { Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[ 1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[1, 2]}, {-2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[ 1, 2]}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-1, 0, 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), ( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0}, {Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2], 0}, {-2^Rational[-1, 2], -2^Rational[-1, 2], 0}, { Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2], 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0}, {0, -1, 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), ( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0}, { Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2], 0}, { 2^Rational[-1, 2], -2^Rational[-1, 2], 0}, { Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2], 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), ( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0}, {1, 0, 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), ( Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0}, { Rational[1, 2] 3^Rational[1, 2], Rational[1, 2], 0}, { 2^Rational[-1, 2], 2^Rational[-1, 2], 0}, { Rational[1, 2], Rational[1, 2] 3^Rational[1, 2], 0}, {(Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0}, {0, 1, 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0}, { Rational[-1, 2], Rational[1, 2] 3^Rational[1, 2], 0}, {-2^Rational[-1, 2], 2^Rational[-1, 2], 0}, { Rational[-1, 2] 3^Rational[1, 2], Rational[1, 2], 0}, {(Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0}, {-1, 0, 0}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {-2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 0, -2 + Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 0, 2 + Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {-2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {-2 + 2^Rational[-1, 2], 0, -2^Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (-2 + 2^Rational[-1, 2]), -2^Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (-2 + 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 0, -2 + 2^Rational[-1, 2], -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (2 - 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 2 - 2^Rational[-1, 2], 0, -2^Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), -2^Rational[-1, 2]}, { Rational[1, 2] (2 - 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 0, 2 - 2^ Rational[-1, 2], -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (-2 + 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + 2^Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2]), -2^Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + 2^Rational[-1, 2]), Rational[1, 2] (2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + 2^Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {-2 + 2^Rational[-1, 2], 0, -2^Rational[-1, 2]}, { Rational[-3, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 4] 3^Rational[1, 2], Rational[-3, 4], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 2] 2^Rational[-1, 2], Rational[-3, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 4], Rational[-3, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { 0, Rational[-3, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 4], Rational[-3, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 2] 2^Rational[-1, 2], Rational[-3, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 4] 3^Rational[1, 2], Rational[-3, 4], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 4] 3^Rational[1, 2], Rational[3, 4], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 2] 2^Rational[-1, 2], Rational[3, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[3, 4], Rational[3, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { 0, Rational[3, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 4], Rational[3, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 2] 2^Rational[-1, 2], Rational[3, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 4] 3^Rational[1, 2], Rational[3, 4], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-3, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[3, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-3, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2, 0, -1}, {(-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), -1}, {-3^Rational[1, 2], -1, -1}, {-2^ Rational[1, 2], -2^Rational[1, 2], -1}, {-1, -3^ Rational[1, 2], -1}, {(-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), -1}, {0, -2, -1}, { 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2]), -1}, {1, -3^Rational[1, 2], -1}, { 2^Rational[1, 2], -2^Rational[1, 2], -1}, { 3^Rational[1, 2], -1, -1}, { 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), -1}, {2, 0, -1}, { 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), -1}, { 3^Rational[1, 2], 1, -1}, { 2^Rational[1, 2], 2^Rational[1, 2], -1}, { 1, 3^Rational[1, 2], -1}, { 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), -1}, {0, 2, -1}, {(-2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (1 + 3^Rational[1, 2]), -1}, {-1, 3^ Rational[1, 2], -1}, {-2^Rational[1, 2], 2^ Rational[1, 2], -1}, {-3^Rational[1, 2], 1, -1}, {(-2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 2^Rational[-1, 2] (-1 + 3^Rational[1, 2]), -1}, {-2, 0, -1}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (( Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])}, { Rational[-5, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 4] 3^Rational[1, 2], Rational[-5, 4], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 2] 2^Rational[-1, 2], Rational[-5, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 4], Rational[-5, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { 0, Rational[-5, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 4], Rational[-5, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 2] 2^Rational[-1, 2], Rational[-5, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 4] 3^Rational[1, 2], Rational[-5, 4], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 4] 3^Rational[1, 2], Rational[5, 4], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 2] 2^Rational[-1, 2], Rational[5, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[5, 4], Rational[5, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { 0, Rational[5, 2], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 4], Rational[5, 4] 3^Rational[1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 2] 2^Rational[-1, 2], Rational[5, 2] 2^Rational[-1, 2], Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 4] 3^Rational[1, 2], Rational[5, 4], Rational[-1, 2] 3^Rational[1, 2]}, {(Rational[-5, 4] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[5, 4] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2]), Rational[-1, 2] 3^Rational[1, 2]}, { Rational[-5, 2], 0, Rational[-1, 2] 3^Rational[1, 2]}, {-2 - 2^ Rational[-1, 2], 0, -2^Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (-2 - 2^Rational[-1, 2]), -2^Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (-2 - 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 0, -2 - 2^ Rational[-1, 2], -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (2 + 2^Rational[-1, 2]), (Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2]), 2^Rational[-1, 2] (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 2 + 2^Rational[-1, 2], 0, -2^Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^ Rational[-1, 2]), Rational[1, 2] (2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2]), -2^Rational[-1, 2]}, { Rational[1, 2] (2 + 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { 0, 2 + 2^Rational[-1, 2], -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, { Rational[1, 2] (-2 - 2^Rational[-1, 2]), (Rational[-1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 - 2^ Rational[-1, 2]), (-2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2]), -2^Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 - 2^Rational[-1, 2]), Rational[1, 2] (2 + 2^Rational[-1, 2]), -2^ Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 - 2^ Rational[-1, 2])) (-1 + 3^Rational[1, 2]), -2^ Rational[-1, 2]}, {-2 - 2^Rational[-1, 2], 0, -2^Rational[-1, 2]}, {-2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 0, -2 + Rational[-1, 2] 3^Rational[1, 2], Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 2 + Rational[1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { 0, 2 + Rational[1, 2] 3^Rational[1, 2], Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), Rational[-1, 2]}, { Rational[1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), ( Rational[-1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, { 2^Rational[-1, 2] (-2 + Rational[-1, 2] 3^Rational[1, 2]), (-2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2]), Rational[1, 2] (2 + Rational[1, 2] 3^Rational[1, 2]), Rational[-1, 2]}, {((Rational[1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (1 + 3^Rational[1, 2]), ((Rational[-1, 2] 2^Rational[-1, 2]) (-2 + Rational[-1, 2] 3^Rational[1, 2])) (-1 + 3^Rational[1, 2]), Rational[-1, 2]}, {-2 + Rational[-1, 2] 3^Rational[1, 2], 0, Rational[-1, 2]}, {-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, -2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), 0, (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {(-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[1, 2] ( 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 0, 2 + (Rational[1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2]), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, {((Rational[1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])), ((Rational[-1, 2] 2^Rational[-1, 2]) ( 1 + 3^Rational[1, 2])) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { Rational[ 1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 3^Rational[1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, { 2^Rational[-1, 2] (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (-2^ Rational[-1, 2]) (-2 + (Rational[-1, 2] 2^Rational[-1, 2]) (1 + 3^Rational[1, 2])), (Rational[-1, 2] 2^Rational[-1, 2]) (-1 + 3^Rational[1, 2])}, 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A tick appears in the \ left hand column. 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2 + 3 Cos[Rational[7, 50] Pi]}, { Rational[246, 25] Pi - 3 Sin[Rational[2, 25] Pi], 2 + 3 Cos[Rational[2, 25] Pi]}, { Rational[249, 25] Pi - 3 Sin[Rational[1, 50] Pi], 2 + 3 Cos[Rational[1, 50] Pi]}, { Rational[252, 25] Pi + 3 Sin[Rational[1, 25] Pi], 2 + 3 Cos[Rational[1, 25] Pi]}, { Rational[-3, 4] (1 - 5^Rational[1, 2]) + Rational[51, 5] Pi, 2 + 3 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^ Rational[1, 2]}, { Rational[258, 25] Pi + 3 Sin[Rational[4, 25] Pi], 2 + 3 Cos[Rational[4, 25] Pi]}, { Rational[261, 25] Pi + 3 Sin[Rational[11, 50] Pi], 2 + 3 Cos[Rational[11, 50] Pi]}, { Rational[264, 25] Pi + 3 Cos[Rational[11, 50] Pi], 2 + 3 Sin[Rational[11, 50] Pi]}, { Rational[267, 25] Pi + 3 Cos[Rational[4, 25] Pi], 2 + 3 Sin[Rational[4, 25] Pi]}, { 3 (Rational[5, 8] + Rational[1, 8] 5^Rational[1, 2])^Rational[1, 2] + Rational[54, 5] Pi, 2 + Rational[-3, 4] (1 - 5^Rational[1, 2])}, { Rational[273, 25] Pi + 3 Cos[Rational[1, 25] Pi], 2 + 3 Sin[Rational[1, 25] Pi]}, { Rational[276, 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6] (3 + 5^Rational[1, 2]))^Rational[1, 2], ( Rational[1, 15] (5 - 2 5^Rational[1, 2]))^Rational[1, 2]], Geometrica`CPoint[(Rational[1, 30] (5 - 5^Rational[1, 2]))^ Rational[1, 2], -(Rational[1, 6] (3 + 5^Rational[1, 2]))^ Rational[1, 2], Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2], -3^Rational[-1, 2], ( Rational[1, 15] (5 - 2 5^Rational[1, 2]))^Rational[1, 2]]], Geometrica`Segment[ Geometrica`CPoint[(Rational[1, 30] (5 + 5^Rational[1, 2]))^ Rational[1, 2], Root[ 1 - 9 #^2 + 9 #^4& , 2, 0], ( Rational[1, 15] (5 + 2 5^Rational[1, 2]))^Rational[1, 2]], Geometrica`CPoint[(Rational[1, 30] (5 + 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 6] (3 - 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[ Root[1 - 30 #^2 + 45 #^4& , 2, 0], 3^ Rational[-1, 2], (Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[ Root[16 - 60 #^2 + 45 #^4& 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5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[ Root[1 - 30 #^2 + 45 #^4& , 2, 0], 3^ Rational[-1, 2], (Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[(Rational[1, 30] (5 + 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 6] (3 - 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2]]], Geometrica`Segment[ Geometrica`CPoint[(Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2], 3^ Rational[-1, 2], (Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[(Rational[2, 15] (5 + 5^Rational[1, 2]))^ Rational[1, 2], 0, Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[2, 15] (5 - 5^Rational[1, 2]))^ Rational[1, 2], 0, Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[(Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2], 3^Rational[-1, 2], Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[(Rational[1, 30] (5 - 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 6] (3 + 5^Rational[1, 2]))^ Rational[1, 2], Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2], 3^ Rational[-1, 2], (Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2]]], Geometrica`Segment[ Geometrica`CPoint[(Rational[2, 15] (5 + 5^Rational[1, 2]))^ Rational[1, 2], 0, Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[1, 15] (5 + 2 5^Rational[1, 2]))^ Rational[1, 2], -3^Rational[-1, 2], ( Rational[1, 15] (5 - 2 5^Rational[1, 2]))^Rational[1, 2]], Geometrica`CPoint[(Rational[1, 30] (5 - 5^Rational[1, 2]))^ Rational[1, 2], -(Rational[1, 6] (3 + 5^Rational[1, 2]))^ Rational[1, 2], Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2], -3^Rational[-1, 2], Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[(Rational[2, 15] (5 - 5^Rational[1, 2]))^ Rational[1, 2], 0, Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[(Rational[2, 15] (5 + 5^Rational[1, 2]))^ Rational[1, 2], 0, Root[1 - 30 #^2 + 45 #^4& , 2, 0]]], Geometrica`Segment[ Geometrica`CPoint[ Root[ 1 - 15 #^2 + 45 #^4& , 2, 0], ( Rational[1, 6] (3 + 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2]], Geometrica`CPoint[(Rational[1, 30] (5 - 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 6] (3 + 5^Rational[1, 2]))^ Rational[1, 2], Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[(Rational[1, 15] (5 - 2 5^Rational[1, 2]))^ Rational[1, 2], 3^Rational[-1, 2], Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[-(Rational[1, 30] (5 + 5^Rational[1, 2]))^ Rational[1, 2], (Rational[1, 6] (3 - 5^Rational[1, 2]))^ Rational[1, 2], Root[1 - 30 #^2 + 45 #^4& , 1, 0]], Geometrica`CPoint[ Root[1 - 30 #^2 + 45 #^4& , 1, 0], 3^Rational[-1, 2], Root[1 - 30 #^2 + 45 #^4& , 2, 0]], Geometrica`CPoint[ Root[ 1 - 15 #^2 + 45 #^4& , 2, 0], ( Rational[1, 6] (3 + 5^Rational[1, 2]))^ 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All the \ vertices lie on the curve. The PRange option provides the end parameters and \ thus the end points, and the number of definition points n. The polygonal \ line has thus n-1 sides. As the intersection of two point segments is coded, \ the intersection of two polygonal lines can be found. Though useful in a \ first approach, that technique is less precise than the numerical algorithms \ coded in ", StyleBox["Mathematica", FontSlant->"Italic"], ". Moreover, the intersecting point is just one characteristic of the \ intersection. One may wish to determine the local properties of each curve at \ the intersection such as tangent, normal or curvature. For that reason, the \ complete information is provided by the values of the parameters of each \ curve at the intersection. Therefore, it is relevant to have another function \ which returns the precise parameterss at the intersection.\nThe concept of \ dynamic intersections consists of providing the user with a graph of the two \ curves and with cursors which displace the point bound to each curve. The \ user manipulates the two points until they coincide near the wanted \ intersection. That almost common position defines a first approximation to \ the precise solution obtained by clicking a button \ \[OpenCurlyDoubleQuote]Solve\[CloseCurlyDoubleQuote]. If the curves have \ several intersections, the operation can be repeated for any intersection and \ the intersection parameters are returned in a dynamic list. The example deals \ with the intersection of an epitrochoid ep with a spiral sp. \nThe upper \ cursor displaces the blue point of the spiral and the lower cursor displaces \ the red point of the epitrochoid. After choosing the point of coincidence of \ the two cursors, one presses the button Solve and the parameters of \ intersection are displayed. 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It provides a game environment \ to treat the problems and animations are quickly prepared in many cases as it \ was shown for kinematic curves. The access to data bases is straightforward \ and the data can be exploited locally for further applications. Problems such \ as complicated intersections can be given a simple configuration and solved \ with a satisfactory precision. 3D applications are also within the access \ range of interactivity. The function Strip is to surfaces what Arc is to \ curves. However, manipulating surfaces may lead to excessive computing times.\ \ \>", "Text", CellChangeTimes->{{3.514308661619236*^9, 3.514308664754455*^9}, { 3.614421274617443*^9, 3.614421295288945*^9}, {3.6144213378579607`*^9, 3.614421427087653*^9}, {3.614421457648284*^9, 3.6144214687682133`*^9}, { 3.614421514284506*^9, 3.614421638381495*^9}, {3.614421670963141*^9, 3.614421799319488*^9}, {3.614421846832789*^9, 3.614422054310543*^9}}] }, Open ]], Cell[CellGroupData[{ Cell["Acknowledgments", "Section", CellChangeTimes->{ 3.483202458955147*^9, {3.514308863196991*^9, 3.5143088633311243`*^9}, { 3.614419904965561*^9, 3.614419908433597*^9}, {3.621865959072901*^9, 3.6218659681002703`*^9}}], Cell["\<\ I am grateful to Luc Barthelet who suggested the syntax of the dynamic \ functions.\ \>", "Text", CellChangeTimes->{{3.514308661619236*^9, 3.514308664754455*^9}, { 3.614421274617443*^9, 3.614421295288945*^9}, {3.6144213378579607`*^9, 3.614421427087653*^9}, {3.614421457648284*^9, 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