(************** Content-type: application/mathematica ************** CreatedBy='Mathematica 5.2' Mathematica-Compatible Notebook This notebook can be used with any Mathematica-compatible application, such as Mathematica, MathReader or Publicon. The data for the notebook starts with the line containing stars above. To get the notebook into a Mathematica-compatible application, do one of the following: * Save the data starting with the line of stars above into a file with a name ending in .nb, then open the file inside the application; * Copy the data starting with the line of stars above to the clipboard, then use the Paste menu command inside the application. Data for notebooks contains only printable 7-bit ASCII and can be sent directly in email or through ftp in text mode. Newlines can be CR, LF or CRLF (Unix, Macintosh or MS-DOS style). NOTE: If you modify the data for this notebook not in a Mathematica- compatible application, you must delete the line below containing the word CacheID, otherwise Mathematica-compatible applications may try to use invalid cache data. For more information on notebooks and Mathematica-compatible applications, contact Wolfram Research: web: http://www.wolfram.com email: info@wolfram.com phone: +1-217-398-0700 (U.S.) Notebook reader applications are available free of charge from Wolfram Research. *******************************************************************) (*CacheID: 232*) (*NotebookFileLineBreakTest NotebookFileLineBreakTest*) (*NotebookOptionsPosition[ 960269, 13639]*) (*NotebookOutlinePosition[ 1053173, 16677]*) (* CellTagsIndexPosition[ 1052401, 16655]*) (*WindowFrame->Normal*) Notebook[{ Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgLZ@0>olBMZOo5WJSoaYjXolJNZ?o6WJSoaYfWolJMZ?o6WZOoaYfXolJN Z?o4W:[oa9^XolFLZ?o4VjP2ol>JZ@0;ol:IZOo3V:So`iVWol:GYoo1UjSo_YJ[ol2GZonmUJko_I>] oknEZOo1UZL00_o1UJL02_o0UZSo_YBXokZ@ZOnjT:Wo_i:Wok^?[Oo0UJ?obi^Fok>9YOn^PjT2ok66 Y`07ok25Z?n^QJSoZ86[ojAn[On[PjSo/8NTok>:XP03ok:9XP0:ok>9X_nbRJ;o[8FTojR3Y_nWPjSo ZhVUojn:XOnbRJ;o/8VSok:9XP;o/h^R01ko/hZRok>=XOncSZ3o/XfOokF?V_nbS9go]8fLokF=Vone SY_o]92Jok>@VoneSi_o]I6Kok>@W?ndTISo]Y6Gok6?V_ndTYGo/i>EokJCU_nfU9Ko]iBEok>BV?n/ SiWo]Y:HonB/Q?om^W_ookYjoonkN_oo^WX2oonkNP08oonjN_oo^g[ookYjoonjN_oo^g[ookYjoonk N_oo^WX3oonkNP?ookYj1Ooo^gX01Ooo^W[ook]joonkN_oo^g[ookYj00Cook]j0_oo^WX5oonkNP;o okYj0_oo^gX01Ooo^W[ook]joonkN_oo^W[ook]j00CookYj1?oo^gX2oonjNP;ook]j0ooo^WX3oonk NP05oonkNooo^g[ook]joonkN_oo^WX01Ooo^gX00ooo^W[ook]joonjNP02oonkNP03oonjN_oo^g[o okYj00;ookYj0_oo^gX2oonjNP03oonkN_oo^W[ookYj00?ookYj00?ook]joonjN_oo^gX02ooo^gX0 1?oo^W[ook]joonjN_oo^gX3oonjNPCook]j1_oo^WX01?oo^g[ookYjoonjN_oo^WX5oonkNP04oonj N_oo^g[ookYjoonjNP;ook]j0_oo^WX00ooo^g[ookYjoonkNP02oonkNP?ookYj0_oo^gX01?oo^W[o ok]joonkN_oo^WX2oonkNP03oonjN_oo^g[ook]j00Kook]j00?ookYjoonkN_oo^gX00_oo^gX2oonj NP;ook]j0_oo^WX2oonkNP03oonjN_oo^g[ook]j00;ookYj0_oo^gX01?oo^W[ook]joonkN_oo^WX2 oonkNP?ookYj00Kook]joonjN_oo^g[ookYjoonkN_oo^WX3oonkNP;ookYj1Ooo^gX00ooo^W[ook]j oonkNP02oonkNP;ookYj0_oo^gX01ooo^W[ook]joonjN_oo^g[ookYjoonkN_oo^WX01Ooo^gX01Ooo ^W[ook]joonjN_oo^g[ookYj00Cook]j0_oo^WX00ooo^g[ookYjoonjNP02oonjNPCook]j00CookYj oonkN_oo^W[ookYj0ooo^gX00ooo^W[ook]joonjNP02oonjNPCook]j00?ookYjoonkN_oo^gX00_oo ^gX00ooo^W[ook]joonjNP02oonjNPGook]j00?ookYjoonkN_oo^WX01Ooo^gX2oonjNP;ook]j0_oo ^WX2oonkNP04oonjN_oo^g[ook]joonjNP;ook]j00?ookYjoonkN_oo^gX00_oo^gX00ooo^W[ook]j oonkNP02oonkNP06oonjN_oo^g[ook]joonjN_oo^g[ookYj0_oo^gX3oonjNP?ook]j0_oo^WX00ooo ^g[ookYjoonkNP02oonkNP;ookYj0_oo^gX01ooo^W[ook]joonjN_oo^g[ookYjoonkN_oo^WX01Ooo ^gX01Ooo^W[ook]joonjN_oo^g[ookYj00Cook]j00?ookYjoonkN_oo^gX00_oo^WX2oonkNP07oonj N_oo^g[ookYjoonkN_oo^W[ook]joonjNP05oonkNP05oonjN_oo^g[ookYjoonkN_oo^WX01?oo^gX2 oonjNP03oonkN_oo^W[ookYj00;ookYj1?oo^gX01?oo^W[ook]joonjN_oo^WX3oonkNP03oonjN_oo ^g[ookYj00;ookYj1?oo^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ookYj00;ookYj1Ooo ^gX00ooo^W[ook]joonjNP05oonkNP;ookYj0_oo^gX2oonjNP;ook]j00CookYjoonkN_oo^g[ookYj 0_oo^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00KookYjoonkN_oo^g[o okYjoonkN_oo^WX2oonkNP?ookYj0ooo^gX2oonjNP04oonkN_oo^W[ook]joonjNP;ook]j0Ooo^WX1 oonkNP7ook]j003ooooFMPgoomIf01goomQdoo?RJooVjVGom>iGooo`BOoolTGooO55ooc`A?okkTKo nna:oocZCookjE7ooNM?oogSC?ong4CoomDkoooC=Oooe3Coom=_ooacSool4ioojk>ool]Cgo oK4ooo^_@_ol[4Conja7oo^/B002ooZ[B00FooZ/Aook[4Konja5oo^/AOojZdConja4ooZ[A?ok[4Co nZ]4oo^/A?oj[4Conja5oo^/A_oj[TSoo:]3oonY@_ooZdOoojQ4oonWAOoo[4;oojhloonZ@0;oojI3 00SoojI2oonV@oooZ4GoojY5oonYAOooZ4CoojU3oonYA@;oojQ400?oojM3oonXA?ooZ4D00oooZ4D0 2OooZ4KoojQ3ooZ/AoojZDOookI@ooo?DooocE?oo[HfoobW9P02ooj/:@0Boob/:OolZRSoo:PXoofY :?ooZb[oojHYoofW9_om[2Woo:XXooVV9Oom[cGool1Hooo7J?ooaFCool=Pooo6IOoocVkoomEe6?oo eWH01_oofWOooMedoo[BJoohbV7on]Yoo3[ZOoa:nVolNaY?o7/:Go aZnUolN_Y@;oaZnV01;oa[2VolF^Yoo2ZjOoa:fUol>/Y_o4[JGoaZjTol>/YOo2ZJGo`j^Uol:ZYOo1 ZJKo`:RXoknXZOnlYJ_o_JFYol2WYOo1Z:@2ol6XY@0:ol2WYOnmYJKo^Z:WokVPYonmXjGo^Z2Zol2W X?o:/I?o/i^RojnFY@;o/IRU00Oo/9RUojjFY_nZU:SoYI6ZojVCYon^V:;o/Y^O00;o/Y^P00co/Y^O ok6JX?naVZ3o/9ROojfFXOnVTJGoYYBTojjKXOnbW:3o/Y^Ook2JX?nbW9l2ok>MW`09ok:MWoncWigo /j2LokFRV?ndX9[o/IfKokFPVOndWiWo/j6I00;o]::I00Go]J:IokBRVOneXiGo]jBDok:PUP02okBT U009ok>ST_ngYi?o]JFDokNVTondY9Co[YnDok>TTOo=]H_ol/ek0?ooomIfk?ooeWH00?ooomIf3_oo eWH08OonfG;ol>=YonCXIoo_jUkoo>m>ooo`A_oolTOoo_97oogbA?oml4Goo>e7oo[[C?ojj5;onnAD ookQE?onge3oomU8oooE?_ooe3KoomDcoooF=?ooecGoomLhooo@>?oobCOool8fooji>ool/ckoo:m0 oob]@_ok[D?onja5oo^[B002ooZ[B@0=ooZ/B?ok[4Oonje7oo^/A_ok[DKonja5oo^]A_oj[TWoo:e5 oonX@OooZDKoojU5oonYA002oonXA@05oon/?_oo[c[oojTooonXA?ooYd<00_ooZ4@01?ooZDGoojU6 oonYAOooZD<3oonXA@03oonY@oooZ4CoojQ400GoojQ400[ooJU2ooV/BOolZT[oolEBooo@E?ooaD[o oZXZoojX9oonZRWooJ/Y0_olZbP04?olYbKooJXWoojY:OooYBWooZHWooj/:OolZRSonjLUoof/^Z@02ol:^Z`0LolB_Z?o4[ZKo`jfVol:]Yoo3[JKoa:jVolJ_Y_o6[jGo aZnVolF^Yoo5[jOoaJjWolJ_Y_o2ZjOoa:fUol>/Y_o4[JGoaJfUolB]YOo1ZJKo`ZVUoknXY_o0ZJOo `ZZVokjWZOnmYJ_o_ZJXol2WY@Co`JRU00Wo_JBVokfRY_nlXJKo^j6VokbPZ_o0YZ;ob:nDokBKXOn^ UJH00onaV:D02?n^UZKo[9FWoj>?ZonXTZOo[YNRok:JX?ncVioo/Y^P0_nbVil0:OncVioo/YVOok:I Won[U:;oXXnXojZGY?naWJ3o/YbOok:KWonaVj3o/YbPok>MWoncW9oo/ijNok>PW?neXIWo]J2Hok6M VonbWI_o/inJok:OVondXYWo]:>IokFSV?ncXiWo]J>EokRUU?ndXIGo/Z6EokJVTonbXi?o]:BAokNV TonfYI?o]JBDokBTTonZWiGoXiZJokfYT?oZbGcoo]If0?ooomIfj_ooeWH00?ooomIf3oooeWH06?om fW7ok^EXonCXJOo/jF?omniDooo`BOonl4Woo?9:ookbB?onlDOoo_55ooc`@oomkDCoo>]9oocYDOom iEOooN5GoogJDOondTSooldnooo==_ood3?oom8coooC=0;oomDf01?oom0eooo9=?ooaCKool4goojk >_ol]Skoo;=2oo^_@ool[DGoo:e6oo^]B?oj[4[onZa9ooZ/B?oi[T[onje6oojX@?ooZDGoojU400Co ojQ400KoojU2oon`??oo[S_ooj`noonY@_ooYd@2oonXA0;oojY50_ooZ4@00oooZ4GoojQ4oonXA@04 oonXA@;oojQ401koojM5oofX@_oj[DWonjM6ooniD_ooce;ooleEoonj??onYRKooZXYooj[:?onZbWo oJ/Yoo^Y:?olZ2SooZXWoonZ:OooYROooJPWoof[:Oom[2WonZPUoob[:oon^4_oolETooo7Ioooa6?o ol9Qooo8IooodG4>oooFMP04ookFMooedG_omM5koo_DN0OoomIf00OoomMfoooIM?ooefcoomEOoooC FOoocecooVoknSYOnnXZGo^j:Vok^PZonoYJ?ob[6CokFLX?n]TjOo/YRT00;o/IRU 00Ko[iRUoj^EYonTSj_oYY6ZojfEY?naVZ02ok:KX00/ok>KWonbVZ3o/Y^Ook6JX?ncVYoo[iJPojB? YonUTZGo[9VSok6MX?nbW9oo/YbPok6KX?n`Vj7o/ifOok>NW_ncX9co]:6IokFOVOndWiWo/9bLokBO VondX9_o]Z:HokFRVOndXiWo]::IokFSUOngXiGo]J:Eok6PU_nfYI;o]JBCok6RT_nfYY7o]ZJCok>S U?ndY9?o[j:EojZOUOn[WY;o]ZJ=omVmP?ogdGOooooFM^WoomIf003ooooFMQ3oomIf01[ooM]_on_V IOoVifWoj^MWoo7/F_omkdcooo58oogbBOollT[oo_9:ookbBOoolTSooo15ook^@oolkDKon^Y=oo[W Eooli5cooN9LookLEoooeDcooli0ooo<=_oocS;oollaoooB=0;oom?oodCSooldh ooo7=ooo`SSoo[djoofj?_ol]47oo;13oo^_A_ok[TSooJTooonWA?ooYdD00_ooZ4@04_ooZDCoojQ4 oonXA?ooZ4Cooj`ooon`>ooo[c_ooj/koonY@_ooZDGoojQ5oonXA?ooZTGoojU4oonWA?ooYd?oojQ3 oonXA0KoojQ5023oojU6oojV@_okZTKonJ]8oon_C?oob5Koo/mFooo7D?om[Rgoo:PWooj/:OomZRWo oZXYoofZ:Oom[2SooJ/YoofZ:?onZ2SooZ@VoobW9_omZbWoo:XYooZX9OojY2Koo[HOolcV7onleQ0oojcF803ookdf3on;MVoobGUOooW9gooYjGoonOV?onWYKo oYRCoon?TOooS9GoohnIoon?VoooRJ3ooj^8oooEMP0:oooFMP0JookEMoojdWWollinonG5R?oE^i?o bkFOolJaY_o5/J[oa[:[olJbZOo7/ZKob;BUolVdYOo6/ZSoaK6YolB`ZOo2[jWo`ZjZol:^ZOo3[jWo a:nZol:]Zoo3[ZWo`ZjXol>^Yoo4[ZL2ol:]Z@03ol6/ZOo2[JOoaZnV00;oak2U00Soa[2UolJ^YOo4 [JGo`jbVol:/Y_o4[JGoa:fVol>[YP;o`jZU00Oo_ZRXol2YZ?o2ZZOo_ZNZokZS[?nnYZOo`:NU00?o `JRU01Co_ZFVokjRY_nnXjGo_J:VokbRYOnkX:_o_:>UolZaToniX9ko/9BVok2FYOn`UjGo/IRUok2G YOn]UZKoYI6Zoj6>[?nYTZOo/9VPokBLW`?o/IZP00_o/Y^Pok2IXOnbVZ3o[iFQojfCX_n]UIooZ9BT ojfJXon`W:3o/I^Pok>MW`02ok6KX008ok>MW_ncXI_o]:6HokJPV?ndWiWo/IfLok2LW_neX9X2okFR V@0EokBRVOndXYSo]J:EokFRUOnfXiGo/Z6FokBSTonfYI?o]:>Dok>ST_naY9?o/Z:Eok>STon^XIGo [j6DokBST?nYWICoYI^Eol^cPoo]bWSoo=Ag0?ooomIfioooeWH00?ooomIf4OooeWH01_ojg6koj^MW onKWJ?oYiVSok^YPooW_D0;ooo1800?ooO5:oocaB?omlDP00_onl4T07oonl4Koo^m1ook_?_olkD?o nnY=oo_XF?oliUoonn5PoogJFoooe53ooli5ooo=>_oocCCoolhboooA?ooe3Woom0iooo<>OonaC_oo[Lkoon^@Ooo[DCooj]2oonY@oooZD@00_ooZ4@01OooZ4Go ojM5oonZ@ooo[Sgoojll00;oojhk00Kooj]2oonYAoooZ4CoojU4oonZA?ooZD<4oonXA0GoojQ500co ojU6oonV@_okZ4?onJe:oo^YAooo_5Coo/eFooo>E_on_d?oo:PWoofZ:?omZbT2oojZ:@0Cooj[:?om ZbWoo:TYoobX:?onYbOooZHVoobW9_olZBWoo:/Yoo^W9_olYRGoo[0gooo0FOoob6SoolMWooo4H_oo `f;ool]ZoooCLP09oooFMP12oooFNOooeXgoo=J?oo_DPoo`cH[ogL:FolZfX?ncYjGoYj>Vok6XX_nm [ico`k>JolFcUoo;]Y;oe;f=on;6QOoXah?ohLB7olZhTOo4]9;oekanomnnLooR`77ohkmaonO2L?o[ aFcoklIYoo?:IoodbVKom<]UooSV1?o8/jD03?o8/jKoak:XolJb ZOo6/JSoaK2Wol>_Z_o2[Z[o`Zj[ol>^Z_o3[Z_o`Zj[ol6]ZP;o`ZjX01;oa:jWol>^Yoo2[JOo`JbW ol>]Y_o6[jGoak2UolJ_YOo5[ZGoaJfUolB]YOo2ZjKoa:bUolF^YOo4[:Go`jZUol:ZY_noZ:P2ol6Y Y`04okjVZ_niXJgo_jNVol2XY@;o`JRU01Oo_jNUokjSY_o1Y:Go_Z:VokfRY_nlXZKo_:2ZokbQYOo9 /9Co^Z2Nok2CYon`UjGo/INTok6HYOn`V:Go[YNVojRCZOnPSJgoY8nZojjFX_neWIgo/YZPok:KW`02 ok:KX008ok:JX?n`V:7o[iFTojfDY?n`Uigo/9VMojVEY?n_Vj82ok2KX00Rok>MWonaVj3o/I^Pok:N W?neXISo]9nIokBOV_ncWico/9bNok:NWOneXiWo]J>HokBRVOncXYSo]J>DokJSU?nfXiGo]:>Eok:R UOnfYI;o]ZFCok:RUOn_XI?o/:6Eok:SUOnbXi;o/::Bok>ST_naXi;o[:2DojVLTonjZ8WocKF7onc9 O_ooomIfi_ooeWH00?ooomIf4_ooeWH08?ofgFooinQVonSWJ?oYiV[oj^QTooC]E_onl4Wooo18ooka BoollD[oo?58oogaB?onl4Wooo5UAooWWFoojiV7onn=SookM G_ooee?oolm7ooo;>_oobS?ooldaooo?Oooa43ooke1 oonl?ooo^D3ookM1oonc@Ooo[d3ooje3oonZA?ooZDGoojM5oonX?ooo[S_oojdloon/>_oo[C_ooja1 oonZAOooYdCoojQ200;oojU300?oojU4oonYAOooZDD01OooZ4D03_ooYdGoojQ6oojX@?oj[TWon:Q6 ooj_C_oob5Soo/mEooo:Doon/S?oo:LVooj/:OomZBWooZTY0oonZbT04_olZRWooZXYoonW:OomYBKo njHUooZ[:?ol[2SooZXXoojW9_on[S7ookeCooo6I_ooafOoolASooo3HOooafKoom1_oooFM@SoomIf 05[oom>8ooc1Z?oodiWoom^:ookJR?omf8kok/^IolneY_n_YJooYj6aojjU[oneZZco^ZbYokJZYonc Z:So^jfVol6`Woo4/Y_o_[2Qok:YZonWWjooZYnXojfPX?n`Xioo/ZBMokJUV?nnZY?o`:f@ol>^Soo6 /8_obK67olbbQ_o?]X;od;N1omFIXOoOQ[Sohh^don>b[_o4 /Z[oaK6XolJaYoo7/ZKob;>UolRcY_o7/ZKoak>VolRcY_o7/jKoa[:WolJbZOo6/J[oa[:ZolJbZOo3 /:_o`Jj]ol6][?o1[J_o`Zj[ol>_Z_o3[ZWo`ZjWol>^Y_o4[ZKoaJnVol:]Yoo2[:Oo`ZfVol>]Y_o4 [ZH2olJ_Y@;oa:fU01_o`Z^VolB]YOo5[ZGo`j^Uol>ZYOo1ZJOo`:ZWol>[YOo1ZJKo_JF[okZR[?nn YZKo`:NUol6XYOnoYjGo_ZFVoknTY_o0Y:Go_J:VokjSYOnnXZKo_9nZokfQYOo6[YKo^Z6Nok2CY_n` UJD00_n`UjD02OnaV:Go[iRUojVDZ?nOS:goX8b/ojbEY?ndViko/i^Pok6KX002ok:KX00Ook:KWon` V:;o[iFUojjDXon^UYko]9bKojjHWonZUjCo/9bQok2LX?n`Vj3o/YbPok6KX?n`WIko]J:GokFPV?nb WY_o/ijLok>OW?n`W9ko/j2KokJSV?neXiWo]:>GokNTU?nfXiGo]j>DokFSUOndXiGo]ZNCokJVT`02 ok2QUP0=ok6RTonbXi?o/Z>CojfPU?n_XYCo/:>Cok2RT_n_XI7o[9nBojNLTon_XI?og/20oo_DMP3o oooFM^CoomIf003ooooFMQ?oomIf023olmm^onSXI_oYifOoj>IYonWWJ?o_k5gonnm=ooo_Aoonl4[o o_5;ookbBOollDOooO56ookaA_onlDWoo_1;ooo`B_oolDCoonlooo_/?oojjTOonNQBooOVGOohiF?o nN5UoogMH_onf5Soom5:ooo;?_oocCOool`aooo<_oo^3oook/moonm?Ooo _3oookhooono?ooo_cgook`ooonh@?oo]D3ook51oon^@Ooo[c_oojljoon/?Ooo[Scoojhnoon/?ooo ZD400oooZ4@3oonYA00YoonYAOooZ4CoojM4oonVA?ooZ4CoojM4oonYAoooYd;onj]5ooV/B?ojZ4Wo okaFooo>EOoocUOool=9oofZ:?omZBOooJXYoofY:OonZRWooZ/YoojZ:Oon[2Woo:XYoofY:OooZ2Wo oZHUoo^V9OokZbOoo:/Woon[:OooZBOooJT[oojhAoooaF7oolMWooo5Hooo`f7oolESoooEoooHSOoofX[ooMJ>ono`[?o5/Jgoa[:/olNcZoo6/j[oaK>YolJcZ_o6/jSo ak>WolJcZOo6/jOoa[:WolBaZ?o6/JL3olNbY`0IolNcYoo8/jKoak:VolJcZ?o6/J[oaK6ZolJbZ?o6 /JWo`k2/ol:_Z_o2[ZWo`Jf[ol>^ZOo4[jOo`jjWolB^Y_o3[ZKoa:jVol:]Yoo2[:Oo`ZbVol6/Yoo2 [:OoaJnUolF^YP02olB]Y@0Kol>/YOo2[:KoaJfUol>[Y_o2ZJKo`JVVol6ZYoo4[:Go`JVWokbT[?nj XZ_o_ZFVol2WYOo0Z:Go_ZBVokjSY_o0YJGo_jBUokjRYOnnXjGo_Z:VokbOZ_nmXJGoaZjFokNNWon_ TjOo[iFV00;o[iJV0_n`UjD01_nZU:OoXHj/oij;[_nWTZOo/YZOok>LWP;o/Y^P03;o/ibOok6JX?n^ UJCo[iFUojnFXon]U9ko/IVKokBLVon^V:3o[9VRok6LX?n_Vj7o/9ZPok>LX?n`W9oo]J6HokFPVOna WIgo]9nKokBPVondWi_o[ifMok>RV_neXiWo]JBFokNTTonfXiGo]Z>DokFRUOncXYGo]JBDok>TU?na XIGo/::Fok6RTon`XY3oZ9fGoj^OU_naXi;o[j6Bok6STOnbXi3o/::@ojnQT?nXWI;o[In@oljfPOoZ b7SomLmgoogDMoooomIfhOooeWH00?ooi6l04ooTK`00:ooSLP;ogIPGomRa9_oIZb;oejLQomNV8OoL ]2GojlDTooK>8?ofcB7omLhRooC?9?odd2?olm0Poo;>7oodc1oom<`PooG=8ooecbCom]0SooK>7ood aaSokl0Aon^g3_oV[Q3oi:LEonJU6ooYYB7okZHRoo6W8_odYQcomJHEooJY3_of[13onJXNoo^W:_oj YbOonZLVooZV9_ojYbOonZHVooZX:?ojZ2L00_ojZBL02oojZbSonZXXooZY:OojZ2?onJPJooRP6_og VQSomiDIooJ@5?ofRa;omHDG00;omH8K01GomH8JooF36ooeQ1_omX@KooJ56oofQAcomX@KooJ57?of QA_omXHMooJ57_o^L`GojFh0onUZ0?o^M@col8hConj@3_o^S@golh`6ooB60?odQ@000_odQP005_oe QP3om8H0ooB70?odQ`3olhT0ooF70?oeQ03om8<1oo>50OobQP3om8P0ooF70?odQP3olXH0oo:83Oo` R1_okXLNonn87_o`Rb3ol8/Qonb25ooWM@L7onA_000aonMg7ooRH6cogeYeon9[J_oWNUOojH4monV3 :ooXPRCoiX4Yomf1=oo;Md[o[6aLoieXIOnJJ6WoX6YVojA[I?nWK6?oZVePoja/G_nbKEGo]Ve?ok5] EonTKG3oXGJ1ojInQon[Q8?oZH:6ojEnR?nVOhSoYX28ojAoRonQOHooX82>oiiiTonQGigoYE^OojMM X?nUGYooYUfOojUMWonWGIgoYUfOoj]NYOnNE:?oVe^2okEbFoniMESo]75KokE`F@02okE`F00>okI_ EOngKeCo]W1FokI`EonfKeKo]FmGokI`F?nfLE[o]W5IokIaF?neL5So]FmIokE^FOneKeP2okI_F0;o ]VmG00?o]VmHokE`G_neLV000_nfL5X01ondL5ko]71Mok=^G?naKV3o/FeOok5]G_nbK5/00_nbJeX0 2OnbJe_o/F]Lok5ZF_naJU[o/6YLok5ZG?naJU_o/VYKok=YF002ok=YE`03ok5YFOnaJE[o/FQJ00;o /6MJ01oo/6MIok5WF?n_Ie_o[6ISojaSH?n/HUSo[VAGojiTF?n]HEWo[f5HojmQEon/GeSo[5mIojiO Eon]GeOoZeiQoj]NF_nbGccoYEM;oie@G?nNDUSoWU=HoimCEonODeSoWUAHoi]CFOnCDF;oSDmYoi=@ HOnOEEKoXEQB00?oX5MB017oWeECoieBFOnPE5OoWUAHoiiGF?nNFEKoXUU@oj=ICOnLEUCoWEMDoiiH E?nOFE?oWeQCoiiID_nRGDcoX5]?oj9KCP02oj9LC@06oj9KCOnPFe3oWUa@oj5NC?nTH4SoYF170_nU GdL04?nTGdSoXf18oimOBOnPGd[oXV59oimOBOnQH4OoW69>oi9NEonIGdkoXF56oj1RAonOHTOoWV17 oiaPBOnOHTL2oj5RA006oj5RAOnVID?o]6/fol5/9oo>JQKogVh670?oc Q`3omHD1ooF30_obP`7olXL1ooB70?oeQP3olhD0oo640?obQPWol8PJ00;okXLN00Gol8TOoo6<8_o_ QagojGX=onE`0P05onA_000eonEa1_oXMDKohEabommNK?oOHG3ohV]WonEeEOoXOT3ojH<`onV4:?oX PbWoh80eolagAonaKUSoXFUSoi]XJ?nLJF[oXFYVoj9[I_nRJfOoYfaSojm]FOndKE7o[faHojA]K_nP M83oYGf6ojR2P_nXP8?oYWj4ojAnQOnTOXKoYX64ojEnROnRIYWoY5ZKojILVonWGIcoZEfLojQLVonZ Gico]EnVoj]DXonRG7Oo]fi?okUcDoneL5[o]W5HokEaF?neL5So]71HokA`FOneKeP00_nfKeL02?nf L5Ko]VmFokI`EonfL5Wo]W5IokI`F?nfLESo]VmG0_neKeP2okI^E`0OokE^F?nfKUOo]fmFokEaGOne LUoo]W1JokE`FoncL5oo]W5KokI`FonbKeoo/FeNok5]GonaK5co/V]Jok9/FOncK5[o/V]Jok9ZFOna Je_o/FYKok1ZG?naJU_o/6ULok5XFOnbJESo/fUGok9YF?n`JUco/6QLok1WF`02ok1WF@0Eok5WF?n_ Ie_o[6ISojiSG?n]HeOo[69JojeQFOn^HESo[f5GojiPF?n/GeSo[EmIojiOEon^GeKoZeiPojYNFonc Gc_oZEY8oimBFonMD5SoWe=G00?oWU=H00KoW5=Ioi=@H_n>CVSoUE1PoieDF?nQEe<2oj1GDP0BoimF D_nME5KoWE9Koj1CEonNE5SoWUIGoimIE_nOFECoXUU?oj5HConLEUGoWEMDoimID_nNFECoWUUBoj5L COnMFU;oXU]>0_nRG4d08onRFdgoXea=oj=NCOnOGDooXUm:ojEQAonUGdOoYEm6ojEOAonRH4WoWUm: oiiNBonQH4SoX619oimPBOnLH4coUf1AoiYRC_nOHTOoWV17oi]PBonNH4SoWF19oiiQA_nTI47oZFHn ojQU?_nTHT;oWf56oiiRBOnUID;o/VHdol1W9?oBJQ;oh6h302Woi6l000cohfl1on1^0ooPKP?offd6 omQ/2?o?JPoo`FHIokIS8onmIB3oeV`>on=`0ooTL0;oonA_0:Ooi6l0003oonA_01Goi6l002OohGd8 omZV7ooH/2GofJ/SomZZ8OoGYb7of:TRon2f9Oo^b2Gom/lRooK=8_oec2;om/dSooC?9?odd2;om=0P ooC>7_odc1oomLdQooG=8?oecR3omLhSooG?9_ofcR?omLXKoo;24oo^^`coik4;on>X3ooSXACok:hT ooF]=?ogYcKomjDbooRT;ooiY2conZDYooZV9oojYRH00_ojZBL0:?ojZ2OonZTXooZW9oojYbOonZHW ooZV:?ojZ2ConZhMooZ_7ooj/2?on[@QooZ`7_oj/Akon[60?odQ@3om8H0ooF70?odQ`02ooB6000EooF60?odR03om8T0oo>70?odPP7om841oo:50OoeRP3o mXP1ooJ60OodR03olhL0ooB61OoaRAOokhLNonj77_o_R1gol8XPoo298?o[Oa?oiW<500Goi6l0037o igLRonEZI?oSIF;ohV=Ton1TK?oOIV_oh6MUon=`F?oWO4GojX@gonV5:_oWPbWohGlaom1h@?nkLU7o YFYOoiaXI_nPJVKoXV]Uoj=[IOnTJfKoZFaPok1^EondKE7o[VaHoj=]KonNLH7oXWZ8ojN1QOnXP8;o YGj5ojIoQ?nVQ8OoYFjEojIJW?nUG9WoXebHoj=MVOnWGIco[EZSojAEX?nQH7Go]g1@okUbDoncKeko /g1MokEaFonfLe_o]W9I00?o]75K0_neL5T01OndL5[o]G1IokI`F?nfL5So]W5J00;o]W5I00Ko]W1H okIaEoneL5Wo]FiHokE_F?nfKeL2okE^F00;okE`FoneLEoo]W1KokE`FondLEko]W1KokIaG?ndL5ko /fmMok5^G_naKEh00_naJe/06onbK5_o/F]Lok5ZG?naJego/FYKok1ZG?n`JUko/6ULojiXGOn_J5_o /VUHok=YEonaJEco[fMMok1WF_naIeSo/6MIok5WF?n^IUkoZfEUojiTFon^HeOoZ61NojYOG?n_HUOo [f9HojeOF002ojaOF@0:ojeOF?n]GeOoZeiOoj]NG?naGckoZUY6oimBF_nNDESoWU9HoiiCF0;oWe=G 00KoWE=HoiAAH?n>CVSoUE1Ooi]BF?nPEU@2oj1GDP0Coj1FDonNE5OoWU=IoimDF?nMDeWoWeEFoj1I E_nOFUGoXEQAoj9IC_nOEe7oW5EDoieGE?nPFU;oWUUCoiiJDOnMFU?oXE]?oj=LC@02oj9LC@0Xoj9K C_nSGDcoX5i=oj1NBonUGdKoYEm7ojEOA_nTGdOoWee;oiiOBonNGT_oXV17oj5PB?nNHD_oWf5:oieO B_nMHd[oWF=;oiILD?nIGTcoWf57oieQBOnQHd?oZ6DmojQU?_nXICooZ6@oojQT?_nWI3ooYVA1ojEU @onSID?oZ68mokAR;oo5IQkoeV/=om]/2?oNK@KohFh2on=_0A_oi6l001CohVl1on1^0ooOKPCoffd7 omM/2OoCJ`gocfX@ol]Y4oo2Ia[o^6DRok5S:?nZHBkoWehhoheHAOnCFdKo_VT]om]d5OoXNa7ojGLF onE`1Oooi6l0YooTK`000?ooi6l05_oTK`00:_oPQ@gofJXRomR^9?oJZR7ofJXRomRX8OoHY23ofjhS onW39OoecB?om/hQooG<8OodcB7omLhSooG@9?odd2?om9?ofcRCom/dRooG76_oa_PgokkL=ooB`8?ofZbWomJl[ooF`90oodQ03omHH00_oeQ`006?odQ`3om8H0ooB60?od QP3om8L0oo:70?ocQP3om8<0oo:00?obQP3omH/0ooJ70?oeQP3olhX0ooB70?oeR07olXTAonn97Oo_ R1kokhLMoo2:7oo`Rb7okH@IonMg2@Coi6l002goiG45onMd@?oTIVWoiFUNon9UI?oPI6SogfIYommT JooOI6GohfeIonMlA_oYPcKojH@ZonR29_oSObgodWY0ok]bD_nWJegoYFaOojE[HOnVJf;oY6]TojE/ I?nXK67o[FeJok5]E?n]K5_oXF]aoiU_Q_nPNHWoYX25ojEoQ?nUQ8GoY7F@ojQLVOnYFiOoZ5fIojIL VonTFIkoXEbBojIWJongL4go]g5Eok9^FoncKeX00_ndL5X03_neLE_o]W9JokEaF_nfLEWo]G9KokEa FoneLE[o]75Kok=aGOneL5[o]W1IokEbG?nfLE_o]W5H0_nfLEX05onfLEWo]W1IokE`FoneL5_o]W1J okI_FOneL5[o]71Ook=aH?ncL5oo/g1PokI`G?neLEko]G5PokE`G_neL5go/FiPojm/Gon`K5ko/FaM ok5[GOn`JUgo/6]N00;o/F]L00[o/F]MojmYGOn^J5co[FMMok1XF_ncJESo/VUJojmWGOn`IUWo/FMH 0_n`IeT04_n^IV3oZfEUojaSG?n^HUKo[61Joj]PFon^HUSo[f9HojeOFOn/GeWoZeiJojiOEon^GUOo [EeNoj]NG?n`GT7oYUQ9oie@F`;oWe9G03SoWU9HoiiCF?nODeSoWU=HoiQBGOn=CfWoUDmPoiYAF?nP EECoXEMBoj1GDOnMEEKoWU=GoimCEonOE5SoWU=HoimEEOnPF5GoWeUFoj1HDOnRF4koXEQ?oj1GD?nM EUCoWUQCoieID_nKF5KoWUYCoj5JC_nRFdooXU]=oj9LCOnRFdgoXee=oj9OBonQGT[oXem8ojEOAonU H4OoXEi:oi]LConOH4_oX659oj1PB?nQH4KoX6=8oimTBOnMH4WoWV57oiMPD?nDGU;oVem;oiiPAonQ I4CoYfLnojUV?0;oZ6@n01SoZ6DoojMU@?nXI3ooZF@nojMT?onUID;oYFE4oimRBOnKGdWoYV4mojmR 9OogcBSonL0^ooZc;_oh/BOomj`SooJZ8Ooe[2GomJl[ooF];_oe[37o mZPaooJR;_ogWb_on9lXooVO9?ojX242ooZR8P0SooZT9?ojY2KonZHUooZ^7?oj[a_onZ`MooZ^7Ooj [agonZhMooZ^7?oj[a[onZlLooZY8_ojYbKonZTWooZZ:?ojZbSonZXXooZX:?oiY2OonIhTooVK9ooe S1CokWd3on]f0OoZKP7okgL@onj:4_o/RPgokHT>oo6;2?ocPP3olh<0ooB60?odQ`000_odQP003Ooc QP3olhD0ooB50?odQP3olhP0oo>60?ocPP3ol8<0oo:70?oeR03omHH0ooB80?odQ`000_obQ@002Oob R0kol8TLonn77_o_R1gol8TNoo6;8_o`RAoojW/?onE`0@03onA_001fonId7?oUK63oi6QTonEZG?oS IFGohFIWon1WI_oPIfSogf=XommSHOoSKEKoigQ:onV2??oYQ2coj80;OoDNSko_g9=ojm]F?nX K5goZ6aNojM/H?nUK6?oXf]VojE[I?n[KEco[faFoja/G?nPJW3oUfb4oiefROnSPhOoY7n@ojERVOn[ F9go[5^QoiiIUonOHWgo/6iKokUbC?nfLUGo/g1Iok9_F_naKe_o/VmLokA_FOnfL5Oo]W5HokIaFOnf LEOo]g5GokIaFOneLE_o]75KokEaF_neLEWo]75JokAaG?neLUgo]W5IokIaF_neLE_o]g5HokIaF?nf L5Wo]71KokE`F_neL5Wo]g1HokE`GOncLF3o/G1Sok9`H_neL5go]G5MokEaH?ndL5ko]G1LokA`GOnc KU_o/FaKok1/GOn`Jeco/FYKok5[FonbJU[o/F]Kok5[GOn_JEco[FMMojiWGOn_J5co/6UKok9YF_n_ IUco[fIJok5XF?n`IeSo/FMGojeXH_nZIFKo[F5JojmQE_n_HESo[61KojeQFOn^HESo[V1GojeOF?n[ GU[o[EmGojeNF?n/GEoo[5mNojmN@onUEd[oWU1IoimBF0;oWU5H00coWU9IoiiCF?nODeOoVE9Kohm@ IonCD6?oVe9IoiiDE_nQEU?oWeIDoiaDF?nPE5D2oj1DEP0ZoiiCF?nOEEGoXEQCoiiIF?nOFECoXUQ? oj9IC_nSFDkoXEQ?oiaEE?nJEUKoVeMFoiiJDOnSG4coXE]?oj9KC_nRG4goXU]=oj=LCOnSGd[oY616 oj5NBOnVH4CoY5m6oiiNBonJGDooWF5?nY I3SoZFDiojAT?_nSHd7oXV=4ojEU@_nXIT;oYVI2ojEVA?nNHTOoUf18?odcAoom/`OooK;7oodbQkomLXQooW2;Ooj^CKon[/cooZl G1OodSA;olYPLonnJ4?o^T@ookh`< oo:60ooaOP3olh<0ooB40?ocQ0000_odQ0004_odQ@3omHD0ooF50?ocQP3olhD0ooB60?ocQ03ol840 oo:40?oeQ`3omHT0ooB80?odQ`3olhD0oo230?ocQ@Wol8LHonj77@;okhLL00Col8XPoo2:8Oo/PAKo iW@50_oTK`006OoTL0?oj7E1onATJ_oUJekoi6UMonAWIOoPI6Soh6MUon5ZIooPIVWogfARon1UGOoR JU_oiWIAonV1?ooYQ2goj88Uon>0;?oGNc_o`79=oje]F?nWJegoZFaLojY]G?nVK6400_nTJf@05onY K5ko[6eJojY/GOnMJ77oUVj7oiahT_nQHj;oWUFLoi]MPon[K6;o^79>okUbCondLEOo/g1HokAaEonb LEWo[g1Mok1_G?naKego/FmLok=_F_ncL5_o]W5H00?o]W5G0oneLEP02OnfLEOo]G5IokAaGOneL5_o ]G1IokEaFonfLE[o]W1IokE`FP02okIaF@0FokE`FOneKeWo]W1JokEaG_ndL63o/g5Qok=_G_ndL5go ]G1MokA`G_neL5co]FmLokI_F?ncKEWo/FaLok1[GOn`K5go/6]Mok5ZF_naJego/6]Nok1YG0;o[VML 05Ko[fQKojiXFon_Ieco[VIMojmWF_n`IeWo[fMIok5WF?n/IVCoZV9TojmQF?n_HEOo[V5IojmRFOn] HEWo[5mIojeOF?n/GeWo[5iIojiOEon]GUOo[EeNojaNG_n_GT?oZEY6oimBFOnNDESoWe9GoiiAF?nN DUWoWe=HoiiCF?nJDU[oTE1Toi9@I?nIDUcoWEEFoj9GD?nNEUCoWUEEoimDEOnPEEGoXEEDoiiDE_nO EE?oXUM?oimIE_nNFEKoXUU>oj=JC?nSFTgoXeUoj9KCOnT GD_oXea=oj9KCOnRGd[oYF=4oj5QB_nSH4[oX5i@oiYJEonIEe[oX5UIojQJFOn]Ef?o]EQQokQFGonh DfOo[55XojAHF_nLFdooV5m;oiiUAOnTJD7oZ6PnojMV?_nWICooYfA0ojMU@0;oZ6@n01GoYf@oojAS @_nSHTCoYF=2oj=S@OnSI3ooYfDnojYU?_nXICooXf=3ojIU@_n[IcooZFHoojMV@_nVIdCoY6I6oj9U A_nQIDKoXfE5oj9QA?nRH4@00onUHd<2ojIS@P0=ojUT@?nXI3ooY692ojAU@onUJ4;oZ6XoojIW@?nT ID?oYVI2ojYW@?nYId3oZfPnoj]X?@02ojaX?00AojYV?OnWICooXfA1oiQOB?n=Fe3oPUQFogeDEon; Edko^FPeommg6?oYN@gojGPDon5Z=ooBE6co`DalolaJ>ooTK`408_oTK`001ooTK`7oi6l2onA_0ooU KPCoiFh7onE^2?oVK@`00_oVK0l00ooVK@ooif`BonM/4P02onI/3`;oiV`@00WoiVd>onI]2ooVK@_o iVd=onI]3?oUK@[oiFd8onE^1_oUKP@0oooTK`1]onA_0000oooTK`0HonA_000=on=d0ooLVQWof;4V omV[8ooIZB;ofJXQomZ[8_oIZB7of:HPom^^8ooW`2Gom8@02ooG=8`10ooG<8_odcB?omLlT ooG@8_ocd27om60?oeQ`3olhD0oo210?ocPP3omHD0oo>80?ofRP3o mXP0oo>60?obQ03olXD5oo665Oo^QA`2onn56`04onn67?o`R1kokXoo1Ldco[fiHoj]]F_n^KUSo[fiHoja]FonXK63oY6]TojE/HonXJekoXVUVoiAU OonCH8KoY6M[okA`E?nhLToo]G5Fok9`F_ncL5T00oncL5P02OndLEOo/g5Hok5aFon_L5ko[g1Mok5_ G?nbL5co/g5LokEaF@02okIaF00>okEaF?neL5Wo]G5IokIaE_nfLESo]W5IokIaEoneL5So]G1IokE` F_nfL5Wo]g1GokI`FOngLEP2okI`F006okE`GOndL5oo]W5NokAaGondL5oo]6mM0_ndL5h08_neL5go ]FmKokE^F?ndKU[o/FaLok1[GOn`JUco/6YKok5[FonaJeco/FUJojiWG?n^J5go[fMJojmXFon]IUoo [6ENojmVFonaIeSo/FMGok1WF_nZIFWo[V=Qok1RE_n^HEOo[V5Iok1RF?n^HESo[EmIojeNF?n/GUWo [EmGojmOE_n]GUL2oj]MG`03ojiNAOnZFdKoX59I00?oWe9G057oWE5IoieBFOnNDeSoWE=Hoi=@H_nB D6CoVeAIoiiEDonREe;oWeIHoieCF_nNDU[oX5AIoj5DF_nPDe_oWeAJoj9EEOnREe[oXEQMoj5GEonR EeGoXEMEoj9FEOnODe[oWU=LoieEF_nLE5goWUIHoj5GFOnOEE[oXUY?ojIOAonRGU?oYUiLojiOF_nb GEco[UQQokIGJ_njDfko^55^okiAK_o7DVoob59_ol]EK_o8Ef_o_U1`okaAMOo7Efko/e5XoiYEF?nR Hd;oZ6/mojMZ@?nVISooYf@oojUT?_nXICkoYfDoojIS@?nTHT?oY653ojIR@_nUID7oY6HnojIU?_nX ICooZVDnojIS@OnTHd;oZVHnojYU?OnVHd3oYVA1ojMU@?nWI3koZVLlojaX>_nZICcoZF@nojaU?On[ IC`00_nZI3d03_n/ICcoZV@lojMS?_nXICkoZ6LmojUY??n[JC[oZfTkojUV?On[IccoZfPloj]W>_n[ IS_oZVHk0_nYIS`04OnVICkoX692oiMOBOn=G57oPEIGogYCFOn6EE3oZVonM` :OoKHECob51^olA?N_o9EegogFTA01goi6l001;oi6l3onE^1ooUKPWoiVd>onM/5?oWK1Soj6/LonQ[ 7_oXJR?ojFXVonUY:OoYJR[ojVT]onYYonE]2OoUKPCoi6l1onA_0?oTL0;oiG04onE` 1OoTK`;oonA_06Coi6l0003oonA_01Woi6l000?ohWT5om^R7_oH/2D00_oIZB43omVZ8@0BomRV8?oH Yb7oh;PToo798_ofcR7om/dRooC<8_oec2;om<`RooG=8oodcbColm0Too7>8OobcQoomlHVooZg;_oj ]Bgon[P^0_oi]bd2ooVg;00YooVg;Ooj^Boon[X_ooZi;ooj]2_onJdVooNX8?ofYQgomZPNooJ^9?of /b_om[@aooJa=?ofZS7omZ60?ocQ07olXHAonn56oo_ QA`2onn56`0Zoo277_o_QAcojWX;onE`0_oTL0?ogFU3omeEIooUJ5ooiFYNonEYFooTJF;ohVAVon1S HOoPIFGoh6M/on5YI?oRJU_oh6MLon1UGooQIf3oi71EonMk@ooYPc7oj8K?naCfcoYdmUoj5JDOn/GEkocEMcom9FLoo_nZIccoZ6HmojYV??n[IS/2oj]W>`0EojYU??nWICkoYV@noj1S@onEGT[oRU]Boh9FEomlDeSo PEEDoiYNAOo4K2_ohgLDonUi3OoWMQcoh6U9om=EJ?o9DFSobEA^oliJKOo?GSOohfh301Soi6l000co i6l2onE^1OoUK@goif`EonQ[7ooYJROojFT[onYX`;ojfPi00?o jfPjon]X>Oo[J3T00_o[IcT01_oZJ3OojVPfonYX=ooZJ3SojfPionYX>0;ojVPg00KojVPfonYX=OoZ J3GojVPdonYY8_odcB;om9OogaR_on[`]ooZj :ooj^b_onKT/ooZi;Ooj^bcon[T/ooZh;Ooj^2conKL/ooVf;Ooj^Boon[`aooZo73_o`QA_okXDLonn57?o_QA_ol8POoo697oo/OQ7oiG48on9_4_oFEEGofeQNonEWG_oUJF3oiFUN onEZH?oRI6Coh6=SommSHooPIF[ohFUXon9[G_oRJeWohVQMon1UHOoPIEoohfaHonMjAooZPSCojH okI`F?nfL5Oo]71Jok=`GOneL5co]G1NokE`G?ndKe_o]FmKokE`G?nfKe[o]FmKokA^FOndKEP2okE] F02Gok=/F?naJe_o/FYJok1ZGOn^JEko[VMLojmXF_n`J5Wo[fUMoj]WHOnZI5oo[FELoj]UG_n]IE_o /6IMojeVJ_n]Hf3o[f5FojiQEon_HEOo/69HojePF_n]GeWo[EmHojYNF_n/GeWo[UmFojiNEOn/GUgo [EmNojiNAonVEd[oWU5IoimAF?nODUOoWe9HoieBFOnODUSoWe=HoimFEOnDD5coR3mgoj`mOOnm@Gko _428okY6Pon[CW7oZTadok1;N?nbBgOo/TYiok=:N?njC7Go^daeokY@N?nlD7Wo^TecokUonXI3koZF@nojYT?OnXHckoZF_nZIcgoZFLmojUW??n[IS_o[6Hkoj]V??nXICgoXf=1oieQAOnEGT[o SEa@ohQIDOn6Ee;oREM>oi9IAonbISOofGHMonQi3_oYMa?oi6daom]JI?o>DW3obE=Xol]FJ?oAFfoo cU]HomUV6@0DonA_0008onA_0OoUKPGoiFh9onI]3ooWK1Ooj6XRonUY;?oZJ3@5on]W>@03onYX=_oZ J3GojVPf00;ojVPe00GojVPfonYX=?oZJ3?ojVPconYX=002onYY<`03onYY<_oZJC?ojVPd00;ojVPe 00?ojVTconYXOoZJSGo j7@]onQg:_oXMBOoj7DUonQd7ooXLQOoig8AonMb3ooVL@[oiG05onA_0@3oonA_05koi6l0003oonA_ 01_oi6l001coh8H=omVZ8OoI[B?ofJXQomV[8OoIZb;of:/QomV/8_oIZb;of:HPomV[8_oT_bCom<`R ooK@8_oecR;om8?odcB?oml0H ooZ]2Ooj[P_on[0;ooZb3?oj]0gon[D=ooZe3_oj/`_onZd:ooVX2OohXPKon9X4ooND0_odSP7olXD0 oo:20?odP`3olX<0oo>30?odPP3omHD0ooF80?odR@3om8P0oo>72OoaQaWokhDMonn57?o_QA_ol8HL oo697oo^Q1?oigH=on5Y<_o?CeWofUYFon=SGooUJF3oiF]MonEYGooSIV?ogf9UomiQH_oPIFGohFQX on5ZH`;ohV]J01[ohVYKon5XGooPIEoohV]EonMhBooYP3[ojH;ojXkR?na@Woo^SJon/JC[oZfTkojYX??nYIcd2oj]W>`0H ojaW>onZIS_oXf=1oiUPAonAGTgoS5aAoheKConCFdSoUE]6oiQLA?nXHc_ob6lWonAj4ooYNQ3oiG4R omeSC_oDEfgocUA[ol]EIoo:EVWod5]Wom5JJoo@GC_ohFd64OoTK`003?oTK`;oiFh6onI]3ooWJa_o jFXXonUY;_oZJ3GojfLlon]W>_o[IcSojVPgonYX=@;ojVPd00CojVTbonYX4OoH [BCofJ/R0_oIZB42omVZ8@0AomVZ8_oIZR7ofJPQomRY8OoN]R?okLPSooK@8Oodc23oll/RooS4:_oj ]C3on[P^ooZm;_oj_2oon[haooZnooJ/4?ofZ`komZLIooJdX_oXS^4okHdRoo7=8go`422okm3Ooo2?h7o`3n2okQ6OOndBWSo/TYfokE;MOniBgCo^4aeokQ@N?ng CgKo]D]eokM;LondBWCo]D]`okU=LOniBgGo]DYboje8LOn`BG7o[Ta_ok1;K?nmC7Cob55golACL_o1 Dg3o`e9`okeALOnlDW3o`E=^ol1CK?nmE6_o_5AZokeEJOnmEFSo^UAWol1DIoo9EfOob5YSolIJHoo4 G6?o`UUTolEHIoo@EfgoaUQTojeNDOnVIT;oYfLnojIU?_nWICcoYVHm0_nWIcd06OnYISgoYVA1oj9R A?nUI47oZ6I0ojQV?onWICooZ6DnojYW??n[IccoZVLkojUU>onYI3coZV@mojMT@?nWI3koZVPkoj]Y >onYJ3coYfLmojUX??n/J3[oZfTkojYY?OnYISd00_n[Ic/06?nYICgoXV=1oiUPAon@GDgoSEa?ohmM COnHGTOoWEi2oiUL@onJG4;o^6Taom]g6OoXNPkoj7HGon=[??oEFFKocU=`oliFJOo>EfKobeIZolmK HOoCGF?oc5UKomUV6@ooi6l000Soi6l2onE^2?oVK17oj6/LonUY:_o[IcSojfHnon]V?@;ojfLh00Ko jVLfonYXXSo]2nAok``SOnm@7ko_DIjoka6O?nm A7ko`D20ol11OonlAGko^4UkokE:N?ngBWGo^T]eokU@MongCg[o]dafokQonYICcoZ6OnYJ3coYVLnojUX??n/JC[oZfPjojYX??nZ IccoZFHlojMU?_nRHd7oUUm9oheKD?n>G4ooUEe9oieN@onQH3ooX5lnoiQK@_nSHD7obG0Won=j4OoY NA7oiW4YomYND_oBE6kocUEaoleGJ?o=EfKoc5MYolmJHooBGEgod5aRolmM>_oSKP<=onA_000>onE^ 1ooVK17oj6/NonYY;oo[IcWojfLmon]V?oo[ISgojVLgonYX=OoZJ3CojVPbonYX=?oZJ3<2onYX=009 onYX<_oZJ3CojVPeonYX=?oZJ3GojVPdonYYooJ/3_of[@oomZT= ooJS7?of/3Som/H[ooK<7?ofbb;omLXTooVi4oojZ@SonZd;ooZ_3?oj[P/3ooZ^3003ooZ^3Ooj/0co n[0;00;onZl;04[on[0;ooZa2ooj/PWon[@7ooZ]2Ooj[PWon[8onYICco Z6DlojUV??nWISkoZFLl0_n[JCX08_nWJ3koYVLnoj]Y>on]JS[oZfTlojQX?_nYISgoYfDmoiiQ@onE GTWoSEa?ohiKC_nGGTOoXV4oojIR>onSGccoVEa4oiIKAOndJ3;og7PIonQl3ooXMQ_oh6I0omIHHooB EfcodeUZom1HIOo=EVKocUMXolmKHooAGE[odUeSoliLEooHIA/;onA_0005onE^1?oVK@goif/HonUY 9_oZJ3<00_o[IS`02?o[Ic[ojfLionYW=OoZJ3;ojVPconYW=OoZJ3KojVPd0_oZJ3D2onYX=0;ojVPe 0_oZJ3@00ooZJ3?ojVTconYY<`03onYY<`0;onYX7_o_RaookhPMonn67?o_QQWokVDaon]QFooVH6;ofUYGomAED?oIFE;ohV=LonAX GooUJUcoi6QPon9SJOoOH6KogV9OomiQH_oPIf_ohVaWon9/G?oRJe_ohVaJon9[FooRJU_ohV]Ion9[ EooQIe_oh6IJon=/EOoWN4SojX4fonR3;OoQP3;oc7Q2okA`EOnVJUkoYf]Moji]FOn`KUOo/6iHok5_ E`03ok9aEP08ojm_F_n[KUooZFeRojI]IOnSKFSoYFeVojU^HOn^L5d2ok9`F@07okAaF?nfLeOo]W9G okIbE_neLUOo]G=IokIdFP02okIcE`0UokIbEoncLE[o/FmLok=`F_ngLUOo]W5HokIaEondLE_o]W=K okEcG?ndLeko]G9LokAbG?ndLUko/W1Ook=_GOneKU[o]FeGokE]F?ndKUWo]FeGokE]E_ncKEWo/F]K ok5YFOnaJEco/6QLojeVGon[I5oo[6=KojeSG?n[I5go[VAJojYTJ_nSH6goZ5iNojePF@02ojiQF@21 ojeOFon]GeWo[UmGojeNF?n/GeSo[UmGojeNEon^GEKoZeeNoj]NHOn]G4coZ5M9oii@FonNDUWoXUI@ oiiAF_n]AGCo`T24oka0Q?o2>hSocS>?okd`T?n_>8Go/T5lok=0O_nf@7oo^D=mok]3OOnlAGgo^dIk okU6Monk@W[o`d=mok]5O_niB7Wo^4]hokA>NongCWOo^4aeokM:MOnfBW7o^Teaoke=M?nfBg;o]De^ ok5;Kon_BFoo[D]/oje7L?nf@gco_E1dokmEL?o7E77obUE^ol9BKonhCW7o_59_ol9EK?nmEFSo]eAV ol1GI_o8FVGo`EMVol9EJ?o:F6Oob5UWolILIOo6G6CoaeYUolIHJ?o6FFKoaUUPolEGHOo7FF?ob5eR ok9LEonSH4?oZ6PgojMX??nUI47oYfE0ojUV?_nVICooYfDmoj]W>_n/Ic[oZVHlojUU??nWIcgoZFTk ojUX??nYJ3goZfPjojYW>onXIccoZ6Pmoj]Y>on]JCWo[6TkojMW?_nSI43oWf92oiANB_n;FU3oT5a= oi]OA?nTHCcoZV_nOGcooTeQ6oj5N?_oEfOocEMXoliJH_oAGE[odeiKom1KJ?oAGT7oh6`800Ooi6l0013oi6l1onE^1OoVK@coif/E onQZ8OoZJBoojVLgon]W>_oZIcSojVLgonYWU:ooaVRSol94Oonmn9OoYH5KokV9Bon]QHOoLFU_oeUM@omQH E?oPGegoi6QNonAYG?oTJ5gohVAUommRJ?oMH6CogF1Ron1UJ_oRK6SohVaOon9[FOoSJeT00_oRJe`0 :_oRJeSohV]Gon9ZF?oQJE[oh6MLon9ZEooVMT_ojH4jonR3;?oSPC7od7Y0okM`DonYJe_oZfaKok1] F?naKUSo/VmGok9aEonbLEKo/g9Eok9aE_n`L5Wo/6mJoje`GonZKf;oYViVojA]J?nUKFGoZfmPojm_ G?naL5[o]79IokIbEongLUGo]W=FokEdF_neM5Wo]7=IokAcF?nbLU_o/W5KokAbF@;o]G5I00Co]g5G okEaFOneLUco]W=K0_nfLe`03?nfLe_o]W9KokAbG_nbL5oo/ViNok=^F_neKUWo]FeGok=/F?ndJeOo /VYJok5ZF`;o/VUJ02Co/fUHok9YFOn_IU_oZV=Moj]SGOn^I5[o[FALojYTK?nXHFOoZEmMojYOG?n/ H5[o[V5HojeOF_n]GU[o[EmGojiOEon]GeWo[5eHojeME_n]GUOo[5eMoj]MH_n[FdooZ5I:oj5BEonQ EECoWe1Nojm5MOo0@H?o_Cn4ol@iROo?=okLhQ_n]>h<2okI2O00@okA0P?ng@Wgo^4Anoka3 OonlA7go^4IhokI6MonnAGKo`4=iok]1OOnlAWko^TilokU?N_niCGSo]D]dokQN?nnDg7o`EA_ol5CKonmDG7o^e1bokmALOo2EFgo_5EW ok]EIoo6F6SoaeUVolMHIOo6EVSobEQVolUII_o7FVGoaeaVolIIIoo5EfKoaE]PolIJH?o4F6;oa5UP ol9IH_o6FFGo_UYJojYPAonSHcooYVHnojUV?P;oYfDn02goZVLkoj]W>onZIccoYfLmojQX??nYJS_o ZV/kojYX??n[Ic[oZVLjojQW??nXJ3go[6XjojaY>_nYJ3coXVA1oiUPAon@GDgoRE]BohYKDOnJGdGo Yf8kojYS>?n[HcSoYF8loiIKAOnFFTGo]FPbom]g5?oYN@ooigOoZIcOojVLfonYX=0;ojVPc00CojVPaonYX_nYIccoZFHlojUW?OnXJ3goZ6PlojUZ>`02oj][ >@0WojYZ??nZJ3coZFPkojUX??nZJCcoZfPjojQV??nQI47oU5i:ohYJDOn8Fe?oSEe>oiQNAOnTHSgo [6Dgoj]T>?nWHS[oWem0ohiIB_nSH3god7EFCoeU]XomULJOoFFf3o d5UPoliHIoo=Ef[oceYPom1LGOoAGE_odUeGomANJ?o;FTOoh6`900;oi6l000ooi6l2onE^1ooVK@co iV`@onM/5?oXJR3ojFT/onYX=_oZIc[ojVLhonYW=ooZIcGojVPeonYX_nY Jc_oZFXkoj]Z>On[JcWoZF/kojUY??nZJ3coZFPlojYX>onYIc_oWfA2oi5NC?moF5WoO5MLoi9MBonQ HSooZ6FV7odEaLom5MG?oBGUSodEeMoliKGooEHb7oi6l0onA^0ooV KP_oifdBonM/5?oWJaSojFXSonYY;_oZJ3H2onYW=`05onYW=_oZJ3GojVLdonYX<_oZJ3<00_oZJ380 1_oZJ37ojVPconYX1olTg ROo4>hCo`c^5ol?nZJc[oZVXjojUZ>onZJSco[6TiojUX>onTICooWF93 ohmOC_moFUWoNEINohIIE?nQHT3o[6@gojiT=On^ICGoZVonMGT3oU5Y6oj=Q??oAM1goiWP> onQf8OoKI4OodEEPom5HG?oDFf3ofEaWomQLHOoDFUkodUYOolmHI_o>F6SoceYPom1LFooAG5_odUiG om9MF?o=FfCoeEi9on=/3ooUK@_oif`DonM/5ooWK1Koj6/OonYY;_o[J3SojfLionYX=_oZJ3OojVLe onYX=?oZJ3800ooZJ3<04?oZJ3;ojVPconYX=?oZJ3?ojVPdonYX<_oZJ3?ojVPdonYXonEd1?oQVb7oe;8TonK2^:Ooc[bWomK0YooNe:_oh/2Kon;0UooNa9oog[RGomjlTooN^8oog[B?omZdSooJ]8_of [R7omZdRooJ]80;omZlO00ComZhNooJ^7oof/23om[8Q0_of/Ql2ooJd7`?om[HP00ComKXPooJi7ooe _27omKXQ0_of_B008oof_b7oml@RooO99Oogc2KomlLTooJl7?od[Q;okj<:onjJ0Oo^V@3ol:@6oo6_ 3oo^/aSoj;8RonJb9OoX/B;ojZdNonb]7oo[[b?ojjhLon^X4ooYYQ3ol;<@ooBo0ooe_P3oml00ooNo 0?of_@7om[/3ooJg0oof^@;om[X2ooJg0oof]@;om[H300;om[D3027om[42ooJ_0Ooe[`;omJh1ooF_ 0Oof[P?omZH7ooJN2oogX@comj/9ooNc1_og^PKon;l9ooRk2?oi_0Goml4BooC9:Oocac7oeYI0omJF ?ooFVSkobi8jolVC=_o?Ldcofe]GomQFD_oIF5KogeiLon=UGooTJEWoi6QJon1RJ_oKFG000_oIEVL0 3_oNGVOohV]WonA^I?oRJUgohf]Hon=[FooRJekohVaKon9/F?oSJeSohVaIon=/G?oUK5[ohfYK0_oP Ied07?oTL5GojGe6onZ2=ooSPSGoeG`ookedCon[KEcoZFiNojm`F_nbLESo/g5IokEbFOnfLUOo]G9H okEbEoneLUSo]G9GokEaEondLESo/G1Joj]_HOnVKVGoYFiWojI^J?n/Kf;o/W5KokEaFOnhLED2okMa E`;o]W5H00[o]W5GokIcG?neM63o/g5Ook=aHOndL5oo]6mOokE^FoneKego]6eI0ondK5L06?nbJe[o /6YMok5YG?nbJE_o/FQIok5YF_nbJ5Wo/FIHok5VEonaIUSo/VMFojeVH_nUHVooZ61QojYOFonYGUco ZUiKojQMG?nWFeooZEaMojaNFOn^GeSo[UiGojeME`;oZeaI01Oo[EiJojULGOnUAf_o]CYlol8oQOnk >hGo_c6=olHbS_o9=X[oac^6olDmQ?o3>hCo`d21ol52O_nc?H7o[3b4ok]3O?nnA7co^d9moke4N_nh @H3o]T60okU3N`02okM4N00UokI5N?nkAgKo_4IhokY6MonfAG_o^TMnok]8O?ngBG?o^4]`okM=L?ng C73o]T]_ok5:L?n]BVko[D]/ojQ:K?n`Ag;o`4Amokm;N?ngD7;o`U9^oleGJoo>F6[oa5E[ol1CK?o9 EVcobEMZol]HJOo8FVOob5]VolQJJOo4EV[oaEMTolAJG_o4FeooaEYRolEJH@02olEJGP11ol9HHOo0 FV3oa5aMol5HH?noEV?oa5]PolAKGoo1FF3o`UaKolIMF?nmG5;oZf95ojYY>_n[JcSoZF/jojYZ>onZ J3_oXfDooiERBOn FF?od5]Kom5MF_oBGUOodeiFom1KI?oBFF_oiVHionM/5OoWJaCoif`FonQ[7?oYJR[ojVLhon]W>OoZ J3GojVPfonYW=_oZJ3@00ooZJ3803ooZIc?ojVPbonYX^k4_oa_A;ok[hFonnk5_o^]QOokKooVd5?oj/1Won[@JooZj5OojaA;on/T?oo[93OojaPWon/XBooSF:?oY]C[oeiM4olnB?oo< T3goc9ol8gQOo1?8?o`cB9okh` Soo3=hWob3^5olXKoaCf4ol92Ooo1@Woo]Cj0oj/lPonk@goo_D=lok]3O?nnAGco`4AnokU1 Oone@Gko]DAiokE4MoniAGWo_4Mjoka6N?nmAWSo^dEiokM6OOneAW_o^DMbokQ8L?nhCG7o^4e_okA; L?n`BVoo[TY]oja9K?nTB6co/DQ`oke3O?ng@Gko^e1bolUFK?o>F6_oc5M[ol]GJoo3EF_ob5QYolEH JOo:Ef[obUQXolQJI_o4FVOo`EMWol=GGoo3G5coaEYPolEJGoo5FeooaE]NolAIH?o0Ef7oa5YNol9I H?nlEV7o`EYNol=LG?o1FUco`EaHol5ME_o2GESoaeYMolMJG?neGT_oYfHmojMZ>_nRIcooTf1;ohMN E?n6GEGoS5mAoiMPB?nQH3oo[FOnVHccoVUi3oi1IBOnWHSWoeGHJonMg 3ooWKbKofEmFolmFIOoAF5ooeE]KomMLH_oGFfOoeUaOomELGOoAFF?od5URolaGJ?o>FF;od5aIom5L FooDGU[oeEiNomIKJ?oAFGWoh5eTonQZ8_oWK17oif`JonUZ9_oZJ3OojVLkonYW=ooZJ3KojVPd00;o jVPc0_oZJ3401OoZJ3?ojVPbonYX<_oZJ3?ojVPf00;ojVLe0_oZJ3<01?oZJ3CojVPbonYW3Ooa U`Wom:85ooB[0Ood[@3omJh0ooNb0Oog/@?omk<5ooRh2?oh^@[onKh;ooW13?oi_`conL<>oo[33ooj a@oon/H>oo[73_ojb0oon/CAOo: SCoobi8ool^=?oo:SCoobYTeom=mCOoHFeKoeeE@omMFDooKFE[ohVAMonAYG?oTJE_ohfESomiKKOoH DfcofEIWomeMH_oPJ6GohfeZon9]HooRJe[ohVYJon9[FooRK5WohV]Hon5[E_oQJUWohfYJonA[EooS JeSohVYHon5YF?oPIe[ogfIKon9[E_oXMdWojWlgonJ0ohQM DOn:Ge;oUF59oiiR@OnTHScoZV_nWHc_oXV8noi=KA_nHG4;oaVlVon=h 4?oXMa[ohFQ2om5FHOo?EV;oeEaJomILGOoFFfKoee]UomILG?oFG5godEYSoliIHoo/7?of]QWon;dDooW23_oja@_on/Poo[33_oj``kon/D>ooW63ooja13on[dAooZc5Ooj[A[on[8KooZj5ooj`a7on/D; ooW53_oCSc;o`h92olb@?_o oja`FonXKeko[G1JojmaFOn`LEWo/W5H00;o]75H1?neLUL05onfLeWo]WAGokAcEonaLU_oZg5RojI^ I_nWKfOoZVmToji^GondKeSo]W1EokMbEoneLUco]W9JokAaG?ndL5co/g1Lok=`GOndKUSo/feHokA] EoncKEWo/VaL00;o/f]I05co[fYLok1YFonaIe[o/6AGok1UEonaIEKo/6MJojUUJonZHfKo[f=FojeQ F?n/GeSoZ5eMojILGonXG5goZUeLojYNFonXG5coZ5]KojeNE?nYEe_oY3j4okDgVOnj8Ko`CZ5olPjQoo6>hKo`D60ol91P?o3@H3o_D1oojDhPonW>hCo`4Amok]2 OOnlA7[o_TEnokm3O_no@Wgo/3mook11OOnhAG[o^TAlok]5NOnjAGOo^TAgok]4N_nfAGgo]TIfoka9 K_nkB77o/dAdoja3MOn`B77o[TY_oje;KOnXBV_oZDQ^oke6N_o0@g_obU1coleIJoo;Ef_oc5Q[oliH J_o:Ef_ob5Q[olYKJ?o5Efcoa5E/olAHIoo2Ef;o`UUOolAIHOo2G6?o`eaOolAKG_o5FUoo`eQSokmF H_nnEV3o^EMMokUHF?o0G5So`E]Jol5KF`;o`EaJ00ko`UeJol=LFonmFUgoZU9Ooj1?HOnNC6CoVTUT oiADF?nOHT3oYf@gojMS>On[I3Oo[6@goj]T=`;oZF@j02CoYV8loi]N@OnDFDGo[6DgomQf5ooXN1Co hfX[omYLFOoAF6;odUUNomELFOoGG67oee]WomIKHooFG5goeUaNom5JHOo>FF;ocEQUoliII_oBFfGo eUaZom]MK?oKGFkofE]_omMKK_oHG73og5eWonQX;_oZJBoojVLkon]W>Oo[IcSojVLfonYX=?oZJ382 onYX<`04onYX<_oZJ37ojVPaonYX=0;ojfLe0_o[IcH02?o[IcGojfLdonYWoo[53P02oo[43P0^oo[3 3_oj`PgonL<>oo[64?oj`a7on[dCooZc6_oj[akon[>_o=Q4GoeUiGomYFE?oFEEKof5EIommMG?oSIUkoi6ULon=WGOoOGF_of5=aomUG I?oLGeooh6IQon=]H_oTL6CohfeSon9ZFooRJeSohf]Jon9/FOoRK5SohfYIonA[EooUJeOoi6YHon9Z F0?ohF]G00_ohFUIommUG?oPIe_oiW=@onYm@?oVP3WofWlnol9hCon]LEWoZFeKoji_F@02ok9aEP0X ok=bEoncLESo]79HokAaF?neLUOo]G9IokEdG?nfLeWo]G9GokAbF?naLU_o[G1OojU_HonVKFKoYfeU oja]H?nbL5_o]G9MokIaFonfLEWo]71Mok=`G?nbL5oo/fiIokA^EoncKESo/VeKok9/F_ncJeSo]6aH ok9/FOnaJU[o[fMLojmUFOnaI5Oo/FEGok1VFonZIFWoZF9UojaQF@;o[F1G00?oZemHojQMGOnWG5d0 0_nYGE`04OnZGE[oZUeGoj9BIOnZ>XSo^SBJok8So `3N8ol@iQoo3?h7o`D6000;o`d6102ko`D20oj/kP_nQ>8Go_T=ooke3O?nmAG_o_DAnol14O_no@Woo ^D60ok=1O_ngA7_o]dAiokY4NOnkAGSo^dAhok]3N_njAWco]TMjoka7M?niAG?o[D9doja1M?nb@g?o /dQaoji:K?nQB6_oXdM]ol58M?o;AgOobD]fol]GK?o;EfWoc5QZoliHJ_o00`ojUS>OnRH3goU5U3oiiM?Oo6L2GoiGTConMa7ooLHDgodEESom=IHOoDFecoeEaJomIK H_oGFfSoeU]OomILFooDG5codUYOoliIH_o=F6WodUU`omIJL?oIFfoofee^omYMKOoIG6cof5a^omML K_oHFgOoi65MonYY=_oZJ3[ojfLionYX=_oZJ3CojVPconYX=?oZJ3?ojVTconYYonM`3OoUK`D0oooT K`1>onA_0000oooTK`0YonA_0007onIg0_oZP`[okXPHoo258_o`Q2?okh@Nonn57@02onn27@0Aonn1 7Oo_PQgokX8Monj37?o^PQgokh@Monn:7oo`TR;oli/UooJT9ooh/ROonKhZooW9;OoidRoon]Pboo[M =_occS_omoo[33?oj``gon/<>ooW33_oia@ko n/L>00;on/@>02[on/<ol@cROo9 >HP2olHjQ`04ol4gROo5=X_o`c^5okm0P@Co`d6106So/3b3oj0fQ_ni@X3o_D=noka4NonnAGgo_dEn oki1P?nn@8Co^49mokQ3Nong@g[o]T9kok]4N_nk@gWo^dAiokY7N_niB7Wo]dIgok=3L_n^@g;o[d=b okE4LOndA7;o/DI`oj=5K_nQB6[oa4e`om19N?o6AgWobeA_ol]HJ_o;FFWobEMZoleHJ_o5EFco`eI] olMGIoo6G5koaUaLol=LGoo5FF3obEIPolIGH?o6F63oaeMTol5EIonoF63o_U]EokQHFOnjFUKo_EeC okiLFOo0G5Woa5eIol=KG?nhEf3oZ55Qoj9>GonWCeoo/U9OokIDG_nlEUkoaEYIolQIF_o5GEco[VQ5 ojiV=On/I3OoZF@iojIR>_nLFcooTEM4ok9Y_oBEU_od5ASomAKGooDG5_oe5]K omIKI?oGFfOoeEaLomELFOoEG5codUYPom1II_o@EW?oeEQfomQJLooHFg3ofee/om]MJooJGF[of5e[ omQKL?oFFGoofEUoonUUB_oZJC7ojVPdonYY=@;ojVTc00_ojVPdonYY=OoZJ3OojfPion]W?Oo/IT3o k6Dnon]V>OoZISCojVHbonYW<@06onUW<007onUX oo[32ooja@gon/D>oo[43P?on/<>02_on/D?oo[63ooja@kon/H>oo[74?ojaA3on[lBooVc4_ofYa7o mJXConfE6oo9HCKo`FXholAj??o9RcoobX/oolN5?oo9RSoocYTjolZ:??oFHESofUIAomQFE?oFEeCo g5UHon9RG_oTJ5oohfQMon1OJooJDG?ofUMUomaNGOoNHUkohF]Lon=_HOoTKVKohfePon9[FOoSJe_o hVaLon=[G?oTJUWoi6]G00;oiF]G00?ohVYIon5[FOoRK5L00_oQJeL03_oRJeSohFYJon1XF_oPIU_o i6iIonUlC?oVPD3ofWloolEkB_naLeSoYfiNoja_Fon`L5So/W5G0_naLEL08onbLEOo/W=MokAdG?nf LUOo]G9GokAbF?neLUOo]G=FokEbE_nbLUWo[FmNojI^J?nUKfkoZ6mXoji`HonaKeoo]75MokE_F_nd KUSo/fmJok=^F_nbKE_o/VeJok=]F?naJe[o/FYKok5XFOnaIeOo[fIHojiVFon/I67o[6AWoj]RGon] H5Oo[5mH00;oZemI00koZeiJoj]NFOn[H5OoZEmIoim=KonX_o[IS[ojfHion]V=oo[ISKojFLaonUX;_oYIc3ojVLaonUW;`GojFP_00GojFL`onUW00?oig4?onI`2_oTK`40oooTK`1?o:RCcobX`oolR:@?o:RckocIPkol^>?ooEHeSo fEI?omUGE?oFFE?of5QGon1PFooTJ5goi6QOon5OJOoKDg3ofEMTomaMGOoOHUgohVUJon9/H?oSKfGo hfeP0_oSK5h08?oRK5gohf]LonA[EooTJeOoiFaGonA[F?oRJUWohF]Hon5[EooQJeSohV]Hon5[EooR K5SohF]Gon1XF_oPJ5gohfmIonMiCOoUOScofW`lolMjB?naLeKoYfiMoja_FonaL5So/W1Gok1`Eon` LE[o/G=Kok9bF?ncLUWo]79G0_ndLUP03oncLUWo]79GokIcEOncLe[o[W=UojY`I_nVKVWoYfeXojY^ I_n`Keoo]6mIokI_EondKeSo/ViKok9]FP02ok9]F@0Kok5/G?n`JU[o/6MGok1WEon^IecoZF=QojYR Hon/H5co[f1EojiPEon]H5Oo[5mIoj]NF_n_HECo[f9Boj1=LOnT<9Go/BnKojldU?naBol@iPoo7>hKoaSZ600;ob3V801Ko`3f4ol51POo4@H;o`422ol50P?o3@H7oa461okXn P_nQ=hGo/Sb4ol14O_nmAG_o_T>0okm2QOo0@HGo_Sn3ok]2O?nmAGWo^D=kokU2Nonf@GWo]D=h0_ni AWH04?nhBGKo[TIkoje4Lon_A73o/TE`ok=5LOncA7?o/4A_ojm5J_ndB6OoaDIbom58N_o6AWOoaDQg olUEK_o;EVh2oliFL013ol]GJOo7EFOobEQRolYIH?o:FEkoaeQPolEHH?o7EV?oaEMSolAIG_nmEeco _5]GokeNE_niGEco^EmHokiOE_noGE_o^EUMoj]BG_nRCV7o[59OokUGFonoF5Wo`eYFol5KEOo1FeCo `U]Fol9KF_o4Fe[oaUYLokiPE?nbJDOo[FI2oieK??nCF4?o/FLaom]f6?oVM1_oh6=3omAFG_o@EUoo eUYNomELGOoEGUWoeE]QomIKIooGGEooeUiGomMMF_oIFfGoeeQ`omEGMOoDEgSoe5UfomQLL?oHFg3o fUe[om]NJooKGVWof5a^omAIO_oEF8CoeER;omQJP_oZITSojVTcon]X=`02on]X>@06on]W>?o/ISco jfHjon]V=ooZIcCojVLb0_oYJ3401OoYJ33ojFP_onUX;ooYJ33ojFP_00;ojFL`00?ojFL_onUW0_oWL@h00ooWL@ooiW08onA_003oonA_04_oi6l0 003oonA_02koi6l000Coi700onIg1?o[P@cokXLH0_o`QB800oo_Q1kokh@Monn57@03onn57P;ol8HN 00[okhDOonj57_o_QQkolhTOooJ:7_ofRQgomXTNooJ97oofR1komHPN0_oeQ1h0H_oeQQkomXPNooJ7 7_ofRaoomYOoEICCodV8aolma=Oo:QCooahU1olV9 ?oo:R43obiXKoaSV8olPhROo6?8Go_Cn2ol0oP_o4@H3o`D22okm0P?o3@H7oa422 okdoPonV=hOo[3V5ol13Ooo0AGoo_D>0oki2Oonn@X3o_T1ooke2O?nlAGSo_TAkokQ1N_njA7So]D=h okM4MonfA7Ko[TAgoja5Non/@WKo/dAb0_naA780C_naAFoo]DM[okI9IoncBFGo`DE_omdnQ_o>A7go bDAmoliBM?o?EVkoc5AaoleGJ?o:F6?ob5MWolUHHoo8FekoaeYNolAIH_o7F6GoaeISol=HG_nnFeSo _5UIokmJEOnoF5So_E]GokiNEOncFUWoZ5=QojA?HonZD5oo]eMHol5KE?o1FUOo`UYGol5KEOo0FeCo `UaEol5JFoo1FUcoa5UKolEJFOnoHe7o[VM8oi]NCOnJGD3ob70RonEd6?oWK2oodEIFom9EGOoEF63o eUYNomELG?oFGU[oeUaRomMLHooFGE_oeE]NomQHJOoKE7CoeDb1olm6ROo9@X_obdJ6om=AN_oHFW7o fEiZom]NJ?oJGV[oee]bomAHPOoEF8KofUZ0omUJR_oSGfSojVPdonYX<`;ojfLf00?ojVLdonYW?oYNCSojWPhonUh>OoYMcGoj7LeonQg=_oYN3H00_oYN3L00ooYMcGoj7PeonUh =P02onUi=@0?onUh=_oZN3OojGPeonUg=_oWMSCoiW@aonEc;_oTLBcohVlWon1^8_oOKAoogfdMomi] 7?oNK1[ogV`H00?ogV`I1?oNK1/01OoNK1[ogV`Hon1_8_oWMRgoiWH/00;oiWH]00coiWD]onIf;OoV MBgoiWD]onAe;?oTM2_oi7@Zon=e;OoTLbGoig4AonMa3?oWL@h2onM`3PGoig4>00?oiG06onA_0?oT K`00oooTK`19onA_0000oooTK`0`onA_0007onA`0?oVMPCojX<:onj76?o`QB7ol8@Qonn57P02onn4 70;okhDM013okhDNonn67_o`QaookhLNonn67_oaR23om8XOooJ:7OofRAkomHTNooF:7_ofRQoomXTN ooF97_ofR1komHLN0_oeQQh09?ofQAgomX@MooJ37_ofQakomX/OooJB8?ofUb;omj0TooN[9ooh]2Wo nL4/ooW:;ooid37on]Pcoo[N_o:R4;oe5mKomYFD?oJEeGoeeQGomQFF?oNFeWohfEKon=YGOoRI6Co gEIaomM?JooIEUgogEiNon1WGP02on=^G`06on=]HOoSKF;ohfePonA/G_oUK5goi6]H0_oTJeL00ooU JeSohfYHon5[F006on5[E`2[on5/F?oPJe[ohFQMon1VGOoQJUSoiGE>on=k@ooJOCoobgY7ok=bE?nX KecoZfiLojm`GOneLeWo]G=Gok=bFOnbLEWo/W5Gok9aF?nbLUWo/W9Kok9bF_ncLU[o]GAKokEcF_nd Le[o/W=Moje`HonXKFKoYF]UojA[J?nWJfGo[VaMok9]F?ncKESo/VeKok9ZEonaJEKo[fUJojeVF_n/ IEcoZ6ARojUQGOnYGe[oZUmJojaOF_n_HUGo[5mEojAKokLdT_n`=97oYbjEojH/U?n] :iOo]BVMok@^Uonf>olPfR_o9=HgobCN8Co_T62ol94Ponl@Woo_49nokm3POno@X3o_D1ooke3NOno@Wgo^D=jokQ4NOnl AGSo]d=ioj/oNOn[@WWo[dEmojm3N?n`@gCo[T5dok=4L?ndAVco^TM[okM8J_ndBFWo_4U]omlnQ_oR @8OocDImoliooJMBSoiW4SomeP@oo=DF3odeMJomIIG?oF FEkoe5]LomINFooGGV;oeEeRomEJHOoGDfkofDelomU?oYMc[oj7LjonUg=ooXMcKoj7Hg0_oXMSH00ooXMcGoj7HeonQg=@03onQf=@0GonQf=?oWMSCoigHc onMf=OoXMSCoj7HeonQf0ooWL0h4onMa3P03onM`3_oWL0goiFl40?oo i6l0B_oTK`000?ooi6l0<_oTK`001ooTL03oigP4on^13Oo^QaWol8LQoo258_o_QAh00_o_Q1d00oo_ QAgokh@Monn57@02onn57P09onn57Oo`QaoolhXPooJ:7OogRQkomXTNooF:7_ofRAoomXXP00;omXXO 06KomXTNooJ:7oofRAoomXTNooJ87oofQakomXDNooF67ooeQAkomH4LooF27OoeQQgomX/PooJ@8Oof UR;omj0TooR]:?oh]B[onL0]ooW:;_oidS3on]Xcoo_Q=OoigS3om=0SooC?9?ofdB?om]0Xoo?A=OoW dRooh]4]on??;_oUdBgolmhToo[T7Oojgb7on]/Woo[F:OojebWon]LZoo[F:Ooje2Won]L[oo[I;_oj fBoon]@/ooW@8ooicAKon<@BooNj4_of]aKom[`OooG4:Ooeb37om/PcooK6XSo`cf7olLmQoo3>hSo`cb6olPnQ_o7?hOo`Cf6olDo Q?o6?hCo[CN8ojon]W=?oZIc;ojFL` onQY;_oWJbooj6lbonQc=?oYMSOojGPionQi=ooXNSKoj7PhonUh>_oYMd02onUf@00;onUf?OoXMCWo igHionQf>OoXMSOoj7HfonQf>?oXMSKoigHfonQf=OoXMS<00ooWMSD01OoWMSCoj7HdonMf00Coig0=onM` 3_oVL0_oi6l2oooTK`19onA_0000oooTK`0donA_0009onEa0OoWM`GojWh=onj66?o`QR3ol8DQonn5 7_o_QAgokh@M00CokhDM00KokXDMonn57OoaQakomHTOooN:7OofRAd3ooJ97P03ooJ:7oofRQkomXXN 00;omXXO00?omXXPooJ97_ofR1l00_ofRR007_ofRQoomHTNooJ87ooeR23omHLOooF47_oePakomHLN ooJ:7_ofRaoomXlOooJE8?ogWR?omjLVooRe:_oe]Agom;DDooG26ooccBColM@eonSDl4_oe^@?o m[/0ooJl0?of^`7om[/2ooFk0_oe`0?okK_o5ICSoeeLeonQ5=ooYCSCoh5D]om9W:_o9Qc_o bi90ol^>@?o=UC[ocXY3omMQF_oJEdkofEQDomMGE_oGF5GofEYEon1OFOoTIegohfUOommMJooIDFoo eU1VomYHH_oOHf?ohV]Jon=]F?oSKEgohfePon=/H?oUJegoiFeJonE/F0?oi6]G00?oi6YIon5[F?oQ JeL01OoQJeL04ooPJeWohVYJonA/F?oRK5WogfYJommYFOoQJUWoi71Con=fBOoJNDCobGQ8okIhE?n/ Le[oZg5KojmaF_nbLE[o/g=Iok=bFOncLUX00_ncLUP04onaLeko[g=SojiaHOn_LV7o/7=Sok9bGOnc L5So/75Lok1`G?n^KUgoYf]RojA[J?nTJV[oYfQSojUVH?n[IUco[6IKojYUHOn/IE`00_n/I5P0P?n_ IUOoZF=IoiQ7JOnR=X3o^CFHok97o/cJ@okLaTOnmX[oaT23ol4oQ?o6?hSoaD26ol=1Q?o2?X;o`ceookm2Noo1@gco_T=iokQ1O?ni@7_o]d1iokI1NOnc @Wgo[d9moje1M?na@foo]TA^okU7K_nlAfgo_4E_ok]7KOn]Deko[EIJom=3OOoW=i7obDEcol1CFoo5 F6Kob5YTolMIH_o4Ef?oaeYLolIMG?o2G5co`5YMokmHFoo0FeCo`e]EokeIE_nSD5_oUTYNoj=>Gonc EUWo_Ua@olEOC_o4Fe?o`eUGol9JFOo1GEOo_eaGokiIFonlEe_o^eMFokeKDOo5GU;oaeYHokaFHOn` CF7o_U52om]^<_oYLDGoi61[omiHOOoHFG;oeEYFomEHFOoFFF7oeUaNomQPGooIGfOoeUM`omE=NOoJ BHCofDR5omA5POo?@HGobT68olM0S?o9@8_ocTB6om98PooDBgood4>1omA>O?oKG7cofEZ2omYIPooJ FX3og5Yoom]IQ_oJFHGojV9@onUY:_oZJ33ojVLc0_oZJ3800ooZJ37ojVPbonYX_oYN3[oj7LlonQg@?oWMT?oigE7onMeAOoWMD;oigDmonMe>@;oigDg00CoigDf onMe=ooWMSGoigHf0_oWMSD02OoWMCGoigHeonMe=OoXMSKoigHeonMfonM`3@03onM`3@03onM`3_oVL0[oi6l10?ooi6l0 B?oTK`000?ooi6l0=ooTK`001_oVMPCojh0>onj46Oo`QR3ol8HOonn57P;okh@M1?o_QAd02?o^Q1co l8HMoo>97oofRAcomhXMooJ97_ofRAgomXTN0_ofRQl01?ofRAoomXTNooJ;7oofRQh2ooJ97P;omXTO 03OomX/OooJ;8?ofRaoomX`QooJ;8?ofS23omX`OooJ;7oofRAoomHHNooF37OoeQQoomXXPooJ<9?oe QAWokWP3onim0_o`R@KolYPHoo:]9Oo^^A_ojklMonS89?o^f2Gon^DOoo[U8_ohi2ConNDTooWR9Ooi fbSon]L]oo[F;_ojebcon]PYoo[F:Oojeb[on]H[oo[G:ooigR7onN@Noo[Q8?ojgaoonMXMooWD6Ooh bQKoml4DooJl5_of_Agom/4Uonnk9?oRZA_oi:/Hon^e5?ob^P_om[/200;om[/002Gom[d0ooBo0ooK QRKo_5i1ol=d=?oOoW7oV3MnojLdUOn_ =i?o]cNBokhaU?nj<97o]cB>okXcS_njBojd_U_nb;YOo_C2?ok@kQOn[BWKo^DElolHjQ_o1 ?8?o`Sf4ol0kQOo4?H?oaSj4olM0Poo8?hGob3f8okhjR_nV_oYO3cojG/lonQh>ooXMc[oigHionIf>OoVMS[o iWHgonIf=?oWMSCoigHconMf=PCoigHe0_oWMCD01_oWMCCoigHeonMe=?oWMCCoigHdonMf<`GoigHe 00?oigHdonMf=OoWMSD00ooWMSD00ooWMS?oigHeonMf=@02onMe=0GoigHe00ooigHdonMf=OoWMSCo igHeonQf=OoXMcGoigDdonAc;OoPKbGogfdLomi/6?oMK1OogfdLonEd;?oWMbd00_oVMRd01ooVMR_o iWH/onEf?oTK`001?oTL07oigH5onYn3_o^PaX2oo278003onn57_o_ QAgokhDM00GokhDM00OolHLNooF87?ofQa_omXPLooJ87OofRAgomXXN00;omXXP00ComXXNooJ97Oof RAkomXXN0_ofRAl02oofRb7omX/PooJ;8?ofS27omXdPooJ<7oofS23omX/QooJ;8?ofS23omX/P00;o mXXO05SomXTPooJ78?o_M0Sojfl0ona`0?o^MP[okh8Gonf93OoZS@gok9DAonnQ4OodZ@[om[8=ooS0 4_oibQKonMHIooWN7OojgR?on]d/oo[K;oojfbkon]X/oo[J;_ojfbgon]L[oo[J9oojhakonN4Loo[P 7_ojhAoon^4Poo[S8?ojgagonMLKooW?6oogaQ?okkH:onRX2ooUYA;ohjDFon>Y6OoX/1OokKHAoo>j 2?of^`7om/80onRS4?o3FS_o`VXkol1f=oo1JSWodePion]6<_oh?ookXeSonk=I3o^32Eok@^Uonc>hGoZdUdojE: MOnaAGcoaSb7ol@jR?o1>hKo`C^7ol@lQ_o5?XGoaSf6olXnR_o;?hSo`3f5ojPeQonb>HGoad27olM0 Q?o4@H7oaT62olToR?o6?hGo`d9lol13NOo0A7Wo`4Ejok]3N_nc?gSo/Sihok3ola3 Qoo9@Hcob42>ole3Q_oBB8;oddZ1om11Q_oA?8Wof4j3omaMOOoIFGoofER0omYJOooJFGoofEV4omEH R?oVHEOojVP/onYX;ooZJ37ojVP`0_oZIc82onYW<`0@onYW<_oZJ3;ojFT`onQZ;OoUJbWohf`Ton9] 8?oQKB3ohFhMon1^6_oOKQSoh6hKon5`8ooTLbgoigPeonQj>0;oj7Th00?oigPionIf=_oVMS@00_oV MSD01?oVMC;oiWHbonMf1ooW L0d00ooWL0koig0=onE_1@3oonA_04Ooi6l0003oonA_03_oi6l000?oiW85onYj4?o^Pa/00_o`QQl0 0oo`QQkokh@Lonn47@04onn57@0Hoo257OocR1komXPKooN96oofRAcomXTMooJ97oofRQoomXTOooJ: 7oofRR3omXXOooJ;7oofRb7omXXTooJ;8_ofS23omX/PooJ=7oofRakomXTOooJ97_ofRAoomXXM0_of RAd07_ofRagomX/LooN?8_oeQAKokgH1oneb0?o]M@CokglFonf44OoXP`_oj8<>on^52oo^N`7okgT0 oo210?obQ`3oli<3ooBO1_oeY`Wom[4>ooRl5ooia27onL`Xoo[C:OojfR_on]d/oo[N;?ojhbOon>@O ooOT8@;on>@Q03?onN?noKcWobF@ioma<;?obok/fTOnnDok0oR_nYB7WoZTYc ojY9MonVB7So]d63ol/lR_o4?8Oo`3^6oklkQ_o3?HGoacf7olLnQ_o9@8;o`Cj3ojdhQOnc>HGoacn6 olHoQoo3@8;oaSn4olXnROo4@H?o`d9lol52Noo0A7Wo_4=kokM2NOnc@7Oo[SehojlnNOnc@7So`TMf ol=:MOnkAG7o^dE`ol94L_o3Afko/U5SojYEGonVDegoZ5=KojeEF_nSF4koWei2oj=L?oncDdCoae5B olUFG?o7Feoo`f1EokMLE_nWDUcoWTYQoiI7HOnWCUco^UMDokmLCOnoGDco_EeA8KodDR0om=9POoA@HKod3^7omI9PooJFggofE]nomQHPOoIF87ofUR3omQHPooGFHSo gU]lonYU?OoZJ2cojVLconYX00?oig0?onM`3OoUK`<0 oooTK`16onA_0000oooTK`0lonA_000SonA_0OoVL`KojW/@onj26Oo`QQool8HPonn47Oo_Q1cokhDM onn57?o_QAgokh@Lonn57OoaQakomHTMooN96oofR1comXPNooJ97OofQacomXTNooJ:7oofRR3omX/Q ooN>9OofS2;omXTNooJ:7_ofRQoomXXNooJ87OofRAgomX/NooJ:7OofRQh00oofRah03?oeRQgomX`Q ooJ<8?oaNPOokW<0oned0Oo_OA;okXLHonZ93OoYQ`kok8L3_ogUaKomj0JooR[6Ooi^AgonLDRooSD7_ofh1gom>DRooGV9?ogiR?on^HS ooOV8oo[fAkohlhIonG@6OoXdASojllEonk<4Oo`a`cokl0:onfh2ooY/0ooiJXConBY5OoW[ACogilU ol9L@oo0HSWo`fTfol5Y=_o1KSWoa6/eoleG9ooR?Akol3PMoni7:?oMHc_ocgI5ol^:@?o?QTWof61H omMFCOoGEeGofEYFomQHEooFEUOof5QGommNFooSIeWohfMNomeIK_oFCFcoee=Nom]JG_oPIFCohfaO on=/GOoTJf7oiViTonI^HooUKEgoiFaHonA[F?oUK5T2onA[E`0Pon9ZFOoQJeSohF]Gon5[EooQJeSo hFaHon5[F?oSJUWoi6]Gon=[E_oRJeWoh6]Jomm[EooPJeOoh6]Homm[FOoOJU_ogfUHon9]E_oRL5Go f75=olYdC?nfM5Go[WEHojedFOn^LUco[G9Rok1cG_n`LUko/G=Ook9bG_nbLE/2ok5`F@2>ojm]FOn^ JeSo[V]KojiXFon_J5So[fMHojeWFon[IV3o[VQHojAQGon5@gSoNCB4oh/iO?nK?g3oYD1/ok0jQ_ni =9Go/CB;oj/cR_n`hKo`Cb8olG_nkF5Go_e]>okiKC_nlGDko_5a=ok]JConiFdko_E]Dol5KEOo2FUCo`EUFokmIFOo1 G5Coa5a?olEJCOnkEUGo/U5BolUCAOoUED_olEAVoo=AQOodC9?oldjAonYGPooNGGKogeeeon9NMooQ GG[ohEf1on9KRooRDY?ofdN;omM5Q_oD@hGoeDF1omI5O_o@@h7obd:6olQ0Roo7?hgocTF4om58P?oA B87od4:6om4lQooFAH;ofEMoomUKOooIF8?ofeR5omUHQ?oFEhCoeeV3omQJQ_oTGf?oj6XZonI[9ooT JbWohf`Ton9/8_oQKAkohFhKon1^6P;oh6hI00cogfhIon1^6_oPKQ_oh6hKomm]6ooOKAWogfdMon5_ 9OoUM2ooigLdonQh=?oWMc<2onIf<`CoiWHd1?oVMS<01?oWMS?oigHbonMfonM`3ooWL0koig0>onMa 4?oVL0_oi6l10?ooi6l0AOoTK`000?ooi6l0?ooTK`000ooVL`GojGT=onj16002oo278003onn57_o_ Q1cokh@L00;okhDM01Gokh@Loo267_ocQagomXLKooJ76_ofQacomHPKooJ87?ofQa_omXPLooJ:7_of RR7omh/RooN;7_ofRaoomXXPooJ97oofRAkomXXNooJ;7oofRQh01_ofRQl0FOofSB?olh0Aonid0?o^ L`3okWP;onn66?o/RPoojHP@onb83OocR@;olXH0oo:70?oaQ@3ol8@0oo230?o`P03okgh0onml0?o` N`3olGT0ooAi0oofN@WomWd?ooJ03_ofQ0oomXd=ooJM1OodZPSomkL=ooW64_oie1Gom=@DonS>5?oY dAOoj]8IonOB6_oUdQcoi]onV^3ooYZaGoc7Pmol9RB?o4 Kc[o`V`jol9W>_o3KSGo`g@[olAP9OoCBBCoiShQonm08OoUESGofFi9olmn@ooEMdoofUaKomMGCooF Ee?oeeQEomMHF?oFEUOoeeMEomiKFooSIE_ohfYOommOJooGCf_oee9OomYIG_oPHf3ohf]Lon=[G_oU Jf7oiVeSonI^I_oUKF7oiFaIonA/F?oTJeSoi6]GonA[F?oSJeSohF]H00;ohF]G00SohVaGon5/EooR Je[ohfYIon=[F?oSJeOohV]Iomm[F@;ogf]G09_oh6aHon1/F_oOJeWogVYJommYFooSJU[ohFiDomQa C_o=M4ko^G5CojmeFOn]MV3o[GARok1bG_n_LEoo[g9Poji`G_n_Ke_o/6eIojm/F?n^K5Wo[V]IojeY FOn]J5Wo[VQHoj]WGon^JEgo/FQCoiiBHonC@77oSSefohDgOOn5=WcoSCUfoj4gPonf UOoSB:3og4FDomA4P?oDAGkoeDEnom12P_o:@HKoad2;ol00Ooig4>onM`3OoWL0koig0>onM`3OoWL0koig0=00Co ig0>00?oig0?onI`2?oTK`00oooTK`14onA_0000oooTK`11onA_0006onEb1?oZNPookX8Joo267oo` QR3okh@M0oo_Q1`03_o^Q1cokh@Moo657OoeQa_omXLKooJ77?oeQacomXPLooJ77?ofR1gomHPNooJ: 8OofRAoomhXN1?ofRQl8ooJ:7P0=ooJ<8OoeQa_okgL4onab0?o_MPKokh8Gonb94_oYR0kojhT8 0oocQ@3olhH0oo:60002oo>60004oo:70?oaQ@3olH40oo6100;okh4001?olWl1ooEn2?ofO@komWT> ooEg2oodN`Col800oo610?odQ@3oiXD1omn50?oTT07oj9X2onVU1_oY/PWoj;`>onS74OoZd1Cojm8G 00;ojMomYIEOoHEeOoeUIGomEGE?oGEUKog5UH on9TFooTJekoh65WomUBJOoFD67ofEMKomiOH?oRJF3oi6aMonE[GOoVK67oiViWonI]HooUK5coiFaI onE/F0;oiF]G0:SohVYIon5ZF?oQJeOohV]Gon5/F?oQJeWohVYIon=[EooSJeSohf]Gon9[FOoOJe[o gf]Hon1[EooPK5SogfaKomm[F_oNJeOogfUKon1XG?oPJESogV]DomU_E?o=KU;o^ViDojeeH?nZM6;o Zg9QojicH_n/LF7oZfaKojeZEon]K5So[FaJojeZFOn/J5So[6UHojaXF?nZJF3o[F]LoimGH_nE@Foo Vd=]oie4JonI@6koTce`ohXiLon:Xko`Sb9ol0mQ?o0?8Co_c^6ol@mQOo8?hCo `3f4okDjQOnm?8KobCf8ol/mROo5@8Co`T61ol10POo5@X7oaT5ookHnOOn_?Ggo]d5lok50NOnd@W?o _dEboka4Loo0AW;o`dUdol97N?njBFco[e5SojYBHOn/DF;oZe=IojMJB?nVH3koYV8mojUQ?OnTGd3o Wem3oiUQAon@ID_oRf=9oi=K@On/Dd7o`598ol9CC?nnEU3o^UYFok]JE?nlFTko^eU>okeIB_nlG4Wo _eeokEDE_o8DToohUABoo9EKoocDX_ole6;oo=BQ_ocEHOo lUV7onMJO_oOG7Koh5ifonANNooUG8KohE>Aom]:TooMAiOohdNOomm7VOoGAXCoeDEmom93P_o<@8Ko b3j;olFVoo d5a`olmJM_oCGUSogf`Mon5_4ooOKQX2on1^6P04on1]6ooPKA[ogfdKomm]6`;ogfdL00_ogfdKomi/ 6?oNK1SogfhNon=c:_oWMc?oigPeonMg=OoWMSCoiWHconIe<`03onIf00?oig4?onMa3_oWL0h01OoWL0h00ooWL@ooig0?onE`1@3oonA_04Co i6l0003oonA_04?oi6l001GoiW<5onUi3_o]PAWol8HPoo678_o`QQkokh@Lonn47Oo_Pagokh@Moo25 7OocQQgomXLKooJ66oofR1comHPLooJ87?ofR1gomXTOooJ98?ofR1h00_ofR1d00oofRakomX/OooJ; 7`07ooJ:7P0;ooJ;7oofSB;olWh60002oo:3000>oo220?o^PP3okh<0oo210?odP@ComX8;ooIn3oofO@colgl3oo63 0?oYN`3ofg40omQ`0?oILP02omYb003Pom]d0?oMN`3ohHD0onBA0OoWVP?oijH6onRc2OoX`a3oj]0D on_D6?oZe1Sojm@Ool^H>Oo1Pccobh`folZ7=Oo8P3WobgdcolUg;?o5L2Wo`fXUolUS8ooBDAkogDHK onA=:OoJHScoe890onAoFooXIVGohVACommOF?oIF5[oeUEGomAFE?oCEU?of5QGon5RG?oTJecohVAT omYEJOoFD67oeU9Lom]IHOoRIekoi6aLonI/GOoVK63oiFaUonI/IooUJeooiF]IonE/EooUJeOoi6]H on9ZFOoQJUSohF]Gon5/F?oPK5SohF]Ion=[F?oSJeOohfYHon=[F?oRJeWogf]Jomm/EooPK5Ooh6aK omm[FooNJeOogV]Hon1[FOoOJUWogFYJomm[G?oPK5OogG1Com5aE_nkLUWo[WIOojQeIOnXL67oZf]K ojm[E_n^JeOo[6]Ioj]ZF_nYJEcoZFQKoj]YFOn/JegoX5ePoi93J_nD?VooUd5`oiU1KonJ@6coVSm] oi`mJ?nM>FkoV328ohh]S_nF;X_o[2n>ojhiROnVBGgoY4ekoj]hgo`Sb9ol4nQ?no?HOo`C^7olhOobcf9 olTnQoo2?hCoa461ol=0POo4@H;o_Sn0ok8kOonf?Wgo/Cimojm0M_noAW3o`DIaoka4L_nnAW7oaDIf oka7NOn]Cf_o[E9Qok1CH_n]De[oYEQ8ojMO?_nYHCgoZf8lojQQ?_nLGdKoT5]=oheMC_nDHTKoWVPm ojM]=_nWJS?o[E/kol1@Aoo1D4_o^U=0oo=BR_ocE8KoleB4oo=EQoocF8SoleN8ooADROo_FH?oi5ik on9IQOoNCICofDJDomU8S_oJC8Wog4Z?omi8U_oKAHgodT=oola1Q?o6?hgo_cfEol=1T?o=BXCocTN0 ola1Ooo=@GOocTQ]om1EI?oDGecodUaXom=KKooBFfcodEa/olmKKOo@FfkodE]dolmJL_oIIScoh6hG on1^6OoOKA_oh6dKomm]6_oOKA`2omm]6`;ogVdK00OogV`Homi/5ooOKA_ohg8XonIgonMa3@02 onMa30;oig4=1_oWL@h3onMa3`03onM`3_oUK`?oi6l00?ooi6l0@_oTK`000?ooi6l0AOoTK`006_oU LPCojGT=onf16Oo`Qb3olHPQoo257_o_Q1gokhDLonj47?o_Q1colXHMooF77?ofQa[omXHKooJ87?of QacomXPMooJ:8?ofRQoomXPMooJ66oofQacomXTNooJ:7oofRaoomXTO0oofRQl2ooJ:7P050?oePPKomWh?ooN03_o[O`?ofgD0omUb00;ofW@000Ko fG<0omQ`0?oHK`3ofFl0omYa0?oJLP02omYa000comaf0?oPPP3oi8l0onJG0ooSX@OojkX8on>j7_o7 WS7odJdYomJg9ooF]R[oek8ZomJU:OoBU2cobhTbolZ3=?o;NRgobfLTom1H7?oCEB3oe7/]omNU;_oV Oe_oifMIonAYD_oSIU[ogeiJom]JFOoHEeKoeEEEomMFE_oNGe[ohfQKon=XH?oLFFSoeU1TomE@GooI Eecoh6AOonE[H?oVK5koiFaOonE]I?oVKFWoiF]UonAZG?oUJUWoi6aHonA[EooSJUSohF]H00;ohFaH 0:3oh6]Hon9ZFOoTJeSohf]Gon=[F?oTJeOohV]Gon1[FOoOK5Woh6eKomm/FOoNJUOogf]Gomm[F?oP JeOogf]KomaZF_oMJESogVYKomm^GooLKeoobVQOokIVG_nYJ5_oXfYJojY^F?n^K5Oo[6YIoja[F?n[ JE[oZFQKoje]F?nQHfCoSdI]oiE0J?nF@fWoTd9^oi=0L?nE?VkoVCa]oi`mIOnR?FSo[SV2ojXdROnM ;h[oTSFN?nbCG?o[TYfoji:MOn_BgGo[T]eojQ8M_nb ?XCo`CR=ol0lROo5?hOoa3j8ol@mQoo4?8Ko`Sf5okPiQoo0>hOobSf8olLoQ?o2?XGo`Sn4ol=0POno @8;o]S^3ok8jPOnd?7ko/Cmkoke5M?o4Ag3o_4Abok]4Lonn@gGoa4AfokQ@LOnTDF[oZe1Qok1FF?nU FTWoYeloojYP?OnWHCooWem4oiUMBOnDFdcoU5e9oj1T?OnVJSOoZFTdoje]<_nXKcGoXfLcoj]I>Onb DSoo/e@jokUE@?nnEdKo_UY:okaIConkE5Ko`5=IolIFEOo;F57o`EECokE@E_o;DeOoieEYoo=FO_oc DXWole27oo=DQ?ocE8?oleB8oo=GR_ocEhWoleN8oo=HQOodEX_oie6AomM:T?oHAY3of4V;omMonMa3OoWL@/3onIa2`03 onMa3OoWL@koig0>00;oig0?00?oig4?onI`2_oTK`40oooTK`12onA_0000DooTK`001?oVM@KojhHI onjB9_obWS<2on^66@Soi6l000GojH4Conb<8?obWS?ok8`PonV14`08onA_0004onMk3Oo[QQWojhHI onIe1PCoi6l000GoiWD6on^66Oo[QQWojhHIonIe1P03onA_0004onIe1_o[QQWojhHIonV14`Soi6l0 00?oig/=on^66Oo[QQT01_o[QQT4onA_0004onV14oo[QQWojhHIonIe1PCoi6l00oo[QQT3onA_0003 onMk3Oo[QQWojhHI00KojhHI1?oTK`001?oWN`gojhHIon^66OoVM@H4onA_0005onIe1_o[QQWojhHI on^66OoVM@H02?oTK`001_oWN`gojhHIoo2H;?o`V2cojhHIonV14`?oi6l000?oiWD6on^66Oo[QQT0 1_o[QQT00ooVM@Koi6l0onA_0008onA_0003onV:30OocQ@03oo>6000@ooB50?ob P`3olX@0oo620?o_PP3olH<0oo>60?ocR@3olXL0oo:60?obQ@3omhD4ooJ02_oZM@?of740omQc00?o fg@00_oJM@00?OoJM03ofg<0omYc0?oILP3of700omM]0?oHKP3oef`0omI[0?oFJP3ofW<0omQ]4Oo< GdWobfY:olif@?o>OSOobhDbolVF;?o>YBKodJHZolfLVSoZ3Iook8fR_nZ ?h;oX4]joiQ;OOnBAHCoUDF4oia8OonSBG_oYdUlok=MomI9R@;oed^501_oedb9omM= SooICIKoeT^Nole:W_o1Ai7o_dF:olI9R_o;CXCobDV5olY4R?o=AhOod4f2omELM?oGIFKoef5KomIO DooDGEgodE]^om1KK_o?FVkod5]_om5LL?o?F7GoeV=4on1^4ooOKAT00ooNKAX03?oOKAWogfdJomm] 6OoNK1SogV`Fomm^7OoSLR_oigHdonMg=OoVMSCoiWHbonMg<`;oiWHc00KoiWLdonIgOoZM3[ojWonMa2ooVL@_oiW400?oiG06 onA_0?oTK`00oooTK`10onA_0000DOoTK`000ooYPA?omjm5oooS>OoTK`3oi6l0 00?oi6l000?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:N500;olhH001Com8H0oo:40?obQ03olX<0oo210?oaPP3olX<0oo>5 0?ocR03om8T0oo>70?oeQ`3om8P0onIm0?oTM03ohG<0omQb0?oHL`3ofG@0omYc00;ofG<000?of780 omM`0?oHL0000ooGK`00e?oGKP3oeVd0omE[0?oEJ@3oe6T0omIV0ooGFDOoeE=WomEBFooFDU;odU=@ olaJCoo7GcOoaF8Rol1[8_noNBWoa8T/olF<<_o8OcOodFXhomEG<_o@KbSoeH0mon9/GOoTJE?oiF]G onAZF?oUJUOoi6UGon9TFOoMGU[ofEMIom]HFOoQHeWohF=Mom]FH?oMFFCogUeTomiMH?oQI5coiFYJ onI[FooUK5goiViRonM`I_oVKfGoiVePonE[G?oTJUcoi6UJon=YF?oRJUSohFaFon5/F?oQJe[ohf]H on=/F?oSJeWohf]Jon=/FOoSJe[oh6]Homm/F_oOK5WogV]Gomm[F?oOK5_oh6aIon5/F?oNJU_og6UJ om]WFOoKJ5_og6QJomeYG_oOJUooffAKolUOF_nhH5[oY61Moi]TG_nVKE[oZFUEoiEDI_nCA73oUD=Z oi94J?n@AF[oSd9/oi0oJ_nC?FKoTSaSohllH_n=>VKoU3IhoidoQ?nQCG[oYDigojI;NonPBWcoVdQl oiE6P?nEAX?oVdB2oj=7N_n/Bg;o]4aeokI=M_ncCG?o/4adojiH_oaCn3ol4nQ?o4@87oad23ok`nQ?nb>h?o]cb4ok4mOOnc?WOo`49g olA4N?o3AWWo`TEfokm0N?niAWCo/E1Xok5DIOn`FU_oZUm4ojMP?OnJFTWoTUQ?oiEJC?nNGTGoYV4n ojAQ?OnTHS[oZF@gojMU>_nSIS[oYFPhojMXBHGodU1oomIMM?oIIVcofVM]omQTK?oEH5oodemFom5MH_o>FG;ocUQc om5KKoo@FGCod5UXom]Y:?oPKQ7ogVdJ0ooOKAT02?oOKA[ogVdJomi/5_oMK1Woh6lUonIeooYLS[ojG8ionUb>_oYLS_ojGooZLc_ojW@;ojW8h00KojW4konY_??oZKS_ojVdmonY]>ooZKST2onY_ =005onY_<_oYKbSoj70LonMc5?oWLPl00_oWL@`00ooWL@koig0=onE_0`3oonA_047oi6l0001@onA_ 0003onjB9_ooc6GoolaU00;oolaU00Goo<1HooReC?ol`5SoolaUoo:N<`04onA_0007oo2H;?ooc6Go olaUooo70?odQ`3om8P0ooN;0?oWO`3ofWL0om]g0?oMN03ofWL0omQc0?oIL`3of780 omM`0002omM_0003omI_0?oFKP3of6h000?of6h01?oIK`00J?oJL@3oeelNomMFH?oHEE_ofEE@omQF CooHEeGoe4m7oli0;_o;@2_oc4Ddole?>?o;ERkob5X[olUMK?nHC7goUTYnoiY8P?nQBWgoY4]hojE; M_nSBWWoWTMnoiM4OonEA7coVDAjojQ7NOneCW7o/Tia0_n`CW807On]Cg3o[4eboka2Ooo4?HOoa3n6 ola0Q_o:?XSob3f8okljS?nd>8_o`3j4ol4oPoo2?X?oaT23okdnQOna?8?o[S^1ok4mO_nn@GWoaT=g olA3NOo5AG_oaT=kokU4M?n_CFco/U=Rok5ID_nVG4[oW5];00;oT5M@013oWEa5ojUP??nZHScoYV?nUHcWoXf8koj9R>onSHSSoYfA_o@BU_oidicoo=DO_ocDh?ole28oo=AQ_ocDH?ole62oo=BQ?ocE8SoleF:oo=IQ_ocFXGo m5N;ooE;Vooe?jKolD6Poo56X?obB:Goh4fLomI?U_oIDIOofTjJomE;WOo>Aj3ob4NQolI6Y?o_oYM3[ojGP?ojG@j00KojG@lonM`=OoX LC?ojWDfonYc=_oZLSL3onYc=`03onYb>OoZLCSojW0h00;ojVhg00kojVhhonY]??oZKCgojVdkonY] ??oZKS[ojW0donU`:ooXLA_oig4AonMa3OoWL@koiW09onA_0Oooi6l0@?oTK`0004ooi6l000KojhHI oooonf:2OocQP7olX@0 oo>60?odQP3olX@0oo210?o`P03ol840oo6300?olh@0013olhH0ooB70?ofR@3ok8<0omah0?oKM`3o fgT0omYh0?oLM`3og7H0om]f0?oKM@3ofWD0omYc0?oJM03ofW<00_oIL`000ooILP3ofW40omYa0003 om]b000gomab0?oKM03ofV`6omQGAOoFDeWoeeA@omUDA_oKDdOofEE:omE7<_oD@2?oe3dSomQ0;_oH AS;oeT8[omWSo[DUXoj1HH_nNCW[oW4QooiU9O_nJB7coW4Qkoim8OOnRB7coY4Ukoj98NOnQBW?oVTQgohe0POnJ AGcoZDa`oj]=Kon^CVoo/Dm`ojm?K_neBWKo`cn3oklmQoo4?XSoccn8olm0R?o1>h_o/CV;ok`nQ?o2 ?h?o_Sj4okm0POnn?h7o]cinok4oN_nc?Wko^d5kolA3NOo6A7Soad=jolA4NonfCFoo/E=SojaFD_nJ EU3oT5IEoi5GE?nGFD_oXei0ojYP>onYH3coYV4nojIU>onUI3[oXF4kojAP>?nVHCKoZ6QOod DXWole>4oo=BP_ocDH?ole>5oo=FR_ocF8Woleb5ooAGS_oeB9gom46Roo93XOo`Aj?okDVWoni9[OoW C:OofU2JomY?VOoEBYcocDJPolY5Woo:Aj3ocDVPom5;X_o>AiOocTV2om=;P?oEDGooeUmaomQVJ_oI IF_oeV=/omARJooEIF_oeVE]om=QH_oAGUSodUiIom=NGoo?FW7oceQcomUU>?oPKACogfdG0_oNKAX0 1ooNK1WogF`Gomi/6ooQL2SoiWLbonQi=?oWMc<01?oVMS800ooVMS7oiWHconIfonMf<_oWMc?oiWLaonIg<_oWMc?oigLeonMg =?oWMc?oigHconMg=OoWMc?oigHconMg00LonUc=ooYLcWojG?oYLc[ojGooYM3cojG@jonUd>OoYLcSo jGOoZLSWojW4ionY`>?oZKcOo jVhjonY]>@;ojVhf00[ojVhgonY]>OoZKS[ojVhkonY^>OoZKbkoj70KonMa3ooVLPgoiG05oooTK`10 onA_0000CooTK`001?oj^U;oolaUooo7[o_Cadoj1:JOnJBg[oWdUloie;N?nNBG[oVdMnoiY8O_nNB7_oXDQjojA7 NOn[CVgoZU9Yoj5=L?nMB7GoXDUfojI:L_nUBg;oZ4]aojY=LOn_Cfoo_TMlolHoQ?o0?8SoaSfonOGc_oYElfojUP L_o`Bg7olD]foo5>N_obD83ole:3oo=BQ?ocDXKoleF7oo=IQoodFhSom5FAooE6W_od?Z?olDBSonm8 Z?o]BZ_ojdZ/oni9[?o]BZOogDfKomE:W?o?AJ7oc4JPolY8Woo@CojGOoYLcT00_oYM3/2onUc >`03onUc>_oYLcWojG?oZMC_ojGOo[LC_ojVlionY_>?oZKcOojVhgonY]=P?ojVhg00SojVdhonY]>OoZ KCgojVdionU_;?oXLQcoig8>onE_0_ooi6l0?ooTK`0004koi6l000Goig/=oooS>Oooc6GooLIOoo>S>@;oolaU00GojhHIonA_0?oTK`3oi6l0on^6 6@02oooS>Oooc6GooLIOoo>S>@;oolaU00GojhHIonA_0?oTK`3o i6l0onjB9P02ooo8OoaO@[okG42oo1n4Oo/RQ;ojXTomEJC_oCEdcobTT_olU49?o9B2KodTa2omMBE?oGFUSo fEUFomUIDooHEe;ofeYCon1PEooTIeWoiFUHonEZEOoUJE[oiFUKonEZF@;oi6YJ02GoiFYIonEZEooV JeOohVAIomUIFOoIEUWofUEJomYFG_oLFFCogf1Ton5UGOoSJ5Soi6YFonAZEooTJUSoiF]KonE/GooV KfOoiW1WonI^H?oUKUkoi6]Jon9YF_oOJ5cohFQMon=YG?oRJESohfUHon9YF?oRJ5WohfUGon=ZF_oN JE[ogFUHomiYEooMIeWogVMI00;ogfUG07gogfQIomeXGOoKJEgoffYOom]XFooJIUSofVIJomUUFooH I5OofV9RonQNNoo]GXGokUb4on]IO?oTE7WocTEkok51MonU>g?oV3Eboi0fK_nC=VkoXSIboiXlM_n> AGgoUDEnoi]5N_nMAg_oWDQloie:NOnLB7[oWDMloie6NOnTC6ooZe5ZojaAJonZD6_oZ4i^ojU=L_n[ BgCoZTadojI:MOnUC77o[4Ufol90Poo9?HOo_cb7ol@lROo>@HKo^Sf8okTmR?nl?XOo/S^6okPoO?nn A7Ko`D=jol12N_o1@gWo_dAgoki3MOo1@7So_4EgojU_nUGSKoYeldojIN=?nXH3?oYf0cojEPFGofcYjoo13O_o`C7Col4eboo1VooMCYSoeeIoomQRK?oIIVSofFEZomISK002omETJP0JomIUJooE I6codf=]om=SKooEHVKoe5mJomAPEooBGUooef@Won9^1_oPKQ7ogF`Homa[6?oMK1[ogflVonIe@?ojG@j00GojW@konUd?OoYLc_ojG@02onUc>00OoYLcSo jGOoYLc[ojGooYM3[ohfTVon9X7?oVK2_ojW@h0_oZLcL01ooZLSOojW?oZ LS_ojg4lonYa>?oZL3L00_oZKcP00ooZKSWojVhgonY^>002onY^=`07onY^=_oZKCSojVdkonY]>ooZ KSWojW0_onM`403oonA_03ooi6l0001>onA_0004on^66Oooc6GoolaUooN_A@[oi6l000CojhHIooo< IOooc6GomJTo1ooTK`001?oeZCooolaUooogOooooooooool01?oTK`02ooooo`04ooc]gooTK`3oi6l0ooc]g`;ooooo1?oT K`02ooooo`03ooc]gooTK`3oi6l000?ooooo00Coih4PonA_0?oTK`3oih4P0ooooom0onA_0005onEa 0_oXM`[ok7hDonn47?o`Qb000_o`QQl06?ocQb3omHTPooJ97_ofRAkomHXPooJ:7oofR1comXHIooJ2 6?ofPaSomX@JooJ77?ofRQgomXPMooJ>8oodQaKokG<1onig2_o]R1?ojXT=oo261OoaP`3olXD0oo63 00;ol80000?olH<0oo:30?obQ@000_obQ@001_ofR07omXT1onF00?oLNP3ofgX0omah00;og7D000?o g7H0omae0?oLMP001OoLMP000ooLM@3og7H0omaf0004omaf000Momeg0?oLM`3og7L0om]f0?oLN@3o fW<0om=I>?oCEUoodUIEom=HC?oEETGof5M>omEGD_oIDUWoeeAFomYHFOoJEeOofUY@omYJDOoJF5Ko fEMGomUEF?oJEUSogUaIon=UG?oVJUWoiFYHonEXFooUJE/00ooUJU/03?oUJUOoiF]HonAYF?oLGEOo f5QGomYHFOoKEe[ofeILom]GH_oMFfGogf9Oon9WF@?oi6YG09?oi6YHonE[GOoVKVGoiFiWonE/H_oU JU[ohfUGon5XF?oPJ5[ohFMLon9WF_oRJ5WohVUGon9XF?oRJE[ohfYHon5YF?oOJ5WogVUGomeXEooM IeWogVQIommYEooPJ5Ooh6YKomeYG_oKJV7ofVQNomYVF?oKIeSofVIIomQUF?oLHfCoj5enonQKQOoY G7oojUYmon]JNOoZFG[oiUMnonQ@O_oKAgWoaT=aokHlL_nT=G?oS3Acog4gP_m`=hgoP3^8oh]0P?nA A7koVDEmoie7O?nNB7[oWDQdoj1=K_nSD6goY4m^ojM?KOnYD6coZTm^oj]=LOn_CG7o/DecojaojDkD_n^>F3oeCUgonY2N_oa @g_olDMioo5;Loo`Bg;ol4]doo5=MooaCWOolDefoo1?L_o`CG3ol51goo9HOOocFHOomDnEooE5Y?od @ZOokdJXone:Z_o/BJ_okDR[one9ZOo]B:[okdFZoo11[_oR@Z_obTBTolQ8XOo>CIgocDNQomI7WOoN CYWogdnGon1JT_oLIG_of6IVomQUJOoFHfd00_oEI6X05OoFIFcoeVE]omATK_oDHfkoeFA_omMUKooD HEcodeiNom=OE_oNJQ3oi6l0on=_0_oSK`Cohg0;onEe8?oWN2ooigLconIf=?oUMSCoiWHdonEg<`02 onEgOoYLc[ojG@ionUd>_oZ M3_ojG@jonUc>OoYM3[ojGP02onUc>@0@onUc>?oYLcWojG_oYLcWojGOoX LcWojG_oYLS[ohfTUon9X6OoRJ1goifh_onYd>0;ojW_oZLSWojW8gonYb >002onY`>@04onY_=oo[KccojfllonY^>0;ojVhi00SojVhhonY]=ooZKCSojVdhonY]>_o[KCkojW0b onI`2oooi6l0?_oTK`0004koi6l000ColYhcoooS>OoTK`3oi6l000goi6l000GomLVO ooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00oooool4onA_00?ooooo0_oT K`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00@?oTK`002_oUL@;oj7H9 onam4oo_Q1gol8HQonn57ooaQb3om8XRooJ97oofRQh2ooJ:7`0EooJ97_ofQAWomXh;o]Sb3okPmQ?nm?X?o_Sf2okllPono?8Go`CZ5okI1 POnUC73oVE9GoieMAOnSH4;oXem3oj9NA?nOGTKoX656oimQAOnOGTGoXedjojUO=?nZGc?oY5`gojMM =?nUGCCoZ5haojMM_n4E3CoVCY;ol4bJ_oD>g?ojD9foo56Moo^@W_okD9joo18 Loo`BG;olDQdoo5:MP02oo5=N00Zoo1=MOo`C7CokdifonmEM_oaEG_olTR>oni2V?o/A9kokDNXone9 Zoo]BJWokDN[one7[?o]AZ_okdBZoni0[?oW?[7og42dola8Xoo=C9god4JPomE5X?oPD9Ooge6FommL T?oSJH_ogfQoomQTK?oFHfgoeFA]omITK?oFI6goeVA/omESKOoDHg3oeF=/omIUKOoFI77oe61SoliJ I?oIICoohVd70_oTK`002OoTK`;oiWL@onMk6OoXNagoj7XQonQj9_oWNBcoigL^onMf<@03onIf<`?o iWHb00CoiGHbonEf_oZM3X00_oYM3/00ooY M3WojG002onUd>006onUc>_oYLcSojGOoYLc[ojG?oYLcSojG@konQa=_oSJB800_oRJ1`02ooSJAooj70conYe>?oZLSOojW4ionYb>?oZLcSojW8ionYa >ooZLC[ojW0i00;ojVlj00?ojg0lonY_>ooZKSL00_oZKSP02?oZKSWojVhhonY^=ooZKSOojVhhon]] @OoYKb_oi6l4oooTK`0monA_0000C_oTK`001?obWS?oolaUoooonA_0004oo[Tcooooooooooooo:gP0?oi6l00oooool4onA_00?ooooo0_oTK`03oooo o`Coi6l00oooool2onA_00Cooooo0_ojiWooK3B4of`eQ_mb=X;oOCaioha1M?nGAg3oXDa[oj==J_nSCfcoYDm/ojI?K?nXCVoo[dibokA@ KonlCWGodTB7on8lUOoI?ICob3b@ojleUOnb=XoobC^:ol8hS_o8>hkoecn_nQGdKoWee6ojAN?OnXGS[o[68joj]OcomI8Y_o?AZ3oeDBRome=V_oREi?ohV:> on9YROoTJX[oh6F8omMTLooEI6`2omETJ`0HomITJooEI6[odf=/omASK?oEI6WoeFA]omETL?o?GVWo cEaOon9/9?oTK`3oi6l2onEb2ooWNQ_ojG`TonUj9OoYNROojGXXonUj:OoYNB_ojWP^onYf<_oZMS7o jGHa0_oYMS803?oXMc;oj7LconQe=?oWMS7oigL]onMh:ooWN2[oigP]onMh_oYM3[ojW@ionUc>OoYM3[o jGOoYLcT00_oYLcP4onUc>@03onUc>?oYLcWojG?oYLcSojGOoZM3_oj74eon=Y8OoRJ1_ohfTMon9X6OoSJB7ojG4fon]e?OoZLSSojW8fonYb>Oo[LScojW8k onYb>?oZL3[ojW0ionY`=ooZKcSojg0lonY_>0;ojVhf00SojVhhonY^=ooZKSWojVhionY^>?oZKS_o jVdkonI_5?ooi6l0?OoTK`0004koi6l000Cok8`PoooS>OoT K`3oi6l000;oi6l000ColYhcoooS>@02oooonA_0005onV:8ko`cZ8olDmQOnm>hOobcf8olLkR_o7>H_oeCf: oma0S?oJ@8_og3fAom/lS?oD@6oo/E5:oj=P?_nQGd?oX5e2oj5M@_nRGdCoX5e3oj9I?OnYFcOo[5hd ojQO>_nQFcOoVELgoh]A?_mmBT?oMDM3ogi>@OnEFSgoZEdlokMO@?o@EeCol4Aboo50N?oa@gSokd9i on]1NOoZ@G[okd=ioo57L_oaB7;ol4Ueonm;MOoaC7OolDYgoo19M?o`C7GolDmgoo1:Ooo^?i;ojD:N onI8V_oVAiWojdZTone9[Oo]A:kokT>^oo13[Ooa@ZcokD6/onE0[_oM@[?ofD>don52/OoS?jooedFQ omQ`02onYd>P03onYd>ooZLc_ojG?oYLcP00_oYLcP00ooY Lc[ojG@06onUc>00?onQc>OoYLcSojGOoYLcSojWDlonM`=?oSJB7ohVPLon9X7ooR Ib7ohVLOonAY9ooYLSKojWDi00;ojW8h00CojW8gonYb>_oZLSWojW4h0_oZLCL01ooZL3SojW0kon]` ??oZKcSojVlgonY^>?oZKSL00_oZKSX01OoZKSWojVhhon]^?_oXKRSoi6l20?ooi6l0??oTK`0004ko i6l000CojH4Cooo7om19JooABeWo_U5;ojEN@?nR GTCoYV10ojEO@?nRGD3oXeXkojUK=OnXFSCoX5LhohmB@On6D4?oRE0ooi1C@onKE4KoZeU7okeP?oo< HT3ocUm8om1IC_oWBFWolCmionm0N_oa?gcol45lon/oOOo/@W[ol4Eeoo58LOoaB7Col4]eoo1ooZM3[ojG@jonYc>ooZM3WojG@ionUc>P;ojG@h00?ojG?oYLcP00_oYLcP2onUc>@03onUc>?oYLcWojG?oXLcP00_oXLST03?oX LcSojWDlonM`=OoSJB3ohVPMon9X8?oRIb?ohVPOon9X7?oTJROojW8ionYd>PGojW8g00WojW4gonY` >_oZL3WojW0jon]`>ooZL3[ojVljonY_>OoZKSP00_oZKST01OoZKSSojVhgonY^>ooZKcSoiVl@0?oo i6l0??oTK`0004ooi6l000Coo<1Hooo3oneDNoo[EGSokUn:ooATVOo^I9;ofVYlomEZM`;oe6Yf 06koeV]gomM[MooKJg?ohVaeom]YN_oCIggod6N3olAVQon`HhcoX5j=oimPR_nTIXGoZF^1ojiZPOo3 GXcodU:JomUGUooUFYGoj5^FonQNUOoPF9[oi5VIoniJU_o]EY_ok5NHonaDT_oXDX_oh59komECIooI DVGoeUEUokEOE?niHeCo]f9DojmMDon_EeKo/UIFok9EEon_DEcoYTaNojQ GT_odUe:oliHC_oMOo_B8Oojd6GonU1VooXAYWoi4JFonE7Uoo]AZOol42_oo11Zoob AJ_olT:/one0[OoR@K3og4Baomm7/?oT@K;ojSbboo12[oodBZgoj5RLommUROoRJ8WohfN:on5VROoN IXOogFN6omiWR?oJIWkoeVAZomITKOoFHWCoef9jom]ROOoMHWoofV5oomUQOooJHWkofV:1omQNO_oV ISooiflMonYg;_oZNC7ojWP`onYh<@;ojWP`00?ojWPaonYhooYLc[ojGOoYM3[ojG?oYLcSojG?oYLcP00_oYLcP0 1?oYLcWojG?oYLcT3onUc>00FonUc>OoXLcWoj7OoYLc_ojGOoYLcWojWHl onM_<_oSJ1oohVPPon9X8_oRJ23ohfTNon9X7ooRJ1goi6XWonYb=ooZM3SojW8eonYb=P?ojW8j00Ko jW4jonY`>OoZL3SojW0ion]`>ooZL3X2onY_>008onY_=ooZKcKojVlhonY_=_oZKcGojfhoonQ_9_oT K`;oonA_03_oi6l0001?onA_0005onjB9_ooc6GoolaUoog6GooYPA<02OoTK`001OocXcWoolaUooo< IOoj^U;oiWD600?oi6l000GoiWD6ooZjD_ooc6GoolaUoo:N<`04onA_0003oo:N?oYLScojG8konUc>P;ojG?oYLcP00ooYLcP2onUc>@;ojG_oYLcWojGooYLc[ojGP02onUd>@06onUd >?oZMC[oiF`[on9W7ooRJ27ohfPN0_oRJ2003_oSJ23ohVTMon9X7?oTJROojG4gonYd>_oZLSSojW4i onYb>_oZLSWojW4honYa>OoZLCSojW0h0_oZLCX00ooZL3OojW0fonY_=`02onY_=P05onY_>?oZKSOo jfhnonY`<_oUL0D0oooTK`0konA_0000D?oTK`002_og[dGoolaUooo=8oofT1oomh`NooN66oofPQSomX8JooJ76OobNPKok6XDon^04oo]R`3olHL0oo:;0?od R`3okhP0on9o0?oJM`3ofgH01?oLMP003?oLM`3ofgP0om]h0?oKN03ofgT0omYh0?oKMP3ogW@0ommc 0?oPLP3ohW40on=`013oi6l000Goi705on1TAooGDe_of5IHomMEF@02omUFF0;ofEMG00Oof5IHomUF EooJEESofUEIomYFFOoJEUSofEIH00;ofEEH00oof5AIomUEF?oIEUSofEEIomYFF?oJEUOof5=IomUE F?oNFe[ohf=JonEXF?oUJEOoiFMGomiLEooHEEL00_oJF5P06OoJFESofUQHomUGF?oJEeWofEMHom]H F?oNFEcogEQRom]GJ?oMGFCoh6EIon9YF?oSJESohVQIon=YEooRJUOohfaLonA^IOoMHFGoeUIHom]M E_oOIEOoh6UHon1YF_oOIeT00_oPJ5P07OoQJESohFUFommXF_oNIUgogfYRomm]IOoNJV;ogFEJomaS D_oTGfCokEajon]LMooZFWOojUMlonUIO?oYEh3ojEQnonaGPoo]DXWoje60onY@O?o]Dh3ol5j>onmS Uoo]HYGolEnConUSR_oIJgKoeF]h00;oeF]f03Woe6YfomIZL_oLJGGofVMkomMUN_oGIW[ofFMiom]X M_oKJ7SofFEkomIRPOo?GXOocE>HomM2/_o;>K[o`3Bmol8`__nn<<7o`3;5ol4e`oo0=/GocC[6ol/d aoo?>[cogf1loki7Q_nP8ZOoZRZOojL[WonX;9ooVC:?oi8cQOnM=H3oZCajoj/oLondA6co_T]Pol=@ FOo8E5?oae=Bol9@Eoo8DUSoae1DolEADoo6DUCob5ABolAIC?oMCFColD9foo4oO?o`@G[okd5jone0 N_o^@7gol4Adoo16LOoaBGH00_oaC7H0:?o`Bg?ol4acoo1;OOo]B8oojD:LonI1WOoU@9Oohd2FonA6 VOoWAISoicZRon/m[_o_A:colD>/ona2[_oO@K?og4Fbon55/?oW?[7okCbaoo16Z_obDZ?olejMoo9R WOocHIgoiVB?omiVR?oPIXcohFJGonASV_oMHXSoff9momaROOoKHWkofF5oomUQ O_oJHWd2om]RO@0;omENPOoSJ6WojWHconYh;?oZMboojWL^onYh;ooZN2kojWP_onUg;OoYN2`00ooY N2d00ooYN2kojGL]onUh;@02onUg:`0EonUf:_oYMb_ojGLZonUf:?oYMR_ojGH/onUe:ooYMR[ojGHX onUf:OoYMR_ojWHaonYf<_oYN2SoigLGonIg4_oWN1GoigTHonMi6OoWNa_oigXK00?oigXJ00OoigTI onMj6_oWNAWoigTHonMi6OoWNA[oigTI00OoigTJ00SoigXKonMi6?oWNAOoigTIonQi9?oYMSCojG8l onUb>`SojG?oYM3SojW@jonUc>OoZM3WojW@konUd>_oZM3[ojW@k0_oYLc/01?oY LcWojG_oYLcX3onUc>@KojGOoZLS[ojW8ionYa>0;ojW4g00_ojW4honY` =ooZKcGojVlhonY_>OoZKSSojVlionY_=ooZKc[ojW4donEa1`3oonA_03_oi6l0001AonA_0003oo>S >Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`gon[YBoooI?o3DE_oaE9Fol5@E?o4DU7oaU9Eol9@Eoo5DUGo`e5Gol9?Eoo8DeWobE9FolMADoo8D5Oo aU=ColmBFOo^AW7olD5gonloNoo_@7[okT5jone0Nooa@WWolDAcoo57M?oaBgKol4eeoo1:3oiCZVonm5[?oa@j_ojd>`omi4/?oOAZko hd>^onTk[_oa?jcolT^Voo5GW_obGi[olV6Moo9QX?odGj?okF2Non=UUOoTI9L00_oSHYP04?oRHiOo i6BGonETUooOHhWoff=iom]SOOoIHgoofF=lomYRN?oJHGOofF9fomQPM_oFGWkojG9HonUg;?oYMbX2 onUg;@;ojWL`02;ojWL_onYg;_oZMc7ojWLbon]g=OoZMcCojgHgon]e=_o[MCSok7Hlonaf>oo/MSko jWLoonMi?_oQOD3og8A5omJ7AooLPdGogX93omj2@?oROCgoi7/konIk>ooWNCWoj7PgonQjP02onUb>`03onUc>OoYM3SojW@i00;ojWOoZM3[o jG@ionYd>P02onYd>@04onYc>ooYLc[ojG@jonUc>POojGOoYLcP2 onUc>@09onUc>?oYLcWojWDnonM_=OoRJ27ohVLOon9X8_oRJ27ohfTN00;ohfPO00OohVPPon9X8OoR J1oohVTLonAZ9OoYLSKojW@i00;ojW8h00_ojW?oZLSOojW4fonYa=ooZL3[ojg4nonY`>_oZ KcOojW0honY`=`02onY_=P03onY_>OoZL3KoiW0:0?ooi6l0>ooTK`0005;oi6l000Soig/=oo:N4on]BOoo^DH7okEZEoniUV_o_HXookf2?onmPT_obH9?oiFN4omI/M?oEJgSoeV]g omA[MooGJfkogV]don1/MooNJgKog6]eoma[M?oKJWGoffYfom]YM_oKJgGoffeconQUOoocG8colej9 oo=OROocG8Wole^ConATR_oNHGKog5mhomiOM_oPH7OogV1mommQPOoOHhOogF:7on1TSoo/MEOojWHionUg?_oY MT3ojGI1onUe@_oWMT?oigE1onY`@?o[Kd3ojW51onMc@ooVLT3oiWE3onEjAOoKOTCod8I6olj@Boo: UDko`IQooYLcWojWOoYLcX00ooYLcT3onUc>0;ojG?oYLcWojG_oYLcX2onUc>@06onYd??oZMCkoiF/[on9X7_oR J1oohfPO0_oSJAh00ooRJ23ohfPQon=X8002on=Y7P0OoZLC[ojW0h0_o[LC`02?oZL3OojW0eonY`=ooZKcSojVlgonY^>_oZLCCoiW0; oooTK`0konA_0000oooTK`1XonA_000ConMc4Oo^NRkomVP^ooYA;ook?2SonDa0ooUG=ookE0SonU@< ooQ:3_og?0[omS`7ooI93_ocF1GokfPIonM`5ooVK@koiV/7onE^0P0MonA_0009onEa3OoOHDcoeU9M omUGEooGE5[ofEIHomUGF?oIEUWofEMH00CofEMG00SofEIHomYFF?oJEESofUEHom]GEooJEeOofUIG omYGE`?ofUMH00cofEIGomYFFOoIEU[oeU=IomQDF_oMFE[ohfAIon9SFOoJF5OofEIHomYFFOoJEeL2 omYHE`16om]HF?oJF5SofUUIomUIF?oIEeOog5UHomiJG_oLFF?ofEIWomYKG_oOIEOohfYFon9ZE_oR J5SohVMGon9XFooNGVGof5QWomQJH_oHF5[og61IomiXEooOJUOogfQKommWFOoOIESogfAGomiRFOoN HEkog69MomYRF?oOHF;ok5iloo1MO?o_GGGokUahon]KMooYFWcoj5QoonUGOooaDHcoke:5on]AOOo_ DhWol5bIoneRW?o^HY?okV6?oniPSoocH97okfB>om][MooEKGCoefegomI/MOoHJfgogf]eomm[N?oL JWOoffUgom]ZM_oKJWGog6Yeoma[MOoLK7KoffagonURQOocFhooleb=oo=MR`;oleb:02Koleffom1:ZOoCEicofVBGomeWX?oQJ:?ohfRP onEXWooUIjKohf:donQM]_oTGZKoi5nIonINVOoRHIOogf>Don1UUOoOIY7ofFf:omQYR_oBIGcoe6Ik omI[O?o=KWooagMhom5iNoo/L9SokG2MonQdRooRMTWoh7@mon5_?_oSKSgoiFdmonA`?OoQLcgohW8l on5b?OoINT7oehI7om6>B_o4SDKo`9I7okjOC?ncXT_oZj96oj^QAP;o[:9801_o[:58ojfPAon_X4So [im7ojfQAon[XTOo[J19ojfPB_nYXd[oZ:E8ojNVBOnYY4WoZ:A9oj:UC?nRZT[oXk???oYRCcojh0donYl:_oYNb?oj7TMonMi6_oWN1L00_oWMaD01?oWN1KoigTHonMi6OoWNAX2 onMi600AonQj8?oYN33ojW@lonYb?_oZM3[ojW@ionYc>OoZM3SojWooZLcWojWOoY Lc[ojGOoYLcX00_oYLcT01OoYLcSojGOoYLcSojGOoYLcSojG_oXLcT00_oXLST02?oXLcWojG?oXLSSojW@lonM`=OoSJB7o hfPM0_oSJAh03_oRJ23ohVPQon=X8?oRJ23ohfPOon=X8?oSJB3ohfTOon=Y7OoRJAWoi6XSonUa=_o[ MCcojW8i0_oZLSX01?oZLCWojW8honYa=ooZLCH2on]b>P;ojW0f00GojW0gonY`=_oZKc_ojG8ZonIa 2`3oonA_03_oi6l0003oonA_06Ooi6l001WoiW0>on]d=oo]KD;ol6A8ooAJBoohB3?on4e2ooUIEOok BASon4L6ooI=3_ogBQ;omT4Coo=56_oaE2WolF0coo1X=?o`JbookVhYone_8oo[K1Ooj6dAonM_3?oV K`Ooi6l201Soi6l000Woi703on9/??oECV3ofEMGomUFF?oHEE[ofUQFomQFFOoIEUP01?oIEeL01?oH EeOof5IHomUFEooJEEP2omYFE`03om]GEooKEUWofUMI00;ofUMI00[ofUMGomYHEooJEe[ofEIJomUF FOoGE5SofeQGon1NF_oKF5Wof5EI1OoJF5L06?oKF5SofeQIomYIF?oJF5SofUQGomYIFOoKFUgogEYR omYFIOoHF6;ogF5Lon9YEooSJUCohVQHon9XFOoQIEWofUUMomYJI_oIFfCof5QLomULFooMI5[ogfEJ omiTF0;ogf=G03_ogfAFomiRG?oNHUgofV9GommPHoo]GG[oke]joneKMoo^FgOokUahonYLO_oXF7oo jUImoo9AS?o`DH;ok5=moo5GT_obGiKokV6IonmRUoo`HXookf6?oo1RSOocHI7ohFQoomA/LooDK7Wo eF]gomMZK_oNJW?ogf]home[MOoLJWKog6]eomeZMOoMJWKoffYiom]/N?oMJWWojen9oo=KSoocG8go lef;oo=LRoocFXgom5ZBoo=MTOo^FIKokeZFoo5LUOoaH83ol6@koo5KI?oLC9WoedBBomloOOoWA7go fda_olEEEP02olMDF`03ol9BF_o1DESoaE5G00;oaU=E05Coa55Gol5>F?o5CeCoaU9FolQCE_oYomdm]ooD@;Sod4Z^olMFW?o1IH_o b769olYbS_o>L9OocG2Eol]cToo3M9[o/WRSojYhZ?nfMZ[o`WFToliaWoo;KJ7o^7FDojZ2POnPSW3o WY1WoinFHOnPVUkoWI]CoiZMBOnHWdWoTIe7oiBLAonVTe3odGmlonYgU_o^LW3ojfXlonM]?ooTLT?o hWM3omai@OoCPT;od8U9olj@Boo4U4Wo^iU:okJNBoncXDco[Z59ojjQA_n^X4Ko[Ym6ok2OAonaWTKo /Ye6ok:MAoncW4L2ok:NAP0Uok:MA_nbWDOo/Ii7ojnOAon`X4So/Im9ok6PB?n`X4So[j58ojnPBOn] XD[oZ:=>oj6X@onF/S7oU[D_oije=onV]3co/:m0olBSA_oLV4OoiY15onR5?_o[OSKok7``onYk:OoY NB7oj7PLonMg5ooVMQ;oiW@=onIf4_oXMR7oj7@04onYc>OoY LcWojG8jonUb>P;ojG0;ojG_oXLSWojG8jonQb>OoYLcSoj78i onUb>_oXLSWojG8honQc>002onUc>00:onQc>?oXLSWojGooTJbWohVPKon=Y7OoSJ1oohVPP on=X7`;ohfTO00cohVPQon=Y8?oSJAoohfTNon=Y7OoSJAoohfPOon9X7_oTJBOojG4gon]e??oZLcL2 onYc>@0=onYb>?oZLS[ojW4honYa=oo[LS_ojW4honY`=OoZL3KojW0gonY_>OoYLAooiW8;onA_0P3o onA_03[oi6l0000ZonA_0004onV14oo[QQWojhHIonIe1PKoi6l000?oig/=on^66Oo[QQT01_o[QQT0 0ooVM@Koi6l0onA_0005onA_0003onMk3Oo/S23olYhc00;olYhc00?ojhHIonIe1_oTK`000_oTK`03 on^66@Goi6l000CoiWD6on^66Oo[QQWojH4C1?oTK`02on^66@03onV14ooTK`3oi6l000?oi6l000Co ig/=on^66Oo[QQWojhHI2?oTK`001_oWN`gol9P/oo:NonI_2?oUK`?oi6l15?oTK`002?oULBSoeU5OomQEFOoJ F5GoeeAKomQEFOoIEeKof5IH0_oIEeL02?oJEeOofEMGomUGF?oIEeOofEQHomYGF?oIEUWofUEI1?oK EUP00ooKEeSofUIHomYGE`02omYGF006omUGEooJEeKof5EGomQDF_oHE5cof5EI0_oJEUP2omYGE`0H omYHEooJFEOofeQGom]HF?oJF5SofUUHomYIFOoHF5WofUYHomiKG_oKF6Coee9WomUHHooOIE_ohVUG on9ZEooSJUWogV1IomQFGOoKFfOoeeMWomA@GOoHEEOogEmH0_oOI5L08_oOHeOogfAGomiTGOoOHUoo gF9Don9PJ?o]G7WokEYhonaKN?o]G7OokUajoneLOOoZF7[ojUIloo5AR?oaCh;ol5N2oo9LU_o`GIGo kf2FonmPW?o_HI;okf2@onmQS_obH97ojFB9omIZM_oCJgWoeFahomQZKOoNJg;oh6afomi[M_oMJWL3 omaZM`1Yom]ZN?oKKGKoh6UkonmMROocFhcolefooaFVKog4^Gom]:U?oK@8GoiT5kome:Loo7EE[oaUEHolICGOo1De[o`e=IolMBFOo7 DUCoaU5Gol5@F_o0DECo`U5Aol=ADoo4E5CoeDePonm7MOoaAWSokDAkon]1OOo/@g_okT=loo15O?oa AgOolDQeoo99LoobB7cokd6EonLjX_oX?9_olCfKoo8kX?oZ>YkoiS^OonHnW_oW@IcojDFHonY7UooZ AI;ohd:QomHl_oo:@K[oa4nVolALV?o:Ii7odVfDomI[V_oIJI[ofV^FomMXW?o=IJ_o_6R_okeY[oo7 Jjcod6fZom1bX?o8N9Go_7n6ok23L_nRTf_oW9iToi^VH_nKZVGoSJmHohNZBOn7Xd3oQYi1oh^K?on; WC[oRi/jojB@F?nnR7;o`Xa:ol^8=_oBQTCoc8m>olRID_nmVdgo/ie9ok2OB_naXDco/:1MBonbX4_o]9aOoYLcP3onUc>@;ojG?oYLSX01OoYLcT00ooYLSWojG@02onUc>006onUb>_oXLSWoj7OoYLcSojG8i0_oY LSX01ooXLSWojW@konM`=?oSJ23ohVPMon=X8?oRJ2400_oSJAl00ooRJ23ohfTOon=Y7`02on=Y7P0H on=Y7ooSJB3ohfPRon=Y8OoSJB3ohVTLonAZ8ooXL3;ojWDionYd>_oZLc[ojW8gonYb>?oZLSKojW8g onYb=_o[LS[ojW4gonY`=_oZL3OojW4fonQa6?oWL@_oiFl2oooTK`0jonA_0000:_oTK`001?oh]Dco olaUooo?o]J3gokFXn one[>oo^K47olVe?oo=[A?o_J2gokV@Too9L9_oeDR?omT/QooE=9oobEB_olEh`oo1S<_o`IC3ol6L` oo5Z;`02oo5]<@09oo5^MAonaWTOo/9m7ok6MB_ncW4X2ok:LBP0Mok>LBonb WD[o/9i:ok:LC_n[Y43oXJhaoj:]U@_oG XDGog9=7onIlE_obN6_olGM_onmhI?o]NV3okGMKoneeD_o/MDkojgA6onYc?OoZLcL00ooYLS403?oY Lc?ojG8eonUb=OoYLSKojG_oYLS[ojGooYLc[ojGPCojG?oYLcSojG_oXLSWoj7OoXLcSojG8jonQb>_oXLS_oj78honUd>OoYLcWoi6/Zon9X 7OoSJ1oohfPQon9X8?oSJAoohfTP0ooSJAh00ooSJAoohfTPon=X8@02on=Y800Eon=Y7_oSJAoohfTN on9Y7_oSJB7oifd^onYc>?o[MC_ojW_oTK`0002[oi6l000Con;EOo`HRoo l6DXonmV CFKof4YXonM9LOo]AgGojd]aone9M_oaAgOokdEnona2P_o]A7_okDAjone5O?o_BWKol4Y`oo57M_oa ?hoojc^Oon@lUooX?9Sok3bKonLlV_oU?Ycoid>KonE6UOoV@Y;oiT2Eomi1X?o;?[;o^CbgokU9[oo6 Fj;oe6FPomYZXOoMJZ?ogVNTon5UY_oMHj_od6:aol9P]_o1HK3ocFNSom9]T_o?Kh?oag5jolEbM_o6 LGGobG1ioli_Qoo@LHoodW6Bom=^U_oAL9Goc76FolQeV?nnNYCo/Gb8ok1oR_nVPhOoX8b3oiRJOOn; ZiKoP;MoofZo9?mS`aKoIKlHog>i7?n4/2OoVJPeojbP@?neWT[o]Yi:ok>PB?naX4So/:17ojnPB?n` X4So/:19ok6NBOnaWT[o/Ye800?o/ia:00Oo/i]9ok>KB_ncW4[o/ia8ok:LB_ncW4Wo/ia:00;o/Ya8 00?o/9i8ok2MB_nbWDX00onbW4/09onaWT[o[J1onkVeCob8mXom>;J_oPQ6Koih1Von]nIoo]OFSokGeYonamIoo[ O6CojgaRonajGoo/MU[ok7EDon]eC?o[M4CojWOoYLcWoj78h0_oYLcP02?oYLSWoj78ionQc>OoXLS[ojG8ionQb>OoY LS[oj78i0_oYLcT01_oZMCgoifldon=X8_oRJ1kohfTOon=Y80CohfTO0_oSJB02on=Y7`0=on=Y8?oR JB7ohfTOon=Y7_oSJAoohfXNon=Y7_oSJA_ohfXMonE/:OoYLSGojgHkonYc>@03onYb=`07onYa=oo[ Lc[ojW8jonY_>ooYLR[oigoo_I2kol6PVoo1Z:_o_IC;okV4h oneS>_o^J47olfaEooI/EOobJd3okV/]oneY9Oo^IBKolEdUoo=?8?oeAagomTPSooI>oo=JT_o`FI?oj5BKon]CWOodFi;olEn>oo=MTOocH7Gol6@n oo5KK_oYDICoi4nComm=UooJ@HcogT=eolUBF_o2Ee;o`UAIol1CF?o4DU_odTmUon5?K?oXC7CokTYm oo57NooaAgOolDUgoo59M_oaAgWol4Mjona5OOo]A7kokTAjona4N_o]AgSol4Y`oo58L_o]?hWojSbL ondlW_oY?9SojCZKonPjW?oS?Y_oiD>IonM4UOoW@IGohdBGomA;W_nmA:go/Sfcoke:Z?o?FjKogFFY on5WZ_oQIJgohUnbon9L]_oJG[Sob6>dolAT[?o8J9cobg2:ol]aO?o5LgGoaG=holQbP?o:LXKocG>C olacVOo:MIcoaWFLolAhVoo0NI_o`7VJol5iVoo3N9_o_GZ?ok=mO_neO7ko]7enojYnOonRQ8OoV8:K oij?R?nN[TSoT;50oh2f=_mb_BWoJ<0OofZo7?mh^2?oSZd_oj:U??n_WTCo]Ya:okNKB_neWD[o/ie9 ok:NB?nbWT[o/Im9ok6OB?nbWT[o/Yi;ok:NB_nbWDWo/Ie;ok6NBonbWDX00_nbW4`0;onbVd_o/i]; ok>JBonbW4_o[ii:ojjOB_n_WT_o/9a;ok6LBonaWD_o[Ym:ok2NC?n^X4CoXZ`aoj6];onS[37oXj`` oj6^;_nR[C3oXj`aoj:^;OnP[RgoYZLmojjME_n^Weko[J1Jok:MG?nmUegoaI9Ooln=HooIR6KohX5U onYoJOo^O6OokWaXonamJOo[OFOojGiWonQnI_oYOF?ojWeSonehGoo]MU[ok7EBon]eB?oZM47ojG@06onQc>OoXLS[oj78honUc>?oXLS[oj78i0_oY LSX03?oYLcWojG8ionUc??oYLcgoi6XYon9X7OoSJAkohfTOon=Y7_oSJAgohVTNon=Y7`;ohfTP00Go hfTOon=Y8?oRJB3ohVTPon9Y8@06on=Z7P;ohVTL00goi6XTonQ`?o[LScojg4lonUb8_oWL`goiW070?ooi6l0>ooTK`0002[oi6l000Con;Eoo5KTOoZEYKoh52OonEBWoocFI;olef=oo9LTOobHGOol6Hooo1K KOoVDI;oiU>>on5>U?oLAIKoeCmmolE>GOo:EUGoe55Uom]=KOoVBgCokTagoo5IgoiSbJonA1U`02onE2T`1/onM0V_oOBYcobEFIokE5Z_nh?;Koc4bZom]MY_oSHK7oiVBeonIP ^_oTGkOog66bola[Yoo0LY[o`G>@olMfP_o9MGcoagV5olMhRoo;LiKocg>JolaeW?o;LYkocg6Rolab X?o9MI_obg>Gol]eU_o9MI?obWF?olmcS_oCLhgoc7N7okUnOon[OH3oXgZ7oiaeQOnKMHKoVgFoi2b@omk^S;oL;lWog2n:?n0]BkoUZ/kojVRAOnbWDWo]I]8ok>M B?nbWTSo/Im8ok2OAon`X4So/:1:ok2OB_n`WdSo/:19ok2PB_naWT[o/Ie:ok:MB_naWTWo/Ie:ok:M B_naWDWo/9e9ojfOB_n_Wd[o]9]MHOncWUco]Y]KokJJG?nfVe_o]IaJokBLG?ngVUgo_iANol^? H_oERFCogh9TonQnI?o/O6CokG]SonamIOo[OFKojWmX0_oYOVL02_oXOVSoj7iUonUmI?o]NVCokWIM oneeEoo/M4kojWA3onUb>_oYLSH2onQb_oYLS_ojWDnonM_<_oSJAoohfTMon=Y8?oSJAkohVTJon=Z6OoSJQOohVXJon=Y8?oS JAoohfTNon9Y80;ohfTP00GohfTOon=Z7_oSJQkohfXNon=Z7`03on=Z7P0>on=Y7OoRJA_ohfXPonI^ ;_oZM3SojW@jonYc>?oZLSSojW8gonYa>OoZLcSoj7oo=MS?ocGI7olf=eoo1W?oo_ FfoohdnCon]BSooUCYCogDRKolHnQ_o>B6_ojDmaoo5I[oiSbKonTkVOo` >YcokCbKonI2U?oU@iGohd:Jon52X?oDD9_oaEBKokU1[onn?[Kof5:]onAM[?oUGk?oiF2mon5S^?oE JjCobg:BolAgRonoOhOo`gj1olMiN_o7NWkob7N9olYcS_o8MHcobG>?ol]dS_o;MHkocWB@om5bSOoA MHkod7FNG_nbWU_o^9YNokVIGP03okNJG00?okBKFoncWE_o/YeJok6MF_ne Veco^YINolJBHOo@Rf;ofXAQonB0Hoo[O6CokGYTonejHoo/NfCojWaS00;ojGeV02;ojWiWonYnJ?oZ OFWojG]VonYkIOo/NVCokGQSonefFOo[LdCojG8honQa<_oWLC7oj78donUb>ooYLSgojGooY Lc[ojG_oZMCgojG0;ojWoo^IcCokV<_onmT:?o_KRKokgoo=MTOodG9ColUfEoo1OToo`GYCo l5jGoo5RToobHi3okf6@onmQSoo`HXookf6AoniOROobHHOom6:;oo=RR_ocHXOolf:;oo=QRoocHX[o lf>;oo=RRoodH8oolf6=oo9MT?ocF8kom5ZBoo9IUOoXDY_ojU>Loo1HU_o^FY7olef_ol]5]ooJG:WofV:XomMO[_oCI;;o d6f_olYeV?o3NX;o`WV1olUeQoo=Lh_obg>;olMfPoo5MWooaGQool9iN?nnNg;o_gifolQmOoo?OXCo a8J1okF@P?neSXKo_XJ7oknNEonUYE3o Vj];oiJ_BOnF/DWoV[1;oif^C?nTZ4coZj=;ok2OBOncW4[o]Ia:okJKB_neVdWo]9a:ok>MBonaWTco /Ii;ok:MB_n`Wdco/Ii;ok2OBonbWd[o/ii;ojnPB_n]XDX2ok:NBP1Cok:MBOnbW4coZZA4oj2]OoYLS[oj7ooZMCcoiF`[on9Y6_oSJA[ohVXGon9Y6ooTJ3GokVThoo5N8?oa F1Ooj6D]on9[5OoRJQ[ohfTPon=Y8OoSJB3ohVTOon=Z7OoRJAgohVXLon9Y6_oSJAgohfPPon=Y8OoS JBCohfTUonAZ9ooUJB/00_oUJR/02?oVK33oig0bonU`=_oZLCWojW8honQd6ooWLPcoiG05oooTK`0l onA_0000:_oTK`001?oh]DcoolaUooo?o`Jc_ol5`/onm?5_o_ C@_okdd:oo9@4oodDBWomU8kooMD@oogEdComUU2ooEN@_odHCkom68joo=Q=OobHc?olFD_oo5X;?o` K2cokfh/onma;Oo_LRool74_oo5^;ooAPSOocFhcoleZ@onYEU_oTD9gol5RDoo=JU?ocFi7olej= ooAJT?odFIKolf1eoo5QAOo`EgKoidjConUAS_oVChkoi4fCome9WOoA>i7oiTIjona=MOo/C7GokTag on]:NOo_BgSolDiboo1CUonMWIgoVYRSoiZEY_nHSZSoVI2VojFVW?nYZICoZ::B ojJJT_nUTY7oXXZDoj2>UOnc[Foo]JUDok>XEonbZEOo]:MGokFVF?neYEKo]JAGokFSE_neXUOo^9mG ok^MFOnkW5Wo^IaGok>OEon/Y5GoYjYEoj2_D_nI/dkoU[I:oiReB?nN/4WoY:Y:ojVTB?n`WTT00_nc W4T0D_neVT_o]9a7ok6NA_naWdOo[j19ojnQB_naWdWo/Im8ojnPBOn]XDWo/:58ok6PB?nbWTSo/Yi< ojZTAOnQ[SCoXZd/oj6^:onWYc_o/iaKokBLI?naX5go]9iMokRJGOngVUco]YYMokNJG?nfVUco]Y]L okJLG?nfVe_o/ieNokBMGOngVUko]i]NokNKGOnfVe_o/iaLok>MG_nbWUoo/YeOokBLG_nhVEgo`9AO olb=G_oHQV3ohh5UonYmIOo]NVCokWYUoniiIOo[OFOojH1XoneeG?ocJE3olfiKonemKoo]Pg_okg]i onifI_o[M4WojG4donQb@oo1RSOo_Gh;olF26ooART?odHHco lf::oo=PR_ocH8oolf:;0_ocHhX0OoocI8_olf:;oo=RRoocH8kokeNConA@V_oYEIOolE^@onmIToob G8oolef=ooAISoocEYOolF1foo5Q@_o^EGGoie6@onMASooVDHgoiU6Aon=?VooB@IKohTEmoni8gojCfFonPnV?oS?YkofDNPolaEV_o3H93o`6B:olUMUOo=FYoo`EFUokE;/?niB[Wob5JeoliQZOo; Ii_ocVj@olmaQ?o7L7GoaW9eolQeP?o]EondZeKo/jaHokB[E_nc ZeKo/Z]Fok6/Eonb[5Ko]:YFokFXEongYUKo]jEGokJWF?nbZ5GoZZiFojBeEOnM^U3oUKm;oi31AonD ^d[oV;M:oibbB?nXYD_o[Z19ok6MAondW4So/Ye8ok>MBOnbWDWo/:18ok6OB?naWTP00_n`WdL0C_n` WdWo/Ii:ojnPB?nR[3;oWjhYojVV?_ndVU_o/ieRok2QG_neWEco]iaLokJLFoneWEco]IaLokJLFonf W5go]Y]LokJKFoncWEco/iiLokFLG?nfVeco]Y]KokJKG?nfVego]i]LokNKGOnfVego]YaNokFLGonb WEgo/IeMok:MG_nfVeco_IMMolNAHOoCR6;ogh=Uon:5J?oXPfcokg9UooIG>oohCBComeDaooEO?_o` KUCok7Y]onZ3N_o[Q7OokGYOonYc?_oXLB[oj78aonYe?OoUL2oohfXMonMY:?oWK33ohf/kon]/A?oa HBKolETJoo1J8_o`GROol5PLoo531oo^DBKoiVL/on=Y7ooSJB?oi6PVonIY;?oTK2gohVh/onA^S>OoTK`3oi6l0onA_0?o^TRH00_ooc6D00oocXcWoi6l0onA_0009onA_00?oolaU1Ooh]D`0 1?oj^U;oolaUoooS>Oooc6GoolaUoog6G`;oolaU 00?olYhconA_0?oTK`00/?oTK`00AooUL0Cojg8/onmS=?o`HSSol6HloniX=?o^IcCokVDbonmS:Oo_ IbCokfdXonma:Oo^LB[okfhboo=Z@_oeHdSomEi8ooEMAOobI3WokfXZoniZ9_o^JR_okf`foo1/@?o` HccokePXoniC5?o^D0GokU42oo1C3_obEBSomEDhooIC??ofD3_omU8jooIF?OofG47omF11ooEP?ood Gcgom5hjoo=O=oobHC7olF@]oo1Z:oo_KB[okg4/onib:_o`M3;omG9JooI^IOoeJe[omFYGooEYEOoe JE?omFYBooE]EOoeKUWomFmOoo=^IOoaK6[okVIWonMSIOoTGfGoh5YNomUGE?oFEE3oeEE@omIED?oF EE;oeeAE00;of5AF00cofEEHomQEF?oHEEOof5AHomUDF?oHDUWofE9IomUCF?oIEESof5MIomQFFooI Ee/2omUGF008omUFF?oHEESoeeAJomUFF?oHEUWoeUALomICFOoGDeP2omIBF`2NomMEF_oGE5[oeU9J omEAGOoGE5[oeeAGomMDE_oFE5godU=Jom9@G?oBBf3oddeKomEBEooFDeSoeU5KomM@JOoDC6Oodd]D omm8N_ocAi3ol4UkoniBM_o^EWWol5Ifoo5HN?ocGXKom6B:ooAQRoocH8com5f@ oo=PT?ocHXkolf6?oo=QS_odH8golf6@oo9PT_oZEIWoie6Koo5HU?oaFY;ol5^Aoo9NSOobGHkoleZ> oo=HU?oaIGOolF=5onaCM_oTDI3ojDn@onYBT?oZEXooj5>Fom]8VooM@hOojDQnon]9OOoZBGSojdMk onm8N_o`BW;okdQhonm7Noo`BgColDaconm8NOo]Ag_okTaloo9=O_oa@h7ojSJ>onDkWOoRA:3of4VQ ol]EVoo3HY7o`VB;VOnMRY[oWhBKoif4VonPQ9_oX8FJoif3V_nMPYcoWX>Ioj23T_nRTY;oZ:RBojRZTonXZICoYZ^G ojJZUonVXiWoY::AojN^FOnaZ4_o]jQJokFXEoncZEKo/JaGok:[EOncZUKo/jUFok>ZE_ndZeKo]:YF ok>[E_ncZeGo/ZaFok:]EOnc[5L2okBZE`0ZokFYFOneZUSo]:aHok2`EonY/eKoX;UDoiG2COn?aTSo TL5;oiBlBOnJ]TSoXj]9ojbRBonbW4[o/i]8ok>MB?ndW4Wo/Ye7ok:MB?n_X4So[J99ok:MB_naWTKo YJXdojFY?_nfVf;o/ieSok2PG?ngVego]i]NokJLG?neW5co]IaKokFMFoneWEco]YaKokFLFondW5_o ]9eLokNKFongVeco]IaL0_nfVe/0@oneVego]Y]MokJLGOnfW5go]YaNokNKGOngVUco^9]OokJLH?nd W5go/iaLok6NGOnbWUoo/j5Rol:GIOoVK6ComdE=ooI<;?ogFB[ome@`ooM@;oogD2gom5`foni^AooV OecoiHU]onV7K_o[NU3ojGonA_0006onMk3Oooc6GoolaUooo_ofDSWomU8hooID>_ofF3comUXmooIM?_oeGcgo mEhmooAL??odGCSolelcoo9S;oo`JBSokfdXoo=_CooeLFcomG9VooEaI_oeL6ComFiOooE[F?oeJECo mFUAooEYD?oeJToomFaAooE]DooeL5Kom6eNoo9WHooZHV7oi65Pon5NHOoPFekog5QGomIFE?oEEE7o eUEBomIDEOoFE5KoeeAFomQDF?oHEESof5AHomQAFooIDU_ofEAJomUGFOoIEeOof5MGomQFF?oHEUWo f5EJomQDF_oIEUWofEMGomQGFOoFEUgoe5AKomIDF@;oeU9K08WoeeAIomICF?oFDUWoeE1KomMCF?oH EESof5EGomEDFooBEUSodeIFom9@GOoBBf;odd]SomE=GooFCF3of4aPomI;GooCC5;oeTYOone:T?oc AY3okTIkoni=Moo^E7SolE^2ooART?odHhkolf:9oo=QR?ocH8colf:=oo=OTOodFY[om5^Hoo5NU?o` GI?okEbConiOSoo_HXookf:Boo1QS_oaH7golUn3ooAPTOodHY7om62>oo=PS?odGHkolen@oo=RSOoc HHkolf:JolELUOo1FiSo`ebEokYRUOnf HIWo^EfPokeIX_o3DZSoaEFSolQTT_o9LHOoaGQhol9fJ_nnM6Oo_GM_ol1jMoo4OWkobH6AomZ2V?oNPIkohGbPonEjYOoZMK;olG6moo5b^OoUNZoo^hJQoiN8V?nHQIWoWXBKoj24VonN Q9coX8>Koj:3V_nPPY[oWH>Koij4UonQPi7oY8:>ojJCS_nZXXcoZZ:>ojRVTP02ojNXU00;ojRYV_nW /H_oXK5YEP;o]:UF00Go/jYG ok>ZF?ncZEKo/Z]Iok>ZF002okBZE`0YokFYEonfZ5Ko/j]Fojn]Eon^[eKoYkEEoijlDOnBa4[oTLAonaWTOo/:18ok6OB_n_X4;oZj=3ojjQF_nbWf?o/ieK okNKG?nfVeco]YaMokJKG?ngVeco]YYLokJLG?neW5go/ieKok>NF_ndWEco]YaKokJKF_neW5_o]Y]K okNKGOnfW5h00_nfVe`2okJKF`0PokFKG?nfVe_o]iaNokRKG_nhVUko]iaPokNNHOneWf;o/J=Qok^D G_oHHe7omCI:ooLb;_o^JBKokG``oo9Y;_ofFS7omeoo=SSOocHH[olej:oo=RROocHX_olenBon]HW?oZFYSolEfCoo9KTOoaFi7oleb?00;olef=05coleV@ooAHUOob IW3ol6I8oniFO?oUC9CokE6AoniGT?o^FXook5JBonE?VooOAYWok4Enoo58M_oaB7gokTIlonm8MOo` Bg?ol4]eoo5W?nKQIooXHBMoin4W?nO Pi_oXH>Joj63VonPPIgoWh:Joj:2U?nSPI7oX8:@oj67T_nWW93oZZ:=ojVLRonZWhgoZZ>?ojRUT?nV XicoY[24ojB`AonR[ccoXK97ojRbDOn^[EKo/jUEokBXE_nbZUSo/ZYGok>YEondZ5Oo]:UFokBYE`;o ]:UH07;o]:YGokBYE_ndZUSo]:YFokBYEOndZ5Co/jUDok>ZEoncZeGo/JaFok:/F?ndZUOo]ZYJokFZ Fon`[EOoZk9Eoj:iDonH`DkoTl9;oiBoBOnK]TWoXj]9ojNXB_n]XTWo/ie7ok:MAonbWE3o/iiMok:O H?nbWUco]iYKokNJG_nfVeco^9]MokNLG_ngVeco]i]MokJKGOndW5go]9eLokFLFonfWE_o]YeLokFM FoneW5_o]Y]JokJKG?nfW5co]Y]KokJLG?nfVego]Y]LokJJG?nfVeoo^9YQokNKH?nlV5co`Y1IokRK G_ndX63obWmHoni2A_oh;3kombm3ooHn:oo[N2Soih/fonR4_oaICgol68honiQ<_o^GB[okUooeE3[omE_ofFCcomU/mooEN?OoeGckomEhnooEK>oog FD_on5QJooQJF_ogGUWomV=HooEYFoodKEgom6iOooA`H_odLF?omG5QooA_GOoeKUcom6eKooAZFOod JUSom6UGooAZDooeJdoomFi?ooE`D_oeLeOom7=LooA^H?ocJF3okFQRonIUIOoQGfGoh5]RomiIGOoI F5SoeUEEom=BEOoBDEKodeAFomIEEooFEEKoeUEGomMEFOoIEeOofUMFomYGFOoIEEcoeUAMomIFF?oG EeOoeUIJomACGOoFE5[oeU=KomMBFooFCegoee5MomQCG?oIE5[oee5Mom=?G_oDDU_oeE=IomEAE_oE CeKoddYRom95IooCAF?oe4YHomM=FOoECU7oeD]Hon];QoodCYSokdR=onm3N_obCh;om66oo=RSOocHHcolf6=ooANT_ocFiOom5^Eoo5LUOo_FYKokebEonmPT?o`HI?olF6>oo5RN?ob HWgolf:9oo=SRoocI8colf6oo9MSOocFhoom5VAoo=HUOobIG7olFI@onaHS_o[F8kokERBonI? V_oSBY_okdZ4oo59LooaBGWokdMloo19Moo`BWCol4]coo1;L_o`BG;ojTQmonE7SOoIE8_oaV20okYQ Q_nlHY?o_ebGokaLVOo0H9[oa6FHolQ[TOo@I9OodEFRolaHX_o:JYCob7>;olIcSOo4MHko_X23okf2 O?o3OGooa7f3ol9oQoo4OXGoaGn3olB1QOo3Q8Koa8>4olB1Q_o3PhSo`8B8okj5ROnoQ8Oo_8N4okf8 OonlR8?oYHV@oiV8WonPQj7oWhFKoib2W?nOPicoXh>Loj22W_nQPYWoY8>DojF2T?nVPY?oYGnCojF8 TOnXX93oZZJ=ojVPS_nYWHcoZYjLHOnaWEoo[j9KoknCEOoGJT_og61>ooooLbCOofAR[okG/YonV6=?oZQC7o jhhdonZ2<_oeMbSon74YooQW:OohG2[on5DWooMA9oodDBOomEX]ooMQ@?oeFcSolVD/oo>5;?ocKB3o lEHEoo9G5oocEQKome0:ooME0_odIPOolFd>oo9d3oobJ`[olU/2oo9S0?obLP7olWX3oo>01OocR0Wo lh`;oo>;3?obRPcolXX=oo::3oobR0kolhX9onn74OoSN3GohFlaon9_9ooTKS7ohGHQomn23_oPOP_o hg82oooTK`0oonA_00009_oTK`04oo:N<`04ooc0F?ooc6GoolaUooFY?`?olYhc00CojhHIonA_0?oT K`3olYhc0_ooc6D00ooh]DcolYhcoo:N<`03oo:N<`06onMk3OoTK`3oi6l0onA_0?oVM@Kon[YB0_oo c6D00oomaUooljS>@05onA_00?oolaU2OoTK`001Ooj ^U;oolaUoooS>@05onA_0006onV14oom aUooolaUoooooeE3_omE_oeF3comE`mooEP?_oeH3[omf5;ooUOGOoiFeWonEMFooUFEOoh F5KomeeGooISEooeJE[om6]LooA^G@?om71N01Oom6mMooA^GOodKEcom6]KooA[FOodK5_om6]JooE] G?oeKEOomFa@ooE]COoeL53omG9FooAaFoodL63olfaQoniZI?oYJFOoiV9Xon5KIOoJF5oof5QHomIF EP02omAED`0UomIEEOoGE5Sof5EGomMCFooEDUooeUAJomMFF_oHEU_oeU=NomMCG_oGDegoee5NomI= HOoGCekof59LomUBFooGDEcoe4iLom=?F_oDD5OoeE1FomIBFOoEDEgoe4eLom97I?o?@f?odTQMomE; FooDCd_og4Y`oo9onaCPOo/CYCokUFAoniFT?o/EXookUR>on]BUOoRBYgokTbAoo5:N?o`BWGokTUjoo59 NOo`BWCol4YconY:OOoHD8Coa5N3Roo3PXKo_8B>ojB5V_nNQY_oX8FJoib3 VonNPYgoXh6Koj>0U_nTPY?oYH:CojB2TonUPi?oYh2Coj>7T?nWWHkoZ::>ojNQSonWWHkoYiV=ojJH SOnTU9SoYZIcojJ[>onU[3coYJa1ojB^@_nT/TgoY[ECojJdD_nY/E?o[JmDojf_EOn^[UKo/j]FokFZ EoncZeOo/jYE00;o]:YE06oo]:UFok>YEondZEKo]JUHokBYF?ncZEKo/jUEokBYE?ncZUOo/ZYGok6[ EonbZESo/ZYFok2/E_na[5Oo]:YGokNXEongZ5Ko]ZUGok6YEon]XTkoYZE6oj2]B_nK[UGoW:]Hoj>W EonZY5[o/:5Kok:NG?neW5_o]i]JokJKFongVe_o]YaKokFLFondW5_o]I]LokJKFonfVeco]Y]KokJL F_neWEco]YeLokFMFoneWE[o]YaJokFLGOnhWEoo`Z1MolBPG?o2X5ko`J1JokfVEoniY5Go/iYAolIk B_of<33onALYooHb<_o`@ckok4mEonMKCooaN37olHh`onb8<_o[Qc?ojgL_onma8_ohVb3onZXSoo^O 8OojTQkonH@JooUk5oohKASon5TQooQD;_ohFC?olF`hoo6C>_ohSR7om6<4oo=L0oobI@7olg<1oo:1 2?oaQPkolH<>oo663?oaR`colH`oo:83oobQ`kolXH>oo:7 3?obR0KokHooeECcomE@looED>_oeECWomEPgooMNB0;o nF9O00conF5KooUNFooiFU[onEIFooUEE?oiEe?on5]CooIRE_oeIe[om6]LooA^G_odL5d2ooAaGP0; ooA`G_odKUcom6eKooA[F?odJUOomFQFooAWEOodJUWom6aJooA/F?oeKEH00_oeKUH03ooeL5GomG1F ooE^F_odKV;olFeUona/IooZJ6[oj69]onALJ?oMEfKof5AOomMEF?oFDeWode1Lom=AF002omEBF00O omAAF_oEDEcoeU5LomIBGOoECf3oeDeQomM>GooHCUooeTiLomA;F_oDC5[oe4mHomA?FooED5ooe51I omEAEooCCe_ocdMPola3I?o?@VWoddUIomA;F_oXB8[olDZEoo=6U?odAX_om4b;ooA@S?odF93om66> oo=RR@02oo=PR`20oo=QR_odGY3oleZGoo=KU_ocG9Gol5bFoneMU?o_H9?olV6:oo5QNoobHWoolf:7 oo=PRoocH8com6:>oo=RRoocHHWolf::oo=QRoocHXgolUjGon]IV_o^GI?olEnCoo=QSoocHh_olen@ oo9KT?ocG8kole^?oo9KS_oaFY7olV9koo1PB_oYCh?oke:Coo9HT?o_EhookER=onmISOobEY3oiDVN onU>V_o_CGookTYboo19L_oaB7SokTZ2ommFP_o5HH;o]627okUKSoo6G8_ocf2olF1T?o2Q8ko_8B7 olb0TOoFO:go/8>Roi^6VOnPPY[oXH2Goj5oT_nRPI7oXh6Coj>0T_nTPI7oY7nBojAoTonRSI3oYY^> ojFIT?nUW97oYIjBoj>LTOnRUY7oY96KojRQM?nW[3SoYZdgojF/>onT[C_oY:i1ojNaCOnX]5;oYKA@ ojJdDOnZ/E?oZk1Fojj^EoncZe[o]ZQJokBYF?ncZEOo]:UFokBYEondZ5L2okFXF@03okBYEOnaZUKo ]:UH00;o/jUE05Ko/JYGok:ZEonfYeSo]:QEok2ZEOnaZeKo/ZYFok:[E_nbZeGo/Z]FokB/FonhY5Ko ]iMHDon]X5oo[J1Poj^PG?nSYUWoXJMJojJUFOnZXeWo/:5KokFMFOngW5_o]YeMokFMGOngVego ^9YNokJKGonfW5ko]YaMokFLGOngW5ko^9]OokNKGongW67o^9aPokBLH?nfXUoogjm?ooF_?ooa[3oo kji0oo2a@?o/Z3ool8H`ooAc9oogKRGon6TPooMQ7_ogDQSokULNonEh;Oo^SC;olI/jonnR>OoZNbSo kV4BooVG5?ok`2?onl43P;olXH> 00kolXL>oo:53_obQPcolXP6onj67OoRO4SohWFooECf3oe4mLomA?F?oCCecodTmJom9>F?o@Be_ocD=Voli0Joo?Ae[og4Ihoo58UOod A9Gom4JDooA;oo=QS?ocHXcolf::ooAOS_odGY7olejBoo9LU_o_ GIKokUjGonmORooaH7colf63oo=QR?ocGhgolej@oo=PS_ocHh`2oo=QR`1:oo=TS?odHI7okERMonUF W?o`H97olV6Boo9PT?ocHh[olf:=oo9NTOocG8oole^?oo1KSooaFi7olf9goo5PCOo/DHKojE:Coo1H S_o_F8kokER=oneGSOodE9?oj4ZMonABolQG TOo=HHSocfF3om=PToo;HjGo]FnFojabQOn]LGooZFR3oj9OWOnUPi?o[iemok>ONOndT7co]hF2okb3 P_nmPWko^X9nokf2OonoPX7o_H5ool1nOoo2OHCo`H66okn6POo2PHOoaWZ=olEmS_o2PHco_h:9okn2 Qoo3PHWoa82_nT[C[oYJdoojR`C?nY/UCoZ;=DojJdE?nX/e?oZ;9BojRbEOn_[5So]:QGokFXEondZ5Oo]:UGok>Y F?ndZESo]:QGok:YE_ncZEOo]:UHok:ZE_nbZUGo/JYFokFXEOneYeSo/jUGok:YEOneZ5Ko]JUGok:Z Eon`[5Ko/JUDokBYE_na[UOo[JYIojjOGoneVf3o^iUQok^HH?ngVEoo/YaOoj^PG?nWXecoYZALojRR FonYXe[o[j5Kok:PG?neWeco]YiMokNMGonfWEh00_nhVel0AonhVf3o^IYOokNLH?ncWUgo[j1IojfS E_nYYU?o^Zi?on2iAOoh_Ccon;/jooRg>oog^3_omkloooO5@oogbTComlU5ooO8A?oha47on9`/ooQO 5?oZI1[ohh`YonN@:?o`OAGonZDDoo[@:?ojdR[on<`WooGD:_ofeR[oll`Yoo>h:OofXRGomjDOooB> 7OoaTB_okZ0doo:8oniA2oo^F1?okf8Roo1W<_oaICcol64goniR0oo^ E0WokePHoo5K9_ocFS;omEPlooEF>oofETKonEMKooUFG?oiEUSonEUKooUNG?oiHEoon69PooQRHOoi H63onEmOooYKFoojEUGonUABooYED_oiF5GomemIooIVG_oeJUkom6aKooA]FoodKUgom6iNooA^G?od KEcomFiNooE]G_odKEcomFiOooE]GoodK5com6aKooE[G?oeK63omFiQooE^GooeKUkomFeKooE/F_oe KU_omFmKooE`F_oeKU_omFiQoo9]Hoo]KFOojFM/onMOKOoTG6WohEUVom]EH?oECecoe4eGomA=E_oD CEGoe4aFom=;E_oCC5Koe4mLomEAG?oDD5Ooe51HomA?G?oCCeX2om=?E`2@om9=FOo@AfSoc49[olm2 JooY@Xkom4B@ooA6TOodBi7om4f=oo=>R_odD8goleF=oo=NROocHh[olfB:oo=SQoocHXOom5j>ooAN TOodGi;olV2@oo9QU_oaHH_olF9koo=PQOodHHSom62oo9M U_o]Dj;ol5RKoo=QSoobH9;olUnAoo=RS?ocHh_olf:?oo5KT_ocF97olU^?onmKT?oaHg7olV1DoniD ROoWDi?okeJ@oo=GS_oaEi7olUBEooACU_oXBi_ohTBKoneCT?oHEX7o^V9lok=[N_nkJW_o_fF3ol9I TOo4F9;oc62:om1TQ_o>HXSo`V>2okYVR_nhKXoo/g::ojEXTOnFII_oWh^ Oon_R7[o[XUiojZ5O?nZRG_o[haiok:`okmlW?nQPX[oYH6:ojF1 SonTOi7oXGjCoiilU?nRO9?oX7jDoj6BT_nTVI7oY9JAoj:GT_nSUi7oXiRAojBMT_nUW9_oZJEgojN/ ?_nW[3WoYZ`mojN[?OnVZccoYJ/jojJ[?OnX[TSoZ[5AojVbDonX/U?oYk9@ojJcDOnT]57oZK1Cok6[ EOncZESo]:QIokFXF?ndZ5Ko/jQE0_nbZUL2ok:YE@1Xok6ZE_ndZ5Ko]JUFok:ZF?ncZESo]:UFokFY E_ndZEKo/JYFok>ZEOngYUOo]:MGojV`C_nW]U[o[j]Xok:MHOncW5go]YaMokRJG_njVEko^9YNokBL H?naWV3o[J1QojfNG_n^WUgo[ImKojjQF_naXU_o/j5LokFPG?nfWUco^9eMokJNG_nbX5_o[Z=Ioj^T E?nWYE7oZ:IAojRTD_nUYE?oZZMCol:`D_oT]D?omkPmooNk@?og_DComl15ooNn@oog_TComl54ooO5 AOoaYT?ol6H/onaM6?oTMaKoj8TKonfi;?oYfCcoj]Pjon?B>?oSdSWoi/Tdon^88oo[GQOoiUPHoo16 7ooeC33okV11onEgCOoSOE;okg==ooJ0A?ohTdGonY=6ooal=OolJ2ConV<2Oo^RPkoiH@`onN6Goo`SV;oki1Ionj@ E?o]QTOoji0gonVE8OoXQ13ojGh8onMk0ooULP3oonA_03ooi6l0003oonA_06goi6l000[oi703on]` ;?o_HcGokVLdoniV1?o^D`SokUTDoo1L8oobFb[om5/m ooMLG?ohFV3on5QMooUHGOoiFEoonEYLooUMGOohGUkon61NooQQG_ohHUoon61OooUMGOoiFUSonUEE oo]DD_okDe;onUIEooQLEoofI5comF]LooA]FoodKUcom6iMooA^G_odK5Wom6eIooA]G?oeKEh2ooA] FP06ooA]GOoeKEoom6iMooA^G_oeKV3omFeP0ooeKEl01?oeKEgomFaKooE]FoofKUX2ooI_FP0@ooE] FooeKEkom6iRoo1]IOo[IfcojEi_onEHJ?oNEF?of59OomA?E_o@BeWodDeJom9?EOoCCeGoddmHom=> F@;odTiG083oddmIom=@F?oDCeooddYZol]6G_oI?H;olT6CooA5SoodB8oom4b9oo=@R?ocDH[oldn< oo=BR_ocG8Wolf>7ooAPS?oeEiGomTnJooEBYOoeFJ7om5jFoo=RToobIXKolVEiooASQOodHhSom66< ooAOSoodGhkom5j>ooAPSoodH97olenAon]HVOo^F9_om5nBooAPS_odGi7om5nBoo=QSOodHXkom6B> oo9OT_oaFI7ole^@onmIToo`Hg?olV5Foo1HR_o]E9CokUBDoo5FToodEYColUBBonmETOo[CY[o`4^N okAUTOn_Lgoo[FYgokUSO_o1Hh?o`6:6ol=NSoo=Ghgodf:8olaSQ_njIGgo]FY`ojmaJ_nVKHGoY6BO oi]/W_nVS8[o/j1hok:KNOncVgco/95nojf6P?n^QWkoZX>0ojZ7O_n^Rg_o[Xaiok2;N?n_RGWo[hQg ojf8MOndRGko`gf:olAlROo1P8Oo`X6:ol:1R?nmQ8?o_X:9ol=mTOo4OHooaWb?ol9oQoo4OHSoiW:X ooUa^ooiLKSonG6looAb^oo6NZ;oXgj=oj=lSonWOXooXWj@oj5nTonONiKoWX>Doj>FT?nSUY7oXiFA oj>GT?nTUXooY9F?ojFISonTVIWoY:AkojJ[>onXZSGoZ:TjojNZ>@;oYZ/j02goYjXhojN[>_nX[D3o ZJm9ojRbDOnW]5CoZ;=EojNcDonT]U;oYk=Aojb_E?na[5Ko]:UHokFYFOncZEOo/jYGok:ZE_naZUKo /ZYEok>YEOndZ5Ko/ZYFok>YF?neZ5So]:QEokBYEOn`ZUCo/ZUFokFWF?ndZ5WoZ[1>ojBc@on_/E[o ^:i_okFUI_nbW5co/IiMok>NGondWEko]i]NokJKG_nbWUko/iiMokRJG?nfVUh00_ncVel0BonbW63o /9iNojnQFon/YU_oYZUDojRYDOn[ZUGoZjUDojbWDon/YU?o[J=BojfTDon]Xe?oZ:EGoj>UEon/Ze;o b[9:onNg@_og_47omkQ0ooRe?_oh[S_onJPeooV:;?oeLbGol7XSooMn7Oob[2Gok<`/onOC<_oSdSOo hM4gomoA=ooW[b[ol5DDoo8L2_o_81;oiC4NonDn;?ocA4OomDiIooA?EOocCUColVIIoo66F?ocQdoo mXE?o_HCCokf8eonmQ=_o`HCcol5`f oo1?7Oo`B@col4X7onm=3?o_EQ?olE/ZooEQGOofH6ComUmNooMNGoogG67on5YOooQIGooiFEkonEYL ooULGOoiGUgonEiNooUMGooiG5oonE]OooYLH?okF5ooo5EMooaBFoolDeOonUMGooUMF_ogIEkomFYM ooA]GOodKEX2ooA]F@06ooE^GooeKEkomFaNooE[G_odK5com6iL0_odKEl3ooA^G`05ooA^HOodL67o mFmSooA^HOoeKV400_oeKEl0:ooeKEcomFeJooE]F?oeKEOomViGooE`FooeL5kom75Soo5]J_o^IVoo k65gonEIKooNEfKofeESomMBG_oCCeKod4mBom5?DOoACeCodTiDom9=E?oDCV;odTiJolm7IOoV?YKo mCnHooA3ToodBh[oldj9oo=@RoocDX[ole66oo=?SOofD9con4^[ooQ6/?ohAZ_omDVdooA<^OogCKGo meRWoo=SS?obIGX00_ocIH<0L?ocHhKom62?ooASTOodHIColV>ConQWQooXJ8Gohf6:onY]M?oaJegolEV?onaEUooZEi?o kUJBoo9GTOoYEI;oeF2>okm[R_nIFiOoW5jHok1`Q?nfIWco`626olAUQoo9HH_odEZBomQLSOo7HH3o /fQdoji`KOnYPFkoVY5hohR0S_nDL9GoZXYook>JLon_TGWo[HilojnAO_n/SH?o[HV1oj^8POn[R83o [Hf0ojj?O?n_SGWo/Xaiok6@N_n_Rg[o[HIgok>5P?o2OH[o`gf9ol=oS?o2PH[o_h69okj2QonoPXOo a7n>olAoSOo5OXgo_X25olMkS_o_LK?onW32ooUa`ooiM?nW[3go Yj/jojN[>OnUZcSoYZXhojNY=onVZCKoYjTiojF_@OnV/d_oY[AAojNdDonW]5@2ojNcD`1doj^aEOn] [eKo[JiGok>ZEondZEWo/jYHok>YEondZEGo/jYGok:[EonbZEKo]JQGokFXF?ncZECo/ZYEok>XF?ne Z5Wo/JaDojNaBonW/T3o[:m3okB]HOni[Foo]jaYokJQH_ndVUco/YeLok:NG?naWego/YiMok:MG?na WUgo/ieOokNJGongW67o]9eOok2NF_n]WUWo[Z1HoinVE?me]dCoOK8hohf/>onA[47oUZ]3oi^[A_nQ ZT_oYZQ@oj^UDon/YECoZjIFojJWF?nSY53odK93ooVU9oojVbGonZP`ooZZ3?ofC`SomDl:ooE?5oodE2SolE/_oniY8_oZ MQ[oj7CdkoeDAmoo@nXoob>ioolT>Eoo==R?ocDhCole>6ooE9V?og>Z[onC6eooPj^oodB;Oo le2doo9B/oobCkComDZkooU<`?ohDZGomURCooEOToocI8GolfInoo=UPoocHhSolf::ooASSoocHYKo jeVHoniJV_ocHY7olfB?oo9SSoodH97om5nDooAPTOodHI;om5nCoo=SS_oPKG[ofFmbomM/MooPMVKo kg=JoneDTOoZE93okeF>on]CTooKFY?o_VR8oj]dPOn/M8?oXE^Doj9JUOneKX?o`FF4olUQROo:I8Co dUR?oliERoo0IGcoZW=doib4L?nEX73oSJAoohBRVOnDXXOoYi]`ojj>Mon[TG[oZiMhojbINOn/VWko [IZ0ojnHO_n`UH3o[IB1ojfGOon`Ug_o/9=kojnBO_n_UGoo[YAoojb@NOngQgooa7^:ol=mRonnPXOo _X>4ol:0R?o1PhGo_hB4okn4Qoo1P93o`WjFokZ4RoojDOnP^CooXKM3oj>e@onU/d7oY;90ojBa?_nV[SkoYJdlojJ[>_nUZcWoYj`mojZ]@onX/4So Y[5YEoneZ5So]:UFojf_C?nX/TCoZ[51ojj^?on//4Go]:eSokN[J_nf[FSo]ZaXokNOGonfV5_o ]IYLok:MGOncWF3o]9aRok2PHonWY5koZZ=Koj^TFOnYYEP2ojZUE`1>oibWC?n2[SGoH[`bof2l=Ome [R_oMZh/ogN`;Omh[c7oOJleohB_>On8[cgoRZhoohn]@onGZdOo[jeYeCodZ=Gon=jE?oYL57oiFi=onI[C?oWO5[ojHUYonN:JOoSTFWojI=QooF2B_ok KC;oneTSooEL8Oo`H1SolF4Foo9P5_oaHAOolUlGoo1L6?ocE1GomTX@ooM?3OohE0comD/Coo996_ob BR7olTXNoo5>4Oo`C0WokdH:onm94oo`DB;ol58Oonm@8?o_Eb7okV0PoneQ7_o[FPkoifH3oooTK`0k onA_0000IOoTK`000ooWPB3oooooooooo`03ooooo`03ooOB[ooTK`3oi6l000?oi6l000?omLVOoooo ooooool00oooool6onA_0003onIh4?ogdZoooooo00Sooooo00?oll2?onIh4?oTK`000ooTK`000ooh fkooooooooooo`09ooooo`03onA_0?o[Td3ooooo00?ooooo00?ol[N0onA_0?oTK`001_oTK`000ooh fkooooooooooo`02ooooo`Coi6l000?okZEPooooooooool00_ooool2ooG9W`Cooooo00?ok9a@onA_ 0?oTK`001OoTK`000oojigOonA_ 0?oTK`000_oTK`000ooYRS3oooooooooo`02ooooo`03oo?0SooTK`3oi6l000;oi6l01?ooool00oog dZooi6l0onA_0028onA_001ConA_0OoZL2Kol68fonmS=_o`HScolU]5ooI>CoofFf?om5UIooAEE_od EeKom5UBoo=JCoocFdoolee@oo=NAOocFSColedcoo9U>?oaIcColfLfooIYB?ohJDgomfY=ooM[Coog JT_omfU9ooMXCoogJeOom6i@oo9Z@?obHCColUDYoo9>7oobC1coldhToo=C=?ocF3oolUdooo5M?ooa GSoolEe1oo9M@_obFD3olU0]ooA5:_of@D_om4YJooM@H_ogEVOon5i_ooQSMOohHgWon69mooQQOooh HGcon61jooQROoohIX3on6QnooUZN_oiJGWonFMfooUUM_oiI7GonF=cooYPL?okGVkoneYWooaCH_om CEWooDaEooaAEoojFE_on69OooMXHOoeJe_om6eKooA^G_odL5kom71MooA^G?odKel00oodKUh3ooA] G00=ooA]F?odK5Som6]GooAZFOodJeWolfeJooA[F_odIeGom6QGooAWE_odIE?om6MJooEWG002ooEU E`0ZooETFOoeIegomFMNooEYI?oeJFOomFQ[ooETK?ocFW3olEMconUGLOoLD73oeDmDom1=F_oXAiGo m42PondnVoobBhgom4b=ooI1Wooi=;KomcFioo8l/_o]?[7ojd>aoni=/OodEK7olE:conmA]_odBL3o n3ZbooThY?oi@JKon4ZLooIET?odGX[olf:7oo=RROocHX[olf2ConeIW?o^FiColf:<0oocHXd0f_od Gi?om5jEooANU?odH9;olFB7okb5QOnoPh_o`h6Aol5mU_o0 OIOo_86:omAiX?ogK/?onFo3ooUa`_oiL/7onW74ooYb`_ojML3onW?4omeg]On/Pi_oW8FCoj>6U?nV U9;oYiVBojRJTOnVW9CoYj2FojRTU_nWYYSoYZFJoj>MWOnTYJ3oYKUMoj6j@onN_4KoWk]5oj:iA_nS ^TKoX[Y5oj:hA_nS^4GoXkI4oj6gA?nS/d;oYK10ojR_@_nX/4KoZ;5;ojJcCOnQ]TkoY;A?ojRaD?nX /U3oYk=AojZaDon_[5Go/:aIok>ZFOnfZ5So]ZQIokFYF_nfZ5go]JUJok6/DOn[/DOoYk=2oj^a@_n^ /4?o[K52oj^bA_nd[VGo]ja]okF/JOne[VWo]j]YokFOIOndVf7o]IaRokFLHOn`WekoZJ=Ioin[DonH /57oWZaEoj^VF_nUYUCoSZe2og^b_m]]CKoNZd/og>a;omb/BooLK4^ofjc;?mb ]RcoPKD`ohN`:on?YRWo_JDhomjD<_oOMb7ojV8EooYB3?oiDA[on5PUooIJ9?ogBBCol68TonR@:?oX UB_oj8T/onF2<_oSN2kohg0^on1j=OoFJS[odFM2omEoBOoBUU7odJ]Hom2gGOoB^UkocK]Mom>NF_oX Me?oig1@on9eC_oSM4koih9IonRCIOoRWg7oi9Y]oo9gBOojGb_oo5PZoo1U?OoXJBcokf@Coo5T4_ob H1Gom5@Aoo985?od?A?omT4>ooM=3?ohD@[omDXCoo9<8OobBb3olD`?oo1>1_o^C@Ookd/9oo161Oo` @`3okdD0one70?o]B@3ojdh0onYE0?oYH03oiF/1oooTK`0konA_0000IOoTK`000oo/W53ooooooooo o`04ooooo`03onIh4?oTK`3oi6l000;oi6l000?ooOK_ooooooooool00oooool00ooYRS3oi6l0onA_ 0002onA_0003onIh4?ojiooIAE?oeGF<2ooAGE@0]ooAGE?od EUCom5ICooAEE_odEeWom5I>ooAD=oodF3Golf0koo5T=OocJ3SomVU8ooMYC?ogK4gomf]=ooMZBoog JT[omfM9ooMXD?oeJdoolVe4oo5[>oobHSGolULXoo5?7?obBa_olddVoo=F>_obFd?olUm4oo9NAoob H4_olf9Coo=REOoeG6Kon55eooI9K?ocBF[okdi_oo=?KoogEW3on5miooQROoohHh;on69n00;on61i 09gon61jooQRO?ohIGgon6YmooM^O?ogKWgon6ikooQ/NOohJg_on6alooQ[NOohJWSonFAeoo]MKOol EFGooDmKooeonYUBOoZHdOok65:oniNBOo^ G4Sok5e8oo9GBOodE4[omE=>ooECD?ocEE7olUIAooEDEOoeCe7omTiEooE>EOoeD5gomEAWooEDI_oe E6_omEMcooEGMOoeF7OomEEiooEDMOofE6_omU=OooIFG?ofGEWomVAMooEYIOodGFOoke5OomaBFooG BgcokdjEoo55V?od>ZcomS6hoo<`^Ooa>KSojSndonQ1/?oY?K;ojcbcondo/oocB[;omDNeoo@k_Ooe =;colcF[ooHkXOoh?j?onCfPooTnWOohA9oomUFMooAUS_obHXWolEfAoo9NV?o`GY?olV2>oo=QS_oc HXkolV:=oo5PSoocGi?om5n?ooAPTOo_I8_offefomQ^MOoJK7[oi7YWonenHOo/D9cocUJJojaaQ?nX MH7o[6j8ojmXR_nfKHGo^6j5oj]XQOnVGi7o_FJ>olQWP?o0KWOo[7=loi:BP_n4]8;oN/22ogc3Pon6 _I[oQKNVofbnK_n3/U7oZj=/ojfRLonZYfkoZIekojbEPon]Vgco[9edojZML_n[VgKo[9]boj^IKon_ Ufoo/9A_ojnBKon]UFWo[9EYoj^HK?n]VWCo]8inok^8R?nmQhko_H6Dokj1TonnPY3o_8>>ol61T?o3 P93o`82?ol9mU?o1OI3og7JVooUaa?oiL<3onG7000;onG:o03?onW?2ooYb_oojLkoonG;2onMg]ond P9koVhVBojJGT?nWUi7oYYF@ojJDTOnWUi3oYiV@ojRNTOnXYYKoY::IojJRX_nU/fGoY[I6oj>hBOnP ^DOoWkY7oj:gA_nT^4GoX[U7oj:iA_nS^DGoXK]6oj:jAonR^TKoX[Q3oj>hAOnU]dOoYKE6ojFeAonS ]T_oXKE@ojNcDOnX/U7oZ[1@ojNdDOnW/e7o[:mDok2/F?ncZUWo/jQJok6/E_n//4_oYk=4ojNc@_nZ /d@00_n//T@02on]/43oZk59okB]I_ngZfco]Z]ZokJ/K?ne/6oo/Jm/ojnRH?n[X5OoZZ5D00;oZ:AC 05;o[J9FojZTEonUYeKoVjU;ohF`>?mh]2goNk<]ogna_mf/3?oO:h/oh:`V3GogHd`omem:?oMP2_of8HaomF9=ooHT3GoiX4VooE/8OojMB;onf`TooYg9Ooe YRSoljlXoo>T:?ocR2;ol6/QonMn=?oQScKojYhaonjT;ooJ/4Go^[QFokRjEonl^5Ko^[IDokbdDOnj ]E7o][]AolFYE_oGTESoehmGomBAEOoCTeCodimQon6JJOocNdgomVDiooQR=ooiGCOomFooeDSOom5Hloo=N>_odI3oomfE9 ooQYCOogJdcomfYEoodBV7omdMSooM8JOogAf[omd]_ooM=L_ohCG7on4adooQ:LoohD7Oo n59iooQCM_ohDWCon51cooQ@K_ohCVWonDiVooU=H?ohCU_on55KooQIH_ogHVSomfI^ooIWK?ogHVGo n54kooQ=9ooRDfKod51Homi:V_od?[GokBk0onHb`OoR>[Kohd6bonM1]?oX?KCojSZdon`k/_o/=;?o kbjboo@//Ooh;K_omcVjoo50ZOoe@jGomd>XooQ2Xooi?IgonCVNooU9Y_ogJJ7omV2Roo=IU_ocHhco lV:Aoo9PSoocHXkolV:>oo5OT?oaG9KolenAoo=PS_odH8oolV>?on9YP?oIJgSodfYfonIdJ?o[M6go ]6>Goj1ZSonZJH[o/6V:ojeWROnUIHSo/6f5ojIaPOnPLX?oW5VIojeWS_n[OGgoWh:7oi^6TOnLY9Go SkZEogo2Q_mn`YOoO<2Pof_1Jom[^4[oVjMVok6QM?n[Xg?oZj=bojRUL?nYWWWo[iImojjKN?n/WgWo Zj1jojVLLOn/UVko[YQeojfKNOn/V7?o[9UeojjKO_nZXXCo[IV4okV9ROnmQ97o_H>CokV4TonkQI;o _hBAok^6R_noPXco`H6=ol:1Roo2P8oo`h2nooYc`@02ooYb _`06ooYc_ooiML3okgFookF3W?nQW8koYYb@0_nWV9004onWUXkoYiJ?ojNHSonXVi3oYijCojNLW?nS [VGoX[I1oj>eA_nT]DSoXKM6oinhAOnR^4KoYKI6oj>fAOnS]T?oXKQ4oj2hA?nQ^4@00_nQ^D<2oinj A01]oj:hA?nS]dGoWkU7oingC?nV]57oYk=CojJcDonY/E?oZK9BojFdD_nX/Tko[K18ojbaA?nX/T3o Z[92ojfa@_n]/D?o[;94ojba@on][coo[;16okF/IOnhZfco/jiVojn`I?n[/f3oZkEOojZ`G?nYXeCo ZJ9BojZSDon^XEOo/:5HojVRDOn@ZT3oNk@`ogVd;Oml/booO[8cogna=?mm/S;oOJl]of^i1:?o]NB_omg@]oo=`;OoYKR_ohGL/omj2;ooeaBconJ_ocK3ko mgoodFCkomEi1ooQTC?ohITkomfM;00;omfU:02_omfYOoeD3_omEMdoon51jooQEO?ohDWSon55hooQCN?ohDGOon51eooU?M?oiCG?onDibooU=KOoiC6gonT]/ooY: JOojB6?onTUQooU9G?oiBEKonDYBooUkCoicZdonLj /_oW>[7ojRneonP//OoX=ZWol3faooj[olCnRooE5YOog@jcomd2WooPjWooi@JOon5RiooIA a?ohC:kom62Aoo9SSOocH8oolefCooANT_ocGI;om5jDoo=OT?ocHHoolf6>ooAPSoocHHgojV>8omMO ROo[I8;okf5gok=XTonCOHWoYf^oiUm UOnPTIWoZI>Doj^HT_nMV9KoSj^XogVkLomV^4SoO;9KojNTKon^XFkoZ:=]oj^QK_nYXVcoYZAXoj^L M_n^Ugoo[Y]lojbOMonZVWKo[HmmojVGO_nWY7goZ:R0oj^UQOn/XXGoZ:>1ojfAPonmQHko^HVooooo`05oogfkooTK`3oi6l0 onA_0?ohfkl00oooool01?oc`8ooi6l0onA_0?o^YF06ooooo`04ooG9WooTK`3oi6l0ooSK_`?ooooo 00?oo>gOonA_0?oTK`00OooTK`009OoQKP?off/8om9X4?o8I1[o`V8Ool1Q8OnoH27o`F4Pol9Q7oo2 HQko`V8PolUQooAI@?oeDC[omE54ooIHE_oe GUgomf1iooUQUooiHI<00_oiHi@0]OohHI?onEb>ooQCQOofCGSold]boo5;L_ocCgOome=hooUGMooh GWWon5mlooQONOohGW[on5imooQNOoohGWkon5amooQLP?ohFh3onEZ1ooQKO_ohFWcon5UjooQINooh F7Won5UgooQGMOohDVcon4e^ooQOoi@f_on5VE_ohBU;on4Q?ooQ;D?ohDeKon5EEooQHF?ogGUgomVAQooIXIooe K6_omG1[ooEaJoodLFWom6]VooINF?ohFDKonD/]oo5F7ooQL1;ogF=>omABIOoEC7KohTJ=onP^X_oQ ><3ofCnmomhi]?oU@k?ojCfbonDc]OoT>;?oiSfaonPg/_o];;Gok3:donY0[?oY?jgoj3jWon90SooO A8WohdV?onY7VOo^@igolSjPoo9:]?o/DJSonSVi3oYYJ@ojFFTOnVV9400_nUUi408onRT9KoZ:IiojBf>OnS]S_oX;Pnoj2h@?nP ^4?oWkU3oi^jA?nO^4?oX[I4oj2gA?nO^D?oX;Q4oj6hA?nR]TCoX;Q5oj2h@onP^D?oXKQ5oj>eAonS ]TKoXkI3ojJd@?nW/T3oYjllojZZ=on[Z3KoZZTgojN/>OnZ[3[o[:`koj^]??n[[Sgo[:hm00;o[:lo 05Ko[:lnojf^?OnY/dooZ;AQojVeGonZ]5ooZ[ANoj^dG_n^/eko/;=Rok6ZGonWX4ooT:HjogZ`:omh /BWoO;0]ogZa:omk/2[oNK0YogZ`:Omo[2WoOJ`XogZ]9OmmZR;oO:XUofFloog[4?omiD[ooMW1_og HPComfH8ooMO2?ogLa;omhPNooR16?ogN0gom7P8ooAf1_o_K07ohFl4onA`0Oooi6l0A_oTK`0006Co i6l000?oiWP@ooooooooool01_ooool00oo/W53oi6l0onN18003ooooo`03oogfkooooooooooo00;o oooo0ooTK`000oomm^ooooooooooo`02ooooo`03onN18?oTK`3oi6l000?oi6l000?ok9a@oooooooo ool00_ooool01?ohfkooi6l0onA_0?ohfkl4ooooo`Soi6l000?oji=0ooooooooool00_ooool00oob ]h3oi6l0onA_0006onA_0003ooSK_ooooooooooo00;ooooo0_oTK`000oo^YF3oooooooooo`02oooo o`03oo[TcooTK`3oi6l000;oi6l000?on^C?ooooooooool02oooool01Ooc`8ooi6l0onA_0?oTK`3o ll2?00?ooooo00Con=^oonA_0?oTK`3omm:_1_ooool01?olkMooi6l0onA_0?omm^l3ooooo`03ooOB [ooTK`3oi6l007coi6l000SohFh3oma/1ooAIa;obF@Hol=R7_noH27o_f0Rol1Q8@;o`V4O017o`V8O ol9S7_o2Haoob64bomYR@_oIHD;oje]BooEGDoodF5Com5IAooAGD_odEE7omTi?ooQRS?ohHX_on66AooQNSoohEH7omTaboo5=L_oaDGKo le5eooMBMOohFGSon5mk0_ohHWX01_ohHGgon5ekooQKNOohFW[on5]jooQLOP;on5am09;on5YjooQH N?ohEGCon51aooQ?LoohC73on4meooQCNOohE7Son5=jooTmAOoh=cKom4idooMHNOofHGcomeegooEI JooeFEkoleUHoo1IDOo_FTOolUE3ooIBA_oiDdoonEIGooUNHOohHf;omVIOooEXG_odJUgolfaLoo=] G_odLFOom6eUooASHOofEE?onD/moo]F=?okBR3ojUHLoma`4ooKHC[of4]XomTmSooR@J;ohD2NonD_ WOoX;JgogCo0omXj^OoQ?[CojCnaonPf/_oU=k?oiCRcon/]]Oo_9kOokCNdona1[Oo]?k?oj3nUomi6 P_oGBWcoeTioomM=OooEBWkoiTFJonY;]_oJDk_oiENiooA?^?oj@kConE2booIMXoobHHoolF2>oo=Q SoocH8kolf2?oo=RS_ocHHkolf:=oo=SSOodGYGokeJNonmOR?o_Hg7oiTN>ol1NT?nASI;oVg6;oima QonRK8SoXFZoj:CU?nWYXSoXkE1oj:f>?nR]S_oX;Pk oibj>_nM^SkoWKY1oiZk@OnL^T?oX[M3oj6gA?nR]T?oX[I4oj2hA?nO^4CoX[I4oj>eA?nT]D?oYKE0 ojNc?OnX/c`2oj^a>`05ojZb>onW/C_oYjdiojVW=On/YC<00_n]YC801?n/YS?o[:HdojbV=?n/YcD2 oj^X=@1DojZX=OnXZS_oYK1DojV`F?nY[eGoZZmGojb^F?n^[5OoYJmBoiV`Aon5[S;oO:PPogbW7_mm YR;oOZHRogfW8?mlYb7oOZHOogbW7_mlYaooOjHNognU7ommYB3oPZOo4e3KoeM;?oiXa[onhDBooZ;5Ooj SAKonXlEooZA6_olUSCoo9XkoobJ?ookXSooljdgoo2h<_of`Rgol;laol:`A_n^YEGo]Z5GokVQE?nk VU;oaYM>ol^EA_oCP3coh5`aonaB:ooaL3Coj:9_F_oWYU;omYdlooNN>OogWc_onG@MooQL0Oog G0?on507ooMJ3?ogKQ?omfdCooI`4_odM0oolV/8oo1U0_oXHP3ohVd2oooTK`17onA_0000I?oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l007Woi6l000KohFh3ome/1ooDJ0oobfDGol9Q7_noH282ol5Q800Gol1Q8?o2 HAoo`V8Ool9R7oo1HB3o`F8Ool9S7_o6HBoofV54omYQ@ooCHSWogea;ooEGEOodEe?om5MBooAFD_od EeComE9ooQRS@;o n6>?00[on5f8ooMBNOodC6col4i/oo1?K_obCfoomEAeooQHMoohGW[on5ik0oohGGd0DoohG7gon5al ooQJMoohEG;on59aooQ?L?ohCfoon4mbooQAO?ohDG[ome5aooICJOodE6ColEMPoo1H@_ocJA[oh6Y2 on1M@ooZG4;okee4oo9C>_ocDCKomD`eooEDB?ogFE?onEQOooURM?oiJ8;onFV7ooUZQoogJh3omfYi ooI]M?oeKFoomFYXooEVH_ofFekomdm@ooU;@?okDC;oo5@YooI;7?oSFQ_oegLKommYJgogcZZomhgYOoU;YooiSFfom`o__oN>[GoicZbonLj/OoX>k7oj32fonXT^oo/;;OokC^c ona2[_o]?[3ojCjUomi3QOoIBgkofDf1omI:OOoMAXgokDFconY;]_oLCk?oi5RgooI>_Ooi@;KonDBh ooU@_?ogFZ[olf2Coo5PROocH8colen?00;olf6>047olf6?ooAOToocGi3ok5ZFoo9PS?o_HWGoi4j< ommoi5XT_n@LHSoZ6n9ok][TondJ9Ko[FFIojMPV_n[GjSocW^R okjOOonW[WGoZJigoj^]OOnZZ8ko[:N@oiR_Qoml/F[oQ:i/ohZ/KOnPoneRHKo]hR4 okV8R?nlQ8go^h:Aok^3T_njPI;ogWZ]ooYbaoojLl;onG71ooYa`_oiLKoonG>oooUa`@02ooUb_`0Q ooUc_OojLL7onGBkoo9f[OocMjkomgN`ooIi[ooEOIooZ92ojVSS_nXXHooXifA oj6cBonO^COoX;Ljoj2h>onQ^3[oX;Pjoini??nN^CooVkY1oi^j@_nO]dCoXKI5oj2g@onP^4?oXkE3 oj>f?onV/ccoZ;8l00;oZ[4j00[oZK8kojRb??nZ/C_oZ[8kojZc??nY/ckoZZllojZZ>?n/YSCo[:Dc 0_n/YS<04on/YSCo[:Hcoj^V=?nYYcGoZZLeojbV=?nZZT?oZJiGojV]DonV[e3oXJmOn9[cKoPJd/ogfW8OmnYAh00_mkYal00omlYQooOJHOogZX8002ogZW8@10og^W8OmkYR7o Oj@Ooffa:_mY]BOoMZlKogRc8_m`]AkoK[DJog2e6omg/2;oOKHFonO=8_oSeBgoe=DdomCE=Oo@eCCo g=@boo71:?ojWa[onYHHooZ@5_ojSQGonY8Goo^G8OokV2WoniP^oobE=ookWSGomZdZooG3;?ofbR_o iLP]ol_8;ooNaRcojL@Wonjh8_oa/Qkolk0NonZg8_oR[2SokZ0aooN`>oof^c_omkDiooJh>_og]3[o m9TjooAhgOonA_0?ohfkl00oooool00oo/W53on^C?ooooo`02ooooo`03oo2^L?oTK`3oji=000Cooooo 00?on=^oonA_0?oTK`001OoTK`05ooooo`;oi6l000?on=^oooooooooool00_ooool8onA_0003on^C @?oooooooooo00Wooooo0_oTK`000oohfkooooooooooo`08ooooo`03oo[TcooVN13oi6l000?oi6l0 00?oiWP@ooooooooool00_ooool01?oebIooi6l0onA_0?oWPB04ooooo`03oo[TcooTK`3oi6l000;o i6l000?ojHX`ooooooooool00_ooool00ooWPB3okZEPooooo`02ooooo`03ooOB[oohfkoooooo00;o oooo00?ol:i`on^C@?ooool00oooool00oo[Td3oi6l0onA_001fonA_0005on=_0OoNK@GoeVT=ol]U 5oo2HAl00_noH2400oo0HB3o`V4Nol9Q7P02ol9Q7`;o`V8O01Go`F4Pol1Q8Oo1Haoo`f4/omMQ@OoJ HD;oeV50om=Q>ooHGdKoleQFooAFD?odF5Com5QBooAGE?odEU?omDm?obGRkolUh`oo9POodKeOom6iFooA^EOodKeGolfa@ooMU K_ohG7?on5QgooQLQOohHXgon6>?ooQST?ohHhkon6:;ooQRR_ohHhkon6:AooQIR?ohDWcom4eaonm; K?o`C7GomD]kooQ;NoohDGSon5QkooQMOOohG7con5MfooQDL_ohDG7on4m_ooMALoogDW;ome9[ooEC I_oaE63ol5QIon]OD?oUITOoh6Xlomi^>ooSN3;omHXJonb59ooKLckojE/eoo1F@_ogG5con6A/ooUW N_oiJXGonFb;ooQ/SOohJhgonF^jSogcbZomlkYooN?JGohCROonHa ZOoO?;kog3fionnooEd[OnnVX_oXk1mojVZP_nZZH?oZZB5ojfR Q_nRZX;oNk1Oog:`E_mc/5KoKk5Gofj_DOme[5CoNjYFogjZG_n8ZVooU:N6oiVXQOnKY7koX9ifoj:R LonQZWKo[IYjokb5Q?nkS8Co]9F0okBDO_ncTh7o^Xb5okf7QoniR8Oo^HF90_njQHX08?nnQ8gofGfZ onii_?o[NKOokWNgonme]OoaM[Com7FfooAf^?ofM[Oon7FjooQf]oohMKWom7R`oo5hZ_ofMjoomW^] ooMm[_ogNJooi7RUok:GSonV[93oYjR@ojRVSonZYHgoYIfCoj>aH?nN^CGoW[Tloini>onP^CcoWkPn 0_nO^3/02?nM^CcoV;`loiRk?_nM^D3oX[HoojFd?OnW/S_oZ;4j0_nZ/CX04?nZ/C_oZk4koj^a>on[ /Cco[K0kojba??n//C_o[;4lojbb??nY/SgoZJlkojZZ=onZYSCoZZHcojVW=?nZYcH2ojZW=`0:ojZW >?n[YSGoZJPiojV]Don/[eooTZm3oh:/:_n4/C?oR;8hohZb>P;oRk4j01SoRk4iohFa=?mn[RWoO:PO og^V7OmjYQooO:HNog^W8?miZ2;oNJPQogbV7omlYR3oNjLOogF_7omT_RKoK;HSog6b8Om^]23oL;DP og:a9Ome/Qoo/Ooi]SWonK0booVd=?oi`3Son:0^oo5O;_o`C3ComT`hooM4>?ocFB;olX0Poo698_o_QQgo kX8I00;okX0H00OokX8Ionj47?o_Q1cokghGonea2_oYJP;oiF/00?ooi6l0A?oTK`0006Coi6l000Oo mm:_oooooooooooooooooogfkooTK`3ooOK_00?ooooo00?oji=0ooooooooool00_ooool00ooTK`3o mLVOooooo`02ooooo`03ooG9WooTK`3oji=000Cooooo00?on=^oonA_0?oTK`001OoTK`000oolkMoo ooooooooo`02ooooo`;oi6l000?on=^oooooooooool00_ooool8onA_0003on^C@?oooooooooo00Wo oooo0_oTK`000oohfkooooooooooo`08ooooo`03oo[Tcoo[Td3oi6l000Coi6l000GomLVOoooooooo oooooooooogfk`02onA_0003onjUH?oooooooooo00;ooooo00?ol:i`onA_0?oTK`000ooTK`001_om m^ooooooooooooooooook9a@ooG9W`?ooooo00?okZEPoo2^L?ooool00_ooool00oogdZool[N0oooo o`03ooooo`03onN18?oTK`3oi6l007Coi6l000Soh6d3omUZ2_o?IQ?oaV8Kol1P8OnoH2;o`F4Pol9Q 7`?o`V4N0oo2HAl0;Oo2HAko`V4Ool5R8?o2I1go`f8UomMQ@OoMHDOoef12omMPA?oGHD;ofF13onYI DOoeEeCom5ICooAGDoodEeGom5MDooACC_oeCe3omEaRooAGF?odEEGom5IGooAFEOodEUKom5EEooAG D_ocGD_olV56oo5TAOoaHd;olV4hoo9M00;on66;09_on6>?ooQQTOohFX_on4mkooI6L?odAW7om4QhooA; N_ogC7Gon4mcooQBLOogE77omU=booIDKOocEVGokeMHon]HC?oWHDGoi6U0on1]>ooOKcOoh70honA^ >_oYL4;ok75;onaXB_odI2gonfDLoniUE_o[IFgomea/ooQUPOohK8_on72OokGc3one`XooU77OoWAagoeeTWom=[ :_oEJ1oohe1Nom/eV?oQ<:_oiCRVomdiYooI=jgogCVYomhkXooM>jCogSJSomdf^?oI>[kogCRhonLj /oo];[ColBRgonlb]Oo[=;GojS:gonXk[Oo/?Z_oj3jPoma5OooFBGcofdF9onPoX?o^AkKoje2fonY: ]OoUCkKole:nooU?`_oiCKoonD:cooU7/OohC[?onDjhooQE/oodGIoolV2>ooAMT_odG9Colen@oo=R S?ocHh_okEfBoo5NSOo[GW[ogD^@on=>SooUCY7o`ebNokmG]?nXHYSoTW63oiE/PonBK8SoXFFDokAU Von`IIco`U^con5Ia_oiIl3omfRcolV1RonUYgKoZ:YjojZXNonYZ7[oZZR0ojbWQOn:[FSoLjmAogF_ C_mf[U3oMjiDogJ^F?mc[USoLJeCog>]D_mmZf;oQZ]cohBZJ_n6YVSoRJERohVWH_nNUFgoZhUaoj6F K?nQVfgoZIEdojfCNOnbTWgo]hb4okR6QonkQ8_o_XF;okj5ROnbR8SoYhVAojb6U002ojj8U00Wok68 TonbQI;o^8>Eokf3Uoo0Pi[oaX2OolR1XOo4Q9go_HRCokj6TOo4QIGo`h:DolB5U_o9QYOoeH2Mol>6 T_nXYXooYJbBojNZT_nXZI3oZ:VDoj>dMOnL^cGoW[Xjoinj>OnN^SSoX;Tioj6g>?nS]COoY;DgojFd =onV/cOoXKDgojBc>OnZ/Cco[;0loj^a>on[/CcoZ[8l00;oZ[4l00ooZK4lojZa>_nX/ScoZ;8kojVa >onX/S_oYk8kojNb??nV/cgoYK8kojJ]>?n[YcOoZ:HgojFX=onWZ3L00_nYYcL02onYYcKoZZHcojZY @On/[EcoVJU4ogZT7OmkZROoOZl^oh>aeCKodM@fomSE=OoCe3Gocm@folgE>OoDeCSoi=HdongB;Oofcb?om]4Roo;C 8_oedaooml8OooV^7oojWaKonXL7ooVG4ooiXB?onZ8[oo^fOoOH4[oef14omUPAOoL H4Oog616omUQ@OoSGU3omEMGooEFE?odEECom5EEooEEE_odEE?omDe=ooEDEooeG63om5ECooAFE_od EESom5EEoo=KCOobHDKolFA3oo5TAOobHdKolV96oo5S@oobHCSolUh_oo9N;ooQ_QOohIgkon5inooQMQoohH97on6BCooQSSoohHi000_ohHXP0E?ohHhcon6B@ooQPT?oh EX7omTe_oo98I?obB6[okTi`oni@KOo]DfKok5MFonUIB?oWGT?ohfQ5on9/@ooTJ3koiFQ0onYYB?o] K5?ol6aOoo=YH_oeIF3omFEQooISH_ofHf3omee7ooML5oohG37ojVMVoo1QKOohFFoomUmiooITN_oh Jgkon722ooUaROoiJXGomf9hooAILoodDWComTeWooU>FOokCdkoo4/moo]E<_olGB[oo5DPooA66_oS BakoeUdWomEQ;?oFJAooheQ?onDiV_oM:KofCVVomLfY?oH =ZkoecZnomPj^ooU<[[okRBhon/]]_o[=KGokCJeonde/_oZ>JgojSZ^onLmW_oL@X?of4B3omi3SOo] A:Wok4ndonY?]OoZC;GojTniooMC`@;onDno06konDBiooU3]OohC[Con4jbooU>]oohD[Kom5RNoo=N T?odGI?olf2>oo=QS_ocHXcokUjAonmMT?o^GGgoh4f?on==T_oVC9;odEFDokiL[OoKBK_o[6J;oi9/ Pon4GiGoT5VKok9UVOoDHZcojek4ooEQ`?ohH[com6>eolm]UOnfQggoZZ9hojN]NonW[7goZJb0ojjY P_nF[W;oL[EFog:cEOmh[eOoNJeHogN`FOmc/5CoLK1_C_me[T[oNjmMoh6_J_n1/6_oQjU[ohBU Hon@V6OoW8a[ohnHIOn9WfGoS9iUohnNJ?nBWFkoUIUdoibCNOnTSWooZXanojZ=PonMR8coUX>?oi^6 S?nORhcoWhf>oij;SOnNQh_oWXJ;oin4S?nQQ8WoXHJ:ojF4SOnQRH[oWiN5oj:GQ_nOTHCoX8n2oj6B Q?nSW8?oX9j6ojFER?nYUH[oYib;ojJOS_nVXi3oYZ2BojBSOonT/cgoYKd=_nR]3OoY[8hojR`>OnY/C_oZ;4kojR`>@;oYk4j00goZJlj ojR`>_nX/3WoYk4jojR`>OnW/3WoZ:liojV_>OnV/S[oYk8lok2^?onfYcgo[JHg00;oYjHe05[oZJHe ojZV=On[YSCoZZHdoj^/C_nU[USoPJHZogbQ7?mkYB?oO:HSogf[9omo/2koQK4coh^a>?n=/C[oS[4k oh^a>On5/3;oNjdXogfV7omlYQkoN:`Nog6d7_m]^QcoKK/Jog2h6omb]AcoJK`SofRj9Omb/AooM;HM ojg:8?ohfS7og]LcomWE<_oFeSKof=HgomcF=_oLeCGogmHdomkE=?oSeS3olmD^omo;gOonA_0?oTK`3on=^o1?ooool8onA_0003on^C@?oooooooooo00;ooooo00?ol[N0onA_ 0?oTK`001_oTK`000oohfkooooooooooo`02ooooo`?oi6l000?ojHX`oogfkoooool00_ooool00ooj i5ooMRQOofH8ComV>8ooMTROogGGoomdeUoo97B_oUD3oogUY1omeQA_oPJ4koiFQ; onaVBOobHTkomFAIooITG?ogI5komfARooMUHoogIFKomfMZooIXIOofIf?omVEQooEVHOofHEKomETK ooQO5ooaFcgojfASooEJHoogG73omFAjooMVO?oiIWkomeiiooEGL_o^E7?olU1_ooU>FoolCTSoo4i5 ooa>=OojGBgonUdSoo]97?o]AQoog5@XomIN;OoGGB_oeEhQomiM>?oX@9?ogcBUon4gYooQ>ZCogSVT omTgYOoG>:[oecV/omLiY_oH>JGoeSNUomPiYOoH@KWoeCk1omlW`OoX:KWoiC>eon@a^?oU<;Koj32e onPh/OoW>K3ogS6VomPiS_oH@h?ohT>Eoni8/_o[C[GojdbdonY=]Oo_C[[on570ooU@__ohDKkonDZk ooU0^OoiB[Con4n`ooU;/ooiBkKomU6Z0_ocGhl2oo=PS`1Soo=PS_o`GY;okUj>onmLO_oQBi7ohT^G onI=U_oNDI;o]V>Mon1=^ooU?kSoXU6NogaGV_nJHYKogV>/ooIS^OoYH<;om6BlooQT__o`J;GoaVnG okQ`R_nZR7coZiEjok2AO_nZU83oZ9Iooj>NNOn0ZVGoNjMQoh6UIOn0YV?oOJMIogZUDOmmY5;oP:9F oh2SDon2XEKoS9eYoiFMMOnCXGKoTJ5`oiRIJ_nZRGKoXi1ioiNLMOnJVGGoWI=foij>MonQRgSoZ8R1 ojZ5PonTQ83oX8:6oiioS?nRNhooYG^>ojemT?naO9Co[gfBok5lU?n^OICo[WbCojemTon[OI;o/7ZD ojMnS?nQR8KoXh^7oj>=Q_nRThOoYI>7ojF=QOnVT8KoYH^5oj:_nV[SWoYJlhojJ^>OnW[cSoYjlfojBa=OnQ]3?oXK@1UojNa>_nX/3[oYk4jojJb>onV/S[oYk8jojVc??ni [3ooaj90ol:P?_n]YCKoYZHcojNVOnZ[E;oS:TjogZU7OmlYB?oOJOn@[ccoSJlgoh2aooZYCGonX`GonjT:_oP [3oohjPkonnb=_oh]b[onKLWooW1:OojbBkon/Heoo[<=OokdcOonX`XooT`9Ooi?S3onDT]ooQ<9_og CBKomTOo_o`IC_ol6@loo1U>oo`I37olF4Xoo1P9_o`HR_omF8jooMZB_ogL4komfa:ooM[CoohKUKomFeAoo=] C0;olg1@067olg1?oo=_D?ocL4_omG1TooQ`QoogL8?omfmnooQ^P?ohKh?on727ooQbQoogL83omfYn ooMWQ?ogIHOomV:2ooMPO?ofH7Somf5eooMRLoogHfkomfMeooMYN?ofIg7ol6EPonaRE_o]FU;ojV5O on]WJOoaJ6Wom6MSooITGOofHe[omV9IooIQEoogH5OomV1IooIRGOogHekomf=MooMSG_ofHekomf1J ooIG:OofH1GomUdOonaRBOo]IF?omeQYooMNP?ohGXkonE:4oo5AK_o]F7_oleV4oo]:GofSZVomTlZOoH>ZOof3VUomLiYOoG>Z7ofSn_omQ3aooG<[oohC6ionDf]OoSK;ogCBdom4^YOo>>97ogD6KonA2/ooSB[Oohd^f00;oiDVe04kokdVnooU=`_oiCkoon5:m ooQA^_oiA;OonDFdooU=/OohC;3on4fbooMC/?ocGY3olf28oo=OS_ocGhgolf2>oo5NT_o`GXool5V7 on=;TooSCYWoiDnEon5=S_nmHICo`6FPol/j]onI@JgoRV2AojEXT?oYG[?olf>konmP`?ofJKSon6Jo ona]Zoo1O8Ko]GR8ok=fQonfLhGo_W24okacOonmL83o`G>3ok1oOOn[PGKo/Gmjok60O?n`OGco[gmi ojf1L_nbOg?o^gQjokefN_niMWSo_WAnokmfQonoO8co_H6:okilQonnOHgo_H2?okelS_noOHco`7f< okilRoo0N97o_g>FokQeTonjLIKo^W>Fok9iT_n[N97o[WNCok1iTonaN9?o/7JFojmiTon_NY82ok1i T`0DojiiUOnQNhSoWGj2oienQOnMOhKoWh25oj21PonQQHCoXHR5oj>9PonSRHGoXh^5ojJ>Q?nSR8?o XHb5oj6onR/SgoY;4m0_nU/C`06?nU/S_oYK8jojJb>onY[cWoZJlhojR`>OnV/CWoZ;0iojV_>OnX [cWoYZlhokJY>_oCWD;ofYM7ol:N?on[YCCoYZHcojRVf 8om`^2;oK;TPohbe;?o;TBOonH@8ooNg8OojVQWomYDTonbW=ooW[3goiZdoonF]@OoT[d?omiDUooR5 5_o]WbgojKe2omg=?oo[c2koml8XooNm9ooh]bcon;@dooVl=Ooi_33on9d`ooM`?oYF@Woif@0onYG0_o]B`cokE4EonUP3?oUK@40oooTK`1:onA_0000HooTK`00 0oob]h3oooooooooo`02ooooo`04onV:I4OocV=4om1R B_o?HT_o_Uh/okiO7onmGB?o_ehQol1O7oo3H1_oaU`^oo5NBoobFTKolEY6oo9JAoobFDGolU]8oo5M A?oaFcOol6Hjonm[>?o^IS3okVHb0_o^Ic82oniW<`?okVLb01SokVLconiW=?o^Ic;okVHYonmS8_o^ Haookf@UooAU=oogKDSomG9:ooE]@OofK4WomVm>oo9^AOoaL4ColG55oo5`A?oaL4?olG50ooAaGoof L7komW5looM`O?ogL7l2ooQ`PP1WooQaP_ohLh3on7>1ooQ`QOohJHCon6EoooQWN_ogK7WomfmiooM_ MoogL7SomWAoooIhROofNXkomWR?ooI_QOodHfSol5U=on]IC?oYHEcojfIWoo5UH_odI5comFALooET GOoeI5oomFARooEUI_ofIF?omVAOooMSFoofHU_omVEQooIP?_ocI1Somf4Loo5I:Oo]FE[omU=[ooU> O_oiEi?on5R>oo=IP_obEW[onTUNooa;=?ojF2oomUhaooMN:OokDakolTdQon1B;?oGF2koef0_omQM <_oGF2ooeUXXonQ9I_oW>jKoh3bPonDmXOoT?J7ohSbSom`lX_oK>j?og3fRomTlZ?oH?:Sof3^SomTl XooG?J3ofS^Romm1_ooCAL7ofCZeonDd]?oW=;7oiCBbon WOmhAj3oReb@oi9ZQOn]Hi?oc5V^onEQ^?ohJ[7on6O0onQ/[?nmOX3o^Gj1okejQ_ncMhWo]WF;okmf QoneO7_o_gAnolY^QOo8LH;oaW:0olIcP_o3M7oo_WQlol5fP_o7LXOoaW>3okmiNOo1MgkoaG:4olU/ Q_o8Jhgo`g:Col5fT?o2MXoo`G^?okinRonnOXgo_7bAokAmT?ndNY;o^gBFokaeTonmMIGo_gBGokUf Ton^N93oZgVBojeiTon`NI?o[WVBojijTOn^NI7o/GVBok9iU?nZNhgoWh21oin0P_nNNh;oW7V2oieg P?nMO8;oWh:2oin4P_nOOh3oWgj1oimoPOnRQX;oXXj2oj>8P_o=LikofH:CokRQBOnW[47oXji2ojF/ @_nW[4;oYZi3ojJ]@onU[TCoY:m2oj>`@OnS[d;oYJe3ojJ/AOnR[T?oW[90oj2a?onP/47oXK13oj2a A?nR/4KoXk16oj>aAOnT/T;oYK51ojJ`@0;oY[0o017oYjlnojJa>onU/S[oY[4ioj6a=onXZSCoaYdj on>BAooNUDOo_Z4lojbU=OnVYS?oZjDcoj>VHdKocF98olaRB?o4ooM`PoogL87omg:1ooIf QOofNH[omWJ9ooI]NOodGUgolUA:onaFC?o[HUkokFQUooAVH?oeI5com6ALooEUHOofIV?omVIPooIV GoofIEcomFEKooIYIOogGToome_o^AIooi3ZVon8l WP;ohcbQ0j;ofS^RomTkYooI?:SofC^SomTlX_oH?Z;ofCZPon8f/_oKB<;odDFh omlf/_oT<;;ogBfdomdW^?oPokAkT?ncO8oo]GV@okYdTonjMI?o^gJCokmeU?nnLiKo]WFEok1hT?n]NI;o[gRB ojmhTOn_NI3o/7VCojmiTOnSOXGoWh>0oj22P_nOP8;oWW^2oiehP?nMNh7oWX>3oij0P_nMOX;oWWf0 oiikP?nMOX;oWHB0ol5jT_ofK[7omW>]onenK?oISEKo^Y]_@onR[d?oXji7ojF/BOnW[4[oYj]; ojN/BonWZd_oYj]:ojF/BOnT[TGoXZm3oj:a@onS/D?oXK0noin/=?ngXSOohYE;on^;CooHUdOo^j8k ojfU=OnWY2koTi`Hoh>H4_mlYB;oNjPTogbV8omnYB;oOj00Coi6l000CoiFX0onMV0OoVKP?oi6l1 oooTK`18onA_0000HooTK`001OojigOonA_0?oTK`3ok9a@3?ooool00oom m^oojHX`onA_0002onA_0003ooSK_ooooooooooo00;ooooo2?oTK`000oo[Td3oooooooooo`09oooo o`03on^C@?oTK`3on=^o00cooooo00?omLVOonA_0?oTK`001?oTK`000oo`[W3oooooooooo`05oooo o`03onN18?oTK`3oi6l000Koi6l000?omm:_ooooooooool00oooool00ooebIooi6l0onA_0002onA_ 0003ooG9Wooooooooooo00?ooooo00?ooOK_onA_0?oTK`00I_oTK`004ooRKP;ofF/:olmV4oo6Ha[o `F4Mol1P7_o1HAgo`V4Nol9Q8Oo2HBOoaF4/olQRHdGobV=6olYSAoo;HdSobf98ol]QBOo:H4WobUm8olaOBoo>H4_o cF19om1PB_o=H4Co`EhVol5O7@;o_ehQ00oo_elPol=Q6oo=FSWolUY=oo9IA_oaGT3okf@eoniV?oaL4Kolg9=oo=`B?odKeGon6mnooQ`R?ohL83on75mooQaP?oh L87on6j4ooQZPoogJH[on6R5ooULG_oiJG3on71kooQ/K_ohK73on6ikooQ_POohL8?on724ooQ`Pooh L87on720ooMcQOogMhkomg^DooMgT_ogJG_omEQGonmBAOo[FToojfAQoo1XIOodIUoomVEOooIVH?of If3omFIKooITGOofHF?omV1`ooIHIOohAAgomd@;ooY35oocAA[ojU9QooIFM_oj@eKoncIZooiCbTon8kX?oS>Z;oh3^Qom/jXooJ>JCofCRRomXkYOoI?JSofS^UomPlXooH?Z;ofCZUomhcYOoQ @;Sod4W0om4l^?oJ<;Ooh2VgonLZ]_oV=;?ofcbVomHoTOoMA9cogTZgomY=^?oOD;;ogU2boma@/ooX CKCon4ZfooU;^?oiAk_onDFnooU7_OogBL7on472ooTn^?oiB;ConDbbooMFY_ocGI3oleb@oo=OS_oc GXoolen=oo=NSoo_FYWocFEmokYPMOoBDhSohTZSoj=RTOnSNG_o]6n?ol5cUoniOHCo^7inokUnPoo0O8So^GV4oiR;M_n;WH3oRIn5ojB7O?o3 LWoo`7MnokajO?o1MH;o`g65ol1dOoo1LgkoaFn;olA]Soo3K8oo`ff@ol=]SOo5KX[oafn8ol5eQOnd O7oo/7Z1ok5gROnbMY7o/WRBok=kTOncOHko/GfonabZ_ogMk3omW:dooAnP_obOV?ojhATom:@FOnfWD_oXjI2oj>U@OnW Y4800_nYXT@0?OnZXTCoZZ=5ojZSA?nYYDGoZJA5ojRWA?nRZd;oXJdoojJZ@_nWZT?oY:e3oj6^A?nR [dKoY:i:ojJ]C?nW[4[oYje:ojF]BOnV[4[oZ:Y;ojNZCOnUZdcoY:]g7onP_a[oOKXXog:g9_m`^2;oL;LWofng:?m^^R7oKKTRogFd9?nD[b_o/JhcolBb=OoD/2go jZHZooF/:ooe[2WomHXYooEk:_oeJBCom5HeonbEBooWQR3oonA_053oi6l0001SonA_00Cooooo00Go mLVOonA_0?oTK`3oi6l0onN18004ooooo`03oo[TcooTK`3oi6l000;oi6l000?okZEPooooooooool0 0_ooool01OoVN13oi6l0onA_0?o^YF3ooOK_00Wooooo00?ooOK_onV:_o=Hd3odF=7omATBOoDHdWodf=;om9SBOoBHdD2om5SAP0Wom1RA_o?HTKocf96om1SAOoAHdCo d6=5olaSA_o7HTSoaF99olIQB_o9Gd_obEm=olYNB_o;H4SocEm:oliOBoo=H4SocV56om5PBOoBHDco `ehaol5O7?o1Gako`UlOol1O8?o2H1coa5d]onYNA?o`HcWokVHboniW_o_JCSokVHb00[okVLc01CokVLeoniV=Oo_IRcokfHSoniW8Oo`HRKomV:?ofcNSomXgX_oJ>J?ofS^WomTkYooI?:;ofCfRom/gZOoK=:7oh3R]om=0aoo7>l7ofCjcon8i ]?oX;;Goi2jeomPgYooH?iWog4ZQon1?/ooKBkOofDjd0_oLD;40B?oXCKCon4ZdooU;]OoiB[Con4Rf ooU7_?ogBUok9NVonZKXCoVFF8 oi=YS?nVNH[o^gn2olAnQ?o1NhCoXHQcohjHJ?n@UFcoSYYlohVLQ?nVNh3o`G=mol9fOOnoMWko_g>0 olE^QOo5KHOob6^:olUZRoo8JhgoaFZ@olMYS?o7KH[o_g>7okAgQon/NXCo[7V2ojejPOn`NX;o[gN: ojmeT?nbMI;o]7VBokEiT_nhMI;o_gBFokebU`;o^GFD04co^gFDokafToneMi7o/7RAojMiS?nPOH?o WX61oj21P_nNOh?oWh22oj1oP_nOP8;oX7n1oin0POnQQ8;oX7n2oiijP?nLNH3oV7mnojmfR_oYK:Wo mg6aooEb[oocL;?omGbAoo:1HOobP6GolWiYonb2HooBT5Ko^Im;ojJT@_nUYD?oZJA4oj^RAOnYXTGo ZJ94ojZRA?nZXDGoZZ56ojZQAOnWYD?oY:I1ojNT@onYXd?oYjE2ojJW@onSZTGoY:Y9ojF[B_nWZT_o Yj];ojJ[B_nW[4[oYje:ojJ]B_nT[D[oY:m;ojB/B_nOXd;oWJ4ookNIB_oQREcol81Uoo27I?o@Te7o UYXPohBF3_n5VA?oNJLJog2e7_mb]R?oKkPPofji7_m^^1coKkHM0om`]Ad04om^^1koKkHMog2d7?m` ]AcoLKDPog:h9?me^R[oM[/]og>k:?ma^B7oJk`Pofbi8oma]2?oKKTYofjj9Om`^R7oL;XRofnj8_m` ^R400_m`^R808_ma^BCoL;TRofnj8Om_^B;oL[LOoi6g;oo/Vd;omidlomZf;_nV`1ooO;dOofni9om_ ^2WoL[PXog:i8_mf^AooNKHIogbc4on2[0goSZTBojfU9_n`YbooXjHWojBU9?ndZbWobK@[on:dOo>Hd;odV=7omATB?oDHd[oe6A;omASBOoBHdOodV=5om5SAOo>HTKocf=7om5RAooA HdOodFA6om1SAOo?HTKod6=5oliRB?o3Gd_o_UeGdWocf17om1PB_o@ HDWocf57olmQAOo@HDKod618omAPC_o9Gc_o`f0Nol=P7?noGR;o_ehQolUR5ooIJA3oifPXonmW=?o^ ISCokfHe00;okfHc00OokVPconiW<_o_Hc;okfDgonmZ>_o^IcCokVHb00[okVLc017okVLeoniW=?o^ IB_okVLSoniW8OoaHR_omfA1ooM/C?ogKD_omVU2oo9UOoj ;AoooSTOooQJ8?oeE2?ohU@WomEN:?oFG2_of5T_omQF;_oGG2_oe6/]omER:_oFIB[ohEE]onM2/?oZ Bk7ojTZconI8]_oRBZWogDVOomQ5XooF@ZGoecjSomTlX_oJ?:CofCbVomLjZ?oI?:CofSbUom/bZooE ;jCoebnYomhk__o?A<;odd2gomY1]_oL>KKog3JbomHnY?oDAi[ofDbTonA>]OoTBKWohTRion]:^?o` B;[olTVhooQ:]ooiB;SonDZhooQ9/oohAkOomTK1ooA7a_oh?/3onC^iooU6^OobDjGol5^@oo=JU_ob GI;olen>ooAMToo_HI7oefF0ol5ULondI6ko/FYPoj=SIOnGE7WoZ4J1oiaCTOn4MikoTf6>oheFT_nI I8WoU5fBoiE2olE^Qoo8JH_oa6b8olM]R?o6KHKo`g22olA`POo3KhSo^g29okI`R_nf LX[o]GJ8ok=fQon`MXGo/GR5ok=iQOnbNhGo/WN9ok=cSOnfLIKo^W2Jok]bVOnkMIOo^WNEokQfU_nj M9Ko^g>GokabTon_MhKoWh9noif4PonNP8OoWh2300;oWh:300[oWh:4oiioPonNOX;oX8F2oj26P_nP PH?oWgb2oiR0O_nZNHOoiVVX0_ogK[804_ofKK;om6beooIdY_ocOFSolWmSoo:0J?obOVSolWiWonZ2 I?oDSeWo/im9ojBT@_nUY4?oZ:=4ojZRAOnYXdGoZJ=4ojVTA@;oZZ9403CoYZA4oj>V@onUY4;oZ:93 ojZQ@onYXT;oYjA3ojJUA_nVY4[oZJ=;ojZSBonZY4_oZZE;ojRWC?nXZ4_oZ:Y;ojJ]BonVZDOoY:91 oifT?_n/WTCodXmFonj7J?oaQ6Woe8M8ojVM;on@YB;oLZhCofVh4_m/]Q_oL;HNog2e7_ma]23oL;DP og2f7Om`]AgoLK@Pog2e7_m^]acoL;DNog2d7oma]1goL;i8Omd^R3oLk/SogBj8_mb_27o Wl4eojg1=on0_b;oL[PRogBh8_mj^B7oO[PKoh2g6?n1]QKoQK8CohR]3on;Y`goSZD HTOocF59olmRBOo>HTSocF=6olaRA_o7H4[o_Ua@okQIE?o0FdoobEi:oleOBOo>H4Socf19om1QA_o@ HDOodF19om1PBOo@HDGocf57om1PAoo?H4Oocf15om=PBOo>H4Co_5dWokaM7oo4H1godFH@on5]0ooT K`3oj6`GonmW=_o_ISWokVHdoniU<_o_IS?okVLconiX<_o^IS7okf?o_J3OokVHc00[okVLc 02GokVHboniV_oaJ2golFXeooIXJ?oh JHkon6R8ooQWQOohJ8Kon6R5ooQXQoohJhkon6Z5ooYHC?ojFTKon6m_ooQ`L?ohKF[on6i[ooQ^K?oh KFgon6i[ooQ^J_ohJfgon6a]ooQ]K?ohK73on6af00;on6io07oon6alooQ]O?ohKGcomg20ooMiT_og N9komfVDooQFNOoh@5;omSU9ooI=IoogFW[on5]eooQHK_ogFG3omemiooQEIooh@AOomUH3ooEU3?ob N1SogWXdolm]A_o[DRWooRhFooh`9_ogA2_ohU4iomUH@ooKE3gogE4nom]FA_oLDd3ofU<`omMM=ooJ FSOog5a?omY;VooL@;OohdNhon14]_oTAkSoiDZboma;?of4G1ol`n_?oH?;Wog4JfomUFX?oOFICoj4bQonm7]Oof AkgomT>jooI1`?oi@/3onDBjooU:^OoiB[OonDRhooQ<]_ohBKCon4JeooQ6_OoeBoi9OU_n;CjSoYUjKoj]YS_n]KhGoW6V;oi1NUonLHYGoW6b6ohN:Non7 WGSoSYQgohnGMOnCTgGoU9AdohbNLonCS8?o]FJEolEUU?o7K8Woafj6ol9`Poo1Lgoo`GEmol1dOonk LhGo]G6800;o]W2;00go/WB8ok1iQOn_O87o[gaook1lPOn_OH3o[gmook60PonaOH;o[gZ2okAeR_nb M8oo]gBE00;o^WFG01ko_W>IokYfTon]N8CoYWYloj9mNOnPPGkoX8>5oin2Q_nOPHGoWh:5oj21QOnN P8GoWX66oin5Q?nQRHCoX8:2oib4P?nSQhGof6jRooM^/OodL;3omFj`ooE]/_odJ[GomVbdooEiP?oc NfSolga^oo=mKOocOF`2oo=mKP06onZ0I?o>SUKo/Ie9ojBTA?nUY4?oZ:950onZXDD03onZXDKoZZ57 ojNTAOnTYTCoYZE3ojVRAOnZXDGoZZ54ojVQAOnWXTGoYZ=7ojRRBOnYXD_oZj1a7?m/]0ooKK<@ ofZd5Om`/a_oL;@Nog2f7om`]QkoKkPOog2g7_m]^AooKKPQog2f7om_^AkoKkPPofnh7_m^^1goK[PN ofji8?m^^bCoK[/UofBo8omX_R7oKk`Qog2l9?m`_2;oL[`Qog>m8ome_2;oM[`RogFm8omi_2;oN;dQ ogRl8Omj_27oN[XOogVh7?mk]QWoNkDIogne5on4]1GoQ;@CohBc4_n6[a7oRJ/?ohbW3_n ohbW3_nLYQ_o[jP/ojb]HTSocV57olQPBOo0G4ko_UUAol=JC_o:GD[ocf16om9QA_oAHDSod657om5QB?o@H4[o d65;om1QB?o@HDCod617om1PB?o@H4Ood655olmQAOo=GdWocUe>olAM;oo@I@oogF`600?oi6l000Oo iVl_ofHFWomf=kooMWOOohJ8Con6R5ooQXR?ohJXoon6b@ooUPHOojFCConFMJooQcMoohKfko n6i/ooQ_KoohKVkon6i]ooQ^K_ohKVoon6a]ooQ/K_ohK702ooQ[LP2_ooQ[LOohJfkon6]`ooQ^N?oh KWoon6Z3ooQUQ?ogI8[omfFKooMTYoogI9Kome9[ooPj@Oog?4GomU1SooMKJ_ogF6?onDUFoo/d>?od @Q[okG@IooMo4ooeNQ7ok7HNonME:_oi@1oooSdGoo`/;Oo_@DSofUM7om]GB_oMDdWogE14omaFCOoN E4WofU>/3of3k5omM0_ooI@L3ofT71omM5/?oCB:7oddZRomEmomlna_o`=lGolTBhonaDV_o_ CH_omCb?ooPhY?oi>k;on3fbooU0__of@/?omdG0ooU:^_ohC;KonDZgooQ;]ooiB[Oon4NeooQ8^?oh B[oomTO3ooPk`?oi@;Kole>Poo9HUOobEYcolEBOoo9LU_oUIh7ofVafom=TO_nhIf[oZfQOoieJLonH EWSoW5Yeoi]FL_nGIGgoUj^MoifXU?nKM8coWFj8oiURTonACjOoYf6Joj]XU?n`LHGoYW>4oj1PU?nT GiWoX6f=oiiiPonEPH3oSH]oohRJOOn:Ug_oSY=johnJM_n7O_nQ Q8;oWh:3oin4PonNQ8GoX8R6oj:;Q_nSRhCoX8V2oj68PooE_ncVdWoYJ=5ojBSAOnY XDKoZj17ojZQAP;oZZ1600CoZJ96ojJT@onUY4;oYj=40_nYXTD09OnZXDGoZ:95ojNTAOnUYDOoYZI: ojRTBonZXdcoZZ9:ojZSBonZXT_oZia6ojjF@_n]Ud;oYY]0oibR??nXX3kochi?onF0EOoPRe7ofI]= olRPA?nZZ3;oQk8Mog>f4om[]17oJkDAofbg5Om^^AKoLKHEogBc5Omc]QOoKkTKog6h6om`^1coL;TO ofjk8?m^^b400_m`^2<08om_^BGoL;TVofZl8_mW_R7oK;XQofni8?mb^AooL[POogBg7_mf]Q_oMKDJ ogJd6?mg/aKoNK8EogZa5?mj/A;oOJhAogf^4?mm[PooO[0?ogn^3on0Za7oQJHBohVP4_nU8OnQYB3o`JHDSobF1:olAMC?o3Fdkoae]>oliNBOoBH4Kod617oliPB?o@HDL00_oAHDL2 om5QB@0;om1PAoo?H4Kod657om1PAooAHDKod656olePA_o;G4[ocea=on5WB_oRKb<01OoTK`000ooT K`;ojf/Uoo1U>P02oniV=009oniV<_o_Ic?okVLboniW<_o^Ic?okf@bonmW=oo_J3SokVHc00?okVLc 00OokVLdoniVooESPoofD5komchnooTl>Ooj =c?onCDYoo=5:?oYG2koi6h[onah6Oo_La?okfLEoo]=5oom?23omD0`ondn@Ood?4cohdi3omUF@OoM DdGogE92omeDB_oLE4CofELgomUG=_oWF6[oe4NAolDlTOo?>[Oof3k5omI0`OoE?/?odck1om95[OoC BJ3oe4ZRomE:Y?oEBZ7oddVTole3ZOo;@Z[oc4>^olhn/Oo>@:_ocD:Wole4Xoo=A:;oi4FhooM3c_of ?l_omSnjoo4nZOob=9OomBZAooPaW?oi=j7on3NOooTkXooi?;;onD2hooU7/?oiB[?on4VdooQ;^Ooi CK_onDZmooQ8^oohBkcon4_0ooTma_oi>[_olE6Koo5ITOodEYgolE:Son=LT?oIJGOoff]gom9QOOna HfSoWUm[oiQDN_nJF7OoVeUfoiYDMonSHg7oVjNDoif^W_nJTIOoWiJ7okYRROnkHXgo_6>?okaQS_o2FXkoaUVCol9HT?ngF8;oYemboj5RM?nVIWWoYfQlojUWP?nZ IX3oZ6MjojIYNOnRK7/00_nPKWh0LOnPMH3oXGinoin4OonNQgooX8R0olUjUoogMJoomgJ`ooEd/Ood M;3olW:`ooAa[oodLJkolfjcoo=`YOocOf_olWmRoo9oIOobOfColWiUoo9nI_ocOfOolWmWoo:0J_ob O6[ojH1Tolf>E?n_WDWoXZE3ojBTAOnYXTKoZZ95ojZSAOnZXTKoZ:=5ojFV@onTYd3oYjI2ojRV@_nY Y4?oZZA5ojVTA?nXYT?oYZQ2ojBYAOnVZ4SoYjM8ojRUB?nXYdWoZZ57ojfH?on[VSgoXj4koiRYooTK`003?oSKP?o gVXTolYQ@Oo?HU3oef9IomEREOoBHd[odF=7om1SA_o@HdCocf96olmRA@;od69600God6=5om5SAooA HdOodF95om1RA@02om1RAP0Aom1RAoo?HTOocf97oliQB?o>HDKoc657ol]OB_o6GDgo`e]=olMLC?o> GdWod617om5PAOo@H4Oocf18oliPB_o?H4T00_oAHDP03_oAHDOod657om1QAoo@HDSocf17om5QA?o= H4Kob5e:olmLBooMIDCoiVlfonUf<_oWMAkoi7041OoTK`001?oXKAGokfDhonmV=oo^Ic<2onmV<`08 oniW?oW H2Comel:ooiD2_oc@R[oid]:on=?DOo`>d?olT56omYF@OoJDSkogE11omeDBOoMD3cofEDaomaN@OoS CXgoc3nBolHoSOo?>k3oeCc5om@la?oE??ojIjRon/ NXWo[gN:ok5bR_n]LXGo[Fn7oj=[Q_nCNgkoSHiiohJ1L_nYGGoo`DfFokU8V_njB9Oo_dnAol5DS_no EHgo`EF?ol=CTonmEhko_UN>okmGSonnFXgo_E^:okeIR_nmFHco_5ZokY=PonYE6coXeYUojEHJonUEfooZ5Mcoj]FN?n]F7oo[E^2ojeLQOn[GX?oZen0ojeNPOn/ H83oZV=moj9UNOnOIgWoXVQjol9UT?oLIJ3oiFVYooA]/_ogL[400_ogMk001oofM[;om7:booA^]Ooe NH?olWmRoo=oIoocOfP00_obP6P05OocP6SolgmVoo=oIoobPFSolX5[oo9nJ_oVPf;obi5CojbRA_nP Z47oY:I4ojVTAOnZY4GoZZ=5ojVTA_nVYd?oY:M1ojNV@OnXYD;oZJE3ojZTA002ojZT@`0OojRU@onU YTGoYZM6ojNVBOnZYDcoZj19ojRK?onNY3SoV:`doibV=OnPXcWoVj@hoiBX=On[Xd;ogXaIoo9hGOo_ NE[ohgiAom2AB?niYT7oYJTeoh^_:?m`]Q_oK;PHoffe6oma/Q[oNZdEogf[4_ml[1?oOZXBognY4P02 ogjZ4@0IogjZ4_n1Ya;oOZXCogZZ3omlZ0_oO:hEogb/5?mnY0goOJH=og^X3omlZQ3oO:`@og^]4_ml [A;oNZhAogZ_4OmnZa;oPJDBohFO4_n;VACoSYDCohnD4on>U1CoSYDDohfE4`03ohbF5009oh^F5?n@ Ta;oPYlGohJjX8onUYB7oYJHR00?oY:HR00OoYJHSojJV8onPYQooYZHSomJR@?o^ TDCoiWTC0?ooi6l0C_oTK`000?ooi6l0>_oTK`002ooSKP7od6HRomMUF_oEI5oodf=Aom9SBOo@HdCo d6=3om1RAOo@HTOod69600;od6=500OodF=5om1RAOo@HTOodF97om1RAoo@HTKocf9700;ocf96027o cf57om1RA_o?HTOoc618olUOB?o7GDcoaUa>olYLBoo>GdSod616olmPB?o@H4OodF56om1PAoo?Gd[o d658om5QBOo@H4_od657om5QAOo@H4Sod617om9QA_o@HDKobUi8olUJBooHHD[oiFdkonUe;?oXMbWo jGP_onQf:?oUL@X01OoTK`00_o^IcCokfHconiV<_o^Ic?okVLaoniWdOoi4i6omQE?ooMDD3ogEA;oma??OoGF2_oiUM[omE4VOo4?9?obD6=oldkZ_oB=lKo e3[6omM0^?oEB:CodTZOomA:XOoCBJ3ocdJWolU0ZOo7?JOocD>Vom59XooA@[3od3f]om11YOoA@jOo ddFSolm7X?o@AZCoiD>oone0cOoY=L7ol2fdooL/Xoog;Y[on3FSooThZ?oh>:Oon3NUooT]Z?oi::[o nCbMooPoWOoi?Ygon3jMooPoX?oi?jSon3jYooTn[Ooh@k?omeJZooIIX?ocCicolUFKonUMTOoIGHGo dF5oomMUO_oKGg[obEQgojAIM?nLG7;oW5Ufoi]HMonMF7SoXei`ojIMJ?nCU8coV/BTojU]WOnNQI[o R82QohiIW_nXKXko[FZFoij3T_nMUH_oVgj?oiA^U_nGL9CoVgR>oj5mR?nSQ8KoYhN9ojYnROngM8ko _VfDok1fR_nVMX3oTG5hohi^MonjGH_ob5FDokQBU_ndD9Oo^U:DokeFT?o3E93o`5J@okQJRonkFXco _eZ>okiKRonnGH_o_Uf:okaKRonkFhco_5^3JOocPVOolh9[oo>1J?oc PFWolh9Yoo>1J@;olh9Z037olh9Yoo>2K?ocPFgolh5]onJ6IOo6UeGoZJM9oj2X@onTYdCoZ:E6ojZT AonXY4KoYJM5oj>Y@onUZ4;oYjM1ojRU@_nXY4?oZJA3ojVT@_nXYD?oYjI3ojNVAonUYdSoWZPooiZX =onJYcKoWJ@hoinS>OnPXcWoX:@joijS>?nHYcGoYjDnolnBD?o]OE[okgAConIeA_oHSd[oajE:oknS A?nbYScoT:d[og:c7_mZ^1[oKKHHogR_5OmmZaCoOJ/B00;oO:`D01GoOJ/Dogb/5?mnZQCoNj`EogZ/ 4?mlZ0[oO:/?ogba6omm[1GoNjH>ogbV3_mjZPkoNZd=ogZ/3ommZQ;oPZDCohNO5?n;VA?oSYHCohjE 4on?U1<00_n>UA<6ohfE4`0CohfF4onATa7oQ9hGoh2o=onV]CSoZZ/[oj:Z9OnUYR?oYJLSojJV8onU YR?oY:LRojFV8_nTYR?oY:LSoinU7_nXZBOog:55onUo8P3oonA_04koi6l0003oonA_03[oi6l000So dVPLolYRCOoBI5Ood6A9om1SAOo@HTKod6=7om5SA@;od6=500?odF=6om1RA_o?HdH00_o@HTH00oo@ HTOocf96olmRAP02om1RAP0SolmQA_o?HTGocV57oliQB?o:Gd[oaee:olQLBoo;GDcocem9om5PA_oA H4GodF17oliOAoo@H4KodV56om1QB?o?H4Wod659om5PB_o?H4Oocf57om5QAooAHDGod655ol]NB?o8 Fd_oe5m:on=Z?ooYLc7ojGLZonUg:ooYMbcojGL`onUf;ooVLPl01OoTK`002OoTK`7ojVPKonmT=_o_ IS?okVDaoniU;oo^IbookVL`oniWookHC;on6ADooI[GOofJecomVQKooIXEoof J5P2ooIXE`09ooIXF?ofJ5WomVQGooIXEOofJ5WomfQJooIYE?ofIeGomV=L00;omUmN04OomV1OooIO H_ofH6?omUmPooIPH_ofIV_omfEYooUIF?ojBTOonTI2ooU;@?ogDdComEQ;oo=MDOoaGe[ol5EHona< BOoXF4OolE4moo/l:_od?b7ojTh>one84ooZASKojd]4onMBDooZAU?ol49@j;od4NTom5:Y_oB@jkodT6_om54Z?oBAjKoddVRom98X_o<@iooeCjbonHmb_o]2JoocPFWolX5W00;olX1W027olX1Voo:1IoobP6Oolh1Xoo>1 IoocPF[olh9[oo>0JOoTQF3oaYUFojVWBOnN[4CoXjU4ojRVB?nYYT[oYZU8oj>ZA_nTZDCoYjI4ojJX A?nWYd?oZ:I3ojNWA?nYYTGoZ:M4oinZ>OnHZS7oVZPboifV=onOXcSoWj@ioinT>?nNY3T00_nOY3L0 4_nIYSKoVZLiokfNBOoUPDkokfi9onQeB?oHTDcoaZA;olJTAoo0X4CoZjHioh^_:Oma]AkoL[onM_CkoZZTYojBW9@;oYJLV 00?oYJLUojBX9_nTZ2D00onTYb@01OnTYb;oWjHOoj^^;OoQT37oi7450?ooi6l0COoTK`000?ooi6l0 >OoTK`003ooJJQ?odfE7om9SE?o@I4God6A3om1SA_oAHdGod6=7om5SAoo@HdKod695olmRAOo@HTOo d696olmRA@03om1RAP0Com1RAoo@HTKocV56oliQA_oooPa7Oof>COol4I8on]5:?o/C0Sok48UonU6?OoYCCkoie5?oo12D?oU Bd;ofUI3omaB@_oGFRkoheQ^om93V_o6?ICoc3nAol]1RooUom59YOoCBjKoddJYomA5[OoDAjSoddRTom56YOo@A:?ocD>Ooli0Z?oV >ZConCZUooU7YOofEIOom5JR?nQR8_oUGNEoiAfU?nFNY3oW7^;oi]kR_nMQ8_oXh>7oj5nQ?nVMXKo[728ojicR?n` M8Oo[GB7oji`R?ngI8co_UV>okUHSOndE9;o]U:GokQIT_nhH8_o^5j:okULSOnjFh[o^U^6ok]KR?nl FX_o^eV8ok]LRoo4Fi7o^5R7ojALKOnSGFOoZEe^ojaNM_n[GWCoZE]aojQJKonWFfh00_nWFfl08OnV FfooYee/ojINJ_nUG6goYEe/ojAKJonUFVcoYEa/ojINKonTH73oXF=`oj=XL_nYJ7So[FUmojiYO_n_ Igco[FUjojYYN?nWJ7OoYfQfok1VO_nnHIGodG9fomUlCOoTO5OokW]Poo61I_obQF[olX=Xoo:2Ioob PFGolX1Too9oI003oo9oI@15oo:0I_obPFSolH1VonB7H?o7UU?oZZA4oinY@OnSYT?oZZ=6ojVTAonU YdGoYJQ4ojRWAOnWYTKoYjM6ojVVAonZXdOoYZDloj6TOnOYCWoW:HhoiNX<_nWY3CodXe5oo9dCOo^L4Oog8E:olNPBOnmZTKo`j95ol:PA?n] YC_oRk0Uoh2`5?mkZQ?oOJLDogfY5?mmZQCoOJ/Dogf[5Omk[1?oNZ`=ogbZ3?mlZP_oNZX;ogj^7?n2 [B3oQYdCohZA3on4?n=Sa3oS94@oh^D4?n?oTK`001OoLK0Wod6Dgom=SC_oAI4Kod6A400;ocf=600KocfA5 olmTA?o@HdOod6=7olmRAoo?HDH2om1RAP03om1RB?o@HTKocf9600;ocV5701cocV58olePAoo;GdSo bEi9olYMB_oooAYE?odJ57om6Q?ooIXKOoiJ7konVQgooQ[R?ohKXOo mfe[ooQVDOokIS[oneldooQYH?ogLgKon79hooM/JOofIEKomV=CooIPDOofGToomVAFooIVEoofIE?o mfAAooMUD_ogIe7omf9?ooMLCoogET[omeI7ooMDA_ogCckon4lmooQC>oohEC[on5/kooYF8gon3ZAooPiWOoh?:OonD6XooTkYOoj>JOonDFVooEDToocFHSo m5R@ooAHU_oMFhSoc5YiolmLLooFH73obeecoimFNOnIFWOoWe]dojIQKOn_IVKoZF=[ojiMIOnYKW3o Kl2;oifAX?oTohUSW_nIL8_oXW2?ojAXU_nLKiKoVH>?oin6R?nPPhSoWgZ;oiajS_nKNX_o W7j8oij;SOnPTHkoXH>5ojQcQOn]K8co[FjomenE_oZOUkolGeSoo9oI?obPVOolX=Xoo:2IoobPFGolX1Uoo:0I_obP6Go lX5Voo:1J?oaP6GogXYLol2IC_nXYdCoWjXooj:X@OnXYTGoYZQ4ojNW@onYXd;oZJ52oj^L@OnXW3_o Y:8eoj>T=?nRXcKoXZ@goj6T=_nOYCCoW:Lcoi^V=OnMYSWoX:@ioinT>?nNYCSoX:Hhoi^VHDKocF56ol]OB_o:GT_obUi:olaNBOo@GTWodV17om5PA_oAHDKo dF17om1PAooAHDKodF19olmPA_oAHDKodV58om9PBooAH4_od5m:om1PA`;odF5602;obEe8olYKB_oK HdCoiVleonQe:OoXMRGojGLYonUf:ooYMRkojGH_onYf?oaLEColf]Coo5_DooaKU7olVeDoo9^EoocKE[om6eLooA[Fooe JU_om6iO0oodK5T0ooodJeWom6]HooA/FOodKEWom6eJooA^G?odKE_om6eJooA]FoodKE[om6iLooAX DOodHDWom6QBooAYDoocJ4oom6UDooMYNOohJ8_onFMnooUTNOohGU[on5i5ooYZ>?olNBOonfLZooUP ?ooiH4GonFU5ooQ[@_ofIS;omVHZooMZ;?oiJRgonF`]ooUa;?oiLRSon70VooMb9?oiKR3onF8NooUS 6oohHaWonF@IooQP6?oiGaConVDIooUZ7OokKAcoo6TFooeY5?olNQWonhXQooZ;8_ojQ23onW`OooY[ 8_ojFB_onERom15 X_o@@:GoaC^Jol/hXOoZ=LOol36[onX/NOo/:GcolRR6ooL`SOohoiQnRonNPH[oXHN9oj=kRonPLXgoXGb8oj66Q_nSVX[oWYRojY^RonYLXKoZG28ojYaQonXLhCoZfn5okIRS_nnEiCo]URAojiJTOn`G9;o/5bCok=O S_nfHhOo]f>6okIRR_nmHHko/en2ojAPJonRHV?oXf5XojANJOnTGfWoY5mZojEOK?nYGWCoZUebojML KonUFVgoYU]/ojILKOnUG6_oYEeZojILJ_nVGFWoXF1Woj=NJ_nVG6_oYUaZojALJ_nUFfcoXE]Zoi]N IonNG6[oXUY_ojAKKOnTG6_oYEe_ojUNLonZH7CoZ6=cojUPMon[G8?o]gIJok^5>onhPcoo^891okf2 @_o1P4Gob7a7omEjCooWNU[okWiRoo61IoobPfWolX=Xoo:2IoobP6OolX1Uoo:0IoobP6SolWmXoo21 IOoORUgo`iE=ojVQ@?nRXcgoZ9doojVK?_nZVc_o[IHiojjE>?nUWC;oWZL_oj6U<_nRY3;oXJDboj2T =?nRXcGoXZDgoinU>0009?nNYSSoWJHjoifW>_nNYS_oWjDloibU[9on/XSGogH]8 oo9`B_oZMDSod995okbSA_nmXdKo_:dhokNa;?nd/2WoY;4Sohn`6On1[A?oOjPCoh6T5?n3X1?oR9P? ohfB3_n>T@ooSi4>ohj?3On;V1GoRjDQoh^P7_nX9_o7R13oonA_04goi6l0003oonA_03Ooi6l001WodVLKom1SC?oA I4_ocfA4olmSA?o?I4Gocf=5olmSAoo?HdKod6=6om5SAOo@HdGocf=4oliRB?o?HTSocf58oliRAoo> HDWocV56olaPA_o8GTSobEe;oliNB_o>GdOod61600;odF1800GodF55om1PAoo@GdWodF15om5QB002 om1PA`0Uom9PB_oBH4_odF1ooYM37ojGL`onYh=_o[ McgojgM0on]f@oo[MT[ojgI=onafCoo/MU;ok7MDonafE_o]Me[ojWA:onMa8_ogRbGomHPZoo>6:_ojPbGoo7HQ ooeZ7OokGQWonULFooU@5oohDbOon5PgooQ??ooi?T3omS96oo4]A?o/;bkoi2lConLeCood>gGol45= onm4@_o[?bKohU@domU:Poo7A77oaCn2ol/nT?o8@8KoaTAdolM9G?o7@7GobcjRolPnYOo?@jKodDJR om97X_oCBJ7odDRSom9:XooCCJ?oddjQom9=Xoo?AJWoc42Woldo[?oA@ZSodTFQom54Xoo>?J?oaSjE ol4nTOoJ>KKokcFZon/^N?o]:G[olbJ@ooDXSood:Xcokbb0oo0XMood8HcomB6IooL_R_ogfTOnfK:3o]eR^ol9M/OncJicoTF^@ oj1ZT?nRIY7oWGR?oib9R_nHMHooVWRAoianSonLMYCoWgF>oj=kQOnSP8CoXHj:oijBRonUPXOoZGB4 ojE_RonVLX[oYG>7ojIcQonVM8GoYGB2ojU`Q_n`JXko[fF>ojeMSon^F9;oZeJDok1ITonhH8_o_6:; okiRSOnbHh3oXfA]oiiUIonPIFSoXFAXoj=QIonRH6SoXUmYojAOJ?nUGVcoZEiaojYML_nXG73oYEU_ ojILJonVGF[oYUa[0_nVGFX0GOnTGVSoXUiYojEMJ_nUGV[oXEiXojAMJ?nSG6[oWeeWoiiOIonQG6_o Y5U/oj=JK?nSFf_oY5][ojEJK?nUG6coX5iXoj9GMon^HfGo^ghcokeo;_njOCCo^WheokUn=?nfO3Ko ]gdgok]j>Oo2Lckocg=7omibCOoYLUKokGYMoo5oHooaP6ColGmVoo5oI?oaOF7olG]Ooo5jGoo_NUco hGiBol>;A?nYUcSoXiXdojFK=_nXVCKo[IHfojRK=?nKYRooVjP`oj6U<_nQY3;oWjDcoj2T<_nRY3?o XJDcoinVOnLYSWoVZL^oiZW:_nIYb_oUZPZoi:Y:?nRYc3obY54onecCoobKE3o ehQ_nY/RKo[k4Xok:a:_na[RSo[Z/Toj>Y7OnGYAOoSYdFoh^F4on=Sa3oShl?ohfA3_n=TPko SI0>ohbA3_n;WA[oS:DRoh^O7?n Coo/CCCoiDaWolU5Noo6@H;obcn>olToS?o4@G[oaD=YolA6G_o3AFGoaE20olMBR_o>B9ooddZRomA: XOoBBJ?odDRSom9?j_odDBUolm0YOo;?9gob3jEokm1 S?o=?Z;ok3RYon`^N_o^:7SolbN;ooDXT_od:9;ojBemonT^KOob98?omAjIooL[Roog=8Gomc>8ooL_ Q_oh;hkon3BDooPcUOogok1S OOnRIF[oWfEWoj9VJ_nRIF[oXFEYoj9UJ?nQHVOoX69Woj5RIonQH6OoYEi[ojUNL?nYGGCoY5UeojAI KonVG6[oYea[ojILJonWG6coYEe[oj1NJ_nTGFWoY5iYoj=NJonSGFWoXUaYoj9LJ?nMGfGoW61Uoj9M JOnRFf_oXE]/oj9KJonRFV_oYE]/oj9NJ?nPFfkoYeQfokMj?OnjPbCo^H4XokZ0:P02okao:P0Lokao :onjOR_o^Gd/okQl;OngN2co^gD_olAd=ooCM4?ohW=>onIeEOo^MUWol7ENoo5iH_oaOFCol7eRoo1l Goo/Ne[og7e>okn:@?nYUSSoXI`fojFK>?n/Uc_oZYXhoj6R=OnOY3?oX:Dcoj6U_niYR[oXjXLojVX7_nYYako[:DNok6V8?nbYR;oYjHNoiBT4_n=VPcoSY8>ohf@3on=T@ooSI8> ohb@3On;UA;oS:4NohfT8?n;WAcoSHlAohb>3onHdKocV=60oo=HTL08_o>HDOocF97ol]QB?o;Gd[obei: oleNBOo?GdSodF17om5PA_o?H4SodF18om5QA_oAH4Sod618om5PAooCH4OodV56om5QA_oBGdWodV1: om5PC?o>GT_obee9oliMBOoGH4OogFI9on9WFoo[LEgokGQFonehEOo/MeKok7IGonafE_o/MUD3onaf E00BonafEOo/MU?ok7IDonafEOo/MUCok7IConafEOoYLd;oiW4ZonMa;OoWLBkoiW4[onIa:_oWLRoo jGMooQbVOohLYOon7:FooQbToogLHkomg>@ooQ` UOoiIYOonV6Soo]RZOokGJWonUVVooYHXoojEikonU>KooY?VOojE:3oneJSoo]F3onSUMooThD_oh>5_oncm`ooQ:S?oM@;[ofDF_omELQOoFEHCoeTJ;ol]1 S?oTolm2Y?o>@:coc3j/olDjX?o7>iSob3fFol90S_o8A9?oiCbNon`_ Noo/:WKolRV:ooHZT?oc:8koj2YmonL/KOo^9WOolajHooLYRoog=XComcB7ooL`ROoh<8oon3BDooPa Uoof>HkolDUaoo1EoiioS_nONHSoXWV5oj9kQ?nOS8_oXYFBoin8SOnPOhSoXgN7ojQc Q_n[LhGoZWB3ojeaQ_n[MH?oY7anojAnP?nUNH7oY7>5oj=]R_nTIY3oWF:6oiMQM?nJI6[oWVQYoimX JOnPIf[oWVM[oimVJ_nRIFSoXFAXoj=UIonSI6OoXV9Yoj=SJOnVHVgoYUicoj9HLonTFV_oYE][ojIL KOnVFfcoYEa[oj5MJonRGF_oXUiZojANJonSGF_oY5][oj9LJ_nOGFKoW61ToimPIOnQGFSoXUaZoj=L J_nRFf[oXe]Yoj1LJ?nRGVOoY5Ejok9/EOnhPbGo]XHTKocV96oliQA_o>HTKocF56oleQBOo;Gd[oc5m:oleOBP02om1PB@0Gom5PB?oAH4Wo d616om1PAooBH4SodF17om5PB?oAH4OodF57om9QAoo?GdKocEi7oleMC?oAGDkodV1:omIRAooPITGo iVlionUc=_o/MT_okGQIonehEOo/Me@00_o/MU@01Oo/MU?okGIDonafE?o/MUCok7IC00?ok7ID01Wo k7IBonafDoo/MU;ok7IConafE_oZM4CoiW4[onI`9ooVLBcoj78eonYd?oo/MdKokGQ9oo1eE?oeJe_o m6aLooA[G_odJecom6aKooA]F_odKE_om6IEooEZGoodL63om6eI00;om6eK0_odKEX06_odKU_om6iL ooA^FoodKE_om6iKooA^G_odKeoom6M=ooANBOodHDkom6UDooAYDoodJDoomFYOooQXPoohHhconU^H ooYMTOoiG7?onTaCoo]0?OojDfWon6jEooQcVOohL9[on72I0_ohL9<08?ohKiOonVZQoo][ZookJJSo nV>TooYNYoojG:ConUbRooYLY?ojFjConUZVooYP[?ojGZKoo52;oo`nK?ol?fKonTMdooU=OOojCGko ndZ4ooa9Q_okAGGooCUIoohY=oon9S;ooRU;on`eGOoM@5goecaHomLjD?oC>T[odC]20_o@@4@0KOoC @4OofSmDon8nH?o/?6_omcakooY9RoojDHkon52NomLk_ooJ@9Co_camol=5H_o6BE[ob4]HolUZ[o`c^Gol8iV?o1>iKo`3n>ol=6R_oI@I;ol2f0onhXM_oc :8SombJBoo4YQooW:WWoiBYbonL[M?o/8IComBF@ooLePoogRT_nTMYGoUVJGojAUUOnWJ9OoXW>?oin2R_nH NhkoW7:>oi]cS_nHNICoX8^AojB6R_nPNHSoXWZ4oj23Q?nQTHgoXXZCoin5S?nQQXWoWgn;oj5kR?nY MHKo/Fj8oji`PonXMWl00_nYMX805onWLXOoYgB5oj5eP?nEKWcoSf9koiAPN?nJIFooW6MZoiiXJ?nM JF[oWFQ[oiiXJ_nOIVWoX6MXoj1WJOnQIFWoXVIWoj9UJOnTHfooY65coj=NKOnSG6WoY5]Z00;oYe][ 00goY5a[ojAMK?nTGFcoXee/oj9MK?nQGF[oXUaZoj=JJonPGFSoVemVoimMIonUG6WoXeeX00;oXUeY 00[oXE][oj5MIonRFG3oZei/okQo;OnjPR7o^84VokN29_ngPRSo^H8Y0onkPBX0=?nlPB[o^h8XokZ2 :?njPRSo^8B?mkbT?oSKXf ojVT9?nVYR?oXjPTojJV9@06ojNV9@04ojNU9?nSZBKoXJXXolV64?ooi6l0C?oTK`000?ooi6l0=?oT K`001_o@IQcodV=:om9SB_o@HTGod6=5olmRAP;ocV9700_ocf96oliRAoo>HTOocV97oleRA_o>HDKo c656olUOBOo;H4WocEm8olmPAP03om1QA`03om1QB?o@H4OodV1700;odV56013od657om1PA_o>GTWo cUi9ol]MB?o;G4[oe5m>om]VBOoRJd7oig0ionUe=OoYMRcojGL^onaiA_o]MeOok7ID0_o/MU800oo/ MUGok7IConafE@02onafE003onafDoo/MUCok7IC00Gok7IC0?Kok7IEonefFOoYLcooiW0VonMa;_oZ M3kokGM9oniiCOo]N4Sok7M5onmeDOodJeWom6eKooA/GoodJUcom6YKooA/FoodKU_omFIEooI[HOod LF3om6eJooA]FoodKEWom6eKooA]F_odKUcom6eKooA]FOodKE[om6iKooA_G_odK5Som699ooANCOod He3om6QDooAYD_odJU;omV]aooQWS_oiGY7oneZIooYLROojDF3ondI;oo]2A_oiHh?on7>KooQaVooi LI[on72FooQ`V_oiJjKonfFcoo]S]OokIk3onfV`oo]N[oojEZKonUZTooYIYOojF:?onUbWooYR[Ook FYkoo4Ihoo`lHOok@FSonTYlooY;QookAhKoo4J3ooe3OOon>fgoocEHoolaGOonICo_cJGokhkO_o5B5gobDaDolQ;EOo9C5KobDaEolUUom50Y?o@@jGoccnWolXjXoo8 ?YOoacfIol0lU?no?I3o_d>;olU:OooX=7[om2Ejoo4YQoof:8ookBZ4onH]M?oU;GCoiBigonPRTOod 8i3omcB5ooPbS_oh<8kon32;ooT_UOoh>IColdIjoo17KOoaAWColD]_oo5;K_o`Bfkol4]coo5:Moob CH;off1eolMPKOn/HVSoZfIUojaTJ?naIVSo/FEVojeRJ_nVGG7o[F5WokIQK?n3YW[oFMN0ogf:Y_nG SZ7oYZZEoiV3U?nFKIOoVV^Eoj9VU_nTJi7oXGb;oiQoS?nGMi3oX7J;oi]cSOnLO97oZ961ojIbQOnO MHCoX7ajoiefMonHKWSoU6Ekoi9POOnHHgGoX6IZoj5UJOnQIV[oX6MYoimWJOnOIf[oWfMXoj1WJ?nN IVWoWVMYoj1WJ?nPIfcoXFAaoj1TKOnOHVKoX61Uoj9MJOnSGFSoXUiZoj9MJ_nQGVWoXUmZoj5OJOnR Gf[oXEeYoj9LJ?nNGVKoVeiUoj5LJ?nSFV_oXU]/oj9LJonSFfcoXE][oieLJOnSE7co]7=:okf28_nk PBD2okR19P05okR19OngPBCo]h8UokV19OniPBH00onjPBH0@OnjPROo^X4XokZ1:_njPB[o^H4ZokR2 :_nhPbWo^8oinU3onNY@ooWjD@oijU4_nLYQCoWJHFoifV 5onLYQOoVJHEoiRV5On_X27ogh`konii?_oCT37oZjHOojJV6_n[YAgoZJPNok6W7?njXQko_J8Rol6Q 9?o2XRCo/JDKoiZU4?n>W0goSI8:oh^F5On=X1koSZ4Ooh^S7on;VQWoSHh@ohf?3onT6?n2bScoRH4Wod617om1QAoo@ HDGocf55oliPAoo?H4OodF57om=QAooCHD[ocV18olaOA_o;GDSobea;om5OB?oIHTOog6M3on9_@_oY LScojGDbonUh;_oYN2l2onUg:`0oo]JU?okFi[oneAeoo]9D?okA4[onTmQooQ]UOohLY_onG6LooQ`VooiJj?onVR`oo]S ]_okI;GonfNaoo]S]OokG;coneRhooYB[_ojDjKonURLooYKW_okFiooo4j6oodhGooiiOonS^FooLm U?of?XoomcbBoo@mSoof?i3omd>HooE9Y?ofAikokD1bon/oI?oe@WSomc]ZooTnMOoY?]7ocRKOom8` aOo??:[oaCBXol8_ZOo1=I?oaD=XolYRom52YOo;?Ioob3bLolTmV_o8?IOo`cjBol=0 T?o1@Xko_4a`omE0JOo_:gSom2R5ooHWSOo[:gkoi2maonH`L_oU;gCojb:>oo4RSoog=ooP` S_oh;8konC:DooLnS_oaAg7ol4QYoo55M?oaBW3olD]]oo1;KOoaBW?olD]goo5:NOoZDggocFIYok1V H_n[IVOoZf=Xok5UIon`I6Ko[V9[ojYOK_nZHfco^EaVok1mN_mUch3oM:FSoi:?Y?nW]9[oXINCoieb T_nIL9SoUG2HoiaXU_nRMXcoWH2;oiEnTOnMN8coXWR:oiiaS?nRPX_o[Ib8ojF=R?nNNXSoWH66oin9 RonPQY3oWH>@oiioRonQPXWoWh>V6onXYaco]:DMokZQ7_njXQko^J4NokZR7onnXb?o_Z< 3On5XA[oPHTGocF96olaPAoo:GdSobem9oleOBOo?H4SodF18om5PAooAHDL00_o@ HDL05ooAHDKod656olmPAoo=GdOobEa;ol]KC_oBGd[ofFA5on9Z@OoVL3Ooj7DbonYh=?oZNS;ojGT^ onUh;_oYMc3ojGH^onQe:?o[MSkok7IDonefE_o/MUGok7IC00?ok7ED00?ok7EConaeE?o/ME@00_o/ ME@01?o/ME?ok7EEonafE_o/MEH2onafE00GonafEOo]MUOokGIEonafBoo]MdSokGQooA]FOodJe[om6eLooA]GoodJUcom6eLooA/FOoeHUOomVaTooA`GoodKET0 1OodKE/0F?odKU_om6eKooA^GOodKUkom6YGooAQBoodGD_om61;ooAWD_odJeKom6IAooIRHoohHHCo nUV:oo]JVOokEi3ondYOoo]5BookBE?onF>3ooQcVoohL9_onF^SooYV[OokHkOonfFfoo]V/OojJ:oo nf:foo]I__okE[[oneJkoo]F]?okF:7oneREooaFSoo2M0ooD`A?o`?egomD9Woo/mGoom=4Ko oRXboohV;Oon92gooBDkooPbFOoe>Voolcieoo8oL_od?VcomCe`oo8mLoo_?6kokcYZonliKOo`?7Go m3mhooM2PoojAiGonT^VooY5Uoob>VOoicM5onLmD?oWAFgoj3RMon0/c_oF:N3ocbKSom0Yf_o8;LGo a2S5olL/`?o7=olI3S?nm C6kocT=Xon0gMOo^<8;om2Z8on//N?oU;VooibebonPZL_o_9HKolAnDooHZQ?og8oomD26oo19J_o`B6SolDI_oo58L`;olD]^043olDY`oo5;N?oaBWOolDYmomMSJon_Jf?oZVAXojaT JOn`IFKo[F=XojmSJOn[HFcoYV9[ok5TIOniIV?oRJmoog72[on>Sj?oV:JHoj:^U_nMPi?oX6jEoiYd UonDLISoVg>>oj5nR?nHPHkoVGV@oj9hROnQMXWoVgJ@oj:DU?nSUI;oYZB@ojNPQ?nTSg[oX7mjoimiN_nMLgWoW75eoiY` M?nCJG_oSF:1oi5XO_nJL7GoWFiaoimZK_nQIf[oXF9Zoj9QJOnRHfSoXfAX0_nRI6P04onRI6WoXf=] oj=SLOnRI6coX6AXoieSJ?nIHfWoV6=^oiaSJ_nMHVWoWf1[oj9OK?nSGF_oXee]ojALK?nPG6SoVf1T oimNI_nSFfP00onRFfP02_nSFfSoXEYZoj=DN?nbM4;o^X4QokUo8oniP2Go^H0VokUo9_nhP2H2okN0 9`04okR19OnfPBGo]h4UokN09@;o^H0U01ko^H4UokR29OngPRCo]h4UokV29OniPBGo^88VokJ29?nd PRCo/H8Sojn38OnaPR;o_7lVolYloijT4_nMYA;oW:HDoifV5_nMYAOoUjDEoiRV 5_njWBKoiXHlonB5>_nkVRKoYZPKokFS7_nkX1l4okZQ7P0?okbQ8?o1X2Co`:T6_nQY1WoT:HR ohfS7_n>XAgoSZ8Poh^H6?nH4KocUm7olUMAoo;GDSocee9omAQB?oKId;ohVdoonMb>_oYMS3oj7LW onUi;_oZO3KojW/honYh=?oZMc;ojGH`onUe;_oYMB_ojWDionafDoo/MEKok7EE0_o/ME@2onafE@Oo k7ID0_o/MU<02oo/MUGok7IDonafEoo]MeWojgA=onYc@Oo]MTSokGQ:onegBOo]Md[okGI900?okGM9 00cokWI=oo=`FOodK5[om6eIooA/GoodJeoom6eLooA[FOofHEOomVeTooA^G?odK5T2ooA]FP?om6eK 03Com6eJooA^FoodKUkom6iLooATC_odGTWom5i:ooASC_odJUGom6E?ooAMB_ogHFoonEf6oo]HTook FISoo4n0oo]7EOok@4?onUIXooQ`U_oiKZKonVN]oo]S]?okI;KonfFdooYW/?okIK;onejjooaE_ook E[[onUJdoo]L]?olIk7onenKooa8NOom<5Coo2XlooPgA?ofAeWonD]NoodnC_om<3CooRHToohT:Oom :3KonRe=oo@kJ_o`@gKolT5`oo=0J_o`?VKokSiV0_o[>fT05_o[?G7ol49kooA4Q_ogAHWonDF;ooY7 U?ogB9?okD9]omll?OoDA3CodSiEomLkT_oFISobCf:olHkQ_o=>j_odd2^omE7XOoHBJ;oedVR omQ8X_oGB:7oeDNRomA4YooA?jCoacZLol8lU?o5>iSoaC^Lol@kV?o3@Hooad>?olM4R_nnCFgocD5] om`hN_oO>X?ohcN3on@cM?oX;FookBUbonXYLOo_9X3olQbGoo@UQoog;hOon2^@ooPeT?og>8[om41l oo19J?oaB6_olDM^oo58LOoaBW7olD]^oo5;KooaBGWolDaioo59N?oTEG3o[faQojEWIon[IVKo[FMU ojQSIon]I6SoZf5[oj]OJ_niGg3obUQ`okiZROmi[J_oQg>Ooj1cU_nKRICoUgnFoj9^TonWKYGoXG6G oiIfTonMOXWoWWb;oiEjT_nNMXcoX7V9oiafRonLMh[oYXf7ok2PR?nXShKoWhR6oj63R?nUOh[oXXB? oin:T?nRQHWoXX28oin5RonPU97oY:nFojNdT?nY[XgoZZ^6ojNRQ_nTT8;oXh5joiibM_nLJg;oVFaa oiIXMon?HX3oSfB2oiI/NOnJL7GoVfeboieZL?nPJ6coX6EXoj=SIonRI6OoX6EX0_nPIFL08onPI6co YV=aojIRKonSHfcoXF5[oieQKonLHVooWF9]oiaRK?nNHf_oWV9[oimOJ_nSGf[oY5e/oimNIonNGfCo XEaXojALJOnRFfSoXU]Yoj=LJ_nSGFSoWeIdojeRH_nkOR[o^glTokQn:?nhObSo^WhXokYo9oniORKo ^GhUokUo9_niObGo]ghT00;o]glT00Oo^GhUokUn9_nkORKo^gdVokYn9onjObKo^WlU00?o^H0U02Go ^GlVokR09OngP2Go]X0UokF19?neORCo_7XVol5l;?nhQB[o[I0TojRM9?nWY2KoYj@YojJT:_nRXago X:@BoinU4OnPYA7oWZHAoibW4?nMYQ7oWZH@oj2V4OnOYA?oWZDBoifV4OnMYa?oWZDHoinT6OnHYaKo U:LDojNS7_oDRS;oj8XmolNY;ongY1ko^Z0N00Go^Z4N00co^j4OokbQ8Oo1XB?o`:4PojfX9onPZ2co Tj@RohjS7On=3On2 Z1ooQ/a1oh?;>omZabOoGHTKocV57oliRA_o> HDSocf58olmQAooGdWod618om5PAoo@H4OodF59om1QB?o=H4SobUe8ol]LBOo< GDWocei9omURA_oQJT3oi74gonMd<_oYMRkojGPZonQi:?oYNRcojgdoonamBOo[ND3ojWLgonYf<_oY MS7ojGH_onUe:ooZMSOok7IBonafF?o/MUKok7IEonafE?o/MUD2onafD`05onafE?o/MU?ok7IConaf E?o/MU<00_o/MU@02_o/MU?ok7EBonaeD_o/MUKokGMIon]eBooWLCGoiW0Yon]d@oo]N4`2onefB@0A onefB_o]MdWokGM9onegAoo^Mdkolg1KooE[FoodKE_om6eLooA/H?odK5gom6YHooIOEooeKfKom6mK ooA]FOodKEX00_odKE/0C_odKE[om6iLooA]FoodKUgom6mOooAYEOodH4Som5i;ooAOC?odI53om6EC ooAHA?oeG57on61mooUGROokFYWoo5>>ooa9L_ok@dKondQ?ooYTTOoiJJkonVJaoo]T]OokHkGonf6f oo]R^OolGKooo5K4ooa@`oolDkconUVbooYO/_okJjconfNJooa@M?ol>dcoo3M4ooa2E?okCF;oo4MJ oodf?_om:R_ooRDWoohW<_om:dOon3QQoo13LOo_A6oolCmWonlmH_o]>Uook3aVonhoMooa@H?om4F; ooQ7S?ojB8gonDB7ooI4Ooo_AG[oidMWomY4Aoo>AT3ocD5SoldjUooA;KSobb72olHWb?o6:L;obB_7 olPUg?o98]gobB7LolDUc?o8<;Coc3FSol`gXP;obcJQ09CobSFSol`fXoo<=J?oc3FTol`eYOo;iGoaCfEolDmU?o1>iSo a3fFolE3Roo6A8go`dB:ok]=KOo=@f[ogSYhomdlQ?oF?Gooe3iaomhhK_oZ;W3okRQboo8SOOoc7Y;o l2B;ooLZS?ohQOo?B8_oddFX6OnTYaOoXjLGojBV5onSYQOoY:HGojFV5`02ojBV 5`;oYJHH00[oXjLIojFV6OnUYacoXZLKoifW6_nSYagoaJHbol^Z<_nmYB3o_J0P0_niXAh00onjXAko ^j4NokZQ7P03okZQ7P0OokjP7onjXb3o]:P`ok6W=?nQZ2coTZLSohfS7_n;UQGoSXd=ohj>3on=Sa3o S90@oh^@4Onoh2[7_n7cD;oML/boek77?mPaagoI/LSof;98_mPbB7o SkV9P02ojBV9P04ojBU9_nQZ2SoX:TYolR64?ooi6l0C?oTK`000?ooi6l0 ol14QonlCfWod4MVomhmMOoN?WooeciiomW?ol4EYoo19J_oaAf_olDI/oo57K002oo5:L00^oo5;K_oaBGColDUjoo5;N_o/ CfoocdaZole5QOoU@ISoicjGonHnU_oZ@ISoiCfIon0kV_oZA9Koj4JEon=2T_njBIkoPIfHoiUlU?nM JhooV6j@oiAcU?nGM9CoVWJBoj1^U_nOL9SoWXZ>oiV3S_nIOhkoWgN_S_nU[8GoYj>1ojNTQ@;oYjJ601CoYZ^8ojF` S?nU/Y3oY[:=ojJ[R_nUUhCoXhEhoj9kLOnLL77oU6Egoi1QOOnBIWgoV6egoiY^LonLLG;oWGAboia` L?nMJVooXVI[oj=SJP;oXf9Y00KoXfA[oj9TL?nSHfkoXF5Zoj1SJ_nNHfX2oiaQKP0DoieRK_nMHVco W6=[oiaSK?nLHVcoVF=/oiMTJOnLHFWoXUe/ojALJonUG6_oYE][ojIKJ_nQE7Ko[VINokZ19onjPB;o ^H0UokR09OniP2D2okR09@0=okN19OnhP2Go^80TokR09?ngP2Go]h4TokN09?nePBCo]84SokF19?nf PBCo]H4TokJ09002okQo9@0EokUo9_njOROo^ghXok]n:?nlOROo_gdXokmm:OnlOBSo^g`Yokak:Oni PR?o/HlGojRO2onSYP_oYJHBojBW6OnVYakoZ:HMojRV7?nXYQ_oZZHL00OoZ:HK00koYjHJojNV6onW YQcoYjLNojBV6onTYQgoW:PFoinT3_ngXako_:4PokNR7OngXQko^J4NokVR7P;o^Z4N023o]j8MokVQ 7OnkX1co/ZDRokNVSA3oU8h>oh2_8?mmc3[oJ/XXof787omTab7oILLRof?88omHc2;oJ<@VoijY9_nTYB?oXJLXoj>V 9`?oY:HV00?oXZLXoinY:Oo9QQ00oooTK`1`ooaXX?olGH;ooDiRooe>F?olFVOoo5YXooa:E_om=CkooB@RoohT9Oon;CoonC=Boo4jFoo/ ?VCokCeYonljJ?o`?73omD62ooU3Q?ohA7oomDInooM4Noog@7Cok49[on18I?oFBE[odDa?omECHOoH Bh;oeT6KomH^[_o>9[gocR2lollR^oo@9;oobao5olHNa?o78/_obB[9olXZ`_o;:kgoc2OBolLNi?o; 8l_ocCNLoldgVoo==j3ocCRNoldhW?o=>9gobcJOol`eXoo;=J;ob3:SolT`[_o7>h_oada@olQ>COo= @XgofdJX00?ofdZQ01cofDFRomM0V_oF>iWofSJPomXgWOoD>9[ocCZEol/mUoo3@93o`d6@ol=7Pono D6KoddA/on8hOOoO?GgofcibomXlK_oJ?7Cofc]domdiKooR=Foom22AooTJYOog;Y3omS:3ooEoii[V?nQMYGoWHJDoiR7T?nMNhgoZ6fFokU]VooEJJOojV>^ooEM^?o2OIkoWXn@oin4 T?nRQ8koYHV?ojFGU?nU]9CoYk:>ojRWQonWZ8GoZ:N5ojNVQonXY8GoZ:F4ojVSPonWY8SoYjR7ojJ/ QonV[HcoYjJ9ojRMPOnVT7[oWWefoiIZMon@H7coT61noiEXMonIKW;oVg5doiecLOnMLg?oWW5aoii] L?nNJ6coWf=Zoj5TJ?nSHV[oY69`oj=RK_nSHF_oX6=ZoiaSJonLHVgoW69^oiiQKonOHVkoWf9]oieR KOnLHFkoUfE]oiQUJ_nJHV[oWf5Zoj1PJ_nOGf[oXeiXoj9KKOnTEgCo]WTiok^18OnhP2D3okV09@;o ^80U00ko]h0TokJ19?ngP2Go]h0UokF19?ngPBGo^glWok]n:?nkObOo^glVokim:?noO2Wo_W`Yokin :0;o_gdX01So_WhXokb0:?nlObOo^7lXok:19?nbQB3o/8dKojVI3onUXPOoXZD3oj>V0_nUX`CoXj@4 oj2U2?nOY`koXJLEojFW6onRYaWoWZLDoj6W5onSYQOoYZHIojRV6_nXYQ/2ojRV6P0`ojRU6_nXYQ_o YZLJojFV6OnTYQWoYZHKoi6T4On;WPSoU:D=ok6T6oo1WR?o^YlNokbO7onlX23o_:4OokbQ8?o4WbCo aJ0TolJO8oo1X1oo]ZLZok^U<_mYbROoILLRofC78_mQab?oG/TUoec99OmGbb;oPkLWojRR8_nRYRGo XjHW0_nTYRH01?nTYBKoXZLXoj:W:?o?P@`6onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_000AonA_0003onA^0?oTK`3oi6l000?oi6l000Goi6h0onA_ 0?oTK`3oi6l0on=^000DonA_0004onA^0?oTK`3oi6l0onA^00Coi6l000?oi6h0onA_0?oTK`002?oT K`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000ooi6l000?oi6h0onA_0?oTK`001ooT K`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooT K`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l0017oi6l000?oi6h0onA_0?oTK`000ooT K`001OoTKP3oi6l0onA_0?oTK`3ohfh001Coi6l000Coi6h0onA_0?oTK`3oi6h01?oTK`001?oTKP3o i6l0onA_0?oTKP04onA_0000onA_0003onE`0?oTK`3oi6l0 00_oi6l000Goi6h0onA_0?oTK`3oi6l0onA^000AonA_0003onA^0?oTK`3oi6l000?oi6l000?oi6h0 onA_0?oTK`001?oTK`000ooTKP3oi6l0onA_000BonA_0006onA^0?oTK`3oi6l0onA^0?oTK`3oi6h0 1?oTK`000ooUL03oi6l0onA_0005onA_0003onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oTK`00 0_oTK`000ooTKP3oi6l0onA_0003onA_0004onA^0?oTK`3oi6l0onA^00;oi6l000?oi6h0onA_0?oT K`002_oTK`001_oTKP3oi6l0onA_0?oTKP3oi6l0onA^00Coi6l000?oiG00onA_0?oTK`001OoTK`00 0ooTKP3oi6l0onA_0003onA_0003onA^0?oTK`3oi6l000;oi6l000?oi6h0onA_0?oTK`000ooTK`00 1?oTKP3oi6l0onA_0?oTKP02onA_0003onA^0?oTK`3oi6l000;oi6l000Goi6h0onA_0?oTK`3oi6l0 onA^0005onA_000Kon=_0Oo>IAkocf59om9RB_o?HDCocV56olePAoo=H4Soc5m8olaNAoo=GTOocEi6 ol]KAoo;G4WodEm7omMTAOoNJD3ohfhmonMb=ooYMC3ojGL[onUh:OoYN2[ojGP[onUh;OoYMbgojGP] 00;ojGP_00CojGPaonYh=ooZN3_ojWLd0_oYMRl01ooYMBcojGH]onUf;OoYMB_ojGDYon]f?Oo/MU@0 0_o/MU<00oo/MUCok7IBonaeDP02onafD`03onaeE?o/MUCok7EC00?ok7IC0_o/MU805?o/MUGokGMG on]eCOoWLSOoiW0YonIa:_oWLBgoig0^onMa;_oVLB_oj74donafB?o]Md_okGI;onegBoo]Md[okGI9 onafA_oaLeComF]I0_odKU`01oodKEcom6aOooETF?ogHUkomG5Woo=^FOodKEX00_odKE/0;oodKUko m6iMooA/G?odKegom6eIooASC?odH4[olf59oo=SB?ocH4Wom5U5ooEI@oogH6GonE^F;ojSiUon`oJ_o`?gKo mD6100;onDJ60;7omTN8oo97MOod@f_omd9eoo94M_oRBVcoddiJolmAD_oDDEoofdJ8omHo[ooE:[oo cB>kollP_?o<7kcocb70oldR`Oo87l?oa1_3ol;kcobBW4ol/Tc?o?8Lko bc6YoldhVoo>>:3ocCRMol/fWOo<=J3obcBSolXcYOo8W3of3ecomHlMOoF@FoocdYSomPnN?oN>ggoj4=`oo11L?oa?W3o lD5Zoo55J?oaB6_olDQ/oo17Joo`B6WolDU_oo50om]3SooOAY;oiDNAomi2TooI?iKogd>Gon=2U?oM?i_ofS^Oolm@U_n9M97oWVfCoj5[U?nKKY7o V6jBoj9bTonQLICoW6^FojMXV?nSL9_oTWfJoin5SOoGGK;onEO6ooUM`oohGKoon5jnonQW/_n/ViSo XJZDojJKU?nVUY7oZ9nCojR`TonX[hgoZJV;ojVYR?nYZXKoYjf9ojN]R?nV[HWoZ:Z6ojRVQonWXhOo Yj>1ojRVP_nXYhOoZ:B8ojRRQOnWWX;oYiImoij4NonEL7goTFAmoiETN?nHJGCoVVecoi]_L_nNLg3o WG9aoie`LOnMKW3oVf]`oj1WK?nSHfcoYF5`oj=QK_nRHVkoWf9]oiiRK?nMHf_oWV9/oieRKonNHVgo Wf9[oimRK?nLI6coUVE[oiQUJ_nNHfWoWV9ZoieTJ_nNI6WoX6=Woi]LLOn[K5Go^h8Sok^08onkObH0 0_nlORL0:OnnORSo_GhWol1m:Oo2O2Wo`GdZokan9oo1O2So`g/Zol1m:_niP2Ko]H8SokJ38onbQ27o /8HPoj^97onWRQgoYhLNoj>:6onMSAOoV90Eoi:D5On=UACoSIh9oj2T1onUYPOoXJH2oj:V0onRYPCo XZL5oj:V1?nSYP?oXZH3oj>T1?nOY@GoWZL;okbX:onkYR_oZJLNojFW7?nSYQSoX:HE00;oWjHE02So XJHFojBV6?nUYQSoY:HGojFV5onWYQ[oXjPJohjW5?n;XaGoRj@Aoi2V4on^Yaoo`J8Uol2P8onhXAko ]J8MokNR7_n^XaSoYj@Doj:T5OnQXQCoVilGoiVW:OnIYR[oUZDXoiFV:_n?ZBcoR:8Poh^@3on=R`_o S8h>ohf@4?n=Sa3oRY0AohZC4_nBTQ7oO:XIofO=:_mXbRSoHLPR0_mOb2D01omOb2CoHLLSoe[:8_mQ ab?oUj`TojJT8_nRYbL00onTYRH00onRYbSoY:DVolj13@1monA_0003onE`0?oTK`3oi6l000_oi6l0 00Goi6h0onA_0?oTK`3oi6l0onA^000AonA_0003onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oT K`001?oTK`000ooTKP3oi6l0onA_001PonA_0003onE`0?oTK`3oi6l000_oi6l000Goi6h0onA_0?oT K`3oi6l0onA^000AonA_0003onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oTK`001?oTK`000ooT KP3oi6l0onA_0006onA_00000ooTK`02onA^01Soi6l000?oi6h0onA_0?oTKP000ooTK`001OoTKP3o i6l0onA_0?oTK`3oi6h000_oi6l000?oi6h0onA_0?oTK`00EOoTK`000ooTKP3oi6l0onA_0004onA_ 0003onA^0?oTK`3oi6l000Coi6l000Coi6h0onA_0?oTK`3oi6h00ooTK`001OoTKP3oi6l0onA^0?oT K`3oi6h000?oi6l000?oi6h0onA_0?oTK`000ooTK`000ooTKP3oi6l0onA_0004onA_0004onA^0?oT K`3oi6l0onA^01koi6l000?oi6h0onA_0?oTK`000ooTK`000ooTKP3oi6l0onA_000;onA_0004onA^ 0?oTK`3oi6l0onA^01koi6l000?oi6h0onA_0?oTK`000ooTK`000ooTKP3oi6l0onA_000AonA_0003 onA^0?oTK`3oi6l000?oi6l001Coe6PBolaP@_oCHDgocf96oliQA_o;GdOobUi7olULB?o9FdOocEe8 om9NB?oEHDGofVI3on=[?_oWLCOoj7D]onUg:_oYMbgojGTZonUh:@?ojGP]00cojGL/onUg:ooYN2ko jGP_onUg;_oYMc3ojWLionYh>?oYMS3ojGD/onUfkollR_?o? 8kkocR:nolTMa?o36LKoaA[5olPL`oo;7/;odBS2om4_a_o?;/;obb_4olXZ]_o?;jKodBC8ol`[]oo< =igocCNPolXdX?o;=:7oc3BTolXdX_o6i[ofCnEom`kX?oJ?:;odDj6okY/D_n` NSgo`6UGomU4MOoAAf_obDiTolQAFoo3EDko_EM5okmHAOo?DU;odT]KomA@D_oLDEOoj4AYoo4mLOoa ?fgolDI/oo58K?oaAf[ol4QZoo18KOoaBfoolDa_oo55Moo`@7kokD9noo18N?oPAg?odD5iomY4M_oJ @X3ohTBDonU6U?oN@iGoeCfHoma1U?oO@i?ofD2Jom4mW?oXBXooZ6NFohmcT_nNJY7oXVZDoj1WUonN KI;oXg6Doim_U?nOKICoX6fGoi1eXonFVYOo_HnNonIS/OoaGk?okF>bonmU[_oaHjWo`X6Foj6hUOnV ]YGoYZj@ojJbTonV]iOoY[>AojN]SOnZZ8_oZZF9ojZVR?nYZHSoYj^;ojJ]RonWZh[oZJJ:ojVTQonY Y8?oZJJ3ojVPQ?nWVh;oYiV1ojNLP_nWWh?oY9F1oiYoP_nAJh?oTV=loiESM_nFIgCoVFYboi]^LOnL LG;oW7=boiY`M?nLL7?oW6]aoj1VLOnSHfooXf5^oj5QK_nNHF_oWem/oieQK?nLHFcoW69^oiaQKP02 oimQK00>oiURK?nGHf[oVem[oj=MJ_nSGFWoXEeZoj9NJ_nQFfkoXe]_okEl=_niQ23o^X4Vok^09onj P2D2okV19P0Gok>28on]QQooYH/Koj>;6_nOT1SoWI4HoiR@5onHT1GoUHhEoiB>5?n@TQ3oSY@?ohfD 3on;U0ooRY8?oh^A3on;T13oRY0BohVG3OnAX0CoWJL1ojJV1OnTYP@00_nTYPD00onSYPGoXjH4oj>V 1002oj>V100moj>V1OnTY0CoX:H2okbU7ooXWDKoh9dmomVS=oo?XSCo`J<]okNU9_n_YR3oZ:HLoj>W 6OnOYQCoW:HBoinW5_nSYaSoUJH@ohbV3onV9`02ojBV9P03oj6X:?nUYBKocH8=08ooi6l000?oi6h0onA_0?oTK`001?oTK`00 0ooTKP3oi6l0onA_0004onA_0004onA^0?oTK`3oi6l0onA^00?oi6l000Goi6h0onA_0?oTKP3oi6l0 onA^0003onA_0003onA^0?oTK`3oi6l007Coi6l000?oi6h0onA_0?oTK`001?oTK`000ooTKP3oi6l0 onA_0004onA_0004onA^0?oTK`3oi6l0onA^00?oi6l000Goi6h0onA_0?oTKP3oi6l0onA^0003onA_ 0003onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oTK`000_oTK`0000?oi6l00_oTKP04onA_0003 onA^0?oTK`3oi6l000Soi6l000Coi6h0onA_0?oTK`3ohfh01_oTK`000ooTKP3ohfh0onA^0009onA_ 0003onE`0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`002ooTK`001?oTKP3oi6l0onA^0?oSKP0> onA_0003onA^0?oTK`3oi6l000Ooi6l000Goi6h0onA_0?oTK`3oi6l0onA^0003onA_0003onA^0?oT K`3oi6l000?oi6l000?oi6h0onA_0?oTK`001?oTK`000ooTKP3oi6l0onA_000onA_0003 onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oTKP001_oTK`000ooTKP3oi6l0onA^0005onA_0003 onA^0?oTK`3oi6h000coi6l00_oTKP0>onA_0003onA^0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oT K`000_oTK`001OoTKP3oi6l0onA_0?oTK`3oi6h000;oi6l000kogf`7olQP=oo=GeCoaei8olAJBoo5 FD_ob5Y:oleMB?oDH4Kog6E4on5/?_oVL3Soj7@bonUg;@;oj7PY00CojGTYonUi;?oYN2kojGL/0_oY N2d03OoYN2cojGL/onUh;OoYN2kojGP`onUg;_oYMc3ojWPgonYg=OoZMbgojGDZonUe;_oYMS000_oY MRd02ooYMBcoj7DXonUe;Oo/MTkok7EGonafDOo/MU;ok7IDonaeD_o/MU;ok7EB00Gok7IB00_ok7EB onafD_o/ME;okGMGonafDooYLcgoig4[onI`:OoWLBgoig4_onMa;@04onMa;P0ConI`:ooWL2ook7I6 onehBoo]MdWokGM:onegBoo]MTWokgEDooA]FoodJe_om6eIooA^FoodKE_omV1HooMTH_odLF;olfmJ ooA`G002ooA`G@0>ooA_G?odKUgomFaQooEUH?ofF5Oome9JooMAHOohDV[onDY_ooToG_oiA5OonTml ooaCZOonCJP2ooi1R00nooi:WOomG;Coo6:ooo]R^?okIK?onfNcoo]Y]?olI;Oone^eooYH]OojFKco nejaooeMQ_omEFSooDeIooe@FoolF6Soo5MZooe7EOon5conCajooE:SoogBi;o nDR8ooA5OOo^AWGojDY]onM8JOoYBW3olDj5ooYOomHk^Oo:>L7o ac33ol/ZaOoD:L7odbW0om0U`Oo?9/3obB;3olHLaOo66lOobao4ol/Q`?o=8Kkod2K0om0]aoo<;J3odcBOomHkVOoF @9;oeT6Dom=1V_o0B6ko/5/hok1O;onkFDkobeILol9IBOnoFSgoa5dgolAN=oo0G3So`EQ0om5=EOoB AF;od4iHomAGCOoDD5Goh4UQona1K_oa@W3olDM]oo57J_oaB6SolDQ[oo59LOoaAg?ol4Efoo12O?o_ @Wkol4Ihon=6MOoD?ggofd=jomU0NOoN@XKoi4VCom]6TooI@IKohTBFonE4V_oS@IooecjSooA8UOoD DIWoU6bGoie^TonPKY?oWV^FoiU^U_nINYCoWXJDoib8UOnJOY3oUgbIoi6>YOnK^i7o[ibojRNRonYXHOoZZ68ojNMROnUUhGoY9>3ojBGQOnTVXOoXYZ9oifAROnD OX_oTFj5oi9XO_nDHWSoTfAfoiMZMOnHKGKoV6]goiI[NOnGK7WoUVUhoi]WMOnMI7GoWf9doiaSLOnJ Gg?oW5e`oi]NKOnJGFooVee`oieJL?nQFG3oWE]aoiENLOnHGg3oVUacoiUKL_nGGg3oV6Aaoim[MOnJ J83oVWmGoiVF5_nITaKoU9DFohjI4_n?V17oSiDBohjC4_n=Ta7oRi8@ohf?40;oS98?00ooSI4?ohfB 3on;TA3oRhl?ohf?3on3on?oBXC?oaJ8^okbT:_ngYROoXJHIohjV3_n>YQ3oS:H?ohfV3on=YQ3oSJHAohZX5On8 Z1_oSj0LohjQ6ononA_0003onA^0?oTK`3oi6l000Woi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Goi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`003?oTK`000ooUL03oi6l0onA_ 0004onA_0005onA^0?oTK`3oi6l0onA_0?oTKP000_oTK`001OoTKP3oi6l0onA_0?oTK`3oi6h000ko i6l000?oi6h0onA_0?oTK`002OoTK`000ooUL03oi6l0onA_0001onA_000000?oi6l0onA^0?oTK`00 0_oTK`001OoTKP3oi6l0onA_0?oTK`3oi6h000?oi6l000Coi6h0onA_0?oTK`3oi6h01OoTK`000ooT KP3oi6l0onA_000:onA_0003onA^0?oTK`3oi6l000Woi6l000?oi6h0onA_0?oTK`003?oTK`000ooT KP3oi6l0onA_000;onA_0003onA^0?oTK`3oi6h001?oi6l000?oi6h0onA_0?oTK`003OoTK`000ooT KP3oi6l0onA_000DonA_0003onA^0?oTK`3oi6l000Coi6l000?oiG00onA_0?oTK`001OoTK`000ooT KP3oi6l0onA_0008onA_0003onA^0?oTK`3oi6l000Koi6l000Goi6h0onA_0?oTK`3oi6l0onA^000: onA_0003onE`0?oTK`3oi6l000;oi6l000Coi6h0onA_0?oTK`3oi6h01_oTK`000ooTKP3oi6l0onA_ 0009onA_0003onA^0?oTK`3oi6l000coi6l000Coi6h0onA_0?oTK`3oiG002?oTK`000ooUL03oi6l0 onA_0002onA_0004onA^0?oTK`3oi6l0onA^00Koi6l000?oi6h0onA_0?oTK`002OoTK`000ooTKP3o i6l0onA_000_oWLc;ojGD]onUh:P;oj7PW00?ojGPZonUh :ooYN2d00_oYN2h01_oYN2gojGH[onUg:ooYMb_ojGL/onUg;P;ojGL_00CojGL]onUg?o]Md_okGM:onegB?o]MTSok7I5onmeD?odKEWom6aL ooA^G?odL5_olfmIooIPE?ogIFCom7=SooA_G_oeKF?omFUUooIWJOogHVkon5maooQJL?oiCVSonDMW ooU:KOoiCg?onD]dooQ0J_oi@5SonTajooaDYOonD:oooTJAooi2R_onBYGooEfYoo]V^?ojIK?onfJ_ oo]W/ookJ;Conf>doo]M/OojFKSonUZhooaLXOomEWKooTaJooe8DoomC5[oo5=Wooe=H?on>T3ooR`V ood]:_ol=dCondM_oo]?S_ohC8goldb3oni;MOoVBf_oh4]Von=;JOo/BWKom4^9ooY=T_ogCHSoi4eT omY>HooHAhSoddB[om0i^oo;>;oob3NnolD``Oo::/3odBZmom8Z_ooA9/GocBO1olXT`_o98/GocR?5 ollSaOo?9/7od2Nnom0V_oo@9lSodS78ol`^^Oo;;Z;ocS6MollaW_o?<:7od2bcolheY_o<=Z;obcJP olHcWoo6gco_SYgokloKoo1@V_oaT=aol54KongDS7oaf0Bol5K7Oo6Ed[obV1: olIN?Oo4G3koaEdmolEN?_o3GScob5U3omM=F?oA@fKodDUOomMED?oBEDood5=?omA@EOoPB6Cok4M^ oo17JooaAF_olD5_oo8oNOoa@gWolD9joo8mOooa>X?olD=honA2NOoG?Wkofd1lomQ0NOoLA7SohdJ5 omi1S_oG@93ofdJAomU7Soo@A97oaTF>omQ@N_o?DG7oV6:;oiF3UOnLOHgoW86=oiMfT_nJO93oWXVA oij>UOnIQIGoVWnDohm_XonBUZ3oVLN=ojZMRoo=J9Cogf:KomeYV_oVIYSobGB?oin`TonU_9OoZ;2C ojJbUonV]9_oY[BJojJbU_nV[XkoYZb?ojRXRonXY8[oZjB:ojRSS?nVYHgoYZNYQ7oQjTEohVW7?n>XAco S:W9OnTYR;o UJ0DohbG3?n;TPWoRi0;oh^@4On@S1KoRIHGoeg58_mIcBH5of778`0:of388omKbR?oKL4ToinW8onW XbCoXjHWojBV9_nPZBSoXJLXolj13@Soi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l001Coi6l000?oi6h0onA_0?oTK`001?oTK`000ooUL03oi6l0onA_ 0005onA_0003onA^0?oTK`3oi6l000Soi6l000?oi6h0onA_0?oTK`001_oTK`000ooTKP3oi6l0onA^ 0009onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001OoTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0onA_ 000DonA_0003onA^0?oTK`3oi6l000Coi6l000?oiG00onA_0?oTK`001OoTK`000ooTKP3oi6l0onA_ 0008onA_0003onA^0?oTK`3oi6l000Koi6l000Goi6h0onA_0?oTK`3oi6l0onA^0002onA_00002?oT K`000ooTKP3oi6l0onA_0005onA_0003onE`0?oTK`3oi6l000?oi6l000?oi6h0onA_0?oTK`000_oT K`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000Goi6h0onA_0?oTK`3oi6l0 onA^0008onA_0003onA^0?oTK`3oi6l000_oi6l000?oi6h0onA_0?oTK`001ooTK`000ooTKP3oi6l0 onA_0004onA_0005onA^0?oTK`3oi6l0onA_0?oTKP000_oTK`000ooTKP3oi6l0onA_000;onA_0003 onA^0?oTK`3oi6l000[oi6l00_oTKP000ooTK`3oiG00onA_0002onA_0003onA^0?oTK`3oi6l000go i6l000?oiG00onA^0?oTK`001ooTK`000ooTKP3oi6l0onA_0002onA_0003onE`0?oTK`3oi6l000[o i6l000?oi6h0onA_0?oTK`005?oTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Go i6l000?oi6h0onA_0?oTK`008OoTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Go i6l000?oi6h0onA_0?oTK`006OoTK`00;ooBIQWoaea8omUTDOoMJD7oi6dmonQc=OoXMBgojGL[onQh :?oXNBWojGTZonUh:_oYN2_ojGP/onUh;OoYMbgojGL/onUh;_oYN2gojGL[onYh:ooYN2gojGP`onUg SooeBZ_on BY_ooTJSolXbZ?o4?8;oadYEolM;E?o8 BUOob4YHolE9F?o3B5Oo`dQFol=:D_o3BU7o`TQFol57FOnoB5Ko_dQDol1:D002oke9DP21oki9Doo2 B5So`dQFokY:AonmF1ooaElCokeI8?njDSco^U@iok]F=OnmECco`UXool=K?oo1G3gocUY8on1CF_oE B6KodDAYomQBF_oHEeCoeUEDom5ED_o@DeCoeTmMomm?GooVBVKojd9`onY2LOoXBFooiTU]on=6KooR A77oiTaZom=@Hoo2B6WoaD]XolA:J?o:CVOobDmUol5>I_niC6Wo_U5UokiEG_ncD6Go]E1VolAJE_o8 Fd_o/E]Woi>8T_nLPXgoVgj;oiAcTonDKYCoUWVDoib5U?nKR9KoVhJBoiIfV?n:J:KoU:JKoiK:QOnT W8KocfJEonMUVooWJYWohfFFokVBS_nQaIKoY[ZDojJgT?nV]iKoY[NJojJhV?nU]Y;oY[F>ojJdSonU /HkoZJb9ojVXR?nZYHOoZ:N:ojJXRonWYH[oZJB9ojZSROnYXhWoZ9n9ojJLROnUUhOoY926oj>AQonS T8GoWhn9oiVV100Joj>U1?nSYPCoWjH0ojRW2OoJXCSokiU9onfO@?o/WcookIi0onfL@Oo^VD;o kYA2onjH@_oBYS[o_jHaol6W=?o0YcOo_JLdokVW:5?mdYQ_oDm0Uoec:9OmPab?oH/LS0omQab<02OmMbB?oFlXSoh:g 8onWXR7oYJDVojBU9onQZ2SoXZLWom5o2`06onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_ 0?oTK`001ooTK`000ooTKP3oi6l0onA_000:onA_00;oi6h000?oi6l0onE`0?oTK`000_oTK`000ooT KP3oi6l0onA_000=onA_0003onE`0?oTKP3oi6l000Ooi6l000?oi6h0onA_0?oTK`000_oTK`000ooU L03oi6l0onA_000@onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`003ooTK`000ooT KP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`001ooTK`000ooT KP3oi6l0onA_0007onA_0003onA^0?oTK`3oi6l000Ooi6l000?oi6h0onA_0?oTK`002_oTK`02onA^ 0003onA_0?oUL03oi6l000;oi6l000?oi6h0onA_0?oTK`003OoTK`000ooUL03oi6h0onA_0007onA_ 0003onA^0?oTK`3oi6l000;oi6l000?oiG00onA_0?oTK`002_oTK`01onA^007oi6l00OoTK`000003 onA_0?oTKP3oi6l000Coi6l000?oiG00onA_0?oTK`003?oTK`000ooTKP3oi6l0onA_0009onA_0003 onA^0?oTK`3oi6l000[oi6l00_oTKP0coig4]onM`;OoWLBkoig4^onMa;OoWLBooig4^onI`:_oW LC;okGM8oneiAOo/MdGokGE8onmdE?oeJEoomf5VooMPJoohGWConEUgoo]BLoolFX?onE^3ooUGO?oi Eg_onEMmooUGNooiFG_onEQhooU?KOoiAfCon4UWooQZoomBWcooTMOooi7F_om C5ooo59Uooe=Foom?dGooSQoldaY_o<okaFD_ngEEGo^UMDokQFE_n_CV?o]U5QolAJE_o6 FU?o`EIJoiYXR?n@QI_oUGJBoiAeTonDL9CoUgFBoib3T_nQS9;oWhN?oif0SonAKYcoTWNOoiVdTonC bWkoY9Z2omAXU?oYIiWojFRIomM`T_nS[Y3oWlFIojJeTonU/iGoYk6IojNbVonW/iKoY[:CojJaT_nU /I?oYJjCojN]S_nXZ8[oZZB9ojZVR_nXYHcoZ:R:ojR[ROnZYHSoZZ>8ojRSQonYYHCoZYn4ojRIPOnX Uh3oYiJ0oj>AQ?nNRh[oVHJ>oiZ8S?nPU8SoXY:5oj2;POnMPgkoWWegoiigL_nIKW?oUfUcoiUXL_nL JWCoVfmfoiYaMP;oWG1c013oWg=coi>BN?n3/G[oPk1lohF/N_mn[7?oPJefohR[Non8ZgSoR:UiohRY Non9Z8CoPZU_ohJK6onDT0coSI4A0_nW1[oRi8Doi2:4on?SACoIkLOoeC@9_mNb2?oHgCoo41` oo]AQ?ojFX[oneVIooi;UOonAHCooE:8oo]QZookHKWoo5f]ooaNZ_okH:goneR]oo]@]_okD;_oo4bN ooe7K_onAeWooDeMooaCI_olE6GooDQ?oohi??omoo]?UOokDIConDVIonTnW?oF=[CobBk3olD_`Oo7;/3oac6oolTb_oo9<[koaC70 olH[`Oo99[gob2JjolTZ^?o6;;Wo`RFkol8T_?o6:[Ooabfcol<]/_o0:KGo`b^holLe[_o6@9_o`3b> ol0aRoo9;IKobBRXold//Oo<<:?ocBnSoll`Xoo><:Gob2N^olDV^Oo8Q olE1Loo8C5;ob4YGolU;FOo7BE[oa4UFolA:Doo4Be?oa4UFolE:F?o3B5T2ol96G`25ol56G?o0BEGo ^d]8okQ?>OnjEBOo`5/Jol=M5?o5GQ;oaElFokmK7OnjEbCo^eXRokeK6onmG1Oo_edFokeK5_o0GQGo `EhDol1N5?o9GQ[odehQoleK8oo5EbWobUTXoliL9_o@G2CodUhToleH;?o8DScobE15olaABoooj6;S_nSSXko XH>Nok]jV?nP]ISoYKFIojJ^V?nV[iOo YjjLojR_VOnY/YSoZ:jEojNaTonU/iKoYKBEojJbT?nXZh_oZZ>7ojRNQonWVX?oZJ21ojfLOon]VWoo [9aooj^NPOn/Xh?o[9f1ojVHP?nZVWooZYYnojJGPonTTXKoWhZ9oifCROnTU8Ko Yi9noij6POnHNh7oW7MhoiU[MOnHJ7OoUVYgoiM[M_nGK7OoVFYdoiY/M_n@SGgoQZj1ohJ/POn5ZGoo PZj2ohJ[QOn9Z8;oR:R0ohNYP?n9YX;oRYj;ogjR@?nAU@koTI4@oh^C4`03ohjB4P0LohfB4_nW1OnSY`KoXZL5oj>W1OnSYPCoXZL5oj:V1?nPY`CoXJL4oj:W10;oXjL5043oXjH4ojFV1OnT YPGoXZH4oiZU0On`YQ;oiYm3onnFA_o]Vd3okY]2onnH@_oUXd7o_ZLbokNW;OnmYRoo^jH`ok^WX=_nc YSKo/ZHdok6VOoaHWgomeBOooI=X?ofCYOomeV3 ooYLN?oiFGconE]jooUEK_okDF_onUajooUKN?oiFWOonEUfooUIMoohFgGon5Q_ooU;I_ojAfoondn= ooa>W?ok@G[ondIVooYENoohG7konEn=ooeBVOon@h7ooDZ0ooaKXOokGKKoo5Z]oo]OY_okH:Woneb] oo]G]ookD[Koo4b>ooe8H?omCE_ooE9SooaDIOomD5cooD55oodcT olTfVoo9On[HCKo[60cojiO;onaGB[o^5hTolEM;?oBG37obU`]ol5FN_n/Cg3o[Da`okYBJ?o9G5KobEeColQMDOo9Fe3oZVEjoiFCojRcT_nV]YKoYKNDojFfT_nYXXKo[XE` ok62MOngPW3o^8=ZokJ3JOndPf[o]H5]okB6LOnbRWGo/8UfojnTa@00_n>Ta@03On=U1CoRi8GohZF5_n?X0goVJP7oj:X1onRZ0SoWZT7 oinW1_nPY`KoXJT5oj:X1onTY`P00_nUY`P00onSZ0OoXJP7oj6X1`02oj6W1P03oj6X1_nQY`OoXJP7 00;oX:P6013oXJP7oj:Y1onQZ0GoXZL6oj6W1onLZ0?o^JLLonZMB?o_VDWoki]2onbMA?o8ZCSo]:T^ okfXX=oneZ3P00_n`ZCH2ok6W=P04ok6X=on^Z3;o[jPZojnW:@;o[ZPX01[o[jPXojfX:_n[Z3;o [jLeojnX=OnVZ2ooUj8ToiBD6?mnWQWoG onieC?o]NDCojg`gonYk;OoZNboojg`conYk8ooYONP02ooUK NP1WooYDKookDfkonUekooUKMooiFWSonE]hooUJMOoiFGGonTmeoo]7O?okDIConeJNooY:N_ojB5[o nUAcooUDNoojEWooo5BEooi3QOonBG_oo5bMoo]Q]_okH:_onfFVoo]TZookH;7onURkooaC[_omAgWo oDIDooe@G_omEFSooEAUooe7D_om>CcooC4hoo/_?ooi_oD>c;og45AW3oSTAeoi1@LomoDH?oM4NBog=3U?mcA9SoLD:Iof`kVOm]>Ico LSVJofhhW_m_=ZCoMc>UohHhVonI@hkoZ4Z3okA?Loo5Ef7oa5]Poj9hQ?nIRICoUgNFoiUiU?nJNY?o UW>FoiUnU_nGPicoR6:UohiWWonELIWoTFNPoiB4X?nB`hSoSOom5kTonQ]i;o XlJJojRjU_nV^YGoZ;BHojRcVOnX]iOoZ;JFojNeTonW]9CoZ;VLoj[9ZOn__Ioo^i9aokZ7J_nhQ6oo ]h9[okN6K?nfQFco]X9[okQmJ0;o]g]V02Go^GaZokUmK?ngNfWo/7YYojn0LOn/PgSoYH9koif5P_nL RH_oX8n;ojFJRonWW8WoW96Eoj:ISon]YHCoZY^4ojVEPOnTT83oXh:0ojacO_njKX;o`fN2okm[PonR SH?oQ:Mjogj]M_ml/W;oO;Afoh6dOOn4/gkoQ;AnohFaPOn8YhKoOjHnoi6G4_n?UAKoSiHG00;oSYDF 00koSiDFohnE5on?UAKoSYDFohfE6?n[2onTZ@[oXjT:ojBX2OnUZ@WoXjT8oj:Y2?nRZPWoXJX9oj:Z2OnRZ`T2oj>Y200Q oj6Z1onNZ`OoX:X7ojBY2OnVZ@coXjT9oinY1_o4ZbOol9eY2CoSZ@UohnU9On:[2WoU;8dojn/>?nfZ3So]:Th ok:Y>?n`ZcWo/:Xh00;o/ZTh01go/ZTiojn[=On`Zbco/:TZojjY:on_ZB[o/:T[ojfY;_nZZCCoZjTc ojb[=On_ZSOoZj/eoj:W;?nHWb3oL[HPoeW@9omMc2KoHonmgCoo_MTcokgE?o/NcOojg/_onak>Oo^O5CokWYMonekF_o^O5T00_o^NUX02oo^Neco kWaJonilFOo^NU[okWaJonmlG_o^Negok7UAonYg?ooZN3?ojWLf00;ojGLg00?ojWLfonUf=_oZN3H0 0_oZMcL2onUg>03oonUf=_oYMcSojWPionUf=ooYMcOojGHfonYg>?oYMSSojGHfonYh>?o^KFGom4nG ooA@TOodFXgomV6CooIRToohJ8konVN3ooYRP_oiGgkonUEboo]FL_oiGW_onEahooYJN_oiFG[onUUo oo]GROokD8WoneB?ooYKU?ojCGOonTEFooY=JOojCg[onE9joo]HSoonB8KooTEhooeLVOolIk7onfF] oo]WZ?okI:_oneneoo]J^oolCIkooD9Xooi8D_omE6?ooEM[ooe@H?om@DSooC6onA0[Oo==[Wo_RjdokT/__nn;/Oob3;7 oldf`Oo<=[kobcG1ol`f`_o9=Kooac70olTX`oo:9[kob2fjolLc^Oo5<;[o`bRmolDT_oo38/7o`2?2 ol4W__o6=jgobTbColYFQ_o4@XWoa2nFolh[X?oK;ZKohcFWomh`Z?oG:Z_ofS6WomPdZoo?<:gocS:W ol``Z_o7;:Go`RFjolHPe?o;;[?obCFTolTc[Oo6?hKobdmIolY@G_o8C6?oadaUolI;IOo5C5oo`TeH ol1CB?o0FCKo`ehZol5O9onmGb_o^E`]okMNJoneSW3o]X]_okR4KOnfQFco]8I^okF4KOngOf_o]H1Z okF1KOniOFgo^WYZokYiIonjMfGo]GEXojehK_nZNgCo[7elojN3O_nXSW[oX8Z5oiR5TOnXVHKo[:26 ojfPQOn[XXSoYYfXGkoR:B0 ohJ[OOn7[8KoOZi[000?ohJP6onEU1?oSiHHohnE6?n>U1SoT9@HohnF6?n@UQWoS9DLoh^J6_nAX17o WJL=ojV/3_nWZ`goXjX=00;oXZX<02ooXZ//2Oo@Yc7ojZA>olFZ>ongZc7o_J`fok^/=?nk[CCo^j/iokbZ>_nk[3_o`:/nokZ[??nHZRko SZLXohjW9on@02ok>Z>@0>ok:[>ona[3[o/ZXiok>[>OncZS_o [j/gok2/;?naZb_o[j//ok6Z;?n_Zbko[:`dojbZ=_n/Zc@2ojZ[=@0Fojb/=On_[3So[ZLcoj:Z;_ml a3CoFm4Zoec:9?mQbbKoGL/Woe[;9_mObbGoH?o/OCSokGlionf0>oo]OcSo kGlg0_o]OcX03Oo]OcWokGlkonio@_o^P43okGhionen=_o]OSWokGljoneo>Oo]OSSokGhionen>_o] OST00_o]OS/01Oo]OSOokGhionmmDoo^O6;okgeO00;okgeN00cokgeOonmmGOo_OEookgeOonmmGOo_ OEkol7iPonmmGOo]Nd_ojWPhonYj=_o[NST3on]i>P;ojgTk00CojgXkonYi??o[NCcojgTk1_o[NCX0 3ooZN3cojgXoon]j??o[NcGokGEBooAHSOoeCiSoleN_ok_oI?C?ogS]1on`fDOog:KoaSZJolY< K?o>DF7oada[olE>H?o4De;o`eU2ol=N=oo4HRooaV@Yol=S;?nkGcKo]Ulnok9RA_naHd[o/FI:ok5Z BOn_JT[o[fU9ok1Z@oncK3oo/f]0ok5[@On`K4;o[F]5ojYZBonWJTooYVaolE`D_o6Ke;oaV]EolAVF?o?ODgobXQ>okEaH_niLUoo^6mQokMbHoneMFSo/g1/ok=` J_nbLVWoZfQ/ojAOLon`J6So/VUTojQUKonMHGgoTER9ohm?S_nPS?nVWHSo[9F5ol67 S_oWQGoT:H>oin/2_nV[@koY:`?oj:/3_nS[0ooY:`@00;oYJ`@01;oYJd@ojF/ 4OnU[1;oYJdBojF]4onR[A;oXj`Aoj>/4_nS[17oXj`@oj>]4?nT[0koYZ`=ojF]3_nU[@goXjd/:_o0[Sko_Jhiokb]=_nn[SSo_Jdk okf]?onl[T3o`:i2okn^@onO[CGoSJX[oh^Z;?n?[BkoVjleoj^^?Onc[3ko/Z`loj^`?on`[cko]J/k 00;o]:`m0_nb[Cd01?nd[3go]:`lok6^>?n`[C02ok6/;`0Jok:/;on_[3;o[J`hojf]>?n/[3So[:`g ojf]>?n/[COo[:`hok6[>OnfZ3SoZk4loh3=?omRdRooH//Wof3<9omMcBSoG<`Voec;9_mJcBKoH/XV oiFd;_nbYBkofHHHonUi4?oYN@l2onUj4003onUi4?oYN@oojGT@00;ojGT@00?ojGX@onUi4?oYN@l0 0_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@00?ojGT@onUi3ooYNA00 0_oYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi4?oYN@oojGT@00;ojGT@00?ojGX@onUi4?oYN@l0 0_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@00?ojGT@onUi3ooYNA00 0_oYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi4?oYN@oojGT@00;ojGT@00?ojGX@onUi4?oYN@l0 0_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@00?ojGT@onUi3ooYNA00 0_oYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi4?oYN@oojGT@00;ojGT@00?ojGX@onUi4?oYN@l0 0_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@00?ojGT@onUi3ooYNA00 0_oYNA000ooYNQ3ojGT@onUi3`02onUj4004onUi4?oYNQ3ojGT@onUi40?ojGX@0ooYNA001ooYNQ3o jGT?onUj4?oYN@oojGT@onQh4?oYN@l00_oYNQ02onUi4003onUj4?oYNA3ojGT?00?ojGX@0_oYNA00 0ooYNQ3ojGT?onUj4002onUj40;ojGT@00Coj7P@onUi3ooYNA3ojGT@0_oYNQ001?oYN@oojGT@onUi 4?oYNA02onUj4003onUi4?oYNQ3ojGX@00;ojGX@0_oYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi 4?oYN@oojGT@00;ojGT@00?ojGX@onUi4?oYN@l00_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj 4?oYNA3ojGT?00;ojGX@0ooYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi4?oYN@oojGT@00;ojGT@ 00?ojGX@onUi4?oYN@l00_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@ 00?ojGT@onUi3ooYNA000_oYNA000ooYNQ3ojGT@onUi3`02onUj4003onUi4?oYN@oojGT@00;ojGT@ 00?ojGX@onUi4?oYN@l00_oYNQ000ooYNA3ojGT?onUi4002onUi4003onUj4?oYNA3ojGT?00;ojGX@ 00?ojGT@onUi3ooYNA000_oYNA000ooYNQ3ojGT@onUi3`02onUj4004onUi4?oYNQ3ojGT@onUi40?o jGX@0ooYNA001ooYNQ3ojGT?onUj4?oYN@oojGT@onQh4?oYN@l00_oYNQ02onUi4003onUj4?oYNA3o jGT?00?ojGX@0_oYNA000ooYNQ3ojGT?onUj4002onUj40;ojGT@00Coj7P@onUi3ooYNA3ojGT@0_oY NQ001?oYN@oojGT@onUi4?oYNA02onUj4003onUi4?oYNQ3ojGX@00;ojGX@0ooYN@l3onUj400000Co jgdFonYl5Oo[OQGojWhF0_oZO1D01_oZOQKojW`EonYl5_oZOQKojW/Eon]n5@;ojWhF00?ojglFonYk 5OoZOQH00_o[OQD04_o[OAKojW/EonYn5_oZOQKojglFon]m5Oo[OQGojglFon]m5_oZNaGojW`Fon]o 5_oZOQKojglFon]m5_o[OAGojglFonYn5P;ojghE00GojgdEonYl5Oo[OQGojW`Eon]m5@03onYl5@0: on]n5Oo[OaKojgdEonYn5_oZO1GojglFonYn5_o[OaKojghEonYl5@;ojghE00?ojglFon]m5_o[OaH0 0_o[OaH01?oZO1KojghEon]o5_oZO1H2on]o5P0?on]n5OoZO1KojgdFon]m5OoZO1KojW`Eon]o5_oZ OQKojghEon]m5_o[OaKojWhFon]m5OoZOQKojW`E00;ojWhF0_o[OaH2onYl5P03on]n5OoZOQKojghE 00;ojgdF00SojW`EonYl5_o[OAKojghEonYn5_oZO1GojghEonYl5@;ojW/E00KojgdEonYn5_oZO1Go jWhFon]n5OoZNaD2onYl5P0>onYl5Oo[OQGojWhFonYn5_o[OAKojW`Eon]o5_oZO1GojW/Eon]m5_oZ OQKojghEon]m5Oo[OAH2on]n5@03onYn5_oZO1GojW`E00;ojWhF00CojglFon]n5OoZO1KojW`E0_o[ OaH06ooZOQKojghEonYk5Oo[OQGojglFonYn5_oZO1GojgdFonYl5OoZOQKojghEonYl5_oZNaGojghE onYl5_oZNaGojglFonYn5_o[OQGojW/Eon]o5_oZNaGojgdFon]n5OoZO1KojgdFon]o5P02on]m5@04 onYn5_oZO1GojW/EonYn5P;ojglF00KojW`EonYn5_o[OaKojghEon]m5OoZO1D2onYl5P07onYl5OoZ O1KojgdFon]m5_o[OaKojgdEonYl5@02onYn5P09onYl5_o[OaKojglFonYl5_o[OaKojghEonYn5_o[ OaKojghE00?ojgdF00_ojglFonYl5OoZO1KojgdEonYl5_o[OAKojghEonYl5OoZNaGojglFon]m5@02 onYl5P04on]o5_oZO1GojW`Eon]o5P;ojW/E00SojWhFon]n5OoZOQKojW`Eon]n5Oo[OAGojW/EonYl 5@;ojW`F00?ojW/EonYl5Oo[OaH00_oZOQH01Oo[OAGojW`FonYk5OoZO1GojglF00;ojW`F00cojWhF onYl5_oZOQKojW/Eon]m5_oZO1GojgdFonYl5Oo[OAKojW/EonYn5_o[OAH2onYk5@09on]o5_oZOQKo jW`EonYl5OoZO1KojgdEon]m5_oZO1KojgdF00;ojW`E00[ojghEonYl5_o[OaKojglFon]m5_o[OAGo jWhFon]o5_o[OQGojglF0_oZO1H07Oo[OaKojWhFonYk5Oo[OAGojW`EonYk5OoZOQKojW`Eon]n5OoZ OQKojghEonam8?o`NDSolWeJoo5lE?oaOE?olGiCoo5lE?obOUGolGaEoo5kEOobO5?olWaDoo9kEoob O5Sol7eAonn0AOo^PcgokX_o_ PcookX8nonn2?Oo_PCkokh8nonn1?Oo_PCookX8oonn3?oo^PSkokH0joo22C_o`OVGol7mUoo61H_o` P67ol85Soo60HOo`P6400_o`Of402OoaPF?olH5Uoo21GOo]OTWok7hkon]k>_o[Ncook7i0on]m?`02 on]k?`;ok7a000?ok7doon]m?oo[OCl00_o[OCl0AOo/OSkojge0onen@_o/O4;ok7e3onamAOo/O4?o jgdeonakA?ocIWgomDnJooEFTooeFXkomEZ?ooEJTOogHISon6JDoo]WQ_ojJHSonVR8oo]OOOokHhGo nVB6ooUUM?ojIWSonfB7oo]MP_ojDW;onUEmooYGO?ojBUWondmOoo]DN?ojFHGonV6=ooaFQoonA7Go oEFZooe1Joon?dWooE=RooeKKOomDfKooT9@oode?ool_oc@6;okDBComPmXOo9=:WoaC:XolHfXoo3<[3o _bg8olLdb@02ol/fa@1Nol/f`oo:=/CobcO3olXf`_o8onfM3So `6m0omAWC_oGJ4oodV]?olMZE_o0Ie[oa6e@olQ`A_o7K4[oa6Y>ol5WD?o5JE3obfeIZ_oUZ:GohcojRXRonS[8[oXZB:ojJJR?nJ XHSoVj:9okF8SOnlL8go`fNoij^3`02oin^400Eoj:_4OnS/1CoYZlFojR^5onV [aKoY[0FojJ]5OnT[QKoXjhFoj>^5OnT[aGoY:lFojB`5OnT[a?oXZlAojBa4OnV[Q;oYZhCojF^4_nW [Q;oY[0B00;oY;0B00SoZJlDojN_4onCYPgoSIh>oj^^;_o9/4Ko_k0mokfa?`;o_[56033o`K17ol>_ A_nZ/CcoSZ`^oh^^;onD/3KoYK4mok:a@_nd[d;o/K10ok:]?on`[Soo[[A2ok>_@Onf[Coo]Ji0okB^ ?onc/43o]:m1okF`@_na/3co/Jhcok>`On^[Sco[jlkojf`>on^[c_o[Zhkojf^ >on^/3_o[Jhkojn]>ondZS[oYKY4ohCCA_mbdC_oJonYl5Oo[OQGojWhFonYn5_o[OAKojW`Eon]o5_oZO1GojW/E on]m5_oZOQKojghEon]m5Oo[OAH2on]n5@03onYn5_oZO1GojW`E00;ojWhF00CojglFon]n5OoZO1Ko jW`E0_o[OaH06ooZOQKojghEonYk5Oo[OQGojglFonYn5_oZO1GojgdFonYl5OoZOQKojghEonYl5_oZ NaGojghEonYl5_oZNaGojglFonYn5_o[OQGojW/Eon]o5_oZNaGojgdFon]n5OoZO1KojgdFon]o5P02 on]m5@04onYn5_oZO1GojW/EonYn5P;ojglF0OoZO1D1onYn5P7ojglF00001Oo/PA[ok84Konb06_o/ P1_ok84K00;okH8K0_o/P1/2onf26`0Konb16oo/P1[ok80Jonb16oo/PA[ok84Konb06_o]PQ[ok84K onb16_o/P1[okH8Konb16oo/P1_ok84Jonb06_o]PQ_ok80Konb16_o/P1_ok80Jonb06oo/PA_ok80J onb16oo/PA[ok80J00;ok84K00Kok80Jonf26oo]PQ[ok84Konb06oo/P1X2onb06`07onf16_o/PA[o kH8Jonb06_o/P1_ok84Jonb16`02onb06P0:onf26oo/P1[okH8Konf26oo/PA_ok80Jonb16oo]PQ_o k80Konb06PCok84J00ook80Konb06_o/PA[ok80Jonf16_o/PA[okH8Jonb16oo]PQ_ok80Jonb16oo] PA[okH8Konb16_o/PA/00_o/P1/01oo/P1[ok80Konb16_o]PQ_ok80Konb16_o]PQ/00_o/PAX01_o/ P1[ok80Konb16_o]PQ_ok80Konb06P;ok84J00?ok84Konb16_o/PA/00_o/PA/01oo]PQ_ok84Konb1 6_o/PA[ok80Jonb06oo/PA/00_o/PAX01_o]PQ_ok80Jonb16_o/PA[okH8Konb06P?ok80K0_o/PA/0 0oo]PQ_ok80Konb16P02onb06`09onf26oo/PA_ok80Konb06oo/PA_ok80Jonb06oo]PQ_ok84J00?o k84K00?okH8Jonb16_o/PAX00oo/P1/01oo/P1[ok84Konb16_o/P1_ok84Konb06_o]PQX00_o/PAX0 2?o/P1[ok84Jonb06_o/P1[okH8Jonb16_o/P1_ok84J0_o/P1X06Oo/PA_ok84Jonb06_o]PQ_okH8J onb16oo/PA[ok80Jonb06oo]PA[ok84Konb06oo/PA[ok80Jonf26_o]PQ_ok80Konb06_o/PA_ok80J onb06oo/P1[okH8Konb06_o]PAX00_o/PA/2onb16P07onf26oo/PA[ok80Konb16oo/P1_ok84Konb0 6`02onb06P05onf26oo/P1_ok80Konb16oo]PQ/00oo/PAX01oo/P1[ok84Jonb06oo/P1[ok84Jonf2 6oo/PAX00_o/P1X2onb06`0:onb16_o/P1_ok80Jonf16_o/P1_ok84Konb16_o/P1_ok84Jonf16P;o k84K00Cok80Jonb16oo]PA[ok84J0_o/PA/01_o/PA[ok84Konb16oo/P1[ok84Jonb06`;ok84K013o k84Jonb06oo/PA_ok84Konb06oo/PA_ok84Jonb06oo]PQ_ok84Konb16_o/PA_ok80Konf26_o/PA[o k84K0_o/P1/01Oo/PA_ok84Jonb16_o/PA[okH8K00Cok80K02[ok80Jonf26_o]PQ_ok80Jonf26oo/ P1[ok84Konf16_o/PA[ok80Jonb16oo/P1kol7`loo=mF?obOUKolgmDoo9nEoobOeOolh1Hoo9oF?ob OeOolWiIoo=nFOobOUOolgmHoo9mF?ocO5[olgmFoo62COo_QD7okh@noo25@oo`QDCokhE2oo25AOo` QD_ol8E7onn4?oo`Q3ookhE2oo25@oo_Q482onn4@`03onn3@Oo_Q4?okhA200;okhA200Cokh=0oo24 B_oaPV;olH5X0_oaPVD04OobPfColH9Uoo62I?oaPVColH9Uoo63J?obPfKol89Jonj0B?o]OcookGm1 onf0@oo]OdGokGm3onf0A?o]P4?okGm300;okH120?ookGm3onj0@_o]P4?okH12onf0AOo]OdKokWm8 oneoBOo]OdSokGm5onioA_o]P3gokX8koo5`L?ogEISomUNFooIJToofFi;omUVDooEHT_ogG9Con6JH oo][ROokJXOonVN4ooaMO_olHHkonfVDWooC4mooPf@Oo_>D;oic]4onDj@ooZ=T3okcHmonle;Oo_>c7ol3YConj;obCRY ol@eY_o6=JWobcZXolPfZoo3;/3oaC3
    oo0IC[o_FHnokUWAonhJTco^6i=okU`C_niKdoo^Fi=okQ/BonhJd[o]fY: okEZC?ndK4co/F]>ojmZDOncLDco]7M8okAlBOneNdWo^7U8ok]dA?nlLD?o_6m4okeaAOnhMD7o]WHo okMe?oniLSgo^74mokE^?_ndKcco`Va8omAXFOoBKeOocg=EolE^F?nmIE[o`VYEolEaCoo6L53oa6eB ol=/DOo2JEGobFaKol]`F_o8M5SoagILolQ^Foo9JV3obF]Pom:5E?o9Re_o]7A/okIcK?nhLf[o]GA] ok9`K_nfKfgo]W1/okQfKOnbLgSo[feookUbMonkM7Go^W9bok]bKOnmLV_o_gA[ol1fJoo2LfGo^79a oib;WOnNYJSoYjBOojBVXOnTYj?oX::VohbF]?n8UKWoT9:doiRK[OnIXZgoS8:gohj6^on@`IWoQ=5e ogoDN_nS/hWoeWRHoknIVonUb9goZl2Ooj^jWOnZ^I_oZKfLojVmWOnZ_j3o[/f[ojoC/_n^cjoo[L^[ ojgA]?n]e[So[lV/okR]TOnkUGOo_9Ecok^IM?nkV7?o^Xm`okV8KongQVoo]hU]okN7KOngPfco^H9Z okR0JOnhP6[o^Gm]okUnKonePG3o]XAbokN5O?nfOhGo/gF4okAfJ_nfMV3o/gIVok5iI?nbNfCo/X5] ojn3MonZS83oZYV7ojVRR_n[XhcoZJZ?ohg6SOmgbX8001koPkJ3oi^TR?nZQ8[o]g69olAWTooAH9oo aIALokR_=?na/CWoZkYc_oj9/monjL?OoSWSWoeJ8bolfW;Oo9[2[o`ZhVokZa9?na/Aoo Y[4Hoj6`5?nO/ACoX;8Foj6a5_nQ/AGoX;8Doj:`5OnT/AL2ojFa5`0VojJa6?nW/1WoY[4IojBb6?nT /QOoY[8IojJa6OnW/ASoYk4GojNa5_nX/AGoZ;0FojNa5OnY/1Go[[0Hoin`5?n=X1;oSiTBoiFS5_nh /cSob;A>okjbB_nn/TSo`K57olFaB?n`/T7oS[4cohjb=?nN]3go/;93okFaAOnc/DCo/[53ok:a@_nb /D?o];52ok6a@on`]4D2okJa@`0AokFa@ond/DCo][53okFbAOna/Sko/k8eok>`=Onc/CKo/K4gojja ?_n_/3oo[k0nojja?_n_/Cko[[4nojjc?_n_/3h00_n_/Cl03_n`[cgo/Zhmoic4B?n3eT[oOM52og?? >?mTcbooGLhZof3>:omHd2SoD/dVoiV[9ooUQ1gok84K0_o/PAX00oo]PQ_ok80Jonb16`02onb16P03 onb06_o/P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03 onf26oo/P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX00oo]PQ_ok80Jonb16`02onb16P03 onb06_o/P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03 onf26oo/P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX00oo]PQ_ok80Jonb16`02onb16P03 onb06_o/P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03 onf26oo/P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX00oo]PQ_ok80Jonb16`02onb16P03 onb06_o/P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03 onf26oo/P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX01_o]PQ_ok80Jonb16_o/PA[okH8K onb06P?ok80K0_o/PA/00oo]PQ_ok80Konb16P02onb06`09onf26oo/PA_ok80Konb06oo/PA_ok80J onb06oo]PQ_ok84J00?ok84K00?okH8Jonb16_o/PAX00oo/P1/01oo/P1[ok84Konb16_o/P1_ok84K onb06_o]PQX00_o/PAX02?o/P1[ok84Jonb06_o/P1[okH8Jonb16_o/P1_ok84J0_o/P1X01Oo/PA_o k84Jonb06_o/P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb1 6P03onf26oo/P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX01_o]PQ_ok80Jonb16_o/P1[o k80Konb16`;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03onf26oo/ P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX00oo]PQ_ok80Jonb16`02onb16P03onb06_o/ P1_ok84K00;ok84J00?okH8Konb06_o/PA/00_o/PAX00oo/P1[ok80Konb16`02onb16P03onf26oo/ P1[ok84K00;ok84J00?ok80Jonb06oo/PA/00_o/PAX00oo]PQ_ok80Jonb16`02onb16P03onb06_o/ P1_ok84K00;ok84J00KokH8Konb06_o/PA[ok84Jonf26oo/P1X3onb06`;ok84K00?okH8Konb06oo/ PAX00_o/P1/02Oo]PQ_ok84Konb06oo/P1_ok84Konb06_o/P1_okH8Konb16P03onb16`03onf26_o/ PA[ok84J00?ok80K00Ook80Jonb16oo/PA[ok80Konb16oo/P1[okH8J00;ok84J00Sok80Jonb16_o/ P1[ok80Jonf26_o/PA[ok80Konb16P;ok80J00Kok84Konb16_o/P1[okH8Konf26_o/PA/1onb16P00 00CokXDPonj48?o^PaookXDP0oo^Q2000oo]Pb3okX@Ponj48003onj48003onj58?o]PR3okX@P00;o kX@P00WokH8Oonj48?o^Q23okH8Ponj48?o^QB3okX4F?oaR4WolHM2oo68AooaR4_olHI=oo66AooaQd?olHQ5oo68AP;olHI600golHM5oo67 AooaR4SolHM6oo66A_oaQdKol8E7oo68A?oaQdSolhEPoo:5J_obQ6SolhAY00;olhAX00golhEYoo>4 IoocQ6WolhA]oo>5J?o`PUOokh=7onn1A?o_PTOokh=8onn2B?o_PdSokh9800;okh5700[okh=7onn2 B?o_PdWokh98onn2BOo_PT[okh9;onj1C?o_PTcokh=;0oo_PTP0ooo_PdKokh@ooo5jH_ogFYSomeRJ ooIKU_oeFYKome^EooMKU_ofFiCom5Z>ooISU_okL8[onfZ8ooaQR_omFHGoo6:@oo]XSOokJXgonf^= oo]QPOokF7Wonef8oo]FL_okCE_one1boo]EQ_okGh_oneejooi:K_onChKooFFXooaSZOolHJcoo62o ooaD]oom@X7ooSa=ooi>DoomGg3ooUM^ooi6E_om=TGonSOoY=b_ojCPV onLo<_oY?EcoiS^:on@iXooD=:[oaCFZol@gZ_o:>Z[ocCZ]olPd]?o6;kgoc3;2oldhaoo:>:Kog3:[on0dZooS=jcohCF]omdd[_oO=jgohSZ^omhd/OoG;k3og3>[on0eZOoO=jSogSR_ omLg]_o=C@OocUT;olYY3oo6K@_o^WD7oiIhoombT>OoDZS?ocJ/aolR`;_o1/R_o]K_n[ ]4Co][=8okFcAonc/dKo/[96ok>dA_nc/dH2ok>dA`06ok>cA_n`]DSo/[M9okNcAong/dKo]K960_nf /dL03Onc]47o/k?nd/cWo/K7KOocQfcolhM[oo>7K?obQFgo lhM/oo>6KOodQfkom8M_oo:6I_o`QU;okXA6onj4BOo`QD_ol8E<0oo`QD/01Oo_Q4_okhA=onn4Boo_ Q4col8E<00;ol8E>00Gol8I?oo25D?o`QDkokhAUooaW[?ol HJgoo630ooe=[_on>V_ooSe4ooeGGoomGWCooDmUoodjC_olYCog3N/om/c[_oE=:OocSBZolXh[_o;?:_oc3^^olLc^_o8/OobSO:oldia_o;>LOobCK8olL_b_o;<:l2omle[`3Nomlg[ooS>ZoohCRaomH`/_oHokQ^E_njKUCo_G5Aokeb D?nmLe7o^g9BokaaDOnjLe?o^G9DokAbF?ncLeSo]WMEokQgE?niMU?o^gM@ok]eConkLdco_G98okib A_nnM4So_W=9okefB_nkMd_o^GI0M?ncOf_o]7aWokEgIOneLEgo/gUQok5m JOncOWCo[9b3ohfkQomobHcoPLj@oh7=T?mmchcoPN6onBX1_oTIhNoi:M7OnL[2co_[M=olZgEOnm]dgoWkQ2oiff @?nd]D[o^;E;ok>eB_nb]DWo/kI90_nd]DT2ok>fBP;o/kE:00Co];I:ok2hCOnd]d_o^;I:0_nf]TX0 3ong]DWo];I4okBd??ne]3_o/kHmok6d@_n`]4Ko/KE5ok2fAOna]DCo/[E5ojnfAOn^]DGo/KA5ok6e A@02ok2dA@0=ok:eAOnf/T?oZKa8ohODBon0ed[oQM9:oh7BB?mldTGoKm8oog^f9onFW1oo`I4Sonj8 9@02onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_R2D2onj69@03onn89Oo^QRGokXHU00GokhPU0_o^ QRD00oo_R2GokXHUonj69@05onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_R2D2onj69@03onn89Oo^ QRGokXHU00GokhPU0_o^QRD00oo_R2GokXHUonj69@05onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_ R2D2onj69@03onn89Oo^QRGokXHU00GokhPU0_o^QRD00oo_R2GokXHUonj69@05onn89@;okXHU00?o khPUonj69Oo^QRD01Oo_R2D2onj69@03onn89Oo^QRGokXHU00GokhPU0_o^QRD00oo_R2GokXHUonj6 9@05onn89@;okXHU00?okhPUonj69Oo_R2D01_o_R2D00oo^QRGokhPUonn89@07onn89@03onj79Oo_ R2GokhPU00KokhPU00?okXHUonn89Oo^QRD00_o_R2D2onj69@;okhPU00?okXHUonn89Oo_R2D02_o_ R2D00oo^QRGokhPUonj69@05onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_R2D2onj69@03onn89Oo^ QRGokXHU00GokhPU0oo^QRD5onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_R2D2onj69@03onn89Oo^ QRGokXHU00GokhPU0_o^QRD00oo_R2GokXHUonj69@05onn89@;okXHU00?okhPUonj69Oo^QRD01Oo_ R2D2onj69@03onn89Oo^QRGokXHU00GokhPU0_o^QRD00oo_R2GokXHUonj69@05onn89@;okXHU00?o khPUonj69Oo_R2D01_o_R2D00oo^QRGokhPUonn89@07onn89@03onj79Oo_R2GokhPU00KokhPU00?o kXHUonn89Oo^QRD00_o_R2D2onj69@;okhPU00?okXHUonn89Oo_R2D02_o_R2D00oo^QRGokhPUonn8 9@03onn89@;okXHU00001OoaRR[ol8XZoo6;:_oaRR[ol8PZ00;ol8XZ00?olHXZoo2::_oaRbX00_oa RbX00oo`R2[olH/Zoo6::P02oo6;:P;olHXZ00?olH/Zoo2::_oaRRX00_oaRbX2oo6::P03oo2::_oa RR[olH/Z00?olH/Z00GolHXZoo6;:_oaRb[olHXZoo6;:P02oo6::P03oo6;:_o`R2[olH/Z00;ol8XZ 00golHXZoo2::_o`RR[olH/Zoo2::_oaRR[olH/Zoo28:_oaRb[ol8XZoo6::_oaRb[ol8XZ00;olHXZ 0ooaRbX01oo`RR[olH/Zoo6;:_oaRb[ol8XZoo6;:_oaRRX00_oaRbX00oo`R2[olH/Zoo6;:P02oo6; :P04oo6::_oaRb[ol8XZoo6::P;olH/Z00?ol8XZoo6::_oaRbX01?o`RRX4oo6;:P;olHXZ0ooaRbX0 1Oo`RR[olH/Zoo6;:_oaRb[olHXZ00;olH/Z00Ool8XZoo28:_o`RR[ol8XZoo28:_oaRb[olHXZ00?o lH/Z0_oaRRX01?o`RR[olH/Zoo6;:_oaRRX3oo6;:P06oo6::_oaRb[olH/Zoo2::_oaRb[ol8XZ0ooa RbX00oo`R2WolH/Zoo6::P05oo6;:P05oo28:_o`RR[olHXZoo6;:_oaRRX00_o`RRX3oo6;:P03oo2: :_o`RBWolH/Z00?olH/Z00ColHXZoo6;:_oaRb[olHXZ0ooaRbX00ooaRR[olH/Zoo6;:P02oo6;:P04 oo2::_oaRb[olH/Zoo2::P;olH/Z00?ol8XZoo6;:_o`RRX00_oaRbX01?o`RR[olH/Zoo6::_o`RRX3 oo6;:P04oo6;:Oo`R2[ol8XZoo28:P?olH/Z00_olHXZoo2::_oaRR[olH/Zoo6::_o`RR[olHXZoo6; :_oaRR[ol8PZoo2::P04oo6;:P05oo6::_o`RR[ol8PZoo6;:_o`RRX01OoaRbX00ooaRR[olH/Zoo6; :P02oo6;:P03oo2::_oaRb[olH/Z00;olH/Z00OolHXZoo6;:_o`R2[ol8XZoo6;:_o`RR[olH/Z00?o l8XZ00ColHXZoo6;:_oaRb[olH/Z0_o`RRX4oo6;:P06oo6::_o`RR[olH/Zoo6;:_o`RR[olH/Z0_o` RRX00oo`R2[olHXZoo6;:P04oo6;:P04oo6::_oaRb[olHXZoo2::PColH/Z00Gol8XZoo6;:_oaRb[o l8XZoo6::P03oo6;:P04oo2::_oaRR[olH/Zoo28:PColH/Z01Col8PZoo29:Oo`RR[olHT/oo>2B?of QFcomXETooF5G_ofQ63omXERooF4H_ofQF;omXEQooJ5HoofQ6;omXERooF5H_oeQ6?omH=QooF5HP;o mXES0_ofQ6809?oePfKomXIXooB:F_ocS4golXY;oo>=C_ocS4kom8a?ooB=CoocSDkom8e?ooBooBoo>=B_odS5KomHU^ooB8L?oeR6oomHU_ooF9L?odR77omHQaooF9M?od RFoolXMPoo67DOo`Qd_olHQ>oo68D?o`Qe3olHQ@oo27D0;olHQ@00golHE@oo67D?oaQe3olHMAoo67 DooaR5?olHMBoo:8DOobR53olXM@oo:8D?oaQe3olHMA00;olXQA00WolHY9oo68DOodKXGonEBWooQM W?ohGYSomefJooMPV?ohGiP00_ohGiH0ooogEigon4V_ooe?[_omHI[oo627ooeOPoolJi3oo6jAooa] S_olH87oo5j9oo]SR_olF6goo5AhooaHS_olGhconf9fooaFK?onBWSooV6NooeZ/?omH[;oo5jkooe8 VOon=eWooTM=ooeOK?omFg?ooDIKoodfB?oh=TSok3a9on8o@?oQ?COohSXOonDm7OoY?CooiSmcon8j WooH=ZkoeC>`omLd[_oG=:SoeC>Woldh[Oo;?ZcobSb_olPe_?o9l3ocS[6ol`h bOo<>LSob3G:ol/bb_o<DIgocef;olaKS?o>FI7oedjPon4k [_oS=ZgohcN/onK3ogcN`on0f/?oP=[7ohcZconZkofSB]olhf[?o4?Igo_bjiolHRf?o69TEoo/G1hokIcN_njNg[o`7edolEmL_o6O7Co`7QhokaiNOnbL8?o^gAmolQl L_o7OWGo`G]kol1jOOo1Nggoa7ejolAlNOo5O7Goa7]dolQjLOo9Mg;o[X2Eoj6TZ_nXZJGoZ:JTojJP YOnJRJgoVHn^oiJ>/onPVZkoXin]oj6N[OnLT:ooVh^coiRmXOn>eH7oUToik?YOnRcZCoYLZQol>jM_oO_VSoel9domO0KooM`6WogL1ZomRjJ_o<^WGo_lFAok>o UOndZhWo^ieook^HOOnlWGgo_:1kokjPN_nlV7Ko^XicokZ3M?ncPG3o/gm[okAjJ?ndNFWo]7]VokIi I?nfNVOoZX]/oiJQMOn8]gooQ= AOoaQD?okXM2onj?@oo^UDCokYU5onnLAP002?oaWTKolYi6oo:LB?ocV4[oliI:oo>EB?oeUTWomYQ: 0_ofUD/07OofVT_omJ5;oo6VBooXYDSohJI4omN[?Oo=[SKoa;h7onK]1goUJLNoiNR8OnFY1ooU:@RoiFT9_nEXBGoTj8Qoj2aok>jC_nh^4go^KM= okNhCOnf^4go]KQ8okFh@?nf]cko];M2ok:gB002ok>gB006ok2gAona]dOo/[M8ojnhBOn`^4So/kI8 0_nb]dP03onc]dSo/KQ8ok:fAond]4KoVlI@>;`09oo:= ;oocSS3olXlaoo:>>@> >;oocSRoolXha00;olhh`00?olXd_oo>>?;`02oo>?;`03oo>>;oobSBoolhh`00;olXha01golhh`oo:>?;oocT33olhh` oo:>@@>>;oobSc7olhh`oo>@<003oo:><@08oo>>>><@07oo>><@06oo>><004oo>>;oocT33o lhl_oo>@<0;olXla00?olXhaoo>@>?;oocSS03oo:><@0>>;oocSS3olXlaoo:=;oocSS3olhh_oo>@ ><006 oo:??;oocT33olXla0_obSS401_ocSS3olXd_oo>>;oobSBoolhl_oo>@<0;olhh` 00OolXlaoo>>>;oobSc7olhh`0_obSc40 0oocSS3olXd_oo>>;`02oo>><007oo>@?;oocT33olXhaoo:=;`03oo:><@0;oo>> ;oocT33oli0`oo>@?;oobSBl00_obSS403?obSc7olhh_oo>> ;oocSS3olXhaoo>>@@@><@02oo>><0;oli0`00Golhh_oo:?><006oo:=;oocSS3olXhaoo:>@:G@02oo>:DP0Boo::EOocRUGolhYEoo:9EOocRUGolXYFoo:9EOocRUKolhaFoo::EoobReWo lXUEoo>:EoocS5KolX]Eoo>;EOobRU?olh]E0_ocS5H0EOocReGolhaFoo>=D?ocS4gom7egooUMXOoj G:3onF:JooQOW_oiGikonF:JooQQV_ohFikonU:/oo/na?ol=/coo5NXooa[ROomGh?ooFF:ooa_TOol Ki3oo6R9ooaRQ_olHX_oo5McooeBN?olG9;oo6NBooa/POomGW?ooTacooiISoomJ[7ooFBmooeG]?on ?WkooSI7ooiBG?omI7_ooE=[oodkCOoj=dSolSe>onQ0A_oP@SGohSdVon@o9ooY@Tooj3mlomhmX_oF =K7odc>comLe[_oK=JgofCFZomHeZ?oF=ZcocSj^olTm/oo7lKobSWFI?ofE6Oon97[_oU >[Coi3Z^onK800_oR>[40g?oO>;?ohCJeon@k]OoS>kCogSNbomDd/_oIol1kD?nnO57o_7Y>okilB_nnNd_o_Ge;okf1COnnQDko_8M=okj6Coo? OEgoe7YPom=kGOoCO5gocgYNol=cHOo1KVKob7QOolYjGOo:MfCocGUSolmlHOo>NF;ocG=/olifKOo< Mg3ocWYXoliiI?o;KW3og95Jom2EIOndMGgo_7Ulol5nN_o2OWSo`gejolAmN_o1NWgo_WYlok=cQonm MX7obGifolQoMoo5OWco`G^1ol5kP?o7OgcoaWmnolF0O_o4OWgoaGakolimL_o9NGKoZhZNojJ`[OnX Z:SoZZNUoij@[OnHS[7oUi6aoi^D/?nUX:goXin^oj>Q/?nNTKCoWiNeoiS8X?n?eh?oVLn?oiO@T?nA dHOoVM>HoioCYOnOeJSoW]FXoikAXOnNdZ?o]OC?ob WD_olYaoo>TCoo[YDkoi:M8omRZ@?o? [c[obkHiokRiiC_nf ^582okFiD`0`okNiD_nf^E;o]kU?okJiD?ne^U7o]KYBokJiD?ne^Doo][U@okFiDOnf^E7o];YBokNk D?nj^E7o]kY@okNkD_ne^dgo]K]4okFk@onc^TWo/kUEon8fEOoRMECohWDD_n9eEGoT]=FojW0 @OnS]3;o[j>;oocSS3olXhaoo:?>;oocSS3olXhaoo:?>;ooc SS3olXhaoo:?>;oocSS3olXhaoo:?>;oocSS3olXhaoo:?>;oocSS3o lXhaoo:?>;oocSS3olXhaoo:?>;oocSS3olXhaoo:?>;oocSS3olXha oo:?>;oocSS3olXhaoo:?>;oocSS3olXhaoo:?>;oocSS3olXhaoo:? >;oobSS7oli0`oo>>;oobSS401_ocSS001?ocSRooli0` oo>?;oocT302oo:?<@03oo:>@>;ooc T33olhh_oo:><@;olhh`00OolXhaoo>>;oocSS3olXhaoo:? >><@08oo>>>><@08oo>>>><@08 oo>>>><@08oo>>>><@08oo>>>><@08oo>> >><@07oo>><@06oo>><004oo>>;oocT33olhl_oo>@<0;olXla00?olXhaoo>@>?;oocSS03oo:><@0>>;ooc SS3olXlaoo:=;oocSS3olhh_oo>@oofRESonHY]00;on8YZ01?on8UYooR9J?ohRFWon8YZooR9J_ohRFSon8YXooR9 J?ohRf[on8Y[ooR;K_ohRFkon8Q[ooR:J_ohRV_onHU`ooV:L?ohRV_omh]Y00;on8U/00_on91SooNC FOogTeOomY=IooNDFOogTeSomi=IooNDFOofTeWomY=JooNCFP02ooJCF006ooNAJOogSW[omhihooN> MoogSgOomhig0_ogSg/05_ofSVcom8iNooB?F?ocSUWom8eKooB?FoodSecom8mKooF?FooeSU[om8iL ooB=GOodSUgomHiLooB>FooeSe[omHmIooB?FoodSe[om8iIooB?FoodSUX2ooF?F`1oooF@F_oeSeco mHmIooFBCooeRVWonFRJooYMXoojI9gonFBOooQOXooiHikonF2OooYF[OokB;kooCS4ooaSS_omFWcooE9eooeMTOomJ93oo6j4ooaXO?onDWKo oU^:ooeY[OomI<3ooDfXoohfI_on?TKooUe]ooiQOOomB5koncI1ooZgobSbeolLe`oo>=LWo ecg2omU0__oC>/?odCW5omLl`_oC>/WobSKBol/bcOo:;L[oa2C@ol0Tcoo4=[oocE2UoliOTOo?HXko cU^Com9GVooRD:Wok46eonLi]_oS>[?oi3^don;Soi3Zhon;?ohcVbonKOo cSbeokebKonoOF3oa7aPolEjG_o6MeooaGEOolIeG_o5MUko`GILol5iG?o0N5ko_gMNol5gFoo2Me[o `7IKol5iG?noNUWo_g]Eol9oD`02ol1jE00?ol5lDoo1OU?o`GiCol5nE?nnO5Co_7a@okenD?nnPe7o _XMAokf7D_noQe;o_HUAol67EooCOf?oeWaT00;oeWeR01KoeGiQolYgI?o3L6WobWYWolimI_o=Nf[o cgiWolmoIOo>O6KocWI^om9lKoo?Ng;ocWUbolijK?o=MG3ogiMLom>JJonmO7oo`7elol9oNonoOH3o `Gb20_o6P7h0XOnnOH;o]GJ9okmkQOo:PW_obh=jolV1O?o2OH;oaH23olZ3Ooo8PX;oaX:2olJ3Poo6 PH?ob81oom:1Loo5Nh3oZYNWojR`/_n^[jWoY9j^oiR=/onJT[;oV8jeoj2M/OnUXZkoYZ>]ojBQ[_nP TkCoY:FeoiKAW_n@f8KoWm:HoicAU?nBdh_oV]FLoj?EZonSe[7oY=F^oj7CZOn^dI_ocLEfom;8M?o> aGWobl=jom73M?oEa7?oe<=homFoN?oI_77of[m]omS0LooE]Vkob:A`okbJNonjUWco_9UmokfMO?nn WW[o_Yahok^GMonkTGGo_8ecokb9M?nmR7?o_HQaokZ9L?nkQ6oo^h5fokR0KongQ77o]h2=okIkS?ne OgKo]XA`okJ6N?ndPGGo/h5^okB1L?neP77o/gi[oj^1I_ndM6;o/WIPojJ9HOnXREoo[h9NojbAI_n[ VHGoXKAQojblB_o_ TTgokYEQD?odXdoom:A@oo:QDOobWe7olYiAoo:MD?obWU3olY]@oo6KD?oc W57oliU@ooBHDOoeUU;omYUCooRIE?oiWUGoh[IAokbm?Onc_3Ko[[`goink=_nD/cKoTj`aoi6];?nK /b[o[[@^ok^a=Ong/SKo];DhokFg@Onc^DKo/ka;ok>lD?ne_EOo]keHokVlF?ni_EOo^;aEokNkE?ng _ECo][eCokJnEOng_EGo]kaDokJnEOnh_eKo^;iDokRmE?nf_E3o]ki7okFnB?nc_e3o/keB00;o];e@ 01_o];e?okJlD?nc_E3o/[a?ok>mC_nc_Dgo/Ki?ok6mCond_E7o]keCokRmDong_UGo^kYBok;0EOnB eeWoQ]]Foh[FEOn9eEGoRMMGojS8C_nk_4GoYl0mom>S=oodTSKomI@gooFC=_oeU3L00_odTcL02?oe U3OomIooNG??ofUScomiPlooNH??ogUcgomYHmooNG??ofUcgomYHlooNG?OofUSgomiPl ooJF??ogVCd2ooNH?009ooJG?OogUcgomYDlooNG?OofUScomiPlooNG??ofUCcomiPl00?omYDl00So miPlooNG??ofUcgomiPlooJG?OofUCcomiPlooJG?@;omiPl00komYLmooNH??ofUcgomiLlooJF??og UcgomiPlooJF?OogV3comYDlooNI?OofUSgomYHlooJF?@?omiLl00ComiTmooJE??ogV3comiLm0_og VCd03?ofUSgomiTmooNH??ogUcgomYHmooNH??ogVCgomYHlooNI?OofUcgomiTmooJE?0;omYLm00Ko miLlooNI?OofUScomYLmooJE??ofUSd2ooNG?004ooJF?OogVCgomiLmooJF?0;omYLm00KomiTmooJG ?OofUScomYHmooJG?OogVCd2ooJE?004ooJF??ogV3comYDlooJE?0?omiLm00komYDlooNI?OogUcgo miLmooJF??ofUcgomYDlooJF??ogVCgomiLlooNI?OofUCcomYHlooNH?0;omiLm00OomiLlooJF?Oof UScomYLmooNG??ofUcgomiLl00;omYHm00komiPlooJF??ogV3comYHmooJF??ofUCcomiLlooNG?Oof UCcomYLmooJF?OofUScomiLlooJE?0;omYHm02oomYHlooJG?OogV3comYLmooJF??ogV3comYDlooJF ?OofUCcomYHmooNH??ofUCcomYLmooNH??ofUcgomYHlooNH??ofUScomYLmooJF??ofUSgomYLmooNG ??ofUcgomYDlooNI?OofUScomYLmooNG?OofUScomYDlooNG??ofUScomiLmooJF??ogUccomYLmooJF ?OogV3comiLmooJG?OogVCgomiPlooNG??ofUCcomYHlooNI?@02ooJE?00RooNG??ogV3comYDlooJG ?OofUScomiPlooJG?OofUCcomiTmooNG??ofUCcomiTmooJF??ofUCcomiTmooJG?OogUccomiPlooNI ?OofUScomiPlooNI?OogUccomYLmooJE??ogV3comiLmooJF?OofUcgomYHlooNH??ofUCcomiPlooNI ?@;omYHl00SomiPlooNG?OogV3comiLlooNI?OofUScomiPlooNI?@;omYHl00GomYLmooJF??ogUcco mYHlooNG?002ooJF?@07ooNI?OogUccomYDlooJE??ogV3comiTmooJF?002ooNH?0;omiTm00WomYHm ooJG?OofUcgomYDlooNI?OofUScomYHmooNG??ofUS`00_ogV3`00oofUcgomiPlooJF?002ooNG?008 ooNG?OofUCcomiPlooJF?OofUScomiLmooNH??ogUc`2ooJG?@0GooR@D?ojRg7onXeaooZ>K_ojS6go nXe/ooV;K?oiRfgonXa]ooV;K?oiS6conXe[ooVC[ojd>;OoaSK6om0gb_oJ?/?ofT71om@l`oo?=lOoeCg5omU4`?oA@?om1OTooDEYoogUFTonUBZ_o[@kOoiC^fon[_ohSjgon4l]_oQ>[Kof3Biomhd^_oV>[OoicZhonQ6]ooRCK3ogDVZomi;ZOoR B:gof4F`olE1^?o6:=Cob2o5olTo[oo0F?o1P5Go_h9Col67D_nnREKo_hQEol:9EOo2ReGo_h]GolF3G?oIOVKof7aWomMoI_oH OVOof7mUolehIOo7LfcocWU`om5lK_o?OFgoch1[oln0JOo?OfWocWQ`om9mL_oBPG?ocgaeolafMOo< M7CohiaQomBGLOo1PH7o`Gj0okmnPoo1OX;ob821olV3P?o7Q8;o_gn6ok]jR_o2OXKobXB0ol^3Ooo9 PgooaH63olR1Q?o;QXCobhN4olV3QOo8Q8GobHB5olR3R?o;Ph?odH5hol1oS?nXW:oo[k>aojf[[onO TkKoViBfoiZ@]?nJTKKoX9fbojJR[onXYJooY:2aojFK]OnU/;CoTmBFoi;IROnSdikoW=BFoi;DR_nJ eI[oXmV`ojKH]_nVeJooZljMol_2M?oCaGKod/Mgol[6Noo8aGcodLEfom;5MOo@`g[od<5jom>oMOoG `GCofL9bombmJ?oA/W3o`j9jok^JO_nkVh7o_IUnokjIO?nlVg_o_IYiokbEM?nkT7Go_Hadokj:Lonm SG;o_8mcokf9MonlPWGo^XA]000`okZ2LoniOH?o]WV8okJ0NonfQW?o]H=dokB6N?neQgCo]7]ZokI] Gon]NV;o[GMQokMZG?nbM5co/GMIok5fF?n_OEOo[WMMojn6I?n`^Coo/L8dojo1>?n^_COo[[/fojfj =OnY_CGoZ<0fok:o>_o2^T3odZe5onVUC?odW57olY9@oo:@D?oaT4ookY=?onnID?o`Ve3olIeBoo:L DoobVe?olYaDoo6LDooaW5ColIaCoo6MDoobWUColYaB0oobWE<0<_obW5ComYACoo6XEOoF^Tgoc;e9 olZnCOo4_D[o]L57oiO3AonL_D_o[;m>okNnCOnl_Dko^;U6okZg@Onm]d3o^KDiokNg>?nf^CSo]kU0 okZiB_ng^Tko]KiAokFnEOng_UWo^/1KokZoG?nk`5_o^/1JokRoFOni_eSo]kiGokG1F?nh_eKo^[iG okW1Donh_dWo]/5>okG0E?ne_eGo]kmDokJoDond`5Co][iCok70Don``E;o/[m@ok?1Donf`EKo^KmH 0_nj_UL03oni_eSo]kiGokRnE_nn_EKoZlQIohcMFon7feSoRmMFohKIF?nFd57o^;i8ok?1BOo4]TGo lY`nooNG?002ooNI?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHl ooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI ?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHl ooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHl ooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI ?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHl ooNI?OogUc`2ooNI?@;omiLm00KomYHlooJG?OofUCcomYHlooNI?OogUc`2ooNI?@;omiLm00[omYHl ooJG?OofUCcomYHlooNI?OogUccomiTmooJE??ofUScomiPl0_ogUcd01oogUccomYHmooJF??ofUcgo miLlooJG?OogUc`00_ofUSd03_ogV3comYHlooNH??ofUSgomYHlooJE??ogUccomiLmooJE??ofUcgo mYHmooJF??ogUccomYDl0_ofUSd07OofUScomYLmooNH??ofUcgomYHlooNH??ofUCcomYHmooJE??of USgomiPlooJE??ofUcgomiPlooJG?OofUScomiPlooJF??ofUcgomYHlooJF?OofUcgomiLmooJF??of UcgomYDlooJF??ogVCgomiLl00;omiTm0_ogUcd01_ofUScomYLmooJE??ofUScomiTmooNG?0;omiTm 0_ogUcd03_ofUScomYLmooJE??ofUScomiTmooNG??ogVCgomiLmooJF??ofUcgomYDlooJF??ogVCgo miLl0_ogVCd2ooNG?@06ooJF??ofUcgomYDlooJF??ogVCgomiLl0_ogVCd2ooNG?@06ooJF??ofUcgo mYDlooJF??ogVCgomiLl0_ogVCd2ooNG?@06ooJF??ofUcgomYDlooJF??ogVCgomiLl0_ogVCd2ooNG ?@06ooJF??ofUcgomYDlooJF??ogVCgomiLl0_ogVCd2ooNG?@06ooJF??ofUcgomYDlooJF??ogVCgo miLl0_ogVCd2ooNG?@0:ooJF??ofUcgomYDlooJF??ogVCgomiLlooNI?OofUCcomYHlooNH?0;omiLm 00OomiLlooJF?OofUScomYLmooNG??ofUcgomiLl00;omYHm00komiPlooJF??ogV3comYHmooJF??of UCcomiLlooNG?OofUCcomYLmooJF?OofUScomiLlooJE?0;omYHm01_omYHlooJG?OogV3comYLmooJF ??ogV3comYDlooJF?OofUCcomYHmooNH??ofUCcomYLmooNH??ofUcgomYHlooNH??ofUScomYLmooJF ??ofUSgomYLmooNG??ofUcgomYDlooNI?OofUS`00OofUcd00004ooRL@_ogVT7omiY1ooVL@@;omiY1 0_ogVT83ooNJ@@04ooNJ@_oiW47omiY1ooVL@@;omiY100Con9a2ooVL@OogVT7omiY20_oiW4400oog VT;omiY1ooVM@@02ooNJ@@;onIa100KomiY1ooNK@OohW4;omiY1ooNJ@_oiW442ooNJ@@?onIa100Ko mi]1ooVL@OogVT7on9a2ooNJ@OoiW443ooNJ@@05ooVL@OohWD;omiY1ooNJ@OogVT800_ogVT401Ooi W47omiY1ooNJ@OohW4;omiY200;onIa10_ogVT404_ohW4;omia2ooVL@OogVT7on9a2ooNJ@OoiWD7o miY2ooNJ@OogVd7omiY1ooNJ@_ohW4;omiY1ooRL@_ogVT7onIa1ooNJ@P;omiY100WomiY2ooVL@Ooh W4;omiY2ooVL@OohW4;onIe1ooVL@OogW4800oogVT400oohW4;omiY1ooVM@@02ooRL@P;omiY1013o nIa1ooNJ@OohW4;onIa1ooRL@_ogVT7omiY2ooNJ@OogVT;onIa1ooNK@OogVT7omi]1ooNL@_oiW47o miY10_oiW4400oohW4;omiY1ooNJ@P03ooNJ@@05ooVM@OogVT7onIe1ooNK@OogVT400_ogVT801oog VT7on9a2ooVM@OogVT;omiY1ooVM@OohW4800_ogVd405?ohW4;omiY2ooNJ@OoiW47on9a2ooNJ@Ooi W47on9a2ooVL@OogVT7omiY2ooNJ@OoiW47omiY1ooVL@OogVT;omiY1ooVL@OogVT;omiY10_oiW440 0oogVT;omiY1ooRL@P02ooNJ@@04ooVL@OoiWD7omiY1ooNJ@@;omiY20ooiW4401OogVd7on9e2ooRL @_ogVT;omiY100;onIa100?omiY2ooVL@OogVd400oogVT404OoiW47omiY1ooNJ@OoiW47omiY1ooVL @OohWD;omiY2ooNJ@OohW4;onIe1ooNL@_oiW47omiY1ooVL@OogVT;omiY100;onIa100?omi]1ooNL @_oiW4400oogVT403?oiW47omiY1ooVL@OogVT7omiY2ooNJ@OoiW47omi]1ooNJ@_ogVT7omia2ooVL @@;omiY100ConIa1ooNJ@OoiW47omiY10oogVT82ooVL@@0?ooNJ@OoiW47omia2ooNK@OoiW47omiY1 ooVL@OogVT7on9a2ooVL@OoiWD7omiY2ooRM@_ogVd7onIa100?omiY100Gon9a2ooNJ@OoiWD7onIa1 ooVM@@02ooNJ@@07ooVM@OohW4;omiY1ooNJ@OoiWD7onIa1ooNK@@02ooNJ@@05ooNJ@_ogVT7onIa1 ooRL@_ogVd400_oiW442ooNJ@@0UooNK@OoiW47onIe1ooVL@OoiW4;onI5QooZ=NookTGConi1booZ> M?okSg3onY1`ooZ>K_okSfkonhm_ooZ@KoojSg7onhmaooZ>L_ojSW7onXmaooZ?LoojSWOonXiiooZ? MOojSg3oni1_oo^@LOojSg;onY1boo^AL_ojSg;onXmcooVBK_oiV6Gon9YPooRIH@02ooZJH@0JooZJ H_ojVV?on9UPooRIHOoiUgGonI>0ooVCOoojUGkonI>1ooZEPOojU7SomYAXooRFG_ofUV;omiISooJD HoofU6ComYETooJDIOogUVKomYAVooRFI?ofU6ComYASooNFHoogUV@3ooJEH`3oooJDI?ofU6?on9IT ooRFHoofUF?omYARooNFHoofUF?omYASooJFGOohV5con7n8ooaL[?okIJGonfZNoo]XX?okHJSooEFf ooe4a_om>lgooC[>ooe9`OolG:gonf>Too]QYOokI:7ooFV?ooi/R?omKY7ooVb?ooeSQoomH8CooEn0 ooeZSoomMY3ooGF5ooeaQOomHGcooUR2ooe`XOomHjgooSiooohkE_onG73ooVJ6ooi@Jooj>d7ol3dc onE7;3oecNb omPk[ooG?JOodSJdolXbb?oA>L_ofSo6om]2`_oF?/GocCK8om0ia_oJAKgohSNoomlg__oO>;gohcNnomhc_ooO3olR3QOnoP8[o^gf6olb6Q?oRHOod8B0ok^5Uon[Y[7o/:jb ojFG]onLSk_oWYVfoi^B]_nGSK[oX9bfojRU/_nXYK?oYZBcojRO]OnS/K7oTMBAoiGISOnTe:7oW=BG oi3GRonEficoXM^bojCH]_nUcjGobaWgodlMgolo5N?o;a7goc<9m om73N?oC`gWofLAaomg4JooE_g;oc;1fol2ROOnkWH;o^iV2okbIOonkVgko_9alokbLN_niUGSo_8ie okf9LonlSgGo_99fokj9N_nkRgSo_HQaokb3KOnkNGOo^7N6okInO_neQ7Co]HUi000VokF6MondM6Co ]fYLok5eH_n[O6Go/g5Kok1`E_n]MUOo[GQJojejF_n]N5Oo[FUKokb1D?o?n]`S[o [l0kok6m>_n__S[oZl0gojS0=on[`C_o]l90olJmB?oJ]4gok:QBoo2GDOoeTE7omY9Boo>CD_o_U5;o kiMDoo2KE?oaW5GolimFoo:OE_obWEH2oo:NEP0Too>NE_obWEKolZ1Goo:PE_odVUKomJAHomNmCoo6 `4Oo_l18ok?2AOne`TGoc;YAoknlEonc`U_o`/1Pol32H?nl`Eko^l5Mok[1Foni`ESo]l5@okRoCOnl ^dco_KU7okZiA?nd_3co[[ljok6m@Onc_dWo]<5?okO2E?nh`E_o^L5Nok[1GOni`Ego^/9L0_ng`UX0 3Onj`E[o^L9FokK3C_ne`ECo]l1IokK1Eonf`5Ko]<9Eok;3E_nd`UOo/LAHok75FOni`eX00_nj`5/0 Ronj`5[o^L1Jok_2F_ni`E[o^<5JokW1F_nl`5Wo_[mIojC?Gon8gecoQm]IohOJF_n=f5Oo/OoVBEkokD2Eon16[OoK@;Coe42_omHm[_oN>[KogSNhom`j ]_oJ=[SofSNdomXj/_oG>k;oecVaomHi/?oD>jkoeSFaom8``_oC>l[ofT;6omY2aOoF?/Koe3O9omom=LW_oKEjOoiUNXoo1B/oo_B;WoiT6ion0o ^?oR@;SoiCjlonDl_OoS>[kohc^mon<;oj3O2onPf`OoRl;okdNmonU9]OoTA[3oidV^onY6/?oXAK3ogTRYolY4/oo4@k?oadF]olY0]_o9>k[ocRS?ol]9 Z?o;Of[oc89Vol]nJOo7NfSoagiTolN2Hoo4OfKo`WmXol1lIoo1OFKoah9SolN2H_o4Of?oa85SolB3 HOo3QUgo_X9Nol:3Goo7QU`2olF5G@2^olB7GOo4QEko`hMOol6;GOo3SU[oa8aIolB=FOo4T5Wo`i5M olBAG_o0ReoobX=WomV0LOoGOg3oeh5_omR2KooIPVkoe7m`olYhNOo?N7kodX1gom>2LooCPW;oe8Ea om>4LOo?OWGodh=hom>4O?oBR7SodhEnole^SooXWW3ogJ5fokYnSOo0Q8WoaXR5olV9Q_oRHKobhZ;olZ9S?o=Rhcoc8Z? olj:S?o?S8godH^;om26R?nhSZ;o[Jbfoj^N]onORkcoWY>moj6N^?nIRk_oUXbmojBT]_nXY[GoZJJd ojNT]?nWWkSoY;^`oi;IRonIei3oYmBSoikDU_nBfI3oU=fQoigL/_nMfjko^=2:om?7N?o;aX?odLMl omC8NOo=aGoodN?nmRW;o^ged okUdN_ngN7Go]H9aokB2LOndLfOo]VmSok=bHOnZPF;o[7MLojeeF_n^MEWo[gMHojejF_n]NU_o[7EL oja_GOo6U4SodZ0oom2K@_o=ZDKo^ki2ok36@?n^acko[l8mok;1?_n_`3goZl@mojS4?On]a3oo^QF_ocXU[om:5JooBQFOocXEWolj9J ooBRF_ocWeWomj5KonFhFOo7a4co_L=9ok;4Aonja4codkIFooBQIoo/[6[o`LEQok_4GOnla5ko_LEO 0_noa6008_o1a6;o_lASokk4Honm`f;o^lAPokW4G?nga5Ko^/=BokS0COnc`TGo[/A0ojc4@?n]a4Oo /<=?okG4E_nga5co^oo^R COokXTconj9=oo^RCOokXdgonj5ooVLK?ojVVgonY]^oo^KL?okVW7oniYcooVLMOohWGGon9i_ooVIO_omNZGo oFj`ooee[?onK;GooUc1ooiAboonDL[ooUC7ooiGaoonH;coo6n[oo]dYoojMZKonW:VooU[[_okL;3o oVb@ooiXR?onKi;ooVZ0ooiQMoonJH;ooWB6ooiePOonMHCooW>4ooiZR?onI9GooUF3oohmIOonDGKo oVN9ooeBIOog@SookTPfonY=EOoSCG[ohdJMon0m^_oM?;ooed6comM0[_oM?K?ogSbfom/l]OoL>K[o gcNmom/i]ooF>[?oeSZdomHk/_oB>ZoodcVbomXf]ooQ>;_ogCo5om]2b?oK?/[of3K=omD_d?oE:];o dRKGol/Qf?o98on4TdOoMA[GocVNColiSV?oKEjOoiUJ/onYLZOo_EK?ojdJlon91^_oP?[co hcjnonl3oiCfoonLo_OoW@Kcoid32onXm`ooZ>/;ok3[3oo0k`oo`>l;ok3G4onPda_o/>[_ocSNnol`i^oo:@;So bU:WolYjL_o=Pf[obh1/olJ1JOo3QFWoa8I[olB4J_o7Q6WoaH1Xol=oJOo4OfSoaH9Vol>3I_o4QFKo aXMRol>6H?o1PV;oaXIRolN8H?o6R67oahYQolJ8HOo4RF;o`haSol:>H0?oaI5N0:GoaYAOolJBHOo5 TV3o`8]RolaoL_oJP7OofH9comZ5L_oIQG3og8IbomZ6MOo>O7[ocGR1om9oNooCQGKoe8IeomF7MOoD QGKodH5gomJ6OOoERH?oeXb3omR4Q_oALi7oj:5domjRN_o0Q8go`XNRi3odHj=om2=SooA Rhooe8j;om6>SooBRhkocXV>okNJZ_n[Z;WoYYBjoij5__nPU;koX9RloiN7__nOUk_oYjViojVW]on[ Z[GoZjFeoj^V^_nSb:_oT=jVA_o=Z4Wo_;I2ok?4@On/b43o/LI2okO2A_ne`dCo[lE1oj_7@On] aT;o]_E7ohkIGonfTF?ohV5SoniEIooJDFOocVE[oliiLooBRG?odXegom:ANooFVGOod Xegon:1Noo6dGoo;aE3o]/M9okC6Boo8`EGojK9WooZMK?omV6gooJ9`olboIOnfaV000_nnaV82oko5 H@;o_lER023o`oo^RC?okXdgonj9=00;onj9<00?onj==oo^RC?okXT`00_ok XTd00ookXTconj==oo^RC@02oo^RC003oo^SCOokXTconj9<00;onj9=00?onj96oomONOoiATWokd[_og3bh omPj]OoD>[?odc^aomPj]?oQ>;ooj3K4onHgaooN>fonY5`?oS?koohSk1on/Sokc[6oo0iaOob?LColck3oo4l`oo[=lCojc[1onlo__o^AK_ok4bl onE9^_oKAkGoeTBhol]5]_noAk?ob4>hom]LWoo[Dj7omSfioo0j_?oV?KSofdZ_omMCZ_oCEZKobgai olV5Koo5RFooahiZolN:J_o5PfkoaH5^olV3KOo9QF_oaXA[ol>2K?o2PFco`XA[olJ6JOo7R6Ko`hMT olB7I?o6RVGoahYVolN;I_o7RVKoaXaVolB>Ioo4TVOoaI9TolBCHoo5UF?oa9=SolFBIOo7TFGoa95T ol>SHkobhZ@ okf0V?njOYcobXZColj>S_o=SHkoc8f>olbS_oCShgod8b@om:@T?oBSi7ochfD omB?TOoDSi3od8jDomJ>Soo>SICo/IZcojJQ`?nRR[ooWXO0ojBI__nOTKooVhk0ojBR^onYZ[[o[:^h ojj/]OnZXkSoZjfloioCZOnAghgoXMVOojSFY_nQf9_oYMJRok2j/One[ISoaLYfol;@O?o2bH3oaO?nmSW[o_91lokbBOonjTGko ^HenokZ3O_nkPX;o]gU]okI`G?nfJeWo[7aMojajG?n_Ke[o[GQNojigGOn]OEko[X9NojilGOn/N5oo [7ENolJOCOoC]4Ood[=9om6_BOo@ZD[oe:99om>QB_o2[4Co^L58ok7:B?n`bTOo]/M:okO5B_neaTWo /0ooRUO_ofYgcomjMlooJWO?oeYW[om:IiooJWN`;omZQl 08?omZQkooFXN_oeYW_omJMiooNZMOoiVXkooWFcooiW__ooF/Ooodo>oomBc?ooE/WooeC:oomJa_oo JKSooGB]ooaeZoojMj_ongFZooeZ/?olJKOon7ZgooMn/_omN9Goog:;oomXOoooJX;oogN7oomhP_oo MXGoogR3oomdP_ooDgOood1WoomEH_ooHW7oo5ILooE7B?oYDfkoiDjOoma6/ooM@L;odd6nom=1_ooD ?L7od42kom10^?oD?KWoecbhomXn]OoN?[[oh3c0omlm_?oN?;_ofSZjom@h]Oo@>;?oeSRhonDbb?o/ ;]3ok2g>onD/dooM;MGofB[IomDWeoo;9=Oo`aoGollVe?oN=eoo9:ZooZEYkohebJon=HX?oHJIKob8UfolF?KOo7SFgobX]]olZ7Koo9 Q73obXE`olJ4L?o5QVkob8M]olN8KOo2Q6ko`X=_olJ6KOo6RVWoa8]XolN=OooORgkodXEnol]jQooAOhGoeX]lomNToo?Si7oc8fBokj1VonmP9gobHVFolj?U?o> TI?oci6Boln@Too>S9KodXjCom>@T_oCSi7odXnBom>?TooETY;odY2FomBAU_oFTYCoe96Eom:?UooI TI3obXjLojZH__nTVL?oXX[1ojJG__nWUkooWhk2oj:J`?nWZ;goZZ^lok6a]on^[[[oZjBmojbb__nO e:?oU=n=ojCIYOnXf:OoX=fLoj_:ZooWGoonWf7onYQPooZEH?onWV?oh<5MokK:D?o7a5_ok[E^oofQ LoonWWGooYiaoojOKoonWg3ooYecoo:aL_o0bFWo_5RojSBF?nmb5Ko]/aGokS;F?oX/eOooZUHoofW F0WooZUH00?ooJMHoojYF?onZEP01oonZEP00oomYeSooZUHoojYF007oojYF003oofWF?onZESooZUH 00OooZUH00?ooJMHoojYF?onZEP01oonZEP00oomYeSooZUHoojYF007oojYF003oofWF?onZESooZUH 00OooZUH00?ooJMHoojYF?onZEP01oonZEP00oomYeSooZUHoojYF007oojYF003oofWF?onZESooZUH 00OooZUH00?ooJMHoojYF?onZEP01oonZEP00oomYeSooZUHoojYF006oojYF003oofWF?onZESooZUH 00_ooZUH00?ooJMHoojYF?onZEP00_onZEP01?omYeSooZUHoojYF?omYeP6oojYF003oofWF?onZESo oZUH00?ooZUH00?ooZQHoojYF?onZEP02_onZEP01?omYeSooZUHoofWF?omYeP9oojYF003oofWF?on ZESooZUH00OooZUH00?ooJMHoojYF?onZEP03oonZEP00oomYeSooZUHoojYF007oojYF003oofWF?on ZESooZUH00OooZUH00?ooJMHoojYF?onZEP01oonZEP00oomYeSooZUHoojYF007oojYF003oofWF?on ZESooZUH00OooZUH00?ooJMHoojYF?onZEP01_onZEP00oomYeSooZUHoojYF00;oojYF003oofWF?on ZESooZUH00;ooZUH00CooJMHoojYF?onZESooJMH1_onZEP00oomYeSooZUHoojYF003oojYF003oojX F?onZESooZUH00[ooZUH00CooJMHoojYF?omYeSooJMH1?onZEP1oofWF07ooZUH00001?ooZUcooZ]M oon]G_ooZeh2oon/G@06oon]G_oo[5goojaMoon]G_ooZUcooZ]M0_oo[5d00ooo[EkoojYLoon/G@02 oon/G@;ooZ]M0_oo[5d00oonZUgooZ]Moon/G@02oonZG006oon]G_ooZUcoojYLoonZG?onZegoojeN 0_oo[5d00oooZegoojYLoon]GP02ooj[G@06oon/GOooZUcooZ]MoonZG?oo[5goojeN0_oo[5d01Ooo ZUcoojeNoon]G_oo[5gooZ]M00;oojaM00OoojeNoonZG?ooZUcoojaMoonZG?oo[5gooZ]M00;oojeN 0_onZed2oonZG006ooj[GOooZUcooZ]Moon/GOonZegoojYL0_oo[5d01_ooZekooZ]Moon]G_onZego ojYLoon]GPGoojaM00Gooj]Moon]G_oo[5goojeNoon/G@02oon]GP03oon/GOooZUcoojaM00;oojYL 0ooo[5d2oon]GP0=oon[G_ooZUcoojYLooj[GOooZUcooj]Nooj[GOooZUcooZ]Moon/GOonZegoojYL oon/G@02oonZG003ooj[GOoo[EkoojeN00;oojaM00CoojeNoonZG?oo[5gooZ]M0ooo[Eh01_ooZUco oZ]Moon]G_oo[EkooZ]Moon]GP;oojaM0_oo[Eh00oooZUcooZYMoonZG003oonZG005oon/GOoo[Eko ojYLoon]G_oo[5d00_ooZU`02?onZegoojYLoon]G_ooZUcoojeNooj[GOooZUcooZ]M0_oo[Eh01Oon ZegoojYLoon]G_onZegoojeN00;oojaM00KoojeNooj[GOooZegooZ]MoonZG?onZed2oon]GP;ooZ]M 00GoojeNoon/GOoo[5goojYLoon/G@02oonZG004ooj[GOoo[5gooZYMooj[G@;oojYL0_oo[5d2ooj[ G@0Boon/GOoo[EkoojYLoon[GOooZUcooZYMooj[GOooZegooZ]MoonZG?oo[Ekooj]Noon/GOonZego ojYLooj[GOoo[5gooZ]M0_ooZU`2oon/G@04oon[G_ooZUcoojeNoon]GP;oojYL00?ooZ]Moon[G_oo [5d00_onZed2oonZG003ooj[GOooZUcoojaM00;oojaM00?ooZ]Moon/GOoo[5d00_oo[Eh2oon/G@Co ojYL00CoojaMoon]G_ooZUcoojeN1?ooZU`01ooo[5gooZ]MoonZG?onZUgoojaMooj[GOoo[5d00_oo ZU`2ooj[G@07oon]G_ooZUcoojaMooj[GOoo[5gooZ]Moon]GP02oon/G@06oon]G_ooZUcooZ]Mooj[ GOooZUcoojaM1?onZed07_oo[EkoojYLooj[GOoo[EkoojaMoojVH_okVfOoniaWoo^LI_olW6OoniaW oobKI_okW6Ooo9aVoobMI_olWFConieToobLI?olWVOoo9]ZoofLK?omVVgoo9YcoojHN?onV7Wooi]l oonLP?ooVh;ooib5oonKQ`;ooib60:[ooi^6oojJQoooV8Sooib6oonTO?ooX8OooIZDoofOR?omXG_o oJ9koobRNoolXX3oo:>2oofTPoomXH;oo:>3ooZWPooiYX3onJR1ooVVPOoiYh7omjYoooJ[O_ofZGco mjUnooFZO_oeZGcomZQmooRZP?ogZ7komZUoooNXO_ohYgoon:N0ooRYPOohZH3omjR0ooRYPOogZGko n:igooRTQoomM;SooeS9oomEc?ooDLgooeG;oomFb_ooEL_ooec5oom]]oonMZooo7F^oo]h[?olMjco o6j`ooa[]_ogO[ComHZbooJ9/?omNIGoofV0oom/POooNHSoogV9oomeR?ooM8Ooog:4oomFM_oo@V[o oeAOooiRB_ofFTSoie]ZonQKXOoNF;kofDc0omU4`_oG@<;oeD6mom@o_ooC@;oodT:komE2_OoC@<3o dd2jomHk_?oO=lCogc[1om`g`?oF/GogcG7on4abooZ>lWojEV`oneQZoo`F[ColE2koni4aOoV@/Oon3W7oo98/Oo]Cjco j5JTon1RV_oHJY;oeVJBom9_SOo9Q7cob8eaolVBomb=T?oBMIWokZUjonF`O_o0 QiWoahnGol^?U?o?TIKocI2Foln@U?o;SYKo`hBMokn2Woo:RYOocHnFoljAVOo@TiKodI6Dom2=UooA SYKodi6EomBAU?oCTIKoe96EomFBU?oDT9Oodi:JomFCUooETYL00_oCTIT0=?oJU97o`HbYojFJaOnV Vah;oclMoomG8N_oHa7?odK=colFVOonnX8Ko_YJ1okbDNonl W7ko^:B3okBXROnhW8D2okVLP@0EokVHPOnfUH7o]HajokB;N_ncSH7o/GabojmjJ?n`QfGo/Y=Rok9m GOndKe_o/VmKok5jGOn^PEko/7IKok1iG?n]N63o[WUOolRPC_oB/D[ocje;00;od:i:01godK5;om:c C?oB[d_oeJMJ002ol3;J00Lol3;JOnobf[o_l]Zokg;JonncFco_1Voh;VIOnJfEko_/]Iokc:FOndce_oal=CooV] FoooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/ G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/ GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed0 1_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/ G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/ GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed0 1_ooZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/ G@;oojYL00?ooZ]Moon]G_oo[Eh00_oo[5d01?oo[EkoojYLoon/GOonZed3oon]GP06oonZG?onZego ojeNoon]G_onZegoojeN0_oo[5d2oon]GP03oonZG?onZUgoojYL00?oojYL00GoojaMoon]G_ooZUco ojeNoon/G@02oonZG008ooj[GOooZUcoojeNoonZG?oo[EkooZ]MoonZG?onZed2oon]GP05ooj[GOoo ZUcoojeNooj[GOoo[Eh00_oo[5d01_oo[EkooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_oo ZUcooZ]Moon/GOonZegoojYLoon/G@;oojYL0_onZed01_ooZUcooZ]Moon/GOonZegoojYLoon/G@;o ojYL0_onZed01?oo[5gooZ]MoonZG?oo[5d2oonZG0;ooZ]M00KoojYLooj[GOoo[5gooZ]MoonZG?oo [5d2oonZG0;ooZ]M00KoojYLooj[GOoo[5gooZ]MoonZG?oo[5d2oonZG0;ooZ]M00KoojYLooj[GOoo [5gooZ]MoonZG?oo[5d2oonZG0;ooZ]M00KoojYLooj[GOoo[5gooZ]MoonZG?oo[5d2oonZG0;ooZ]M 00KoojYLooj[GOoo[5gooZ]MoonZG?oo[5d2oonZG0;ooZ]M00KoojYLooj[GOoo[5gooZ]MoonZG?oo [5d2oonZG003ooj[GOoo[EkoojeN00;oojaM00CoojeNoonZG?oo[5gooZ]M0ooo[Eh01_ooZUcooZ]M oon]G_oo[EkooZ]Moon]GP;oojaM0_oo[Eh00oooZUcooZYMoonZG003oonZG005oon/GOoo[EkoojYL oon]G_oo[5d00_ooZU`02?onZegoojYLoon]G_ooZUcoojeNooj[GOooZUcooZ]M0_oo[Eh01OonZego ojYLoon]G_onZegoojeN00;oojaM00KoojeNooj[GOooZegooZ]MoonZG?onZed1oon]GP000_oo[f<0 0ooo[fCoojmSoon_H`03oon_H`03oon_I?oo[f?oojmS00GoojmS00CoojmToon_Hooo[f?oojmT0_oo [f<00ooo[F?oojmSoon]H`08oon_H`03oon`I?oo[f?oojeS00;oojmS0_oo[f@01?oo[F?ook1Toon_ Hooo[f@2oon_H`03oon_I?oo[f?oojmS00;oojmS00?oojmToon_Hooo/6@01Ooo[f<00ooo[fCoojmS oon_H`04oon_H`03oon^I?oo[F?oojmS00CoojmS00?oojiToon_I?oo[f<00ooo[f<01Ooo[fCoojmS oon_Hooo[f?oojmT00;oojmS00Oook5Uoon_I?oo[f?oojeSoon_I?oo[f?oojmT00;oojmS00GoojmT oon_Hooo[f?oojmToon`I002oon_H`04oon`I?oo[f?oojmSoon_I0GoojmS0_oo[f@6oon_H`03oon^ I?oo[f?oojmS00?oojmS00OoojeSoon_Hooo[fCoojmToon`I?oo[f?ook1T00[oojmS00?ook5Uoon_ Hooo[f<01?oo[f<01?oo[fCoojmSoon_Hooo[f@2oon_H`04oonaIOoo/6CoojmSoon_I0?oojmS00?o ojmToon_Hooo[f<00ooo[f<00ooo[fCoojmSoon_I002oon_H`06oon`I?oo[f?oojmSoon_I?oo[f?o ojiT0_oo[f<01_oo/6CoojmSoon_Hooo[fCook1Toon_I0WoojmS00CoojmToon_Hooo[f?oojeS1Ooo [f<01?oo[F?oojmSoon_I?oo[f@4oon_H`04oon_I?oo[f?oojmToon_I0?oojmS00?ook1Toon_I?oo [F<00_oo[f<00ooo[fCoojmSoon_I002oon_H`05oon]Hooo[f?oojmSoon_Hooo[f@00ooo[f<2oon_ I0CoojmS00?ook1Toon_Hooo[f<01?oo[f<00ooo[fCoojmSoon_I006oon_H`04oon_I?oo[f?ook5U oon_H`;ook1T00?oojmToon_Hooo[f@01?oo[f<00ooo[fCoojiToon_H`02oon_I0CoojmS00koojeS oon_Hooo[f?ook1Toon_I?oo[F?oojmSoon`I?oo[f?ook5Uoon_Hooo[VCooJEZoobNK@;oo:1[00?o o9m/oobNJoolWf`00_olWf`0:_olWVcoo9m[oobOJoolX6_oo:5/oobOJoolX6coo9m/oobOK_olX6ko o:1_oofQL?omX7?ooImfoojNN?onWg[ooYimoonMP?ooWHCooif5oonLQ?ooW8[oo::AoobTT?okY8[o njF9oo^WR?ohZXKon:Z8ooJ[QooeZhComZb3ooN/Poog[XComZf2ooJ]POof[H;omZb3ooJ/Q?ogZXGo mj^6ooRZQ@;on:^40_ohZh<2ooR[Q00;ooRZQOohZXKon:Z5ooR[PoohZXGon:Z3ooR]POoh[Goon:B< ooae]oooCm400_ooDlh2oomFc@0?oomGc?ooI<7oog2gooie]?olMk3oo7R`ooag/OokL[3onW6cooF4 ]OodSk3omHbcooN7]OonMicoofIh00;oog2007[oofamoom]N_ooKgWooeecoom5FoonH4comg15oniW LOoLHJCogVC8omYNcOoHFLCofEO3om]@a?oIAL?oe46oom=1`?oE@Kooe470omDo`_oC?/7odcc5om8c booB;l[oe3;3omPaa?oE]Oo1BkOogd30onQ4__oa>=7oldBjonQDZOoMHI_oe6bBom1_ SOoEIY;ofVNJom23Q?o?TGKocHeeol^:MOoJoljCVOo;T9_oaHRQol>7XOo;Si_od9:Iom6CVOoAU9WodYBHom:AVooATI_odi>J omBDVOoEU9Woe9BJomFDV?oDTiWoeI>LomFEWOoDU9goeIFLom>CWOoGUY[of9BHokN<]OnUWLOoYiW5 ojVK`_nXVL7oYiK2ojFDa?nTUlKoZJO3ok:g_?na];coZjg0ojZU`OncZkooYm2NoiOQV_nYfjooY=bV oigOY_nl_XOonVi_oo9[O_oHYgko_l]kol7@P_o9c8;odL]lolc:P?o:bX;odomBOC_o@X4_ob[1?okS3COn`cTgo/m1AokKK_o0cW3o`/e`00;o`Le`00Co`Leaol7=L?o1cG7o`Lea1?o1cG006?o1cFoo_li_ol3> L?o2cVoo`li`olC>L?o4cFgo`le]ol;=KOo3cFko`le]ok_@K_njcg;o/liPok?>Foo1cFko`/iaol7> Koo1cFko_li]okg?KOo0cVgo`le/ol;>K0;o`/i]00?o`/i/ol7>KOo0cVd00_nocVd03onmcVko_Le^ okg>K_nncFoo_IXoh_SIOnhd5oo`/aOok_>H_n_d4gohkYHoon_I006oon_H`04 oon^I?oo[f?oojmToon_I0KoojmS00CoojiToon_Hooo[fCoojmT1_oo[f<01?oo[VCoojmSoon_I?oo [f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00CoojiToon_Hooo[fCoojmT1_oo[f<01?oo[VCo ojmSoon_I?oo[f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00CoojiToon_Hooo[fCoojmT1_oo [f<01?oo[VCoojmSoon_I?oo[f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00CoojiToon_Hooo [fCoojmT1_oo[f<00ooo[VCoojmSoon_H`03oon_H`07oon]Hooo[f?oojmToon_I?oo/6CoojmSoon` I00:oon_H`03oonaIOoo[f?oojmS00CoojmS00CoojmToon_Hooo[f?oojmT0_oo[f<01?oo/FGook1T oon_Hooo[f@3oon_H`03oon_I?oo[f?oojmS00?oojmS00?oojmToon_Hooo[f@02?oo[f<01?oo[VCo ojmSoon_I?oo[f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00?oojiToon_Hooo[f<01Ooo[f<0 1?oo[VCoojmSoon_I?oo[f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00CoojiToon_Hooo[fCo ojmT1_oo[f<01?oo[VCoojmSoon_I?oo[f@6oon_H`04oon^I?oo[f?oojmToon_I0KoojmS00CoojiT oon_Hooo[fCoojmT1_oo[f<00ooo[VCoojmSoon_H`03oon_H`07oon]Hooo[f?oojmToon_I?oo/6Co ojmSoon`I00:oon_H`03oonaIOoo[f?oojmS00CoojmS00CoojmToon_Hooo[f?oojmT0_oo[f<01?oo /FGook1Toon_Hooo[f@3oon_H`03oon_I?oo[f?oojmS00?oojmS00?oojmToon_Hooo[f@00_oo[f<0 1Ooo/6CoojmSoon_Hooo[fCoojmS007oojiT0002oonbJ@06ooncJ_oo/FWook=ZoonaJOoo/FSook5Y 0_oo/fX03Ooo/FSook5YoonaJOoo/VWook=ZoonaJ?oo/FWook9YooncJ_oo/FWook=ZoonaJOoo]6X0 0_oo/FT3oonaJ003oonaJOoo/f[ook5Y00;ook5Y00Cook5XooncJ_oo/VWook5Y0_oo/VT01_oo/f[o ok5YoonaJOoo/FSook=ZoonbJ@?ook=Z00[ook9XoonaJOoo/FWookAZoonaJOoo/VWook5XoonaJOoo /FSook=Z0_oo/FT00ooo/FSook5YoonaJ003ooncJP03oonaJOoo/f[ook=Z00;ook5Y0_oo/fX2oonb J@07oonaJOoo]6[ook9XoonaJOoo/FSook9YooncJP02oonbJ@07ooncJ_oo/FSook9YoondJ_oo/FWo ok=ZoonbJ@02ooncJP04oonaJOoo/VWook5XoonaJ0?ook5Y00Cook9YoonaJOoo/f[ook=Z0_oo]6X0 1_oo/VWook5XoonaJOoo/FSook=ZoonaJ0;ook5Y00Gook=ZoonaJ?oo]6[ook=ZoonaJ@02ooncJP;o ok9Y01Sook5XoondJ_oo/f[ookAZooncJ_oo]6[ook5YoonbJOoo/FWook9XoonaJOoo/FSook9Xoona JOoo/FSook9YoonaJOoo/f[ook9YoonaJ?oo/f[ook9YooncJOoo/VT2oonaJ@06ooncJ_oo/FSook9Y oonbJOoo/f[ook5Y0_oo/fX01ooo/VWook5YooncJ_oo/FSook5YoonaJ?oo]6X00_oo/fX00ooo/FWo ok=ZooncJP02ooncJP04oonbJOoo/f[ook5XoonaJ0;ook=Z00?ook9YoonaJOoo/FT00_oo/fX02?oo /VWookAZoonbJOoo/f[ook5YooncJ_oo/fWook5Y0ooo/fX04_oo]6[ook5YooncJ_oo/FWook=Zoonc JOoo/FSook=ZoonaJ?oo/f[ookAZooncJOoo/FSook9YooncJ_oo/VWook=ZoonaJ@;ook9Y00Sook=Z ooncJOoo/VWook5XooncJ_oo/FSook5YoonbJ@;ook5Y00?ook5XoonaJOoo/fX01?oo/fX2oonaJ@07 ooncJ_oo/FWook9YooncJOoo/FSook=ZoonaJ@02oonbJ@;ook5X01Cook=ZoonaJ?oo/VWook9Yoonc J_oo/VWook5YooncJ_oo/VWook=YoonbJOoo/f[ook5YoonbJOoo/FWook=ZoonaJ?oo/VWook=Zoonb J@;ook5Y00kook5XooncJ_oo/FWook9YoonaJOoo/VWook=ZoondJ_oo/VWook5XooncJOoo/FSookAZ ooncJP;ook9Y0ooo/fX2oonbJ@06oonaJ?oo/f[ook9YooncJ_oo/VWook5Y0_oo/fX02?on/F_oo:9` oobQL_olXg7oo:5`oobRL?olXFooo:5`0_olXg408OolXW;oo:1aoobPL?olX77oo:5aoobPL?olXW?o o:5doo^PLoolYG;oo:AaoobVL_olY77ooJIaoofTLOomYG?oo:=coofSM?omXWGoo:5dooBXMOof^GWo mkejooRnO?oe^7kom;21ooN]Roog[8komjjI?o/QYCogEkol`cb?o?=LKodSG5omLh`OoM=/Soj33BonX[e?oT:m?ofRWAomDUd?oC 9=Koe2SNomP[gooM:MoohC3Eon0hb?oQ>LWoiSS?oo8de_ojN?o8S7_oahajolR=N_o6 S7Sob91iolR@N?o6SGOo`XYiol>;NOo7SgWoaHie0_o3SgD0]_o1SgCo`iAfolBGMoo5UWKoaYMfolFF M_o4UgOoa9edolJKM?o4UGOoaIQeolRKLoo7VW?oaYMdolNLLOo@U7Woh8b7omj>QooOT8_oh8j>on2> SOoQSHgoh8f>omV=R?o?QX_oeH:Dom^9TOoESX[of9:8omR=S_oHS8kog9>;omZ?SooKTYOog96HomEo Woo_[h?oikF5ol>>Woo5T:3obi>NolnEWOo?U9coc9>OolV@X?o5RJGoa8^TolnDWoo@U9codINLom6F WOoBUIgodiJNom2BX?oDUIcoe9JLomBEWOoEUYooeIFLomFFWOoFUYkoeiJOomFGX?oGVIooeIJNom>E XOoJVI_odI2Rok:?_OnXXL[oZ9k7ojRLaOnVUlGoYYK5ojJBaOnWUlKo[jg4okBi`?n_/KooZk73oj^U `onfX;goY]6LoiSRX?n/g;;oX]f[oj7QV?oF`VoomgMhooeSROoUSHCoc;YnolG=Poo8cX?odLakolc: P?oZD_ocZQ>olf[Coo>[53odK1@om:dD_oA]U?od;=Aom:^D_oDY53odiiLOo2cg?oXMa]ohCYJOnYfFCo`laSokcA I?n/de7o`oomG d?ooEM?ooeg=lKoeSC:on@^dooV:mKogB_Bom@VdOoF9];oh2GGomlXg_oI;N3ogRoOon0ceOoN>LWoiSW>oo4d fOoh=M_ooC?NooXndoobDkoom535oo=5cOoXAlWoi4[9onE9c?oPAlcofDK7omI9a?oBB/7ocDC8ola5 b_o:AlWoaTK8olA6aOo7Al@2olQ8a01Mol]7aOoO?o3SGgoa8el olFAN?o8UGKoaIIfol6FMonoTgWoa9IjolBGN_o3UW[oa9Ikol>INOo5WGSoaieiolJIN?o7VgSobIig olRMMoo8VgOob9igomBFO_oRShcohI6?on6CT?oQTHoohI2@on2@TOoQSi;ofHZBolf3SooFPiOogXbE omN?T_oITY7of8n?omV@TOoLThgofI:Bom^BVOoLTY_odWjSonncQOoU]H_o`i2RolFAY?oFXOoDVIooe9RQ omJIXOoDUj7oe9RPomFFX?oGUZ7oeINRomNJXooFVJCoe9NSomBIY?oHV:3ocHjYok6J`_nWX<_oZ9k8 ojJGaonWVe`on^/L?oZK;4oj^QaonoX[coY=NMoiSSYOn/gkWoXMfZ ok_IOooTa77okGQloomPS_ocMhOog:60olW8Poo9dX?ocliool[:Poo>bgooclb0olc;QOoBbh;odlb3 omC=O_o@bh7odYDgoc:AZDgocjY= oln/Coo?[e7od;ACom6cDoo@[e;ocjE@om2HC_oCY57o_km@okGAE_nfdUSo^LmJokO@F_ngd5Wo]m5I ok_BGoo1dFWo`]5YokgAIOnjdFKo_M5Wol?AJOoOOnldGGo`M5gol7@Moo1dGOo`=5fol7AMoo0dGKo`M5fol;AM_o4dGKo`m9eolGAM_o6d7H2olKA MP03olGAM_o2dWKo`]5d00;o`]5e00oo`]5dol?AM?o4cgCo]]EdokODM?o2dG_o]m9_ojgAE?nfdF;o `M5fol;AM_nndWGo_]5eol3AMOo1dGD00_o0dWH00oo0dWGo_]9fokoBM@02ol3BL`0@ol7ALoo1dG;o `]9bol?BLoo3dWCo`]9col?BM?o7d7Go`]5coiWRK?nGhVOo_]5VokoAI_n^deGoYm97on>oHP;ookE_ 0_oo]Fh00ooo/fkookA^ooneKP02ooneK`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh0 0_oo]Fl00ooo]FkookE_ooneK`02ooneKP03ooncK_oo]6kookE^00;ookE_00?ookE^ooneKooo]Fl0 0_oo]Fh00ooo/fkookA^ooneKP02ooneK`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh0 0_oo]Fl00ooo]FkookE_ooneK`02ooneKP03ooncK_oo]6kookE^00;ookE_00?ookE^ooneKooo]Fl0 0_oo]Fh00ooo/fkookA^ooneKP02ooneK`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh0 0_oo]Fl00ooo]FkookE_ooneK`02ooneKP03ooncK_oo]6kookE^00;ookE_00?ookE^ooneKooo]Fl0 0_oo]Fh00ooo/fkookA^ooneKP02ooneK`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh0 0_oo]Fl00ooo]FkookE_ooneK`02ooneKP04ooncK_oo]6kookE^ooneK`;ookA^00?ookE^oondK_oo ]Fl01Ooo]Fl00ooo/fkookE_oondKP03ooneK`03ooncK_oo]FoookE_00;ookE_00_ook=]ooneKooo ]FoookA^ooneKooo/fgookE_ooncKOoo]FoookA^ooncKP02ooneK`04oondK_oo]FoookE_oondKP?o okE_00?ook=]ooneKooo]Fl00ooo]Fl01Ooo]6kookE^ooneK_oo]FoookA^00;ookE_0_oo]Fh00ooo /fkookA^ooneKP02ooneK`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh00_oo]Fl00ooo ]FkookE_ooneK`02ooneKP03ooncK_oo]6kookE^00?ookE_0_oo]Fh00ooo/fkookA^ooneKP02oone K`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh00_oo]Fl00ooo]FkookE_ooneK`02oone KP03ooncK_oo]6kookE^00;ookE_00?ookE^ooneKooo]Fl00_oo]Fh00ooo/fkookA^ooneKP02oone K`03ooneK_oo]FoookE_00;ookE^00?ook=^oondK_oo]Fh00_oo]Fl00ooo]FkookE_ooneK`02oone KP03ooncK_oo]6kookE^00;ookE_00?ookE^ooneKooo]Fl00_oo]Fh01?oo/fkookA^ooneK_oo]Fl2 oondKP03ooneK_oo]6kookE_00GookE_00?ook=^ooneKooo]6h00ooo]Fl00ooo/fkookE_ooneK`02 ooneK`0;ooncKOoo]FoookE_oondK_oo]Foook=]ooneKooo/fgookE_oondK_oo/fh00_oo]Fl01?oo ]6kookE_ooneKooo]6h3ooneK`03ooncKOoo]FoookE_00?ookE_00CookA^ooneK_oo]FkookE_0_oo ]6h2ooneK`7ookA^0Ooo]Fl1ooneK`000_oo]g<02ooo^7CookMdoongLooo]g?ookMdoongLooo^GGo okIcoongM?oo]g?ookMd00KookMc00?ookQdoongLooo]g<00_oo]g<01?oo]gCookMcoongM?oo^GD6 oongL`03oongM?oo]g?ookMc00?ookMc00?ookQdoongLooo]g<00ooo]g<00ooo]gCookMcoongL`03 oongL`06oongM?oo]g?ookMdoongM?oo^7CookMc0_oo]g@4oongL`03oongM?oo^7CookMc00;ookMc 00CookMdoonhM?oo]g?ookMd0ooo]g<01Ooo]W?ookMcoonhM?oo]gCookMc00;ookMd0_oo]g<01Ooo ]gCookMcoonfLooo^7CookMc00;ookMd00?ookQdoongLooo]g<00_oo]g<01_oo^7CookMcoongM?oo ]gCookMcoonhM0;ookMd0_oo]g<02?oo^7CookMcoongLooo]gCookMcoongM?oo]g?ookIc0_oo]g@0 0ooo]g?ookMdoongL`03oongL`03oonhM?oo]g?ookMc00KookMc00?ookMdoongLooo]g<01Ooo]g<0 1Ooo]gCookMcoongM?oo]g?ookMd00;ookMc00?ookMdoongLooo]g<01?oo]g<00ooo]W?ookMdoong L`02oongL`05oonhM?oo]g?ookMcoongLooo]g@01_oo]g<00ooo]gCookMcoongM004oongL`04oong M?oo]g?ookMcoonhM0CookMc0_oo]g@9oongL`04oonhM?oo]g?ookMcoonhM0?ookMc00?ookMdoong Looo]g<00ooo]g@01Ooo^7CookMcoongLooo]g?ookQd00;ookMd0_oo]g<01?oo]gCookMcoongLooo ]g@8oongL`03oongM?oo^7CookMd00?ookMc0_oo]g@:oongL`04oongM?oo]g?ookMcoongM0KookMc 00GookQdoongM?oo^7CookMcoongM005oongL`04oongM?oo]g?ookMcooniM@;ookMc00_ookMdoong Looo^7CookMdoongLooo]gCookMcoongM?oo]W?ookMcoongM002oongL`03oonfLooo]g?ookMd00Go okMc00GookIdoof[MookXgSoo:IhoobVM`02oobVN005oobVNOolYgWoo:IhoobVN?olYWT00_olYWP0 1OolYW[oo:EioobTNOokXWconj9o00;oo:Ql00goo:MmoobVOOolYggoo:MmoofXOOolZ7comZUioo:i Nooc]G_olkIkooO4O?og`Wcon<=m00?on<=l0_oga7`02Oof`Wkoml5oooO2P?oh`X7onL64ooRoQOoe ^HGomKB8ooNbS002ooNbSP0NooRaT?oi[i?onJjEooV_U?oh[i?on:nBooR`T?oh/hgomk6>ooNUVOoj RJgooGFfooi/_?ooGlKoecG CmomM6`oob?/_oi4boomMC^_oOCL;ogUN_omeWWooR IZKoiej/onUF[ooUHJSodX6@olbEP?o;U7koc9EnolfEOP02olbDOP0oolZBOoo9TH3ob960olJ?Ooo5 T83oaY1oolJBO_o4T7oo`hmoolB@Ooo3Sgooa9AkolJHN_o7VgWoaI]jokjBOOnoTWoo`iUmolFKOOo7 W7koaI]molZON_o:XG[ob9ijolRMN_o9WWWoaiiiolVQNOo8WWWoeIF5onBBT_oSTY?ohI>Con2CTooP TYCogi2Eon6BU?oNT9GocX:Hom=oVooOS9Sofi6HomZBU_oFT9?of92DombFTOoIU9?ofY>KombDWOoC PJKokk>:onRhSOo2T:GoaY>VolbFY?o=V:GobIBVolbGXoo9TZOo`H^^olVBZ?oBUj?od9RT00;odIVS 01SodiRTomFJXoo@UJKodINUomBIY?oDVJ?oeYVSomFIYOoDVJGoeIRTomNIY?oEUjGoeiZTomNLYOoE VJOoe9RVomFIY_oGUZCoai:`ojVPb_nTXLooZ9c:ojRLbOnXW/oj[O^_n[eYCof=Qdomc0NOoYO7kooV>@ooYZR_oXSX7ocl25olW@ Q?o?d8;oc<^5om3=P?o8c8Cob/b6om3om2YC_o?Z4kocZU?olj[D?o>[E;ocZmDolnbE?o>/5CocJE@om6J DOogNood^Wko lkImoo:cO?of`7gonLJ1ooS5P_ogaX7on0ooO4P_oh`h;onL>3oo[2Q_oj`8[omk^:ooJiR_og^h_omkF=ooNZU_oiTJWo oW>mooia_?onM[_oofG9oomHdoooFM;ooeODoomGeOooI]oo>B[OohP;ConG[1ooJ?_?ofTkSomhjkooN<_ooiRl?onH_2ooZ;a?ofTK[ol9N/onbKXOoYVJ3o jY6]onn7^OoeOKkonGS0ooATdOoUB]cohDOLon12gOoO?mgog43Loma3fooMA=_ogD;Momm2gOoN@mco gD?Lom/mf_oG==Wod37Dol/db_o?=l_od3S;ollhbOoA=olI1coo8AolE2cOo7ALcobU?8olMGa_o6DLCofTK1oo=1a?oOEKSodF6bomiD__oWD;ko iUj^onMP[OoVGZkoiUb[on5WX_oBQY3ocYJ1olZGP?o9V87obiF1olfFP_o=UX7obiF1olVCP_o8TX;o aY:2olNCPOo5TH?oa923olJCPOo6Th3oaY>1olNDPOo1Th3o`YEmolFIOOo4VGgoa9Unol:HOoo1Uh7o `YR1olFJP?o6W8;oaib10_o9WWd0>Oo8WWkoaiemolVMNoo9WgcobZ9kolRNO?oJUX_oiiFGon:CU_oQ TYKoh9:Fon6DU_oQU9GohIBFon2CUoo@Q9godWjPon2PomR;Y?o]/Y3oj[bIoj7R]OnYfjoo`]5homkKO_oH_g_oj7mjooiWS?on J8golGV4omVUOooAcX?ocln2omC=QOoCc83oal^5olW`D_oC/5CodZeBom6]DOoA[E;od:]Bom2ZD?o?[57ocjiBoln^Doo> [ECocjmDolj_Doo@Z5;oeJ5Dolf]DOnnaeGo]MAIokgCIoo2dF_o_M=YokgDJ?nldfSo_M=XokcDJ0;o _=AY00[o^mAXok[DJOnhe6So^MAXol3AJooAcgCoi[ekon70Nonoe7[o`=Am0_o2e7`00oo4e7_oaMAk olKDN`02olKCO0?oaMAl00GoaMAkol?DNoo2e7co`mAlol;DN`02ol;CNP;o`]Aj0_o3dgX02onbfGWo /]QkokoCNonme7go^m=mokOAIOnddEWo^M=/okkDO?o0e7co`MAk00?o`MAj0_o1dgX2ol3DNP06okoD N_o2e7_o`]Amol;DO?o1e7_o`]Ak0_o1e7X02_o3e7Woa=AjolWBN_n]g7;oTNQ[ojoLK_nede_oYmE< ojGFC?oS`FX4ooniM`04ooniN?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSookUgooniMooo^GL2 oonhM`CookUg00CookUhooniMooo^GOookUg0_oo^7L4ooniM`04ooniN?oo^GOookUgooniM`;ookQg 1?oo^GL01?oo^GSookUgooniMooo^GL2oonhM`CookUg00CookUhooniMooo^GOookUg0_oo^7L4ooni M`04ooniN?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSookUgooniMooo^GL2oonhM`CookUg00Co okUhooniMooo^GOookUg0_oo^7L4ooniM`04ooniN?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSo okUgooniMooo^GL2oonhM`CookUg00?ookUhooniMooo^GL00_oo^GL01_oo^7OookUgooniMooo^7Oo okUhoonjN0SookUg00?ookQgooniMooo^GL00ooo^GL00ooo^7OookUgooniM`02ooniM`04oonhMooo ^GOookUgooniM`;ookQg0_oo^GL01_oo^7OookYhooniMooo^GOookQgoonjN0;ookQg00?ookUgoonh Mooo^GP00_oo^GL00ooo^7OookUgooniM`02oonhM`CookUg00CookUhooniMooo^GOookUg0_oo^7L4 ooniM`04ooniN?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSookUgooniMooo^7L4ooniM`04ooni N?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSookUgooniMooo^GL2oonhM`CookUg00CookUhooni Mooo^GOookUg0_oo^7L4ooniM`04ooniN?oo^GOookUgooniM`;ookQg1?oo^GL01?oo^GSookUgooni Mooo^GL2oonhM`CookUg00CookUhooniMooo^GOookUg0_oo^7L4ooniM`03ooniN?oo^GOookUg00;o okUg00KookQgooniMooo^GOookQgooniN?oo^WP8ooniM`03oonhMooo^GOookUg00?ookUg00?ookQg ooniMooo^GL00_oo^GL01?oo^7OookUgooniMooo^GL2oonhM`;ookUg00KookQgoonjN?oo^GOookUg oonhMooo^WP2oonhM`03ooniMooo^7OookUh00;ookUg00CookQgooniMooo^GOookQg1_oo^GL000;o ok]j0_oo^WX3oonkNP;ookYj1?oo^gX01Ooo^W[ook]joonkN_oo^g[ookYj00?ook]j0_oo^WX3oonk NP04oonjN_oo^g[ookYjoonkNP;ookYj1Ooo^gX00ooo^W[ook]joonkNP02oonjNP;ook]j0_oo^WX0 0ooo^g[ookYjoonkNP03oonkNP03oonjN_oo^g[ook]j00;ookYj00?ook]joonjN_oo^gX00_oo^gX0 0ooo^W[ook]joonjNP02oonjNPCook]j0_oo^WX00ooo^g[ookYjoonkNP03oonkNP;ookYj00?ook]j oonjN_oo^WX00_oo^gX4oonjNP;ook]j00?ookYjoonkN_oo^gX00_oo^gX2oonjNP04oonkN_oo^W[o okYjoonjNP_ook]j0_oo^WX4oonkNP03oonjN_oo^g[ook]j00GookYj0ooo^gX01_oo^W[ook]joonj N_oo^W[ookYkoonkNP;ookYj00?ook]joonjN_oo^gX02?oo^gX01?oo^W[ook]joonkN_oo^WX2oonk NP03oonjN_oo^g[ook]j00?ook]j00CookYjoonkN_oo^W[ookYj0_oo^gX01?oo^W[ook]joonjN_oo ^WX2oonkNP;ookYj0ooo^gX3oonjNPKook]j0_oo^WX01Ooo^g[ookYjoonjN_oo^W[ook]j00;ookYj 1?oo^gX01_oo^W[ook]joonjN_oo^g[ookYjoonkNP?ookYj00?ook]joonjN_oo^gX01Ooo^gX01ooo ^W[ook]joonjN_oo^W[ook]joonjN_oo^gX01?oo^WX01Ooo^g[ookYjoonjN_oo^g[ookYj00Cook]j 00KookYjoonkN_oo^g[ookYjoonkN_oo^WX6oonkNP03oonjN_oo^g[ook]j00?ook]j00CookYjoonk N_oo^g[ookYj0_oo^gX2oonjNP?ook]j00CookYjoonkN_oo^g[ook]j0_oo^WX5oonkNPGookYj00?o ok]joonjN_oo^WX00_oo^WX3oonkNP07oonjN_oo^g[ook]joonkN_oo^W[ook]joojdN`03oobYO@;o o:Qm0_olZGd4oobXO@0>oo^XOOokYggonjQmoo^WOOoiXgkonJ20oobXPOomZh7oo:Z1oob[P?omZh7o njZ1oo:eOOoc_802oo>gO`04oo:dOood^7konE[_odTjkomh>eooYf`?oiRgOoUBMkohDSMomi7gOoOA]d00_oN @]h0DOoNA=gogTKMome3h?oM?n;of3OMomDge_oF=]God3K>oldfb_o<Bm7obT[< olU>b?o;D/?obe?1ola?aOoBLcocD[4olNCQ?o8UX?obIF3olNCP`02olFDP`0>olBDPoo3UX?o`YF0ol:FOoo4VgooaIao ol>IP?o4WH3oaYj1olBKP_o1V8Go`iV6olNMPOo9WWh2olVOO`0:olNNO_o8WggobImmolVRO?o:Wgoo giJConNEV_oQTY[oh9BHon6EU`;ohIJG02?ohIFHomnBV_oCRIcodX>Qon2;X_oNT9oogYFLomZ?WOoH TiWofYRFomVGV?oJV9cofi>RomV?Y?o^]i7ojkj>okj>Zoo5UJ_oc9NZol^FZOo;V:SobiVZolJ@[onn R[?ociRYom:JYoo@VZSod9^Xom6KYooCVjSoeYfWom>IZ?o@V:_odi^XomBKZ002omJLY`1FomJLZ?oD VjSoei^XomNLYooGVZSof9bWomRMZ?oEW:_oe9Z[om>H[?oDUjcoeiZXokfH__nUY=;oYik=ojRLbonX W/goZIk;ojNJbon[Wl[o[jW;ok>`c?n`Y/coZjG=ojNRc_o8Qlko`[:ioi3VYOnThL;o]LjJom3AM?oG fXKoeL1monMkO?ooI8_oofJ?ooU]ROoQThCoe[j0om;>PooCbhGoel^1olk;Q_o>c8Koc/n5olk>POoA cXCoc/^6om?:QOoCbXCodlZ2omG;Ooo>bXKocLZ7om3CKonaTVgo/HEVok>0I_n`N6_o[8U_ok23J?nb NF?o]7MRokAjHoncM6Go]WYQoljUDooF/e7odZa@om:[DOoB[E82om:_D`0Gom>_DooC[U?odZeAom:/ DOo@[5;odJaCom2^Doo?[e?odK1Com6eEOo?/UGod:MCom2PDoo>[eOoa8oo9jWOoaNYgol8:Honn6T_oaNi_on5bgoo]A_ookCl;o nUbkooEjYoodQYoomGjUoo=lYOo_RIgoki6KonjFV_o]UiWokYJLoo2=XOocOZcolX^eoo6H/_obU[Co li>fooB?^?ogQL3onW_5ooMaa_odK/ComV[9ooUVcoojIM3onfK?ooeZc?omKL_ooFk>ooIQfOoVCMoo iTgNonIgOoVB]kohTONon56g_oPAMkogD7PomXkh_oI=n;ofcORomThg?oE=mOo cSKDol``dOo@:]KofBWHoml]f_oS<=WohR_Lon<[gOoZ;=ool3[LooM>doogD=co gcONonIon2EV?oQUiOohIJH0_oQUIL08_oP TI[oehfKom>7X?oMQZCoghnOomfEVooKT9oofI2MomZHU_oIUiOofIRJomZCX_oIS:Kol;Z?onZmS_o0 T:_oaY>/olfHZ?oI [?oBUjgoeYNZomBJZoncV/KoXIkDojNGc_nXUlkoZIO@ojZLcOn/YlSo/Zo4okBd`on`/n `_ng]/CogIG8olC0ZOn>hhoo[=>EomKHM?o>fG_ofM^3om?1OOoXOX3oofJ=oom/T_omJY;ok7b9omV^ POoK>oj_[eon]i/Go[mJgokJnWonm[HGo`ZAhok^?IOngRVKo]I5[ ok>EK_naR6co/8AXok63I_n]RFoo[89`ok9lJ?ndNV?o]7ESokEeI?ncLF?o`hmIomNeDOoD/E;odjiA om:[D?oAZE3odJ]Com>_DooC/5Codk5Dom>`DooB[e?odJeCom6]D_oA[U?ocjeC00;od:iC00cod:mC olnYEOo>VUSociYGol^bG_nncF3o_MEYokkCK?nmdfco_ME[okcDJ_nleFT2okgEJ`0=okkEJonne6[o _]A[okkDJonle6[o^]EYokkDJOnneF_o_mEbol?EN_o6eGooa]AoolGDOP02olGDO@04olGEOOo4eGgo `MEmol;EO@?o`mEm0oo2e7`04_o2eGco`]Alol?EO?o5dgco[]ajok;INoo0dggo_=EmokgEOOnoe83o ]]E]okO@G?n_de_o]]E_ol;EOoo2eGgo`MAlol3EO0;o`MEm00Co`]Emol;DOOo0eGgo`]Am0_o2eGd2 ol;DO@0@ol7EOOo0eGgo`MEmol7EOOo2eGgoa]=mok[GNonBifooRNIKojOFD?n_de7oYmE@onS2Kooo ^W[ook]joonjNP;ook]j1?oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNPCookYj00Cook]joonjN_oo ^g[ookYj0_oo^gX4oonjNP04oonkN_oo^W[ook]joonjNP;ook]j1?oo^WX01?oo^g[ookYjoonkN_oo ^WX2oonkNPCookYj00Cook]joonjN_oo^g[ookYj0_oo^gX4oonjNP04oonkN_oo^W[ook]joonjNP;o ok]j1?oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNPCookYj00Cook]joonjN_oo^g[ookYj0_oo^gX4 oonjNP04oonkN_oo^W[ook]joonjNP;ook]j1?oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNPCookYj 00Cook]joonjN_oo^g[ookYj0_oo^gX2oonjNP03oonkN_oo^W[ook]j00Cook]j0_oo^WX00ooo^g[o okYjoonjNP02oonjNP?ook]j0_oo^WX3oonkNP03oonjN_oo^g[ook]j00?ook]j0_oo^WX4oonkNP?o okYj0ooo^gX00ooo^W[ook]joonjNP05oonkNP;ookYj00Kook]joonjN_oo^g[ookYjoonkN_oo^WX2 oonkNPCookYj00Cook]joonjN_oo^g[ookYj0_oo^gX4oonjNP04oonkN_oo^W[ook]joonjNP;ook]j 0_oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNPCookYj00Cook]joonjN_oo^g[ookYj0_oo^gX4oonj NP04oonkN_oo^W[ook]joonjNP;ook]j1?oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNPCookYj00Co ok]joonjN_oo^g[ookYj0_oo^gX4oonjNP04oonkN_oo^W[ook]joonjNP;ook]j1?oo^WX01?oo^g[o okYjoonkN_oo^WX2oonkNP;ookYj00?ook]joonjN_oo^gX01?oo^gX2oonjNP03oonkN_oo^W[ookYj 00;ookYj0ooo^gX2oonjNP?ook]j00?ookYjoonkN_oo^gX00ooo^gX2oonjNPCook]j0ooo^WX3oonk NP03oonjN_oo^g[ookYj00Gook]j0_oo^WX01?oo^g[ookYjoonjN_oo^WX3oonkNP0000CookYjoonk N_oo^g[ookYj0ooo^gX00ooo^W[ook]joonjNP02oonjNP03oonkN_oo^W[ookYj00Gook]j00?ookYj oonkN_oo^gX00ooo^WX2oonkNP03oonjN_oo^g[ookYj00Cook]j0_oo^WX01?oo^g[ookYjoonkN_oo ^gX2oonjNP03oonjNooo^g[ook]j00;ook]j00?ookYjoonkN_oo^gX01Ooo^gX2oonjNPGook]j00Ko okYjoonkN_oo^W[ookYjoonkN_oo^WX3oonkNP03oonjN_oo^g[ook]j00?ook]j00CookYjoonkN_oo ^W[ookYj1Ooo^gX2oonjNPCook]j00?ookYjoonkN_oo^gX01Ooo^WX00ooo^g[ookYjoonjNP03oonj NP03oonkN_oo^W[ook]j00;ookYj0_oo^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ook]j 00;ook]j00KookYjoonkN_oo^g[ookYjoonkN_oo^WX2oonkNP?ookYj0ooo^gX2oonjNP04oonkN_oo ^W[ook]joonjNP;ook]j00?ookYjoonkN_oo^gX00_oo^WX01?oo^g[ookYjoonjN_oo^WX2oonkNP05 oonjN_oo^g[ook]joonjN_oo^gX00_oo^WX9oonkNP03oonjN_oo^g[ookYj00;ook]j00SookYjoonk N_oo^W[ookYjoonkN_oo^W[ook]joonjNP?ook]j0ooo^WX5oonkNP05oonjN_oo^g[ook]joonkN_oo ^WX01?oo^gX2oonjNPGook]j0_oo^WX2oonkNP05oonjN_oo^g[ook]joonjN_oo^gX01?oo^WX4oonk NP;ookYj0_oo^gX3oonjNP?ook]j00Gook]koonkN_oo^g[ook]joonjNP05oonkNP03oonjN_oo^g[o okYj00;ook]j00?ookYjoonkN_oo^WX00_oo^WX2oonkNP;ookYj00?ook]joonjN_oo^WX00ooo^WX0 0ooo^g[ookYjoonkNP0;oonkNP04oonjN_oo^g[ookYjoonkNP?ookYj1?oo^gX3oonjNP04oojgNook ZGgonjImoo^ZO@;onjQm00?onjUmoo^ZOOokZWd00ookZWd00ookZ7gonjYmooZYO@02ooZWO@07ooZW OoojYWoonjUooobZP?ogZgkol[Ymoo>iO`04oo>gO`06oo:eO_of_Woon;odcGJomP`gOoU;^7ok37Lond_g?ob;N3o lbcQooD/h_oj;^;onS?OooHjg?oj@mOonSgEooaOo:E;oo bU?0olY?a?o;B<_oc4G>ol]5coo:A/gobdK=ol]7cOo:ALkobDG=olM6boo6BaonAH__oYBlSoi5ZconARZ?oSI:SohF^UomF5UOo;VX?ob9Z0olZGP_o;UHCobYF4olVFQ?o9UX?o biR3olZFP`02olVEP`0=olRDQ?o6U8?oaI>4ol>BQOo3ThGo`Y>3oknBQ?o0UH?o_iJ2olBKOoo8WGoo aYb0ol:IP002olBLP009ol>MPoo7WXCob9^5olBHQOo3V83oaienolZPOoo7WWooaYeo00;obJ1m00Oo bJ5nom2LQOoSUIOoiY>Kon>DV?oPU9Soh9JG00;ohIFG01[ohIFHomn@V_oISIcoe8NPom^5Y?oOSZ3o g9>Mom^AW_oKT9oofYFHomRGUooJVIWofY>PomN6ZOoa^hoojKf?ol>CZOo;UZ[ocYVXolbHZ?o:UjWo biJZol::/_o2S[3odI^Xom>KY`;od9ZX087odI^Wom>KZ?oEW:Ooe9^Xom2FZ_oBVZSodiZYomJLZ?oF WJOoeifWomBKZOoDVZWoei^XomRMYooGVjSof9bWomVNYooGW:WodiZ/olnD[oo=TK3odiJ/ol^E]?n/ YL[o[KZnojngZ?ncaYco_=FDok[CQ_nidH7o^M60okCCNongdggo^mEkokCFN?o8bH7omkBColW;N_nU g6Sof^=^onGWJ?oIiG7oj>QeomoBLooeRW7oof1booi^OOooKHComG23on2EN?o>ah3ocMJ5om3>QOo@ bHSoelf5omW;Q?o?ahOobLN8ol[9Q_o8bHGodl]oom?;Q?o?b8Sod/V6om?:Q_oBbXGodL^4olo>POo= aWko]lZJojWM_onZj/coZn_=ojWT`OnZdJ[o/l2FokNTNoniTFOo^Y9YokZKJoneSF[o/HQ/ok65JOnb T6Wo[hm`ok=hKOndNV[o/gYVokIfHoneMVGo]W]PoljVDOoF/e7oe;1ComB_D_oC[E;odZ]Aom6XD?oC Ze7odjmCom>`E?oB/ECod[1Dom:_DooB[U;odJiBom:bEOoA/UGodK5FolnXF?o>YE_ocZEJolbHE?oA WEKobkUOol7@Hoo0eV_o`M=^ol7DK_nmeF_o^mEZokcEJ_nmeF_o_=E[okgDJonmeF_o_]E[okgDJonm eFX00_nneFT02?nmeFco_mEdolCEO?o6e7koa]EnolCEOOo3eGgo`]Em0oo3eGd00oo4e7go`]Elol;D O002ol;EO00Bol;DO?o2eGco`mElolCDO?n/g7[o/=UlokoDOOnleGgo_MEmokkEOonkeGco/mATok;B F?nadego^MEaol?DOoo1eGgo`=Em0_o2eGd00oo2e7go`]Emol3EO@05ol;EO@03ol3FOOo0eGgo`MEm 00?o`]Em00Ooa]=nojkKN?mljV3oR^1@ok;CD_nWeToo`laM00Cook]j00?ookYjoonkN_oo^WX00_oo ^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo ^gX00ooo^W[ook]joonjNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00?ookYjoonkN_oo^WX00_oo ^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo ^gX00ooo^W[ook]joonjNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00?ookYjoonkN_oo^WX00_oo ^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo ^gX00ooo^W[ook]joonjNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00?ookYjoonkN_oo^WX00_oo ^gX00ooo^W[ook]joonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo ^gX00ooo^W[ook]joonkNP02oonkNP06oonjN_oo^g[ook]joonjN_oo^g[ookYj0_oo^gX3oonjNP?o ok]j0_oo^WX01?oo^g[ookYjoonkN_oo^WX2oonkNP03oonjN_oo^g[ook]j00;ookYj00Cook]joonj N_oo^W[ookYj0_oo^gX01Ooo^W[ook]joonkN_oo^W[ook]j00;ookYj2_oo^gX00ooo^W[ook]joonk NP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo^gX00ooo^W[ook]joonj NP02oonkNP03oonjN_oo^g[ook]j00;ook]j00CookYjoonkN_oo^g[ookYj1?oo^gX00ooo^W[ook]j oonjNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00?ookYjoonkN_oo^WX00_oo^gX00ooo^W[ook]j oonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo^gX00ooo^W[ook]j oonjNP02oonkNP03oonjN_oo^g[ook]j00;ook]j00?ookYjoonkN_oo^WX00_oo^gX00ooo^W[ook]j oonkNP02oonkNP03oonjN_oo^g[ookYj00;ook]j00?ookYjoonkN_oo^gX00_oo^gX00ooo^W[ook]j oonkNP02oonkNP06oonjN_oo^g[ook]joonjN_oo^g[ookYj0_oo^gX3oonjNP?ook]j0_oo^WX01?oo ^g[ookYjoonkN_oo^WX2oonkNP03oonjN_oo^g[ook]j00;ookYj00Cook]joonjN_oo^W[ookYj0_oo ^gX01Ooo^W[ook]joonkN_oo^W[ook]j00;ookYj2Ooo^gX00ooo^W[ook]joonjNP02oonkNP7ookYj 003ooooFMRcoomIf00?ooLahoo^nN_ok_WX01_ok`7X03_ok_g[onkmioo^oNOoj_gWon[ijooZmN_oj _WWon[ijooZnNook_g_on;ijoo;7N_occGcollYl0_ocbG`2oo?9N`04oo?8O?ocbgcon=aoooWMO`go n=f00_ohg7h02_odeggokkR4oo6>U?o`OicolHbJonnBUOo_TiCokiFDonjFT_obNjH2oo]E`P0CooM` /OocSIkolY6Ioo2>onZVQooYYHSojZ>:on^TS?o[Y8_ojiV?on^GVOoYZYkojjRRoo2@ /_ofO<;oo6gCoi4CSonI7hOoXCN3ojDkQonM; h_oX@n7omcoOooi5g_ojAMgonC_PooHdhOog=^3omcONonhffOoX==_ojcSNooSP_o6YX;oaJN2olFX P?o4ZGoo`jUoolBYP?o2Z7ooa:YmolJ/OOo7/7goa[5mol6[O_o2[7koaJj2olBZPoo5ZX?oajj0olJ_ OOo4[7coaJimolN_OOo6[gcob;1lolRaO?o8/7godJ^5onBUUooUY9WohZFFon6UUP;oh:JE0_oPYIH0 1OoPX9Wog9jMomBJWOoGU:;oh9fO00;ofj>K01;og:>Lom^VVOoHYiKofZbEomVVW?oFUjKol<^?oncB S?o2XZOoc:VWolbZY_o;ZZKobZZVolVUZOo1VZooaj:/om:]YOoC[J@3om2/Y@07om>]YOoE[JGoeZjT om6YYooAZZKodj^VomF^YP02omJ_Y@1EomF^Y_oCZZOoeZbVomR^YOoG[ZGoejfUomV_Y?oG[:Kod:F/ om6Y[OoN^Z?oi/2Ioo36RooRchSo^NM_okCWJ?nhiFKo]nEVok_UIoniiFKo^NEWokSUJOniiFSo_^EY okoTJ?nliFSogMUmooc7JoncP6oo/X9/ok>3IoncOVGo/7aWol>KEOoE^Dgoe;I@ omBhDP02omBiDP0Mom:fDOoB/e7odkA?om:eCooC]U7odkQBom>iDooC^E;od[M@om:gDOoC]e?od;AG oln`F?o@/USod[AJom6dF_o?[UOocjAEom:ZEoo9`U[o`]iQokoVJOo0iF_o_^IYokgVJ?nmiVWo_^IY okkVJ_nmiVX00_nmiVT02_nliVSo_NIYokkVJOnmiVKo^nIVokcVK?o1iWCo`nIiol;VNoo2iWX3ol?V N`03olCVNoo3iW_o`nIj00Go`^Ii013o`nEiolCUNOn]jWOo[^UiokkUNonliW_o_NIjokgVNoo0iGoo ]NIaojoUF_nghU_o/nAMok_VLOo3iWko`nIl0oo2iW/3ol7VN`?o`^Ik0oo1iW/4ol;VN`08olCUOOo1 iGWoSNaQog?bE?nMjE3o[^E>ojOVC_o/fVgooooFMT;oomIf003ooooFMRcoomIf00?oomEfooc6NOok _7X01?ok`7X2oo^oNP04oo^nN_ok_gWon[mioo[0N@;on[ii00Konl1iooZoNOok`7_on[ijoo;2Mooc cg/2oo?9N`;oll]k0_ocbW`01Oobb7col/QkooWLOOohgGoon=j100[on=f002?on=aoooWLOOoefWko klB1oo2ATOocN9oolXNMoo2BUoo_U9Kol9>FonnCU_o_UYCol8NMooQN_?oiF/3olWfXonnAV_o^TYSo k9:JonbNT_oYYh[oj:F6onRSQooZXXWojZB9onZWR?o[WhgokXjKoo2A[?ocS[_ongO9ooe^coolK/oo o7?gOoRDmco iECKonMDg?oWDMgoj53MonQ>g_o[Bn3okDOSona6iOo^B>Col53Poo5Ch?obDn7ol5;Oone>foo^CMWo kd[HonU3fOoY@Mcoj43KonHlf_oO>m?oeCg5om8mbOoI?]?ogcgFonYPoo8[8?o`jV3olF[P?o:/g_oaZmmol>[ OOo4[Ggoa[1lolVbO?o:/Gkob;1nomF[R?oVYYKoiZJGon>UU_oRZ9D2on6WU@0Lon2VUOoQYiGohZBI omnPWOoFWI_oeIBPon6KX?oNXYcofZ:KombSVooNYiWofjFIom^[UOoJYi[ofIjRong5Too/dHko`J2W olbYYooY[omG^JooXkVWokO9/on_PJOoiSEcoofYNoomfGOoo NF?oogAToo]kF_o^/F?oj^E[on7`L_oVjW?oj^Q_onGVM?oPi7SohN5gomoON?oMg7Ood=R0ol[GPoo8 eX?oam>4olg>QOo9cHOoc=27om?hD_oD^E?odkMBomBfDOoD]U3od[A?om:dD?oB]E3od[MAom>iDooC^U;odkMEom6`E`03 om6aE`0>om6bF?oA/eWodK=Jolj[Eoo@XUCodZ]Eol?AG?o0iV[o`nA/okoUJ_nniVWo_NIYokoVJOnn iVX3okoVJP08okkVJ_nmiV[o_^IZokkVJOnmiVOo_>IXokcVM?o0iW`2olCVN`04ol?VNoo4iW_o`nIk ol;VNPKo`^Ii00Koa>Eiol?UN_n[jWOoZnYhokkUN_nmiWX2okkVNP09okoVO?nkiWko/^EYokKSG?nh heco/nENok_VL_o4iWko`nIk00;o`^Ik00?o`NIkol3VNoo2iW/01?o2iW/00oo1iW_o`>Ijol;VN`03 ol;VN`08ol7VO?o0iGWoY^IRogW_Don1l5SoZ^I?ojGWB_o5hE_ooooFMT;oomIf003ooooFMRgoomIf 00Coo]5gooc1NOok_G[onl1j0_ok_gX01?ok_W[onkmjoo^oNOok_gT2oo[0N@0DooZoNOoj_WWonl1i ooZoN_ok`7[om[mjoo7;N_occ7_ollYkoo;9Noobb7collYkooC;NoocbWcollUloo;5Noofe7gon=eo ooSMP?ohgX07ooSMP008ooWMOooifggom]]loo;?POo`XH[ol7fKooB1X?obTIP3oo2CUP0Koo2CUoo` UYColHfJooQQ^_olEoo]bcOokML_onWK9oo]fb_oiM/[onGO900;onWS903KonGO9ooYeb_ok ML[onGS8ooYfaoomL/comF?GonQAgOo[DMgokeSLoo1EgOoaD]koldoPoo=>h?obBn7olT[Too5e_oWB=KoiTOFonM6f?oT@]WogckIomm0eOoK@M;odT79ol]8_?o< DK[oed_9on52e?o/A];olDk>onmFaoo^H[_ol6Jfon]U]?oEH;_o_f2nokaX^Oo0JKSo`6RhokmY]onn JKKo_V^eokiY^?nmI[Wo^VJfokUZ/onjJ[@2okYX]01Qok]Y]?nkJ;Ko^F6kokYT^?nkIkGo^VNgok]W ]onkIkSo^fRgokAN__nmCL_ogdS7oo9J]OoVL[3oeWJ^omE_[OoHKJoofFf`on5P^OoWD/OOo3[GcobK1mol^aOOo:/Gkof:^:onJW U_oTYiKohjJFon:XU_oQZ9GohJNEon6XUOoPYiKohjFJon6QW?oIX9WodiJNomfGX_oOXIgofJ:KombT V_oNZ9WogJJKom^YV?oIYYWofZ6Pono:T?o[dXgo`j6Wol^XYoo=ZjGoc:^Uol^YY_o9Y:Wo_iV`ol^V Z002om:/YP09om2/YOo@[JGod:^VomB]YOoE[ZGoeZjUom>[Y_o@ZJOodj^V00;oeZfU00[oeZjVomJ_ Y_oCZjWoeJ^YomJ]YooCZJWodZRZomniXOobd8[ooMIi1OooeWH0FookegGoc^1_ojkXJ_ncif[o]nI[ okWVKOngiV_o]NIZokSVJonfiV_o]nI/okcVK_nhiV_oan=dooW;T_obdI3ofNe/ooOdGooVkVgofni/ onK]Joo[lVgoj^1[ooZdOondZg;o]9QVokNgDOoC]e;oe;UBomBhD_oC]U7od[A@ om:fD?oB]E7odK=Bom>bE_oB/5Sod[5Hom6aF?oA[eSod:iGom6`Eoo@/5L00_o@/EP01_o@ZUSod:MF ol;>H?nliF[o`>EYokoUJ@;o_^IY00Co_NIYokkVJOnniVWo_nIZ1?nniVX01OnoiVWo_^IYok[VLonm iW_o`NIk00;o`nIk00?oa>Ikol?VNoo2iWT01_o2iWT01_o4iG[o`nIjojS[Mon[jGWo_nEjokkUNP;o _NIk00Wo_^IlokgVOoniiWWo]^AQokSRG?ngheco]>ANok_VL_o3iWd00_o2iW/00oo1iW_o`>Ikol;V N`04ol;VN`03ol7VNoo0iW_o`NIk00;o`^Ik00[o`>IjokkVNonkiW_o[NESoiKXEOmhlE[oTNaCojcU COnXiTgojmY/ooooeWI1oooFMP00ooooeWH^oooFMP05oogoo2LUoofRj[oo6S2oomOcoolLgOo[C=Ooj4SEonM4eOoYA=Oo iT;Fon11dooK?=?of47=omA0b_oA?<[ocTG3om5I^OoFG;cogU7hokQQ^OniI[Go^VVeokaX]onmIkSo_66mokMEaonnB]YOoA[:Kocj^Vom2]YOo@ZjKoe:fUomF^YOoF[jCo djfUom2XYooCZjH00_oE[JH02?oF[JOoeZnVomB]Yoo@YJ_odZNZomZbY?o]bi3onmEn2?ooeWH0C?of f7Gob^9^ojoWK?nciV_o^>I[okOVJonfiV[o]nI[okSVK?nfiV_o^>I/ok_VKOnfiV[odm]iook6U_ol `H_okMYDonGdIOoRk73ogNe/onW]Joo/lVgokn1Yoo^EaonWUKOo^ifSok>Q/onSWL?oZjFkojNU^onOZKooSkFooe^e_omC_KooE kG;od^YdomSXL_oOi6[ocMicok3UR?nTjiSoZ>NToj;@SonJa83oUlR:oig5U_nPaISoW/BCoifoS?nX ]XSo]JF1okJLM?niWFoo]i5]okAnK?nbL6So^XAMom>hD?oI`E;oe;U@omFjD?oC]doodkA?omBdDOoC ]U42omBjDP09omBiD_oC^57odkEAom:^Doo@ZeGodJmFom6`F?oA/ESod[AH00;od[9H00_od[AHom:b FOoA/UWod;AHom2^Eoo@YE?oalUSokGVI_nhifGo_>EWokkUJP02okcVJ00=okgVJ?nliVSo_>IYokgV JOnniVWo_NIYokgVJ?nmiV[o_>IfokkVO?nliW[o_^Ikol;VNP02ol?VN`03ol?VNOo2iWWo`^Ii00;o `^Ii00Oo`nIiol;VNOo3iGWoa>EiojG[M_nYjWSo_nEl00Co_^Il00co^nIlokgVOoniiG;o]^ANokSR GOnghUgo]>ANokcVLoo3iWgo`^Ikol7VNoo0iW/5ol;VN`03ol7VNoo0iW_o`NIk00;o`^Ik00_o_NIj ok_VO?njiW[oYnIQojGUF?n9jeKoNO9HoicYCOnTiTWoa^1LoogFM@3ooooFMT3oomIf003ooooFMRko omIf00CoomAfooc5NOoj_G[onkmi0ook`7T4oo[0N@0CooZoNOok_gWonl1iooZoNOod`GOollmjoo?: Noobag[ol/Ujoo?Goo6CUP02oo2BUP0Noo2D UOoaU9GomGNXooUS^?odQ:?okifAonfRSoo/XIGokJ6DonjTTOo_YhkokJR?onjSU?ocUZ3on8R`ooej _oooI/Ooof?8ooagaoohNkoniW]?o[IKKojV>honMX/_oVJZooifRdon]X]_o^J;Coh6BholIT^onjIkWo _6Riol1W^_nmIK[o^VJfokYZ]?nlJKGo^fRdokYX]?njJKKo^VVdokQX]OnhHkWo^VJfokYX]?nlIkSo _F2nok]Ga_ngDU?o=ZHGobJZ1olNUP_o6YH82olNUPP03olVWP_o:Z87obZV000;obZ^104Oob:V2olJWP_o6 Yh;oajR2olNZP?o6ZH3oa:V1olJYPOo4ZH3o`JV1oknXP_o0ZH7oa:eoolNcOOo7]7goak=molRcOoo7 [h7oaZ^0olBZPOo5ZX;oaZ^3ol6VPoo4Zgkob[=kolJ_OOo8/7cob[5lolJ/P?o4ZH3oaJemol^^P?oN ZHooj:NIonFXUOoSYIKohZJFon2WUOoQZ9GohJVFon>XU_oQXi[ohZ:LomfSV_oEWI_of9BRomnNW_oH WIkofjJJomfXVOoLZ9[og:VLomNSW?oEVikolLj=onWASoo3XZWobZVVolf/YOo]YOoA[:KodJbUom2/Y_o@ZjKodjfUomB]Y@02omF^Y@04om2YZ?oBZZWoeJfWomF]YP;o eZjU00God:NZomB[Z?oX`iOon=:3oooFM`0:oooFMP0WooSHMOo;hFoo[^QZok?VJ_nhiVco]nI[okGV JonfiVco]^I[okGVJonjiVco^NI/ok[VK?oUfHOook^FooVRJOoRfU3ohO=[onC]K_oPkVcojne[onkb Jooah6GonXYOoom/I?ooM67oogUUoomgIOooKUoooVaLoo6KI?oYeF[oiNm_on?ZL_oViFook>IZongW JOoViVooj>I_00;oj>E^02kojnM_onOYKooSjFoognY`om[[L_o@kVkoe>mUonCaG_oMkeko^>m[ojO] NonUjWGoXmmToioLI?nSfFooXm9foiOBMon@eGOoUdROn_Z8Co[9F6ojb6 QOo5YVCogom>gDOoD^U7oe;]ComBnE?oD_EGoe;IGom>a E_oB/eOodK9Fom6aE_oA]EOod[EH0_oB]EX03?oB]5WodJiFom6/E?oC/EGodk9Jolk2I_o0efoo^=mX okOTIOnliVSo`NEZokkVJ@;o_NIX0_nmiVT01_noiV[o_^IYokoVJOnmiV_o_NIhokkVO0;o_^Ij00?o _NIjokoVN_o0iWT00oo1iWT4ol;VN@04ol?UNOo4iGWoYNagojC[N0;o`>El0onniW`03?nkiW_o_NIm okkVO_nfiFOo]^=KokOSG_nghUco]>AOokgVMOo4iWko`NIkol3VN`Go`^Ik013o`>Ikol3VN_o2iW_o `^IkokoVN_njiW_o_>IlokWVN?nUiV3oXNEFoj?VFommkeKoPO1Eoj7WBon[iDkojmY]ooooeWI0oooF MP00ooooeWH_oooFMP03ookAMook`GWon[ii00;onl1i00?onkmiooZoN_oj`7T00_oj`7T02ooj_WWo nl1ioo_0NOof_WSol/YiooC>N_ocbg[ollQkoo;7N_obbg[ollaj00;oll]k00GollYkoo?9Noocb7co llMkooOIOP03ooWMP00TooSNPOoigH3on]]mooSKOOoaaX;ol9:CooIgX_obPYoolY>Ioo2DUOo`TIOo lI6Hoo:@V?obSiSolI2Hoo6@UooaT9KolXNNooAnZOo`Ti[okZF>onfVTOo]XYCokZBConjXS_o^ZHoo lJ6IooFBZ?oiPKOooW?3oomaaOooJLOoofK2ooj6]?omR[WooWG70_onN<801?onML7oogVnoomj_Ooo NKh2oomh_@04oomg_OooM[googBmoom``@;oof_400GoofG>ooU?gOoaA>3olTSPooA=gP02ooMAg@0V ooA>gOo`C=ookd[Roo1:h?oaBMgokDGIonQ1eOoU@M;ojD;Cone1eOoX?mGofCc=olhma?o>?l;odcc7 om@lb?o??l;odTG4ommAc?oVI<[oi676omiQ^ooOI[KojV6hon]U/ooWIk;ojVBfonUV/ooWJ;;ojFRe onQZ]ooYJKGokFZcon=V]_o:H[_o^fFkokQV^?njJ;D2ok]Z/`0SokYY]OnjIkKo^FNfokQY/onjJk?o ^FRfokIU]_nhI;Oo^efnokaHa_niElKo_5o1ol]U]_oKKJ;og7JLomAiY_oHN;7og7BcomQ]/?oFLZ[o ffj`onQG`ooWDRZ_o< ZJGocJbTolbZYOo;Z:Koa9j/ol:M[Oo@ZjKodjfUom:/YOo@[:GodJbVom6[Y_oC[:GodjfV0_oC[JL2 om6ZZ007omJ]YOoE[JKoeZfUoljTZ_oE[ZKom=::ookEN@0=oooFMP1UooOHMOoQ[okCWKOnj iFco]nI[okKVJ_nfiV_o]nI/okKVK?niiVgo]^IZol;ULoobe8kooj24ooNBC_oZiE[ojO=Won?]KOoT kFcojNi[on_bK?oaffSonXUNoom[H_ooMF;oogQVoomfH?ooL5koof]QooV0H_o[]VCoina^on;]LooZ j6golNQXonSWKooVig3oinM_onSVKooYifooiNM`on?WL?oWiW7ojNMcon?YKooIjVSof>]Uomk[H?oG kEoo/o1YojO^M_n_jF[o[^AMoj_VG_n[iF3oX^MMoi_YF_nFjE[oWN9VoikLK_nMfWCoY=IfojW@M?nV b7WoY;R9ojZmNonlfEkoaMQLol[>G_oAbEgod/UMom?4F?oE^e?od[==om:fC_oB^U7odkUBom>fE?oC /UCodJmFom>bEooB/5Cod:YCom2]Doo?[ECocjeEom2/EOo=ZUCod;1Gom;0Hoo:c6WoaME/ol?HL?o2 eFooa]Aaol?EKonjh6So^nIWol3UJ_o0iFT01?nniVT01OnniV[o_^IYokkVKOnmiW[o_^Ik00;o_^Ij 01oo_^IkokgVN_nmiWSo`>Iiol;VNOo1iWWo`>Ijol7VNOo2iWWo`>IjolCUN_o4iG_oYNagojC[NOo1 iGco`>ElokkVO?noiWco_NImok[VNonmiW_o_nIook_VN?nfi63o^>9LokKSG_nghU_o]>EPokkVMoo4 iWko`NIk00Go`^Ik017o`NIkol3VN_o2iW_o`>Ijok_VN_nkiW_o_NImok[VN?nViV7oW^IFojOUGOnH j5SoN_5Iohc]C_nUiT[ocMmNookFMP3ooooFMSooomIf003ooooFMS3oomIf00GooL]hooZnNOok_gWo nl1iooZoN@03oo[0N@0DooZoNOoj_WWoo<1iooZmN?oca7Oollijoo?;N_ocbW[ollUjoo?9NoobbG_o ll]joo?;VOobSIWolI2Joo6?WOoaT9_ol9ZHonnQU_o_ X9KokiVIonnGV_o`WIGolYjFooBEW_ojPjoooGBooom[a_ooIlOoof[2oomWa?ooG_OoOE/omi`XOoL Kj?oe7FZomMg[ooNM;GoffbdomQ][ooJLJgohV2ion=D__oRE;goiEnfomV9V_o@Z8KobJZ2olVXPOo: ZX03ol^ZP003ol^ZPOo9ZX7obZ^100;obJZ200Cob:V2olRWP_o6Yh;oajR10oo5ZX402oo4ZX7oa:j0 olF]P?o0YX7o`ZR1ol>/POo7/GkobK9molN`Ooo7[h3obJj000?ob:j003;oaJZ2ol>VQ?o4Zh7oaZml ol>ZOOo7[gcobk=nolN^POo6[87ob:eoolN`OOo8ZX;ogZ:DonNVUooTZICohjJFon:TU_oQYiGohJRF on:XV?oSYiSohZ>Jon:SVooQY9[of9nIom>FWooNVJ3ofibOomVRW?oMZ9WogJNKomfYVooLYigoeYbP onc7T?o]dXooaZBWolbZYOo=[:GobjZUolZVYoo4WZcoaJ2/om6[Y_oC[JGodJ^Vom2/YOoA[JGod:ZX om:[Y`?oe:fV00OodJZWom:ZYooE[:KoeZjUolbRZooD[JOomM28013oomIf00Son=QeolWRK_nYjF[o /nM[ok[UJonfiV_o]NI[okSVK0;o]^I/05_o^NI/okKVJOo=hWOoml>;oon0J_oiXDgomNiKon_cIOoS kFcoiNa/onS^JooXlVcokmeXooR:H?onJF3oogAQoomgIOooMF;oofiJoom]H?okM6;omIUMonCHK?oR kg3okNeYon[VK_oXiVooinM_onOVKooWifooi^M`on7WL?oTig7oi^MbonSYK?oTjF?ohnUTon7[IOoL k6;od^mQok3`L?nUjg3o[>1PojoNGOncgV;o[n1OojSRG?nSiU[o[>ANojgTGonXiekoYnIPojSSG_nZ h63o[meTojkJI_n]gf7o/>1Pok;MH_nhffCo_MQVokkIHoo0f5ko`]9Molk9F_oG]57oe:9;omBRD?oD Xe7odIi@omBSDOoDYE;odj=AomFVDOoCXU3odZ1@omB]E_oEbFWoa]MaokgLK_nlgFko_=U]okkIKOo0 f6ko`MM^ol7EKoo3eFoo^]mXok[VIoo0iF[o_nEZ00Go_^IY00?o_^I^okgVNonniW/00_nniWX02?nn iW_o_^IjokgVN?nmiWSo`>Iiol7VN_o1iWWo`^Ii0_o0iWX01?o4iG[o`nEjoj;/MonTjgT2ol3UO00? okkVO?noiWco_>Ilok[VNonniW_o_nIlokkVOonhiFoo]n=LokOSGOngheko]n9KokGUH_nmiWOo`nIn 00Go`^Ik017o`NIkol;VNoo2iW_o_>Ijok_VNonliW_o_^ImokWVN?nUiV3oWnIHojCUG?nWiEcoSNYH ogWaE_nGjD_o]^ABonoIK`3ooooFMSooomIf0000\ \>"], "Graphics", Evaluatable->False, ImageSize->{1046, 161}, ImageMargins->{{0, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}] }, Open ]], Cell[CellGroupData[{ Cell["Code to Illuminate Multivariable Calculus Topics", "Title"], Cell["Al Hibbard", "Author"], Cell["Central College", "Affiliation"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["Overview", "Section"], Cell[TextData[ButtonBox["NumericPlot3D", ButtonData:>"NumericPlot3D", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["CenteredNumericPlot3D", ButtonData:>"CenteredNumericPlot3D", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["CenteredContourPlot", ButtonData:>"CenteredContourPlot", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["Graphics3DViewer", ButtonData:>"Graphics3DViewer", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["CenteredPlot3D", ButtonData:>"CenteredPlot3D", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["Plot3DExt", ButtonData:>"Plot3DExt", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["RainbowParametricPlot", ButtonData:>"RainbowParametricPlot", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["LineIntegralIllustration", ButtonData:>"LineIntegralIllustration", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[ButtonBox["ShowApproximations3D", ButtonData:>"ShowApproximations3D", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["NumericPlot3D", "Section", CellTags->"NumericPlot3D"], Cell[BoxData[ \(g[x_, y_] := \ x\^2 + 3 y\^2\)], "Input", CellLabel->"In[128]:="], Cell[BoxData[ \(\(ContourPlot[g[x, y], {x, \(-1\), 1}, {y, \(-1\), 1}];\)\)], "Input", CellLabel->"In[129]:="], Cell[BoxData[ \(NumericPlot3D[g[x, y], {x, \(-1\), 1}, {y, \(-1\), 1}]\)], "Input", CellLabel->"In[130]:="], Cell[BoxData[ \(NumericPlot3D[g[x, y], {x, \(-1\), 1, 0.5}, {y, \(-1\), 1}]\)], "Input",\ CellLabel->"In[131]:="], Cell[BoxData[ \(NumericPlot3D[ g[x, y], {x, \(-1\), 1, 0.5}, {y, \(-1\), 1, 0.25}]\)], "Input", CellLabel->"In[132]:="], Cell[BoxData[ \(data = NumericPlot3D[g[x, y], {x, \(-1\), 1, 0.5}, {y, \(-1\), 1, 0.5}, \ Frame \[Rule] False]\)], "Input", CellLabel->"In[133]:="], Cell[BoxData[ \(\(First[data]\)[\([2]\)] // Rest\)], "Input", CellLabel->"In[134]:="], Cell[TextData[ButtonBox["Code", ButtonData:>"NumericPlot3DCode", ButtonStyle->"Hyperlink"]], "SmallText"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{0, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["CenteredNumericPlot3D", "Section", CellTags->"CenteredNumericPlot3D"], Cell[BoxData[ \(g[x_, y_] := \ x\^2 + 3 y\^2\)], "Input", CellLabel->"In[135]:="], Cell[BoxData[ \(CenteredNumericPlot3D[g[x, y], {x, 0}, {y, 0}, Radii \[Rule] 1]\)], "Input", CellLabel->"In[136]:="], Cell[BoxData[ \(NumericPlot3D[g[x, y], {x, \(-10\), 10, 0.5}, {y, \(-1\), 1, 0.5}, Focus \[Rule] {0, 0}, Radii \[Rule] 1.0]\)], "Input", CellLabel->"In[137]:="], Cell[BoxData[ \(CenteredNumericPlot3D[g[x, y], {x, 0}, {y, 0}, Radii \[Rule] {1, 4.0}]\)], "Input", CellLabel->"In[138]:="], Cell[BoxData[ \(NumericPlot3D[g[x, y], {x, \(-10\), 10, 0.5}, {y, \(-1\), 1, 0.5}, Focus \[Rule] {0, 0}, Radii \[Rule] {1.0, 4}]\)], "Input", CellLabel->"In[139]:="], Cell[BoxData[ \(Table[ CenteredNumericPlot3D[g[x, y], {x, 1}, {y, \(-2\)}, Radii \[Rule] 0.5\^k], {k, 1, 5}]\)], "Input", CellLabel->"In[140]:="], Cell[BoxData[ \(CenteredNumericPlot3D[x\^2 + 3\ y\^2, {x, 0}, \ {y, 0}, Radii \[Rule] {1\/2, 1}, Zoomable \[Rule] True]\)], "Input", CellLabel->"In[141]:="], Cell[TextData[ButtonBox["code", ButtonData:>"CenteredNumericPlot3Dcode", ButtonStyle->"Hyperlink"]], "SmallText"] }, Open ]] }, Open ]], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["CenteredContourPlot", "Section", CellTags->"CenteredContourPlot"], Cell[BoxData[ \(f[x_, y_] := 2\ x\ y\ - \ Cos[x]\ + \ Sin[\ x\ - \ y]\)], "Input", CellLabel->"In[142]:="], Cell[BoxData[ \(\(ContourPlot[f[x, y], {x, \(-1\), 3}, {y, 0, 4}];\)\)], "Input", CellLabel->"In[143]:="], Cell[BoxData[ \(\(CenteredContourPlot[f[x, y], {x, 1}, {y, 2}, Radii \[Rule] 2];\)\)], "Input", CellLabel->"In[144]:="], Cell[BoxData[ \(Options[CenteredContourPlot]\)], "Input", CellLabel->"In[145]:="], Cell[BoxData[ \(\(CenteredContourPlot[f[x, y], {x, 1}, {y, 2}, Radii \[Rule] {2, \ 1}];\)\)], "Input", CellLabel->"In[146]:="], Cell[BoxData[ \(\(Table[ ContourPlot[f[x, y], {x, \(-2\), 3}, {y, \(-4\), 5}, Focus \[Rule] {2, 3}, Radii \[Rule] 2\^\(-k\)], {k, \(-2\), 3}];\)\)], "Input", CellLabel->"In[147]:="], Cell[BoxData[ \(CenteredContourPlot[f[x, y], {x, 1}, {y, 2}, Radii \[Rule] 2, Zoomable \[Rule] True]; \)], "Input", CellLabel->"In[150]:="], Cell[BoxData[ \(\(CenteredContourPlot[2\ x\ y - Cos[x] + Sin[x - y], {x, 1}, {y, 2}, Radii \[Rule] 3, \ ShowGrid \[Rule] False, ColorFunction \[Rule] Automatic];\)\)], "Input", CellLabel->"In[151]:="], Cell[BoxData[ \(CenteredContourPlot[2\ x\ y - Cos[x] + Sin[x - y], {x, 1}, {y, 2}, Radii \[Rule] 3, Zoomable \[Rule] True, \ ShowGrid \[Rule] False, ColorFunction \[Rule] Automatic]; \)], "Input", CellLabel->"In[152]:="], Cell[BoxData[ \(ContourPlot[f[x, y], {x, \(-2\), 3}, {y, \(-4\), 5}, Focus \[Rule] {2, 3}, Radii \[Rule] {3, 1}, Zoomable \[Rule] True]; \)], "Input", CellLabel->"In[153]:="] }, Open ]] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"CenteredContourPlotcode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["Graphics3DViewer", "Section", CellTags->"Graphics3DViewer"], Cell[BoxData[ \(f[x_, y_] := Sin[x + Cos[y]]\)], "Input", CellLabel->"In[154]:="], Cell[BoxData[ \(\(gr = Plot3D[f[x, y], {x, \(-4\), 5}, {y, \(-6\), 7}, ColorFunction \[Rule] Hue, PlotPoints \[Rule] 35];\)\)], "Input", CellLabel->"In[155]:="], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[156]:="], Cell[BoxData[ \(g[x_, y_] := 5 - 3 x\^2 - 2 y\^2\)], "Input", CellLabel->"In[157]:="], Cell[BoxData[ \(\(gr = Plot3D[g[x, y], {x, \(-6\), 6}, {y, \(-3\), 3}, PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[158]:="], Cell[BoxData[ \(Graphics3DViewer[gr, Viewer \[Rule] "\"]\)], "Input", CellLabel->"In[159]:="] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"Graphics3DViewercode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["CenteredPlot3D", "Section", CellTags->"CenteredPlot3D"], Cell[BoxData[{ \(Clear[f]\), "\[IndentingNewLine]", \(f[x_, y_] := x\ y\ Exp[\(-\((x\^2 + y\^2)\)\)]\)}], "Input", CellLabel->"In[160]:="], Cell[BoxData[ \(\(CenteredPlot3D[f[x, y], {x, 1.2}, {y, 1.4}, Radii \[Rule] {2, 3}, \ PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[162]:="], Cell[BoxData[ \(\(CenteredPlot3D[f[x, y], {x, 1.2}, {y, 1.4}, Radii \[Rule] 2, \ PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[163]:="], Cell[BoxData[ \(\(Table[ CenteredPlot3D[f[x, y], {x, 1.2}, {y, 1.4}, Radii \[Rule] 2\^\(-k\)], {k, 0, 5}];\)\)], "Input", CellLabel->"In[164]:=", AnimationDisplayTime->0.5], Cell[BoxData[ \(CenteredPlot3D[\[ExponentialE]\^\(\(-x\^2\) - y\^2\)\ x\ y, {x, 1.2}, \ {y, 1.4}, Radii \[Rule] 1, Zoomable \[Rule] True, AxesLabel \[Rule] {"\", "\", "\"}, PlotRange \[Rule] All]; \)], "Input", CellLabel->"In[167]:="] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"CenteredPlot3Dcode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["Plot3DExt", "Section", CellTags->"Plot3DExt"], Cell[BoxData[{ \(Clear[f]\), "\[IndentingNewLine]", \(f[x_, y_] := x\ y\ Exp[\(-\((x\^2 + y\^2)\)\)]\)}], "Input", CellLabel->"In[211]:="], Cell[BoxData[ \(\(gr = Plot3DExt[f[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Focus \[Rule] {1.2, 1.4}, PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[170]:="], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[171]:="], Cell[BoxData[ \(g[x_, y_] := 3 x\^2 - 2 y\^2\)], "Input", CellLabel->"In[174]:="], Cell[BoxData[ \(plane = TangentPlane[g[x, y], {x, 2}, {y, \(-2\)}]\)], "Input", CellLabel->"In[175]:="], Cell[BoxData[ \(\(Plot3DExt[g[x, y], {x, \(-2\), 3}, {y, \(-3\), 3}, PlaneEquation \[Rule] plane];\)\)], "Input", CellLabel->"In[176]:="], Cell[BoxData[ \(\(gr = Plot3DExt[g[x, y], {x, \(-2\), 3}, {y, \(-3\), 3}, PlaneColor \[Rule] Red, PlaneEquation \[Rule] plane];\)\)], "Input",\ CellLabel->"In[177]:="], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[174]:="] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"Plot3DExtcode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["RainbowParametricPlot", "Section", CellTags->"RainbowParametricPlot"], Cell[BoxData[ \(\(ParametricPlot[{Cos[3 t], Sin[5 t]}, {t, 0, 2 \[Pi]}, \ PlotStyle \[Rule] RGBColor[0, 0, 1], \ AspectRatio \[Rule] Automatic];\)\)], "Input", CellLabel->"In[178]:=", AnimationDisplayTime->0.5, AnimationCycleOffset->1, AnimationCycleRepetitions->Infinity], Cell[BoxData[ \(\(TraceParametricPlot[{Cos[3 t], Sin[5 t]}, {t, 0, 2 \[Pi], 8}, \ PlotStyle \[Rule] RGBColor[0, 0, 1], \ AspectRatio \[Rule] Automatic];\)\)], "Input", CellLabel->"In[179]:=", AnimationDisplayTime->1, AnimationCycleOffset->1, AnimationCycleRepetitions->Infinity], Cell[BoxData[ \(\(RainbowParametricPlot[{Cos[3 t], Sin[5 t]}, {t, 0, 2 \[Pi]}, 16, \ PlotStyle \[Rule] RGBColor[0, 0, 1], \ AspectRatio \[Rule] Automatic];\)\)], "Input", CellLabel->"In[180]:="], Cell[BoxData[ \(\(RainbowParametricPlot[{Cos[3 t], Sin[5 t]}, {t, 0, 2 \[Pi]}, 16, \ PlotStyle \[Rule] RGBColor[0, 0, 1], \ AspectRatio \[Rule] Automatic, \ IncludeDots \[Rule] True];\)\)], "Input", CellLabel->"In[181]:="] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"RainbowParametricPlotcode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["LineIntegralIllustration", "Section", CellTags->"LineIntegralIllustration"], Cell[BoxData[{ \(Clear[P, Q]\), "\[IndentingNewLine]", \(P[x_, y_] := x - y\), "\n", \(Q[x_, y_] := x + y\)}], "Input", CellLabel->"In[182]:="], Cell[BoxData[{ \(\(gr1 = PlotVectorField[{P[x, y], Q[x, y]}, {x, \(-3\), 3}, {y, \(-3\), 3}, ColorFunction \[Rule] Hue, \ DisplayFunction \[Rule] Identity];\)\), "\n", \(\(gr2 = Plot[\@\(1 - x\^2\), {x, \(-1\), 1}, PlotStyle \[Rule] RGBColor[0, 0, 0], \ DisplayFunction \[Rule] Identity];\)\), "\n", \(\(Show[{gr2, gr1}, AspectRatio \[Rule] Automatic, \ DisplayFunction \[Rule] $DisplayFunction];\)\)}], "Input", CellLabel->"In[185]:="], Cell[BoxData[ \(\(LineIntegralIllustration[{P[x, y], Q[x, y]}, {Cos[t], Sin[t]}, {t, 0, \ Pi}, 4, \ AspectRatio \[Rule] Automatic];\)\)], "Input", CellLabel->"In[188]:="], Cell[BoxData[ \(\(LineIntegralIllustration[{P[x, y], Q[x, y]}, {Cos[t], Sin[t]}, {t, 0, \ Pi}, 12, \ AspectRatio \[Rule] Automatic];\)\)], "Input", CellLabel->"In[189]:="] }, Open ]], Cell[TextData[ButtonBox["code", ButtonData:>"LineIntegralIllustrationcode", ButtonStyle->"Hyperlink"]], "Text"], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell["ShowApproximations3D", "Section", CellTags->"ShowApproximations3D"], Cell[BoxData[{ \(Clear[f, g]\), "\[IndentingNewLine]", \(f[x_, y_] := x\ y\ Exp[\(-\((x\^2 + y\^2)\)\)]\), "\[IndentingNewLine]", \(g[x_, y_] := Sin[x + Cos[y]]\)}], "Input", CellLabel->"In[190]:="], Cell[BoxData[ \(\(gr = ShowApproximations3D[f[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[193]:="], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[194]:="], Cell[BoxData[ \(Options[ShowApproximations3D]\)], "Input", CellLabel->"In[195]:="], Cell[BoxData[ \(gr = ShowApproximations3D[f[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Method \[Rule] "\", Divisions \[Rule] {12, 6}, PlotRange \[Rule] All, DisplayVolume \[Rule] True]\)], "Input", CellLabel->"In[196]:="], Cell[BoxData[ \(\(gr = ShowApproximations3D[f[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Method \[Rule] "\", Divisions \[Rule] {12, 6}, PlotRange \[Rule] All];\)\)], "Input", CellLabel->"In[197]:="], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[198]:="], Cell[BoxData[ \(\(Plot3D[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}];\)\)], "Input", CellLabel->"In[199]:="], Cell[BoxData[ \(\(gr = ShowApproximations3D[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Method -> "\", Divisions \[Rule] {10, 20}, Color \[Rule] Yellow];\)\)], "Input", CellLabel->"In[200]:="] }, Open ]], Cell[BoxData[ \(Graphics3DViewer[gr]\)], "Input", CellLabel->"In[201]:="], Cell[BoxData[ \(RiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {10, 20}, Method -> "\"]\)], "Input", CellLabel->"In[202]:="], Cell[BoxData[ \(NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {10, 20}, Method -> "\"]\)], "Input", CellLabel->"In[203]:="], Cell[BoxData[ \(NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {10, 20}, Method -> "\"]\)], "Input", CellLabel->"In[204]:="], Cell[BoxData[ \(NIntegrate[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}]\)], "Input", CellLabel->"In[205]:="], Cell[BoxData[ \(NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {200, 200}, Method -> "\"]\)], "Input", CellLabel->"In[206]:="], Cell[BoxData[ \(g[x_, y_] := x\^2 + y\^2\)], "Input", CellLabel->"In[207]:="], Cell[BoxData[ \(TableForm[ Table[{3\^k, NIntegrate[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"]}, {k, 0, 4}], TableHeadings \[Rule] {None, {"\", "\", "\", \ "\", "\", "\", "\", "\"}}]\)], \ "Input", CellLabel->"In[208]:="], Cell[BoxData[ \(g[x_, y_] := Cos[x\ + \ y]\)], "Input", CellLabel->"In[209]:="], Cell[BoxData[ \(TableForm[ Table[{3\^k, NIntegrate[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"], NRiemannSum[g[x, y], {x, \(-3\), 3}, {y, \(-3\), 3}, Divisions \[Rule] {3\^k, 3\^k}, Method -> "\"]}, {k, 0, 4}], TableHeadings \[Rule] {None, {"\", "\", "\", \ "\", "\", "\", "\", "\"}}]\)], \ "Input", CellLabel->"In[210]:="], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{0, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[CellGroupData[{ Cell[TextData[{ StyleBox["Code to initialize at outset", FontSize->36, FontColor->RGBColor[1, 0, 0]], StyleBox[" ", FontColor->RGBColor[1, 0, 0]] }], "Section"], Cell[CellGroupData[{ Cell["Preliminaries", "Subsection"], Cell[BoxData[{\(Off[General::"\"];\), "\n", \(Off[ General::"\"];\), "\n", RowBox[{\(Needs["\"]\), "\n", \( (*Needs["\"]*) \)}], "\n", \ \(Needs["\"]\), "\n", \(Needs["\"]\), "\n\ ", \(Needs["\"]\), "\n", \ \(Needs["\"]\), "\n", \ \(Needs["\"]\), "\[IndentingNewLine]", RowBox[{\(Needs["\"]\), "\[IndentingNewLine]"}], "\[IndentingNewLine]", StyleBox[\(SetOptions[Plot, \ PlotStyle\ -> \ {{Red}, {Blue}, {Magenta}, {Cyan}, \n\t{Green}, \ {Yellow}, \ {Black}}];\), FontWeight->"Bold"], "\n", StyleBox[\(SetOptions[ListPlot, \ PlotStyle\ -> \ {Blue}];\), FontWeight-> "Bold"], "\n", \(vp\ = \ {1.429, .645, 3};\), "\n", \(SetOptions[ Plot3D, \ ViewPoint -> vp\ ];\), "\n", \(SetOptions[Graphics3D, \ ViewPoint -> vp\ ];\), "\n", \(SetOptions[ParametricPlot3D, \ ViewPoint -> vp\ ];\), "\[IndentingNewLine]", \(Unprotect[ Black];\), "\[IndentingNewLine]", \(Black\ = \ RGBColor[0, 0, 0];\), "\[IndentingNewLine]", \(Protect[ Black];\)}], "Input", CellLabel->"In[1]:=", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell["Code sections", "Subsection"], Cell[CellGroupData[{ Cell["LiveJar", "Subsubsection", CellTags->"Graphics3DViewer"], Cell[BoxData[{ \($CurrentNotebookName := "\" /. NotebookInformation[EvaluationNotebook[]]\), "\[IndentingNewLine]", \($CurrentNotebookPath := \(("\" /. NotebookInformation[EvaluationNotebook[]])\)[\([1]\)] // ToFileName\)}], "Input", CellLabel->"In[19]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[{ \(\(\($JarFileName\ = \ "\";\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(FileInDirectoryQ[fn_, dir_] := Module[{path, \ files, \ cwd}, \[IndentingNewLine]cwd\ = \ Directory[]; \[IndentingNewLine]path\ = \ ToFileName[dir]; \[IndentingNewLine]SetDirectory[ path]; \[IndentingNewLine]files\ = \ FileNames[]; \[IndentingNewLine]SetDirectory[ cwd]; \[IndentingNewLine]MemberQ[files, fn]]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(LiveInCurrentDirectoryQ[] := FileInDirectoryQ[$JarFileName, $CurrentNotebookPath]\)\(\ \[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(LiveInSomeMMAPathQ[] := \ Apply[Or, Map[FileInDirectoryQ[$JarFileName, #] &, $Path]]\)\(\ \[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\($LivePresent\ = \ LiveInCurrentDirectoryQ[]\ || \ LiveInSomeMMAPathQ[];\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(LiveMMAPath[] := \ \(Select[ Cases[Map[{#, FileInDirectoryQ[$JarFileName, #]} &, $Path], {_, True}], StringLength[First[#]] > 3 &] // First\) // First\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(LiveJarPath\ := \ If[LiveInCurrentDirectoryQ[], $CurrentNotebookPath, If[LiveInSomeMMAPathQ[], \ LiveMMAPath[], "\"]]\)}], "Input", CellLabel->"In[21]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(QueryForLivePath[] := Module[{nb}, \[IndentingNewLine]nb\ = \ NotebookCreate[]; \[IndentingNewLine]NotebookWrite[nb, \ Cell["\", \ \ "\"]]; \[IndentingNewLine]$FBPath\ = \ "\<\>"; \ \[IndentingNewLine]NotebookWrite[nb, \ Cell[BoxData[ ButtonBox["\", ButtonFunction \[RuleDelayed] \((FindLive[#] &)\), ButtonEvaluator \[Rule] Automatic]], "\", Active \[Rule] True]];\[IndentingNewLine]]\)], "Input", CellLabel->"In[368]:=", CellTags->"Graphics3DViewer"], Cell[BoxData[ \(FindLive[x_] := Module[{ljpath, \ pos}, \[IndentingNewLine]LinkWrite[$ParentLink, \ FrontEnd`FileBrowse[False]]; \[IndentingNewLine]$FBPath\ = LinkRead[$ParentLink]; \[IndentingNewLine]pos\ = StringPosition[$FBPath, "\"]; \[IndentingNewLine]If[ Length[pos]\ == 0, \[IndentingNewLine]NotebookWrite[ ButtonNotebook[], \ Cell[TextData[{"\", \ ButtonBox["\", ButtonData \[RuleDelayed] \ {URL["\\ "], None}, ButtonStyle \[Rule] "\"], \ "\<\n\nto \ download it. Then place it in the same folder as the file in which you were \ trying to work. You may now close this window.\>"}], \ "\"]]; LiveJarPath = "\", \[IndentingNewLine]$FBPath\ = \ StringDrop[$FBPath, First[pos]]; \[IndentingNewLine]LiveJarPath = $FBPath; \ \[IndentingNewLine]NotebookWrite[ButtonNotebook[], \ Cell[TextData[{"\", $FBPath, "\<\n\n\ Great. So you can now view any 3D output of any function by 'feeding' it into \ the Graphics3DView function. Close this window and begin.\>"}], \ \ "\"]]];\[IndentingNewLine]]\)], "Input", CellLabel->"In[369]:=", CellTags->"Graphics3DViewer"], Cell[BoxData[ \(OneTimeJLinkStuff := Module[{path}, \[IndentingNewLine]$LiveJarReady\ = \ False; \[IndentingNewLine]path = LiveJarPath; \[IndentingNewLine]LJ = 0; \[IndentingNewLine]If[ path\ == "\", QueryForLivePath[]]; \[IndentingNewLine]If[ path\ =!= "\", $LiveJarReady = True; \[IndentingNewLine]InstallJave[]; \ \[IndentingNewLine]AddToClassPath[LiveJarPath <> $JarFileName]]]\)], "Input", CellLabel->"In[28]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(MMAViewer[graphics_, animOpts___] := AppletViewer["\", {"\" <> StringReplace[ ToString[ LiveForm[graphics, animOpts]], "\<\"\>" \[Rule] "\<''\>"], "\", \ "\"}]\)], "Input", CellLabel->"In[29]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(\(\(\ \)\(\(Options[ Graphics3DViewer] = {Viewer \[Rule] "\"};\)\(\ \)\(\ \[IndentingNewLine]\) \( (*\ \(Options[ Graphics3DViewer] = {Viewer \[Rule] "\"};\)\ *) \ \)\)\)\)], "Input", CellLabel->"In[30]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(Graphics3DViewer[graphics_, animOpts___] := Module[{ver, \ viewer}, \[IndentingNewLine]ver\ = \ $VersionNumber; \ \[IndentingNewLine]viewer = Viewer /. Flatten[{animOpts, Options[Graphics3DViewer]}]; \[IndentingNewLine] (*\ \(If[ animOpts =!= Null, \[IndentingNewLine]animOpts = DeleteCases[animOpts, \ Viewer\ -> \ _]];\)\ \ *) \[IndentingNewLine]If[$LiveJarReady =!= True, OneTimeJLinkStuff]; \[IndentingNewLine]If[ver \[GreaterEqual] \ 5, If[viewer === "\", MMAToBrowser[graphics, animOpts], MMAViewer[graphics, animOpts]], MMAToBrowser[graphics, animOpts]]]\)], "Input", CellLabel->"In[31]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(\(LiveForm[graphics_, animOpts___] := Module[{graphics3d = Switch[graphics, \n_ContourGraphics, Graphics3D[SurfaceGraphics[graphics]], \n_DensityGraphics, Graphics3D[SurfaceGraphics[graphics]], \n_SurfaceGraphics, Graphics3D[graphics], \n_, graphics] //. \[InvisibleSpace]SequenceForm[ x___] \[RuleDelayed] StringForm[StringJoin[Table["\<``\>", {Length[{x}]}]], x]}, Switch[graphics3d, \n_List, \(HoldForm[ShowAnimation]\)[ LiveForm /@ graphics3d, InputForm[N[Flatten[{animOpts}]]]], \n_, InputForm[N[graphics3d]]]];\)\)], "Input", CellLabel->"In[32]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \( (*\ \(MMAToBrowser[graphics_, filename_, animOpts___] := Module[{ps, x, \ nfilename\ , mfilename}, \[IndentingNewLine]mfilename = filename <> "\<.m\>"; \[IndentingNewLine]If[Not[OSChosenQ], QueryOS[]]; nfilename\ = \ StringJoin[LiveJarPath, mfilename]; ps = Unprotect[Real]; \ Format[x_Real, InputForm] := OutputForm[ NumberForm[x, 5, NumberFormat \[Rule] \((If[#3 \[Equal] "\<\>", #1, SequenceForm[#1, "\<*^\>", #3]] &)\)]]; \ Protect @@ ps; \[IndentingNewLine]WriteString[nfilename, ToString[LiveForm[graphics, animOpts], CharacterEncoding \[Rule] None]]; \ Close[nfilename]; \[IndentingNewLine]ps = Unprotect[Real]; \ Format[x_Real, InputForm] =. ; \ Protect @@ ps; \[IndentingNewLine]WriteHTMLFile[LiveJarPath, mfilename]];\)*) \)], "Input", CellLabel->"In[33]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(\(MMAToBrowser[graphics_, animOpts___] := Module[{ps, x, \ nfilename\ , mfilename, \ filename = "\" <> ToString[\(LJ++\)]}, \[IndentingNewLine]mfilename = filename <> "\<.m\>"; \[IndentingNewLine]If[Not[OSChosenQ], QueryOS[]]; nfilename\ = \ StringJoin[LiveJarPath, mfilename]; ps = Unprotect[Real]; \ Format[x_Real, InputForm] := OutputForm[ NumberForm[x, 5, NumberFormat \[Rule] \((If[#3 \[Equal] "\<\>", #1, SequenceForm[#1, "\<*^\>", #3]] &)\)]]; \ Protect @@ ps; \[IndentingNewLine]WriteString[nfilename, ToString[LiveForm[graphics, animOpts], CharacterEncoding \[Rule] None]]; \ Close[nfilename]; \[IndentingNewLine]ps = Unprotect[Real]; \ Format[x_Real, InputForm] =. ; \ Protect @@ ps; \[IndentingNewLine]WriteHTMLFile[LiveJarPath, mfilename]];\)\)], "Input", CellLabel->"In[34]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(WriteHTMLFile[path_, filename_]\ := \ Module[{nfilename, \ hfilename}, \[IndentingNewLine]hfilename\ = \ StringTake[ filename, {1, First[First[ StringPosition[ filename, "\<.\>"]]]}] <> "\"; \ \[IndentingNewLine]nfilename = StringJoin[path, hfilename]; \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \ \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \ \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \ \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \[IndentingNewLine]WriteString[ nfilename, "\<\n\>"]; \[IndentingNewLine]WriteString[ nfilename, "\<\>"]; \[IndentingNewLine]Close[ nfilename]; \[IndentingNewLine]WriteLinkButton[path, hfilename]]\)], "Input", CellLabel->"In[35]:=", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[BoxData[ \(WriteLinkButton[path_, filename_]\ := \ Module[{nb, npath}, \[IndentingNewLine]nb\ = \ InputNotebook[]; \[IndentingNewLine]npath\ = StringReplace[path, {"\<\\\>" -> "\"}] <> filename; \[IndentingNewLine]NotebookWrite[nb, Cell[TextData[{"\", ButtonBox["\", ButtonData -> {URL["\" <> npath], None}, ButtonStyle \[Rule] "\"], "\<.\>"}], \ "\", CellFrame \[Rule] True, FontSize \[Rule] 16, FontWeight \[Rule] "\", Background \[Rule] RGBColor[1, 1, 0]]]]\)], "Input", CellLabel->"In[36]:=", InitializationCell->True, CellTags->"Graphics3DViewer"] }, Closed]], Cell[CellGroupData[{ Cell["Gradient", "Subsubsection"], Cell[BoxData[{ \(\(Unprotect[Gradient];\)\), "\[IndentingNewLine]", \(Gradient[f_] := Module[{temp}, \[IndentingNewLine]temp = Outer[D, {f}, {$xvar, $yvar, $zvar}] // First; \[IndentingNewLine]If[temp[\([3]\)] === 0, Take[temp, 2], temp]]\), "\[IndentingNewLine]", \(\(Protect[Gradient];\)\)}], "Input", CellLabel->"In[37]:=", InitializationCell->True], Cell[BoxData[ \(RotatingDirectionalDerivatives[ f_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, {x0_, y0_}, n_, opts___?OptionQ] := Module[{thick = 0.02, epsilon = 0.02, u, su, dd, \[Theta], d\[Theta]\ = \ 2 \[Pi]/n, grd, mag}, \[IndentingNewLine]grd = Gradient[f] /. {xvar \[Rule] x0, yvar \[Rule] y0} // N; \[IndentingNewLine]mag = \@\(grd[\([1]\)]\^2 + grd[\([2]\)]\^2\ \); \[IndentingNewLine]grd = If[mag > 0, \(1\/mag\) grd, grd]; \[IndentingNewLine]gr3 = ParametricPlot3D[{x0 + t\ grd[\([1]\)], y0 + t\ grd[\([2]\)], epsilon + \((f /. {xvar \[Rule] x0 + \ t\ grd[\([1]\)], yvar \[Rule] \ y0 + t\ grd[\([2]\)]})\), Hue[1]}, {t, 0, 1}, DisplayFunction \[Rule] Identity] /. {List[Hue[aa_], Line[ft_]]\ \[Rule] \ List[Hue[aa], Thickness[thick], Line[ft]]}; \[IndentingNewLine]Table[ u = {Cos[\[Theta]], Sin[\[Theta]]}; su = Sequence @@ u; \[IndentingNewLine]dd = grd . u; gr1 = Plot3D[f, \ {xvar, xmin, xmax}, {yvar, ymin, ymax}, Evaluate[opts], ColorFunction \[Rule] Hue, PlotPoints \[Rule] 25, \ PlotLabel \[Rule] StyleForm[\*"\"\<\!\(f\_u\)(\>\"" <> ToString[x0] <> "\<,\>" <> ToString[y0] <> "\<) = \>" <> ToString[dd], FontSize \[Rule] 14], DisplayFunction \[Rule] Identity]; \[IndentingNewLine]gr2 = ParametricPlot3D[{x0 + t\ Cos[\[Theta]], y0 + t\ Sin[\[Theta]], epsilon + \((f /. {xvar \[Rule] \ x0 + t\ Cos[\[Theta]], yvar \[Rule] \ y0 + t\ Sin[\[Theta]]})\)}, {t, 0, 1}, DisplayFunction \[Rule] Identity] /. {List[Line[ft_], rest__]\ \[Rule] \ List[Thickness[thick], Line[ft], rest]}; \[IndentingNewLine]\(Show[{gr1, gr3, gr2}, DisplayFunction \[Rule] $DisplayFunction];\), {\[Theta], 0, 2 \[Pi] - d\[Theta], d\[Theta]}];\[IndentingNewLine]]\)], "Input",\ CellLabel->"In[40]:=", InitializationCell->True], Cell[BoxData[{ \(\(Unprotect[Hessian];\)\), "\[IndentingNewLine]", \(Hessian[f_, {x_}] := {D[f, x, x]}\), "\n", \(Hessian[ f_, {x_, y_}] := {{D[f, x, x], D[f, x, y]}, {D[f, y, x], D[f, y, y]}}\), "\n", \(Hessian[ f_, {x_, y_, z_}] := {{D[f, x, x], D[f, x, y], D[f, x, z]}, {D[f, y, x], D[f, y, y], D[f, y, z]}, {D[f, z, x], D[f, z, y], D[f, z, z]}}\), "\[IndentingNewLine]", \(\(Protect[Hessian];\)\)}], "Input", CellLabel->"In[41]:=", InitializationCell->True], Cell[BoxData[{ \(\(LinearApproximation[f_, {vars__}]\)[ point__] := \((f /. MapThread[Rule[#1, #2] &, {{vars}, {point}}])\) + \(\(\(Gradient[ f, {vars}]\)[point] . First[{{vars} - {point}}]\)\(\[IndentingNewLine]\) \)\), "\n", \(\(QuadraticApproximation[f_, {vars__}]\)[ point__] := \(LinearApproximation[f, {vars}]\)[point] + 1/2\ \((Hessian[f, {vars}] /. MapThread[Rule[#1, #2] &, {{vars}, {point}}])\) . First[{{vars} - {point}}] . First[{{vars} - {point}}]\)}], "Input",\ CellLabel->"In[46]:=", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell["centered functions", "Subsubsection"], Cell[BoxData[ \(zoomFunction[{tag_, multiplier_}] := Module[{nb = EvaluationNotebook[], cell, \ rad}, \[IndentingNewLine]NotebookFind[nb, tag, Previous, CellTags]; \n SelectionMove[nb, All, CellContents]; \[IndentingNewLine]cell\ = \ NotebookRead[nb]; \[IndentingNewLine]\ cell = \ cell /. RowBox[{"\", "\<\[Rule]\>", x_}] :> RowBox[{"\", "\<\[Rule]\>", ToBoxes[ ToExpression[x]* multiplier]}]\ ; \[IndentingNewLine]cell = \ cell /. RowBox[{"\", "\<->\>", x_}] :> RowBox[{"\", "\<\[Rule]\>", ToBoxes[ ToExpression[x]* multiplier]}]\ ; \[IndentingNewLine]NotebookWrite[nb, cell]; SelectionMove[nb, All, Cell]; SelectionEvaluate[nb, None]\[IndentingNewLine]]\)], "Input", CellLabel->"In[48]:=", InitializationCell->True], Cell[BoxData[ \(\(Options[CenteredContourPlot] = {Zoomable \[Rule] False, \ ColorFunction \[Rule] Hue, \ ShowGrid \[Rule] True, \ Radii \[Rule] 1};\)\)], "Input", CellLabel->"In[49]:=", InitializationCell->True], Cell[BoxData[ \(CenteredContourPlot[g_, \ {xvar_, x0_}, {yvar_, y0_}, \ opts___?OptionQ] := Module[{zoom, \ contopts, \ gridQ, \ grid, k, \ contONLYopts, \ rad, \ dx, dy, \ gr, nb, cont, rnd, \ semicolonQ}, \[IndentingNewLine]rad = Radii /. Flatten[{opts, Options[CenteredContourPlot]}]; \[IndentingNewLine]zoom = Zoomable /. Flatten[{opts, Options[CenteredContourPlot]}]; \[IndentingNewLine]gridQ = ShowGrid /. Flatten[{opts, Options[CenteredContourPlot]}]; \[IndentingNewLine]If[ Head[rad] === List, dx = First[rad]; dy = Last[rad], dx = \(dy = rad\)]; \[IndentingNewLine]grid\ = {Epilog \[Rule] {RGBColor[ 0, 0, 0], Table[Line[{{k, y0 - dy}, {k, y0 + dy}}], {k, x0 - dx, \ x0 + dx, \ dx/5}], \ Table[Line[{{x0 - dx, k}, {x0 + dx, k}}], {k, y0 - dy, \ y0 + dy, \ dy/5}], PointSize[0.03], Point[{x0, y0}]}}; \[IndentingNewLine]contopts\ = {\ FilterOptions[ContourPlot, opts], ColorFunction \[Rule] Hue}; \[IndentingNewLine]contONLYopts = Complement[contopts, Options[CenteredContourPlot]]; \[IndentingNewLine] \ (*\(Print["\" <> ToString[rad] <> "\<\nzoom = \>" <> ToString[zoom] <> "\<\ngrid = \>" <> ToString[gridQ] <> "\<\ncontopts = \>" <> ToString[contopts] <> "\<\ncontONLYopts = \>" <> ToString[contONLYopts] <> "\<\ndx = \>" <> ToString[dx] <> "\<\ndy = \>" <> ToString[dy]];\)*) \[IndentingNewLine]If[gridQ, \ contopts\ = \ Flatten[{grid, contopts}]]; gr = ContourPlot[ g, {xvar, x0 - dx, x0 + dx}, {yvar, y0 - dy, y0 + dy}, Evaluate[Apply[Sequence, contopts]]]; \n If[zoom, {rnd, semicolonQ} = CenteredContourPlotZoom[]; \[IndentingNewLine]If[\(! \ semicolonQ\), \[IndentingNewLine]\ NotebookWrite[EvaluationNotebook[], Cell[DisplayForm[ToBoxes[gr]], \ "\", \ CellLabel -> "\" <> ToString[$Line] <> "\<]=\>", \ CellTags -> "\" <> ToString[ rnd] <> "\"]]]]; \[IndentingNewLine]\ \ gr\ \[IndentingNewLine]]\)], "Input", CellLabel->"In[50]:=", InitializationCell->True, CellTags->"CenteredContourPlotcode"], Cell[BoxData[ \(CenteredContourPlotZoom[] := Module[{nb, cont, rnd, d, \ semiQ}, \[IndentingNewLine]rnd = Random[Integer, {0, 10000}]; \[IndentingNewLine]nb = InputNotebook[]; \[IndentingNewLine]NotebookFind[ nb, "\" <> ToString[$Line] <> "\<]:=\>", Previous, CellLabel]; \[IndentingNewLine]SelectionMove[nb, After, \ CellContents]; \[IndentingNewLine]NotebookFind[nb, "\<]\>", Previous, CellContents]; \[IndentingNewLine]\ SelectionMove[nb, Next, \ Character]; \ \[IndentingNewLine]cont = NotebookRead[nb]; \[IndentingNewLine]SelectionMove[nb, After, \ Character]; \[IndentingNewLine]semiQ\ = If[cont === {}, False, \ True]; \[IndentingNewLine]NotebookFind[ nb, "\" <> ToString[$Line] <> "\<]:=\>", Previous, CellLabel]; \ \[IndentingNewLine]\ NotebookWrite[nb, NotebookRead[nb] /. \[InvisibleSpace]Cell[b__] \[Rule] Cell[b, CellTags \[Rule] "\" <> ToString[rnd]]]; \[IndentingNewLine]SelectionMove[nb, After, Cell]; \[IndentingNewLine]NotebookWrite[nb, Cell[BoxData[ RowBox[{ButtonBox["\", \ \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 2}, \ ButtonFunction :> \((zoomFunction[#] &)\)], ButtonBox["\", \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 1/2}, ButtonFunction :> \((zoomFunction[#] &)\)]}]], \ \ "\", Active -> True, CellTags -> "\" <> ToString[ rnd] <> "\"]]; \[IndentingNewLine]\ \ SelectionMove[ nb, Next, Cell]; \ NotebookWrite[nb, NotebookRead[nb] /. \[InvisibleSpace]Cell[b__] \[Rule] Cell[b, CellTags \[Rule] "\" <> ToString[rnd] <> "\"]]; \ success = NotebookFind[nb, "\" <> ToString[$Line] <> "\<]=\>", Previous, CellLabel]; \ \[IndentingNewLine]{rnd, \ semiQ}]\)], "Input", CellLabel->"In[51]:=", InitializationCell->True, CellTags->"ccp9172out"], Cell[BoxData[{ RowBox[{\(Unprotect[ContourPlot];\), "\[IndentingNewLine]"}], "\[IndentingNewLine]", RowBox[{ RowBox[{ StyleBox[\(ContourPlot[ f_, {xvar_, xmin_, \ xmax_}, {yvar_, ymin_, ymax_}, \ Focus -> \ {x0_, y0_}, \ Radii -> {rx_, ry_}, opts___?OptionQ]\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], "\[IndentingNewLine]", \(CenteredContourPlot[ f, {xvar, x0}, {yvar, \ y0}, Radii -> {rx, \ ry}, opts]\)}], "\[IndentingNewLine]"}], "\[IndentingNewLine]", RowBox[{ RowBox[{ StyleBox[\(ContourPlot[ f_, {xvar_, xmin_, \ xmax_}, {yvar_, ymin_, ymax_}, \ Focus -> \ {x0_, y0_}, \ Radii -> rx_, opts___?OptionQ]\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], "\[IndentingNewLine]", \(CenteredContourPlot[ f, {xvar, x0}, {yvar, \ y0}, Radii -> rx, opts]\)}], "\[IndentingNewLine]"}], "\[IndentingNewLine]", \(Protect[ ContourPlot];\)}], "Input", CellLabel->"In[52]:=", InitializationCell->True], Cell[BoxData[ \(\(Options[ CenteredNumericPlot3D] = {Zoomable \[Rule] False, \ \ Radii \[Rule] 1, Steps \[Rule] 2};\)\)], "Input", CellLabel->"In[56]:=", InitializationCell->True], Cell[BoxData[ StyleBox[\(CenteredNumericPlot3D[f_, {xvar_, x0_}, {yvar_, y0_}, opts___?OptionQ]\ := \ Module[{dx, dy, zoom, rad, \ rnd, steps}, \[IndentingNewLine]rad = Radii /. Flatten[{opts, Options[ CenteredNumericPlot3D]}]; \[IndentingNewLine]steps = Steps /. Flatten[{opts, Options[CenteredNumericPlot3D]}]; \[IndentingNewLine]zoom = Zoomable /. Flatten[{opts, Options[CenteredNumericPlot3D]}]; \[IndentingNewLine]If[ Head[rad] === List, dx = First[rad]; dy = Last[rad], dx = \(dy = rad\)]; \[IndentingNewLine]If[\(! zoom\), DisplayForm[\ \ GridBox[ focusedtableofvalues[ f, \ {xvar, \ x0}, {yvar, y0}, \ {dx/steps, dy/steps}], GridFrame \[Rule] True, RowLines \[Rule] True, RowSpacings \[Rule] {2, 0}, ColumnSpacings \[Rule] {1, 0.5}, ColumnLines \[Rule] True]], \[IndentingNewLine]rnd = Random[Integer, {0, 10000}]; \[IndentingNewLine]nb = InputNotebook[]; \[IndentingNewLine]NotebookFind[ nb, "\" <> ToString[$Line] <> "\<]:=\>", Previous, CellLabel]; \ \n\ NotebookWrite[nb, NotebookRead[nb] /. \[InvisibleSpace]Cell[b__] \[Rule] Cell[b, CellTags \[Rule] "\" <> ToString[rnd]]]; \n SelectionMove[nb, After, Cell]; \n NotebookWrite[nb, Cell[BoxData[ RowBox[{ButtonBox["\", \ \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 2}, \ ButtonFunction :> \((zoomFunction[#] &)\)], ButtonBox["\", \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 1/2}, ButtonFunction :> \((zoomFunction[#] &)\)]}]], \ \ "\", Active -> True, CellTags -> "\" <> ToString[rnd] <> "\"]]; \n\ \ SelectionMove[nb, After, Cell]; \ NotebookWrite[ nb, \[InvisibleSpace]Cell[ DisplayForm[\ \ GridBox[ focusedtableofvalues[ f, \ {xvar, \ x0}, {yvar, y0}, \ {dx, dy}], GridFrame \[Rule] True, RowLines \[Rule] True, RowSpacings \[Rule] {2, 0}, ColumnSpacings \[Rule] {1, 0.5}, ColumnLines \[Rule] True]], "\", CellTags \[Rule] "\" <> ToString[rnd] <> "\"]];\ \ \[IndentingNewLine]]]\), FontWeight->"Bold"]], "Input", CellLabel->"In[57]:=", InitializationCell->True, CellTags->"CenteredNumericPlot3Dcode"], Cell[BoxData[ \(CenteredPlot3D // Clear\)], "Input", CellLabel->"In[433]:="], Cell[BoxData[ \(\(Options[CenteredPlot3D] = {Zoomable \[Rule] False, \ ColorFunction \[Rule] Hue, \ Tracings \[Rule] True, \ Radii \[Rule] 1};\)\)], "Input", CellLabel->"In[58]:=", InitializationCell->True, CellTags->"CenteredPlot3Dcode"], Cell[BoxData[ \(CenteredPlot3D[g_, \ {xvar_, x0_}, {yvar_, y0_}, \ opts___?OptionQ] := Module[{zoom, \ contopts, \ gridQ, \ grid, k, \ contONLYopts, \ rad, \ dx, dy, \ gr, nb, cont, rnd, \ semicolonQ, \ gr1, \ gr2}, \[IndentingNewLine]rad = Radii /. Flatten[{opts, Options[CenteredPlot3D]}]; \[IndentingNewLine]zoom = Zoomable /. Flatten[{opts, Options[CenteredContourPlot]}]; \[IndentingNewLine]gridQ = Tracings /. Flatten[{opts, Options[CenteredContourPlot]}]; \[IndentingNewLine]If[ Head[rad] === List, dx = First[rad]; dy = Last[rad], dx = \(dy = rad\)]; \[IndentingNewLine]contopts\ = {\ FilterOptions[CenteredPlot3D, opts], FilterOptions[Plot3DExt, opts], Options[CenteredPlot3D]}; \[IndentingNewLine] (*\(Print["\" <> ToString[rad] <> "\<\nzoom = \>" <> ToString[zoom] <> "\<\ngrid = \>" <> ToString[gridQ] <> "\<\ncontopts = \>" <> ToString[contopts] <> "\<\ncontONLYopts = \>" <> ToString[contONLYopts] <> "\<\ndx = \>" <> ToString[dx] <> "\<\ndy = \>" <> ToString[dy]];\)*) \[IndentingNewLine]If[gridQ, \ contopts\ = \ Flatten[{grid, contopts}]]; \[IndentingNewLine]gr1 = Plot3DExt[g, {x, x0 - dx, x0 + dx}, {y, y0 - dy, y0 + dy}, Focus -> {x0, y0}, Evaluate[Apply[Sequence, contopts]], DisplayFunction -> Identity]; \n\t\tgr2\ = \ Graphics3D[{RGBColor[0, 0, 0], PointSize[0.03], \ Point[{x0, y0, g /. {xvar -> x0, yvar -> y0}}]}, DisplayFunction -> Identity]; \n\t gr = Show[{gr1, gr2}, DisplayFunction -> $DisplayFunction]; \n If[zoom, {rnd, semicolonQ} = CenteredPlot3DZoom[]; \[IndentingNewLine]If[\(! semicolonQ\), \ \[IndentingNewLine]\ NotebookWrite[EvaluationNotebook[], Cell[DisplayForm[ToBoxes[gr]], \ "\", \ CellLabel -> "\" <> ToString[$Line] <> "\<]=\>", \ CellTags -> "\" <> ToString[ rnd] <> "\"]]]]; \[IndentingNewLine]\ \ gr\ \[IndentingNewLine]]\)], "Input", CellLabel->"In[59]:=", InitializationCell->True, CellTags->"CenteredPlot3Dcode"], Cell[BoxData[ \(CenteredPlot3DZoom[] := Module[{nb, cont, rnd, d, \ semiQ}, \[IndentingNewLine]rnd = Random[Integer, {0, 10000}]; \[IndentingNewLine]nb = InputNotebook[]; \[IndentingNewLine]NotebookFind[ nb, "\" <> ToString[$Line] <> "\<]:=\>", Previous, CellLabel]; \[IndentingNewLine]SelectionMove[nb, After, \ CellContents]; \[IndentingNewLine]NotebookFind[nb, "\<]\>", Previous, CellContents]; \[IndentingNewLine]\ SelectionMove[nb, Next, \ Character]; \ \[IndentingNewLine]cont = NotebookRead[nb]; \[IndentingNewLine]SelectionMove[nb, After, \ Character]; \[IndentingNewLine]semiQ\ = If[cont === {}, False, \ True]; \[IndentingNewLine]NotebookFind[ nb, "\" <> ToString[$Line] <> "\<]:=\>", Previous, CellLabel]; \ \[IndentingNewLine]\ NotebookWrite[nb, NotebookRead[nb] /. \[InvisibleSpace]Cell[b__] \[Rule] Cell[b, CellTags \[Rule] "\" <> ToString[rnd]]]; \[IndentingNewLine]SelectionMove[nb, After, Cell]; \[IndentingNewLine]NotebookWrite[nb, Cell[BoxData[ RowBox[{ButtonBox["\", \ \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 2}, \ ButtonFunction :> \((zoomFunction[#] &)\)], ButtonBox["\", \ ButtonEvaluator -> Automatic, ButtonData -> {"\" <> ToString[rnd], 1/2}, ButtonFunction :> \((zoomFunction[#] &)\)]}]], \ \ "\", Active -> True, CellTags -> "\" <> ToString[ rnd] <> "\"]]; \[IndentingNewLine]\ \ SelectionMove[ nb, Next, Cell]; \ NotebookWrite[nb, NotebookRead[nb] /. \[InvisibleSpace]Cell[b__] \[Rule] Cell[b, CellTags \[Rule] "\" <> ToString[rnd] <> "\"]]; \ success = NotebookFind[nb, "\" <> ToString[$Line] <> "\<]=\>", Previous, CellLabel]; \ \[IndentingNewLine]{rnd, \ semiQ}]\)], "Input", CellLabel->"In[60]:=", InitializationCell->True, CellTags->"ccp9172out"] }, Closed]], Cell[CellGroupData[{ Cell["NumericPlot3D", "Subsubsection", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ \(FormatEntry[x_]\ := \ If[x === DirectedInfinity[], x = "\<\[Infinity]\>", If[Head[x] === Integer\ || \ Head[x] === Rational, x, PaddedForm[x, {6, 3}]]] // Chop\)], "Input", CellLabel->"In[61]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ \(PlainFormatEntry[x_]\ := \ If[Head[x] === Integer\ || \ Head[x] === Rational, x, N[x, 3]] // Chop\)], "Input", CellLabel->"In[62]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ RowBox[{ StyleBox[\(tableofvalues[ f_, {xvar_, a_, b_, c_: 0.01}, {yvar_, d_, e_, g_: 0.01}]\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], RowBox[{ StyleBox["Module", FontWeight->"Bold"], StyleBox["[", FontWeight->"Bold"], RowBox[{ StyleBox[\({temp, \ headings}\), FontWeight->"Bold"], StyleBox[",", FontWeight->"Bold"], StyleBox["\n", FontWeight->"Bold"], RowBox[{ StyleBox[\(temp = Table[FormatEntry[f /. {xvar -> i, yvar -> j}] // ToBoxes, \ {j, \ e, d, \ \(-g\)}, \n\t{i, a, b, c}]\), FontWeight->"Bold"], StyleBox[";", FontWeight->"Bold"], "\[IndentingNewLine]", \(headings\ = Table[ButtonBox[ToBoxes[i], Background -> RGBColor[1, 1, 0]], {i, a, b, c}]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, temp]\), ";", "\[IndentingNewLine]", \(headings\ = \ Join[{ButtonBox["\", Background -> RGBColor[1, 0, 1]]}, Table[ButtonBox[ToBoxes[j], Background -> RGBColor[1, 1, 0]], {j, \ e, d, \ \(-g\)}]]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, Transpose[temp]] // Transpose\)}]}], "]"}]}]], "Input", CellLabel->"In[63]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ RowBox[{ RowBox[{ StyleBox[ RowBox[{"plain", StyleBox["tableofvalues", FontWeight->"Bold"]}]], StyleBox["[", FontWeight->"Bold"], StyleBox[\(f_, {xvar_, a_, b_, c_: 0.01}, {yvar_, d_, e_, g_: 0.01}\), FontWeight->"Bold"], StyleBox["]", FontWeight->"Bold"]}], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], RowBox[{ StyleBox["Module", FontWeight->"Bold"], StyleBox["[", FontWeight->"Bold"], RowBox[{ StyleBox[\({temp, \ headings}\), FontWeight->"Bold"], StyleBox[",", FontWeight->"Bold"], StyleBox["\n", FontWeight->"Bold"], RowBox[{ StyleBox[\(temp = Table[PlainFormatEntry[f /. {xvar -> i, yvar -> j}], \ {j, \ e, d, \ \(-g\)}, \n\t{i, a, b, c}]\), FontWeight->"Bold"], StyleBox[";", FontWeight->"Bold"], "\[IndentingNewLine]", \(headings\ = Table[i, {i, a, b, c}]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, temp]\), ";", "\[IndentingNewLine]", \(headings\ = \ Join[{"\"}, Table[j, {j, \ e, d, \ \(-g\)}]]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, Transpose[temp]] // Transpose\)}]}], "]"}]}]], "Input", CellLabel->"In[64]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ RowBox[{ StyleBox[\(focusedtableofvalues[ f_, {xvar_, x0_}, {yvar_, y0_}, {dx_, dy_}]\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], RowBox[{ StyleBox["Module", FontWeight->"Bold"], StyleBox["[", FontWeight->"Bold"], RowBox[{ StyleBox[\({temp, \ headings}\), FontWeight->"Bold"], StyleBox[",", FontWeight->"Bold"], StyleBox["\n", FontWeight->"Bold"], RowBox[{ StyleBox[\(temp = Table[FormatEntry[f /. {xvar -> i, yvar -> j}] // ToBoxes, \ {j, \ y0 + 2 dy, y0 - 2 dy, \ \(-dy\)}, \n\t{i, x0 - 2 dx, x0 + 2 dx, dx}]\), FontWeight->"Bold"], StyleBox[";", FontWeight->"Bold"], "\[IndentingNewLine]", \(headings\ = Table[ButtonBox[ToBoxes[i], Background -> RGBColor[1, 1, 0]], {i, x0 - 2 dx, x0 + 2 dx, dx}]\), ";", "\n", "\t\t", \(headings[\([3]\)]\ = \ headings[\([3]\)] /. RGBColor[1, 1, 0] -> RGBColor[0, 1, 1]\), ";", "\n", "\t\t", \(temp[\([3, 3]\)] = ButtonBox[temp[\([3, 3]\)], Background -> RGBColor[0, 1, 1]]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, temp]\), ";", "\[IndentingNewLine]", \(headings\ = \ Join[{ButtonBox["\", Background -> RGBColor[1, 0, 1]]}, Table[ButtonBox[ToBoxes[j], Background -> RGBColor[1, 1, 0]], {j, y0 + 2 dy, y0 - 2 dy, \ \(-dy\)}]]\), ";", "\n", "\t\t", \(headings[\([4]\)]\ = \ headings[\([4]\)] /. RGBColor[1, 1, 0] -> RGBColor[0, 1, 1]\), ";", "\[IndentingNewLine]", \(temp\ = \ Join[{headings}, Transpose[temp]] // Transpose\)}]}], "]"}]}]], "Input", CellLabel->"In[65]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ RowBox[{ StyleBox[\(NumericPlot3D[ f_, {xvar_, a_, b_, c_: 1}, {yvar_, d_, e_, g_: 1}]\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], "\[IndentingNewLine]", \(DisplayForm[\ \ GridBox[ tableofvalues[f, \ {xvar, \ a, \ b, \ c}, {yvar, \ d, \ e, \ g}], GridFrame \[Rule] True, RowLines \[Rule] True, RowSpacings \[Rule] {2, 0}, ColumnSpacings \[Rule] {1, 0.5}, ColumnLines \[Rule] True]]\)}]], "Input", CellLabel->"In[66]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ \(NumericPlot3D[f_, {xvar_, a_, b_, c_ : 1}, {yvar_, d_, e_, g_ : 1}, Frame \[Rule] False] := PlainNumericPlot3D[f, {xvar, a, b, c}, {yvar, d, e, g}]\)], "Input", CellLabel->"In[67]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ \(NumericPlot3D[f_, {xvar_, a_, b_, c_ : 1}, {yvar_, d_, e_, g_ : 1}, Focus \[Rule] {x0_, y0_}, Radii -> {rx_, ry_}] := CenteredNumericPlot3D[f, {xvar, x0}, {yvar, y0}, Radii \[Rule] {rx, ry}]\)], "Input", CellLabel->"In[68]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ \(NumericPlot3D[f_, {xvar_, a_, b_, c_ : 1}, {yvar_, d_, e_, g_ : 1}, Focus \[Rule] {x0_, y0_}, Radii -> rx_] := CenteredNumericPlot3D[f, {xvar, x0}, {yvar, y0}, Radii -> rx]\)], "Input", CellLabel->"In[69]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[BoxData[ RowBox[{ RowBox[{"PlainNumericPlot3D", StyleBox["[", FontWeight->"Bold"], StyleBox[\(f_, {xvar_, a_, b_, c_: 1}, {yvar_, d_, e_, g_: 1}\), FontWeight->"Bold"], StyleBox["]", FontWeight->"Bold"]}], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], "\[IndentingNewLine]", \(TableForm[ plaintableofvalues[ f, \ {xvar, \ a, \ b, \ c}, {yvar, \ d, \ e, \ g}]]\)}]], "Input", CellLabel->"In[70]:=", InitializationCell->True, CellTags->"NumericPlot3DCode"] }, Closed]], Cell[CellGroupData[{ Cell["Plot3dalt", "Subsubsection", InitializationCell->True], Cell[BoxData[ \(PlotRangeUsed[ f_, {xvar_\ , \ xmin_, xmax_}, {yvar_, ymin_, ymax_}] := \ Module[{gr}, \[IndentingNewLine]gr\ = \ Plot3D[f, {xvar, \ xmin, xmax}, {yvar, \ ymin, ymax}, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]\((PlotRange\ /. \ FullOptions[gr])\)[\([3]\)]\[IndentingNewLine]]\)], "Input", CellLabel->"In[71]:=", InitializationCell->True], Cell[BoxData[ RowBox[{ RowBox[{"TangentPlane", StyleBox["[", FontWeight->"Bold"], StyleBox[\(f_, {xvar_, x0_}, {yvar_, y0_}\), FontWeight->"Bold"], StyleBox["]", FontWeight->"Bold"]}], StyleBox[" ", FontWeight->"Bold"], StyleBox[":=", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], RowBox[{ RowBox[{ RowBox[{"z", "==", RowBox[{ StyleBox[\((f /. {xvar -> x0, yvar -> y0})\), FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox["+", FontWeight->"Bold"], StyleBox[" ", FontWeight->"Bold"], StyleBox[\(\((D[f, x] /. {xvar -> x0})\) \((x - x0)\)\), FontWeight->"Bold"], StyleBox["+", FontWeight-> "Bold"], \(\((D[f, y] /. {yvar -> y0})\) \((y - y0)\)\)}]}], " ", "//", "Expand"}], "//", "Simplify"}]}]], "Input", CellLabel->"In[72]:=", InitializationCell->True], Cell[BoxData[ \(\(SetOptions[Plot3D, ColorFunction \[Rule] Hue, PlotPoints \[Rule] 25, \ Mesh \[Rule] False, AxesLabel \[Rule] {"\", "\", "\"}];\)\)], "Input", CellLabel->"In[73]:=", InitializationCell->True], Cell[BoxData[{ \(\(Options[Plot3DExt]\ = \ Options[Plot3D];\)\), "\n", \(\(Options[Plot3DExt]\ = \ Join[Options[Plot3DExt], {Focus \[Rule] False, TangentLinesAtFocus \[Rule] False, PlaneColor \[Rule] RGBColor[ .5, .5, .5], PlaneEquation \[Rule] \ False, \ CrossSectionView \[Rule] False, \ BothViews \[Rule] False, Tracings \[Rule] True}];\)\)}], "Input", CellLabel->"In[74]:=", InitializationCell->True], Cell[BoxData[ \(Plot3DExt[g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, opts___?OptionQ]\ := \ Module[{gr, altgr1, count = 0, \ thick = 0.015, focus = Focus /. Flatten[{opts, Options[Plot3DExt]}], planeColor = PlaneColor /. Flatten[{opts, Options[Plot3DExt]}], \[IndentingNewLine]viewPoint = ViewPoint /. Flatten[{opts, Options[Plot3DExt]}], planeEquation = PlaneEquation /. Flatten[{opts, Options[Plot3DExt]}], crossSectionView = CrossSectionView /. Flatten[{opts, Options[Plot3DExt]}], bothViews = BothViews /. Flatten[{opts, Options[Plot3DExt]}], plot3dopts = FilterOptions[Plot3D, opts], tangents\ = \ TangentLinesAtFocus /. Flatten[{opts, Options[Plot3DExt]}], paropts = FilterOptions[ParametricPlot3D, opts], graphopts = FilterOptions[Graphics3D, opts], i, rng}, \[IndentingNewLine]gr[\(++count\)] = Plot3D[g, {xvar, xmin, xmax}, {yvar, ymin, ymax}, plot3dopts // Evaluate, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]rng\ = PlotRange\ /. \ FullOptions[gr[1]]; \[IndentingNewLine]If[ VectorQ[focus] && Dimensions[ focus] \[Equal] {2}, \[IndentingNewLine]gr[\(++count\)] = Plot3DFocus[g, {xvar, xmin, xmax}, {yvar, ymin, ymax}, focus, \ rng, paropts]; \[IndentingNewLine]If[ VectorQ[tangents] && Dimensions[tangents] \[Equal] {2}\ && \ And @@ Map[BooleanQ, tangents], \[IndentingNewLine]If[ tangents[\([1]\)], gr[\(++count\)] = Plot3Dwxtangent[g, {xvar, xmin, xmax}, {yvar, ymin, ymax}, focus, \ rng, paropts] /. {Hue[a_] \[Rule] Sequence[Hue[a], Thickness[thick]]}]; \[IndentingNewLine]If[ tangents[\([2]\)], gr[\(++count\)] = Plot3Dwytangent[g, {xvar, xmin, xmax}, {yvar, ymin, ymax}, focus, \ rng, paropts] /. {Hue[a_] \[Rule] Sequence[Hue[a], Thickness[thick]]}]]]; \[IndentingNewLine]If[ planeEquation =!= False, gr[\(++count\)] = Plot3DWPlane[g, {xvar, xmin, xmax}, {yvar, ymin, ymax}, \ rng, opts]]; \[IndentingNewLine] (*If[\(crossSectionView === True\)\(,\)]; \ finish\ *) \[IndentingNewLine]Show[ Table[gr[i], {i, 1, count}], Evaluate[graphopts], ViewPoint \[Rule] \ viewPoint, DisplayFunction \[Rule] $DisplayFunction, \ AxesLabel \[Rule] {"\", "\", \ "\"}]\[IndentingNewLine]]\)], "Input", CellLabel->"In[76]:=", InitializationCell->True], Cell[BoxData[ \(Main3DPlot[g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, opts___?OptionQ]\ := Plot3D[g, {xvar, \ xmin, xmax}, {yvar, ymin, ymax}, opts // Evaluate, PlotPoints \[Rule] 25, \ Mesh \[Rule] False, \ ColorFunction \[Rule] Hue, \ DisplayFunction \[Rule] Identity]\)], "Input", CellLabel->"In[77]:=", InitializationCell->True], Cell[BoxData[ \(\(\( (*\ Used\ to\ add\ a\ focus\ to\ a\ 3 D\ plot\ *) \)\(\[IndentingNewLine]\)\(Plot3DFocus[ g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, {x0_, y0_}, rng_, opts___?OptionQ]\ := \ Module[{gr2, gr2b, gr3, gr3b, \ epsilon, thick = 0.015}, \[IndentingNewLine]epsilon\ = \ \((rng[\([3, 2]\)] - rng[\([3, 1]\)])\)/ 50; \[IndentingNewLine]gr2\ = \ ParametricPlot3D[{x0, yvar, epsilon + \((g /. {xvar \[Rule] x0})\)}, {yvar, ymin, ymax}, \ opts // Evaluate, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]gr2b\ = \ ParametricPlot3D[{x0, yvar, \(-epsilon\) + \((g /. {xvar \[Rule] x0})\)}, {yvar, ymin, ymax}, \ opts // Evaluate, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]gr3\ = \ ParametricPlot3D[{xvar, y0, \((g /. {yvar \[Rule] y0})\) + epsilon}, {xvar, xmin, xmax}, opts // Evaluate, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]gr3b\ = \ ParametricPlot3D[{xvar, y0, \((g /. {yvar \[Rule] y0})\) + \(-epsilon\)}, {xvar, xmin, xmax}, opts // Evaluate, DisplayFunction \[Rule] Identity]; \[IndentingNewLine]Sequence @@ Flatten[{{gr2, gr3, gr2b, gr3b} /. {List[Line[f_], rest__]\ \[Rule] \ List[Thickness[thick], Line[f], rest]}, Graphics3D[{PointSize[1.5*thick], Point[{x0, y0, epsilon + \((g /. {xvar \[Rule] x0, yvar \[Rule] y0})\)}], Point[{x0, y0, \(-epsilon\) + \((g /. {xvar \[Rule] x0, yvar \[Rule] y0})\)}]}]}]\[IndentingNewLine]]\)\)\)], \ "Input", CellLabel->"In[78]:=", InitializationCell->True], Cell[BoxData[ \(Plot3Dwytangent[ g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, {x0_, y0_}, rng_, opts___?OptionQ]\ := \ Module[{epsilon}, \[IndentingNewLine]epsilon\ = \ \((rng[\([3, 2]\)] - rng[\([3, 1]\)])\)/ 50; \[IndentingNewLine]ParametricPlot3D[{x0, yvar, epsilon + \((g /. {xvar \[Rule] x0, yvar \[Rule] y0})\)\ + \ \((D[g /. {xvar \[Rule] x0}, yvar] /. {yvar \[Rule] \ y0})\) \((yvar - y0)\), \ Hue[1]} // Evaluate, {yvar, ymin, ymax}, \ opts // Evaluate, DisplayFunction \[Rule] Identity]\[IndentingNewLine]]\)], "Input", CellLabel->"In[79]:=", InitializationCell->True], Cell[BoxData[ \(Plot3Dwxtangent[ g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, {x0_, y0_}, rng_, opts___?OptionQ]\ := \ Module[{\ epsilon}, \[IndentingNewLine]epsilon\ = \ \((rng[\([3, 2]\)] - rng[\([3, 1]\)])\)/ 50; \[IndentingNewLine]ParametricPlot3D[{xvar, y0, epsilon + \((g /. {xvar \[Rule] x0, yvar \[Rule] y0})\)\ + \ \((D[g /. {yvar \[Rule] y0}, xvar] /. {xvar \[Rule] \ x0})\) \((xvar - x0)\), \ Hue[1]} // Evaluate, {xvar, xmin, xmax}, \ opts // Evaluate, DisplayFunction \[Rule] Identity]\[IndentingNewLine]]\)], "Input", CellLabel->"In[80]:=", InitializationCell->True], Cell[BoxData[ \(varInPlaneEquationQ[eq_, var_] := Flatten[Position[FullForm[eq], var]] =!= {}\)], "Input", CellLabel->"In[81]:=", InitializationCell->True], Cell[BoxData[ \(VariablesInPlaneEquation[eq_]\ := {varInPlaneEquationQ[eq, x], varInPlaneEquationQ[eq, y], varInPlaneEquationQ[eq, z]}\)], "Input", CellLabel->"In[82]:=", InitializationCell->True], Cell[BoxData[ \(SolveFor[eq_, var_]\ := \ var /. Solve[eq, var] // First\)], "Input", CellLabel->"In[83]:=", InitializationCell->True], Cell[BoxData[ \(Plot3DWPlane[g_, {xvar_, xmin_, xmax_}, {yvar_, ymin_, ymax_}, \ rng_, opts___?OptionQ]\ := \ Module[{\ plcolor, plane, \ vars, \ paropts = FilterOptions[ParametricPlot3D, opts]}, \[IndentingNewLine]plcolor\ = PlaneColor /. Flatten[{opts, Options[Plot3DExt]}]; \[IndentingNewLine]plane\ = PlaneEquation /. Flatten[{opts, Options[Plot3DExt]}]; \[IndentingNewLine]vars\ = VariablesInPlaneEquation[plane]; \[IndentingNewLine]If[ vars[\([1]\)], \[IndentingNewLine]If[ vars[\([2]\)], \[IndentingNewLine]If[ vars[\([3]\)], \[IndentingNewLine] (*\ all\ of\ x, \ y, \ z\ *) \[IndentingNewLine]ParametricPlot3D[{xvar, yvar, SolveFor[plane, z], \ plcolor}, {xvar, xmin, xmax}, {yvar, ymin, ymax}, PlotPoints \[Rule] 4, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity], \[IndentingNewLine] (*\ only\ x\ and\ y\ \ *) \[IndentingNewLine]ParametricPlot3D[{xvar, SolveFor[plane, yvar], z, \ plcolor}, {xvar, xmin, xmax}, {z, rng[\([3, 1]\)], \ rng[\([3, 2]\)]}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity]], \[IndentingNewLine]If[ vars[\([3]\)], \[IndentingNewLine] (*\ only\ x\ and\ z\ \ *) \[IndentingNewLine]ParametricPlot3D[{xvar, yvar, SolveFor[plane, z], \ plcolor}, {xvar, xmin, xmax}, {yvar, ymin, ymax}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity], \[IndentingNewLine] (*\ only\ x\ *) \[IndentingNewLine]ParametricPlot3D[{SolveFor[ plane, xvar], yvar, z, \ plcolor}, {yvar, ymin, ymax}, {z, rng[\([3, 1]\)], \ rng[\([3, 2]\)]}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity]]], \[IndentingNewLine]If[ vars[\([2]\)], \[IndentingNewLine]If[ vars[\([3]\)], \[IndentingNewLine] (*\ only\ y\ and\ z\ \ *) \[IndentingNewLine]ParametricPlot3D[{xvar, yvar, SolveFor[plane, z], \ plcolor}, {xvar, xmin, xmax}, {yvar, ymin, ymax}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity], \[IndentingNewLine] (*\ only\ y\ *) \[IndentingNewLine]ParametricPlot3D[{xvar, SolveFor[plane, yvar], z, \ plcolor}, {xvar, xmin, xmax}, {z, rng[\([3, 1]\)], \ rng[\([3, 2]\)]}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity]], \[IndentingNewLine]If[ vars[\([3]\)], \[IndentingNewLine] (*\ only\ z\ *) \[IndentingNewLine]ParametricPlot3D[{xvar, yvar, SolveFor[plane, z], \ plcolor}, {xvar, xmin, xmax}, {yvar, ymin, ymax}, PlotPoints \[Rule] 10, \ Evaluate[\ paropts], DisplayFunction \[Rule] Identity], \[IndentingNewLine]Print["\"]]]]\[IndentingNewLine]]\)], "Input", CellLabel->"In[84]:=", InitializationCell->True], Cell[BoxData[ \(\(Options[ Plot3DWxPlane] = {PlaneColor \[Rule] RGBColor[ .5, .5, .5]};\)\)], "Input", CellLabel->"In[85]:=", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell["Approximations3D", "Subsubsection"], Cell[BoxData[ \(\(\(\ \)\(\(Options[ ShowApproximations3D] = {Method \[Rule] "\", Divisions \[Rule] {5, 5}, \ DisplayVolume \[Rule] False, \ Color \[Rule] RGBColor[1, 164/255, 215/255]};\)\ \[IndentingNewLine] (*\ Options[ShowApproximations3D] = {}\ *) \[IndentingNewLine] notListQ[x_] := Head[x] =!= List\)\)\)], "Input", CellLabel->"In[87]:=", InitializationCell->True], Cell[BoxData[ \(ShowApproximations3D[{fn1_, fn2_}, {var1_, a_, b_}, {var2_, c_, d_}, opts___?OptionQ] := Module[{k, rlist, llist, randlist, prt, thex, deltax, mycolors, fnx, xxx, method, divisions, gr1, gr2, volume, grlist, daQ, rc, finopts = {opts}}, method = Method /. \[InvisibleSpace]Flatten[{opts, Options[ ShowApproximations3D]}]; \[IndentingNewLine] (*\ \ \(Return[{opts}];\)\ *) divisions = Divisions /. \[InvisibleSpace]Flatten[{opts, Options[ShowApproximations3D]}]; daQ = DisplayVolume /. \[InvisibleSpace]Flatten[{opts, Options[ShowApproximations3D]}]; rc = Color /. \[InvisibleSpace]Flatten[{opts, Options[ShowApproximations3D]}]; finopts = DeleteCases[finopts, Color \[Rule] _]; finopts = DeleteCases[finopts, DisplayVolume \[Rule] _]; finopts = DeleteCases[finopts, Divisions \[Rule] _]; finopts = DeleteCases[finopts, Method \[Rule] _]; mycolors = rc; {volume, grlist} = {RiemannSum[{fn1, fn2}, {var1, a, b}, {var2, c, d}, Divisions \[Rule] divisions, Method \[Rule] method, DataToo \[Rule] False], ApproxCuboids[{fn1, fn2}, {var1, a, b}, {var2, c, d}, Divisions \[Rule] divisions, Method \[Rule] method, Color \[Rule] rc]}; \ gr1 = Show[Graphics3D[grlist], DisplayFunction \[Rule] Identity, Lighting \[Rule] False]; \ \[IndentingNewLine]gr2 = Plot3D[fn2, {var1, a, b}, {var2, c, d}, ColorFunction \[Rule] Hue, DisplayFunction \[Rule] Identity]; gr1 = Show[{gr2, gr1, gr2}, DisplayFunction \[Rule] $DisplayFunction, Lighting \[Rule] False, finopts]; \[IndentingNewLine]If[daQ, volume, gr1]]\)], "Input", CellLabel->"In[89]:=", InitializationCell->True], Cell[BoxData[ \(ShowApproximations3D[fn_, {var1_, a_, b_}, {var2_, c_, d_}, opts___?OptionQ] := ShowApproximations3D[{0, fn}, {var1, a, b}, {var2, c, d}, opts]\)], "Input", CellLabel->"In[90]:=", InitializationCell->True], Cell[BoxData[{ \(lowerLeftPoint[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := {a, c}\), "\[IndentingNewLine]", \(lowerRightPoint[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := {b, c}\), "\[IndentingNewLine]", \(upperLeftPoint[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := {a, d}\), "\[IndentingNewLine]", \(upperRightPoint[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := {b, d}\), "\[IndentingNewLine]", \(midpointPoint[ f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := {\(a + b\)\/2, \(c + d\)\/2}\), "\[IndentingNewLine]", \(maxPoint[ f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := \(\(Flatten[ Table[{f /. {xvar \[Rule] j, yvar \[Rule] k}, j, k}, {j, a, b, \(b - a\)\/\(Max[d - c, b - a]*15\)}, {k, c, d, \(d - c\)\/\(Max[d - c, b - a]*15\)}], 1] // Sort\) // Last\) // Rest\), "\n", \(minPoint[ f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := \(\(Flatten[ Table[{f /. {xvar \[Rule] j, yvar \[Rule] k}, j, k}, {j, a, b, \(b - a\)\/\(Max[d - c, b - a]*15\)}, {k, c, d, \(d - c\)\/\(Max[d - c, b - a]*15\)}], 1] // Sort\) // First\) // Rest\), "\[IndentingNewLine]", \(closestCornerPoint[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := Which[a >= 0 && c >= 0, {a, c}, \[IndentingNewLine]a >= 0 && d <= 0, {a, d}, \[IndentingNewLine]a >= 0 && Sign[c] =!= Sign[d], {a, If[d > Abs[c], c, d]}, \[IndentingNewLine]b <= 0 && c >= 0, {b, c}, \[IndentingNewLine]b <= 0 && d <= 0, {b, d}, \[IndentingNewLine]b <= 0 && Sign[c] =!= Sign[d], {b, If[d > Abs[c], c, d]}, \[IndentingNewLine]c >= 0 && Sign[a] =!= Sign[b], {If[b > Abs[a], a, b], c}, \[IndentingNewLine]d <= 0 && Sign[a] =!= Sign[b], {If[b > Abs[a], a, b], d}, \[IndentingNewLine]Sign[c] =!= Sign[d] && Sign[a] =!= Sign[b], {If[b > Abs[a], a, b], If[d > Abs[c], c, d]}\[IndentingNewLine]]\)}], "Input", CellLabel->"In[91]:=", InitializationCell->True], Cell[BoxData[{ \(lowerLeftValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := f /. {xvar \[Rule] a, yvar \[Rule] c}\), "\[IndentingNewLine]", \(lowerRightValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := f /. {xvar \[Rule] b, yvar \[Rule] c}\), "\[IndentingNewLine]", \(upperLeftValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := f /. {xvar \[Rule] a, yvar \[Rule] d}\), "\[IndentingNewLine]", \(upperRightValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := f /. {xvar \[Rule] b, yvar \[Rule] d}\), "\[IndentingNewLine]", \(midpointValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := f /. {xvar \[Rule] \(a + b\)\/2, yvar \[Rule] \(c + d\)\/2}\), "\[IndentingNewLine]", \(minValue[ f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := \[IndentingNewLine]\(ApproxValues[ f, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {15, 15}, Method \[Rule] "\"] // Flatten\) // Min\), "\[IndentingNewLine]", \(maxValue[ f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := \(ApproxValues[f, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {15, 15}, Method \[Rule] "\"] // Flatten\) // Max\), "\[IndentingNewLine]", \(closestCornerValue[f_, {xvar_, a_, b_}, {yvar_, c_, d_}] := Which[a >= 0 && c >= 0, f /. {xvar \[Rule] a, yvar \[Rule] c}, \[IndentingNewLine]a >= 0 && d <= 0, f /. {xvar \[Rule] a, yvar \[Rule] d}, \[IndentingNewLine]a >= 0 && Sign[c] =!= Sign[d], f /. {xvar \[Rule] a, yvar \[Rule] If[d > Abs[c], c, d]}, \[IndentingNewLine]b <= 0 && c >= 0, f /. {xvar \[Rule] b, yvar \[Rule] c}, \[IndentingNewLine]b <= 0 && d <= 0, f /. {xvar \[Rule] b, yvar \[Rule] d}, \[IndentingNewLine]b <= 0 && Sign[c] =!= Sign[d], f /. {xvar \[Rule] b, yvar \[Rule] If[d > Abs[c], c, d]}, \[IndentingNewLine]c >= 0 && Sign[a] =!= Sign[b], f /. {xvar \[Rule] If[b > Abs[a], a, b], yvar \[Rule] c}, \[IndentingNewLine]d <= 0 && Sign[a] =!= Sign[b], f /. {xvar \[Rule] If[b > Abs[a], a, b], yvar \[Rule] d}, \[IndentingNewLine]Sign[c] =!= Sign[d] && Sign[a] =!= Sign[b], f /. {xvar \[Rule] If[b > Abs[a], a, b], yvar \[Rule] If[d > Abs[c], c, d]}\[IndentingNewLine]]\)}], "Input", CellLabel->"In[99]:=", InitializationCell->True], Cell[BoxData[ \(ApproxPoints[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_] := With[{dx = \(b - a\)\/m, dy = \(d - c\)\/n}, Table[\(ToExpression[method <> "\"]\)[ f, {xvar, a + j\ dx, a + \((j + 1)\)\ dx}, {yvar, c + k\ dy, c + \((k + 1)\)\ dy}], {j, 0, m - 1}, {k, 0, n - 1}]]\)], "Input", CellLabel->"In[107]:=", InitializationCell->True], Cell[BoxData[ \(ApproxValues[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_] := With[{dx = \(b - a\)\/m, dy = \(d - c\)\/n}, Table[\(ToExpression[method <> "\"]\)[ f, {xvar, a + j\ dx, a + \((j + 1)\)\ dx}, {yvar, c + k\ dy, c + \((k + 1)\)\ dy}], {j, 0, m - 1}, {k, 0, n - 1}]]\)], "Input", CellLabel->"In[108]:=", InitializationCell->True], Cell[BoxData[ \(NApproxValues[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_] := With[{dx = \(b - a\)\/m, dy = \(d - c\)\/n}, Table[\(ToExpression[method <> "\"]\)[ f, {xvar, a*\((1.0)\) + j\ dx, a + \((j + 1)\)\ dx}, {yvar, c*\((1.0)\) + k\ dy, c + \((k + 1)\)\ dy}], {j, 0, m - 1}, {k, 0, n - 1}]]\)], "Input", CellLabel->"In[109]:=", InitializationCell->True], Cell[BoxData[ \(ApproxCuboids[{f_, g_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_, opts___] := Module[{dx = \(b - a\)\/m, dy = \(d - c\)\/n, lowvals, uppervals, lowers, uppers, cuboids, color}, \[IndentingNewLine]color = Color /. \[InvisibleSpace]Flatten[{opts, Options[ShowApproximations3D]}]; \[IndentingNewLine]lowers = Flatten[Table[{a + j\ dx, c + k\ dy}, {j, 0, m - 1}, {k, 0, n - 1}], 1]; \[IndentingNewLine]lowvals = If[method === "\", \[IndentingNewLine]Flatten[ NApproxValues[f, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], 1], If[method === "\", Flatten[NApproxValues[f, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], 1], Flatten[NApproxValues[f, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method], 1]]]; \[IndentingNewLine]lowers = Join[Transpose[lowers], {lowvals}] // Transpose; \[IndentingNewLine]uppers = Flatten[Table[{a + j\ dx, c + k\ dy}, {j, 1, m}, {k, 1, n}], 1]; \[IndentingNewLine]uppervals = Flatten[NApproxValues[g, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method], 1]; \[IndentingNewLine]uppers = Join[Transpose[uppers], {uppervals}] // Transpose; \[IndentingNewLine]cuboids = Transpose[{lowers, uppers}]; Prepend[\((Cuboid[First[#1], Last[#1]] &)\) /@ cuboids, color]]\)], "Input", CellLabel->"In[110]:=", InitializationCell->True], Cell[BoxData[ \(\(Options[RiemannSum] = {DataToo \[Rule] False, \ Method \[Rule] "\"};\)\)], "Input", CellLabel->"In[111]:=", InitializationCell->True], Cell[BoxData[ \(RiemannSum[{lower_, upper_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Method \[Rule] method_, Divisions \[Rule] {m_, n_}, opts___?OptionQ] := RiemannSum[{lower, upper}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method, opts]\)], "Input", CellLabel->"In[112]:=", InitializationCell->True], Cell[BoxData[{ \(\(\(RiemannSum[{lower_, upper_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_, opts___?OptionQ] := Module[{bottomvals, topvals, xyPoints, data, datatoo, sum, meth, dx = \(b - a\)\/m, dy = \(d - c\)\/n}, \[IndentingNewLine]datatoo = DataToo /. Flatten[{opts, Options[RiemannSum]}]; \[IndentingNewLine] (*\ Return[{method, opts, Options[RiemannSum], \ Head[method]}]\ *) ; \[IndentingNewLine]Switch[ method, "\", bottomvals = ApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"]; \n topvals = ApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], \[IndentingNewLine]"\", bottomvals = ApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"]; \n topvals = ApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], \[IndentingNewLine]_, bottomvals = ApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method]; \n topvals = ApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method]]; \[IndentingNewLine]data\ = \ topvals - bottomvals; \[IndentingNewLine]sum = Plus @@ \((Flatten[data]*dx*dy)\); \[IndentingNewLine]xyPoints = Table[{j, k}, {j, a, b - dx, dx}, {k, c, d - dy, dy}]; \[IndentingNewLine]data = Flatten[xyPoints, 1] // Transpose; \[IndentingNewLine]data\ = {First[data], Last[data], Flatten[bottomvals], Flatten[topvals]} // Transpose; \[IndentingNewLine]If[datatoo, {sum, data}, \ sum]\[IndentingNewLine]]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(RiemannSum[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_, opts___?OptionQ] := RiemannSum[{0, f}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] method, opts]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(RiemannSum[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, opts___?OptionQ] := RiemannSum[{0, f}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] midpoint, opts]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(RiemannSum[{lower_, upper_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, opts___?OptionQ] := RiemannSum[{lower, upper}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] midpoint, opts]\)}], "Input", CellLabel->"In[113]:=", InitializationCell->True], Cell[BoxData[{ \(\(\(NRiemannSum[{lower_, upper_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_, opts___?OptionQ] := Module[{bottomvals, topvals, xyPoints, data, datatoo, sum, meth, dx = \(b - a\)\/\(m*1.0\), dy = \(d - c\)\/\(n*1.0\)}, \[IndentingNewLine]datatoo = DataToo /. Flatten[{opts, Options[RiemannSum]}]; \[IndentingNewLine] (*\ Return[{method, opts, Options[RiemannSum], \ Head[method]}]\ *) ; \[IndentingNewLine]Switch[ method, "\", bottomvals = NApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"]; \n topvals = NApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], \[IndentingNewLine]"\", bottomvals = NApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"]; \n topvals = NApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] "\"], \[IndentingNewLine]_, bottomvals = NApproxValues[lower, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method]; \n topvals = NApproxValues[upper, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, Method \[Rule] method]]; \[IndentingNewLine]data\ = \ topvals - bottomvals; \[IndentingNewLine]sum = Plus @@ \((Flatten[data]*dx*dy)\); \[IndentingNewLine]xyPoints = Table[{j, k}, {j, a, b - dx, dx}, {k, c, d - dy, dy}]; \[IndentingNewLine]data = Flatten[xyPoints, 1] // Transpose; \[IndentingNewLine]data\ = {First[data], Last[data], Flatten[bottomvals], Flatten[topvals]} // Transpose; \[IndentingNewLine]If[datatoo, {sum, data}, \ sum]\[IndentingNewLine]]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(NRiemannSum[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, Method \[Rule] method_, opts___?OptionQ] := NRiemannSum[{0, f}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] method, opts]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(NRiemannSum[f_, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, opts___?OptionQ] := NRiemannSum[{0, f}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] midpoint, opts]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(NRiemannSum[{lower_, upper_}, {xvar_, a_, b_}, {yvar_, c_, d_}, Divisions \[Rule] {m_, n_}, opts___?OptionQ] := NRiemannSum[{lower, upper}, {xvar, a, b}, {yvar, c, d}, Divisions \[Rule] {m, n}, \ Method \[Rule] midpoint, opts]\)}], "Input", CellLabel->"In[117]:=", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell["ParametricPlot", "Subsubsection"], Cell[BoxData[ \(TraceParametricPlot[{ff_, gg_}, {t_, t0_, t1_}, dt_Integer: 8, opts___] := TraceParametricPlot[{f, \ g}, \ {t, \ t0, \ t1, \ dt}, \ opts]\)], "Input", CellLabel->"In[121]:=", InitializationCell->True], Cell[BoxData[ \(\(\(TraceParametricPlot[{ff_, gg_}, {t_, t0_, t1_, dt_Integer: 8}, opts___] := \n\ \ Module[{ndt, arro, arrsz, rng, xx, tt, f, g}, ndt = N[\((t1 - t0)\)/dt]; \n\ \ \ \ f = Function[t, ff]; \ g = Function[t, gg]; \n\ \ \ \ \ arrsz = \n\ \ \ \ \ \ N[\((Max[ Table[Abs[f[tt]], {tt, t0, t1, N[\((t1 - t0)\)/ 25]}]] + \n\ \ \ \ \ \ \ \ \ \ \ \ \ \ Max[ Table[Abs[g[tt]], {tt, t0, t1, N[\((t1 - t0)\)/25]}]])\)/ 2.0]; \n\ \ \ \ \ arro[{a_, b_}, {c_, d_}, eps_] := \n\ \ \ \ \ \ Polygon[{{a, b} + 3*eps*{c - a, d - b}/Sqrt[\((b - d)\)^2 + \((c - a)\)^2], {a, b} + \n\ \ \ \ \ \ \ \ \ \ \ \ eps/ Sqrt[\((b - d)\)^2 + \((c - a)\)^2]*{\((b - d)\), \((c - a)\)}, {a, \n\ \ \ \ \ \ \ \ \ \ \ \ \ \ b} + \ \((\(-eps\))\)/Sqrt[\((b - d)\)^2 + \((c - a)\)^2]*{\((b - d)\), \((c - a)\)}}]; \n\ \ \ \ \ rng = \n\ \ \ \ \ \ FullOptions[\ \n\ \ \ \ \ \ \ \ ParametricPlot[{f[xx], g[xx]}, {xx, t0, t1}, opts, PlotRange \[Rule] All, \n\ \ \ \ \ \ \ \ \ \ DisplayFunction \[Rule] Identity], PlotRange]; \n\ \ \ \ \ Do[\n\ \ \ \ \ \ ParametricPlot[{f[xx], g[xx]}, {xx, t0, tt}, \n\ \ \ \ \ \ \ \ PlotRange \[Rule] rng + {{0, 0}, {0, .06* rng[\([2, 2]\)]}}, \n\ \ \ \ \ \ \ \ PlotStyle \[Rule] Hue[\((tt + 1)\)/\((dt - 1)\)], \n\ \ \ \ \ \ \ \ Epilog \[Rule] {Blue, \n\ \ \ \ \ \ \ \ \ \ \ \ \ arro[{f[tt], g[tt]}, {f[tt + .05*arrsz], g[\((tt + .05* arrsz)\)]}, .035*\n\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ arrsz]}, \n\ \ \ \ \ \ \ \ PlotLabel\n\ \ \ \ \ \ \ \ \ \ \[Rule] StringJoin["\", \n\ \ \ \ \ \ \ \ \ \ \ \ ToString[ N[If[Abs[tt + .001] < .0001, 0, tt + .001], 3]]], \n\ \ \ \ \ \ \ \ DisplayFunction \[Rule] \ $DisplayFunction, opts], {tt, t0 - .001, t1, ndt}]]\)\(\ \ \ \ \ \)\)\)], "Input", CellLabel->"In[122]:=", InitializationCell->True], Cell[BoxData[ \(\(Options[ RainbowParametricPlot]\ = {IncludeDots \[Rule] False};\)\)], "Input", CellLabel->"In[123]:=", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[BoxData[ \(RainbowParametricPlot[{ff_, gg_}, {var_, min_, max_}, n_Integer : 8, opts___?OptionQ] := Module[{ln, gr, rt, i, pt, j, rng, dx, st, grs, f, g, dotsQ}, dotsQ = IncludeDots /. \[InvisibleSpace]Flatten[{opts, Options[RainbowParametricPlot]}]; \[IndentingNewLine]If[ dotsQ, RainbowParametricPlotwDots[{ff, gg}, {var, min, max}, n], \[IndentingNewLine]dx = \(max - min\)\/n; \ \[IndentingNewLine]f = Function[var, ff]; g = Function[var, gg]; Do[gr[j] = ParametricPlot[{f[var], g[var]}, {var, min + \((j - 1)\)\ dx, min + \((j - 1)\)\ dx + dx}, DisplayFunction \[Rule] Identity, PlotStyle \[Rule] Hue[j\/n], opts], {j, 1, n}]; grs = Table[gr[i], {i, 1, n}]; Show[grs, DisplayFunction \[Rule] $DisplayFunction]]]\)], "Input", CellLabel->"In[124]:=", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[BoxData[ \(RainbowParametricPlotwDots[{ff_, gg_}, {var_, min_, max_}, n_Integer: 8, opts___] := \n\ \ Module[{ln, gr, rt, i, pt, rng, dx, st, grs, f, g, pts = {}}, dx = \((max - min)\)/n; \n\ \ \ \ \ f = Function[var, ff]; \n\ \ \ \ \ g = Function[var, gg]; \n\ \ \ \ \ Do[ st = min + \((i - 1)\)\ dx; \n\ \ \ \ \ \ \ AppendTo[\n\ \ \ \ \ \ \ \ pts, \ {PointSize[0.01 + i\ 0.0025], Point[{f[st], g[st]}]}]; \n\ \ \ \ \ \ \ gr[ i] = \n\ \ \ \ \ \ \ \ ParametricPlot[{f[var], g[var]}, {var, st, st + dx}, \n\ \ \ \ \ \ \ \ \ \ DisplayFunction \[Rule] Identity, PlotStyle \[Rule] Hue[i/n], opts], {i, 1, \n\ \ \ \ \ \ \ \ n}]; \ grs = Table[gr[i], {i, 1, n}]; \n\ \ \ \ \ Show[{grs, Graphics[ pts]}, \n\ \ \ \ \ \ DisplayFunction \[Rule] $DisplayFunction]]\ \)], "Input", CellLabel->"In[125]:=", InitializationCell->True, CellTags->"RainbowParametricPlotcode"] }, Closed]], Cell[CellGroupData[{ Cell["LineIntegrals", "Subsubsection"], Cell[BoxData[ \(\(\( (*\ this\ measures\ the\ distance\ between\ any\ two\ points, \ in\ any\ dimension\ *) \)\(\[IndentingNewLine]\)\(Distance[pt1_List, \ pt2_List]\ := \ \@\(\((pt2 - pt1)\) . \((pt2 - pt1)\)\)\)\)\)], \ "Input", CellLabel->"In[126]:=", InitializationCell->True], Cell[BoxData[ \(LineIntegralIllustration[{P_, Q_}, {ff_, gg_}, {var_, min_, max_}, n_Integer: 8, opts___] := \n\ \ Module[{ln, gr, rt, i, pt, rng, dt, st, grs, f, g, pts, scale, vfarrows, disarrows, widest}, dt = \((max - min)\)/n; \n\ \ \ \ \ f = Function[var, ff]; \n\ \ \ \ \ g = Function[var, gg]; \[IndentingNewLine]pts\ = \ Table[Point[{f[k], g[k]}], {k, min, \ max\ , \ dt}]; \[IndentingNewLine]disarrows = Table[Arrow[First[pts[\([k]\)]], First[pts[\([k + 1]\)]]], {k, 1, Length[pts] - 1}]; \[IndentingNewLine]grs = ParametricPlot[{f[var], g[var]}, {var, min, max}, \n\ \ \ \ \ \ \ \ \ \ opts, \ DisplayFunction \[Rule] Identity]; \ \[IndentingNewLine]widest = PlotRange\ /. \ FullOptions[grs]; \[IndentingNewLine]widest\ = Map[\((Last[#] - First[#])\) &, widest] // Max; \[IndentingNewLine]vfarrows = Map[Arrow[First[#], First[#] + {P /. {x \[Rule] #[\([1, 1]\)], y \[Rule] #[\([1, 2]\)]}, Q /. {x \[Rule] #[\([1, 1]\)], y \[Rule] #[\([1, 2]\)]}}] &, pts] // Drop[#, \(-1\)] &; \n\ \ \ \ scale = 1/5*widest/\((Map[Apply[Distance, #] &, N[vfarrows]] // Max)\); \[IndentingNewLine]vfarrows = vfarrows /. Arrow[first_, second_] \[Rule] Arrow[first, first + scale*\((second - first)\)]; \n\ \ \ \ \ Show[{grs, Graphics[{PointSize[0.02], pts, RGBColor[1, 0, 0], disarrows, RGBColor[0, 0, 1], vfarrows}]}, \n\ \ \ \ \ \ DisplayFunction \[Rule] \ $DisplayFunction]]\)], "Input", CellLabel->"In[127]:=", InitializationCell->True, CellTags->"LineIntegralIllustrationcode"] }, Closed]], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{1, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]\[FilledRightTriangle]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[Cell[BoxData[GridBox[{ { ButtonBox[ StyleBox["\[FirstPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageFirst"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"First Slide"], ButtonBox[ StyleBox["\[LeftPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Previous Slide"], ButtonBox[ StyleBox["\[RightPointer]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlideHyperlink", ButtonNote->"Next Slide"], ButtonBox[ StyleBox["\[LastPage]", "SR"], ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageLast"]}], ButtonStyle->"SlideHyperlink"], " ", ButtonBox[ StyleBox[ RowBox[{ CounterBox["SlideShowNavigationBar"], \(\(\ \)\(of\)\(\ \)\), CounterBox["SlideShowNavigationBar", {None, "SlideShowHeader", -1}]}], "SR"], ButtonFrame->"None"]} }]]]], "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgS>OoTK`3oi6l000?oi6l0 00?ok8`Pooc0F?ooc6D01?ooc6D00ool`5Sok8`PonA_0005onA_0004oo:NS>OoTK`3o i6l000goi6l000GomLVOooooooooooooo>gOonIh4003onA_00?ooooo1?oTK`03ooooo`;oi6l00ooo ool4onA_00?ooooo0_oTK`03ooooo`04oo:gP?oTK`3oi6l0oo?0S`;ooooo00?on=^oonA_0?oTK`00 3ooTK`0004Coi6l000ColYhcoooS>Oooc6GoolaUooZjD_oVM@H00ooTK`001OoVM@Kon[YBoooS>Oooc6GoolaU00GoolaU00?olYhconA_0?oTK`000_oTK`000ooWN`go n[YBoooS>@?oi6l000CokY8VoooS>@05onA_00?oolaU2OoTK`001Ooj^U;o olaUoooS>@05onA_0006onV14oomaUoo olaUoooonA_0005onMk3Oo[QQWojhHIon^66OoVM@H0NooT K`000?ooi6l06_oTK`000?ooi6l06_oTK`0005coi6l01Oob]h000oo[Td3oi6l0onA_0003onA_0003 on^C@?ob]h3ol[N000;ol[N000?okZEPonA_0?oTK`001_oTK`000ooYRS3ol[N0ooSK_`04ooSK_`03 oo2^L?oWPB3oi6l000Goi6l000?okZEPoo:gP?ob]h002Oob]h000ooTK`3oih4Poo:gP003oo:gP003 on^C@?oTK`3oi6l000Koi6l000?okZEPoo:gP?ob]h000_ob]h04onA_0003onN18?ob]h3ol[N000;o l[N000?ol:i`oo:gP?ob]h000oob]h08onA_0003on^C@?ob]h3ol[N000;ol[N00_o^YF03oo:gP003 onjUH?oTK`3oi6l000?oi6l01?ob]h000ooYRS3oi6l0onA_0002onA_00Col[N000?okZEPonA_0?oT K`00?_oTK`0005_oi6l000?oih4Pooooooooool00oooool00oogdZooi6l0onA_0003onA_0003ooG9 Wooooooooooo00?ooooo1_oTK`000ooVN13omm:_ooooo`08ooooo`03oo?0SooVN13oi6l000?oi6l0 00?on=^oooooooooool02Oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l0 00?on=^oooooooooool00_ooool4onA_0003onjUH?oooooooooo00;ooooo0_oebIl4ooooo`03onbL D?oTK`3oi6l000Goi6l000?on^C?ooooooooool00_ooool00oo`[W3omLVOooooo`02ooooo`03ooc] gooTK`3oi6l000;oi6l000?ojHX`ooooooooool00_ooool00ooc`8ooi6l0onA_0002onA_00Cooooo 00?omm:_onA_0?oTK`00?_oTK`0005_oi6l000?ok9a@ooooooooool01?ooool00ooVN13oi6l0onA_ 0002onA_0003oogfkooooooooooo00?ooooo00?ojHX`onA_0?oTK`000_oTK`000ooVN13on^C?oooo o`0:ooooo`03oo[TcooVN13oi6l000;oi6l000?on=^oooooooooool02Oooool00ooTK`3oji=0oooo o`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^oooooooooool00_ooool4onA_0003ooOB[ooo oooooooo00;ooooo00?oji=0onbLD?ooool00oooool00ooebIooi6l0onA_0004onA_0003onN18?oo oooooooo00?ooooo00?oiWP@onjUH?ooool00oooool4onA_0003oo2^L?oooooooooo00;ooooo00Go n^C?onA_0?oTK`3oi6l0on^C@004ooooo`03oo:gP?oTK`3oi6l003koi6l0001KonA_0003oo:gP?oo oooooooo00Cooooo00GokZEPonA_0?oTK`3oi6l0on^C@006ooooo`03onjUH?oTK`3oi6l000;oi6l0 00?on=^oooooooooool00oooool00oomm^oon=^ooogfk`05ooooo`05oo?0SooTK`3oi6l0onA_0?oh fkl02oooool00ooTK`3oji=0ooooo`03ooooo`03oo:gP?oTK`3oi6l000Koi6l000?on=^ooooooooo ool00_ooool3onA_0003onIh4?oooooooooo00;ooooo00Coo>gOonA_0?oTK`3oo>gO0oooool00oom m^ooiWP@onA_0004onA_0003oo2^L?oooooooooo00;ooooo00?omm:_onA_0?oYRS001?ooool01Oo[ Td3oi6l0onA_0?oTK`3on^C?00Gooooo00Coih4PonA_0?oTK`3okZEP1?ooool00oo[Td3oi6l0onA_ 000nonA_0000FooTK`000oohfkooooooooooo`04ooooo`05ooG9WooTK`3oi6l0onA_0?oc`8l01_oo ool01Ooc`8ooi6l0onA_0?oTK`3oji=000Gooooo00Gol:i`onA_0?oTK`3oiWP@ooG9W`05ooooo`04 onN18?oTK`3oi6l0ooSK_`Cooooo2?oTK`000oo[Td3oooooooooo`02ooooo`03oo:gP?oTK`3oi6l0 00Koi6l000?on=^oooooooooool00_ooool3onA_0003onjUH?oooooooooo00;ooooo00Coll2?onA_ 0?oTK`3oll2?3oooool00oo/W53oi6l0onA_0004ooooo`04oo2^L?oTK`3oi6l0onN180Kooooo00Co kZEPonA_0?oTK`3oll2?1?ooool00ooVN13oi6l0onA_000nonA_0000FooTK`000oomm^oooooooooo o`04ooooo`05oogfkooTK`3oi6l0onA_0?olkMl01_ooool01OojigOonA_0?oTK`3ooOK_0oooool00oogdZooi6l0onA_000oonA_0000F_oTK`00 0oo[Td3oooooooooo`02ooooo`07ooSK_ooooooooooooooooooc`8ooi6l0oo2^L003ooooo`03ooG9 Wooooooooooo00;ooooo00?oji=0onA_0?oVN1001?ooool00oolkMooi6l0onA_0005onA_00Gooooo 0_oTK`000oohfkooooooooooo`02ooooo`Soi6l000?oji=0ooooooooool00_ooool00oolkMoon=^o ooSK_`04ooSK_`;oi6l000?on=^oooooooooool00_ooool00oohfkoon^C?ooooo`04ooooo`03oo2^ L?oTK`3oi6l000;oi6l000?okZEPooooooooool00_ooool01OogdZool[N0oo:gP?ob]h3ooOK_00Co oooo00GojHX`onA_0?oTK`3oi6l0onjUH004ooooo`03onA_0?oVN13ooooo00Oooooo0_oWPB04oooo o`03oo:gP?oTK`3oi6l003ooi6l0001JonA_0003oo:gP?oooooooooo00;ooooo00Ook9a@oooooooo ooooooooooc]gooTK`3on=^o00?ooooo00?ok9a@oo[Tcoooool00_ooool00oo`[W3oi6l0on^C@004 ooooo`03ooSK_ooTK`3oi6l000Goi6l01Oooool2onA_0003ooSK_ooooooooooo00;ooooo2?oTK`00 0oo[Td3oooooooooo`09ooooo`;oi6l000?on=^oooooooooool02?ooool00ooji"], "Graphics", CellFrame->{{0, 0}, {4, 0}}, Evaluatable->False, GeneratedCell->False, CellAutoOverwrite->False, CellFrameColor->RGBColor[1, 0.8, 0.396078], ImageSize->{281, 65}, ImageMargins->{{0, 0}, {0, 1}}, ImageRegion->{{0, 1}, {0, 1}}, Background->RGBColor[0.894118, 0.435294, 0]], Cell[TextData[{ ButtonBox["\[FilledLeftTriangle]\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPagePrevious"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Previous Slide"], "\[ThickSpace]\[ThickSpace]|\[ThickSpace]\[ThickSpace]", ButtonBox["\[ThickSpace]\[ThickSpace]\[ThickSpace]", ButtonFunction:>FrontEndExecute[ { FrontEndToken[ FrontEnd`SelectedNotebook[ ], "ScrollPageNext"]}], ButtonStyle->"SlidePreviousNextLink", ButtonFrame->"None", ButtonNote->"Next Slide"] }], "PreviousNext"] }, Open ]], Cell[BoxData[ TagBox[\(\[SkeletonIndicator] ContourGraphics \[SkeletonIndicator]\), False, Editable->False]], "Output", CellLabel->"Out[341]="] }, FrontEndVersion->"5.2 for Microsoft Windows", ScreenRectangle->{{0, 1024}, {0, 681}}, AutoGeneratedPackage->None, ScreenStyleEnvironment->"SlideShow", PrintingStyleEnvironment->"Presentation", WindowToolbars->{}, CellGrouping->Manual, WindowSize->{974, 640}, WindowMargins->{{4, Automatic}, {Automatic, 1}}, ShowSelection->True, ShowGroupOpenCloseIcon->True, CellLabelAutoDelete->False, ShowCellTags->True, Magnification->1, StyleDefinitions -> Notebook[{ Cell[CellGroupData[{ Cell["Wolfram Reseller Conference 2006", "Title"], Cell["\<\ Modify the definitions below to change the default appearance of all cells in \ a given style. Make modifications to any definition using commands in the \ Format menu.\ \>", "Text"], Cell[CellGroupData[{ Cell["Style Environment Names", "Section"], Cell[StyleData[All, "Working"], PageWidth->WindowWidth, CellBracketOptions->{"Color"->RGBColor[0.269993, 0.308507, 0.6]}, CellLabelMargins->{{12, Inherited}, {Inherited, Inherited}}, ScriptMinSize->9], Cell[StyleData[All, "Presentation"], PageWidth->WindowWidth, CellLabelMargins->{{24, Inherited}, {Inherited, Inherited}}, ScriptMinSize->12], Cell[StyleData[All, "SlideShow"], PageWidth->WindowWidth, ScrollingOptions->{"PagewiseDisplay"->True, "VerticalScrollRange"->Fit}, ShowCellBracket->False, ScriptMinSize->9], Cell[StyleData[All, "Printout"], PageWidth->PaperWidth, CellLabelMargins->{{2, Inherited}, {Inherited, Inherited}}, ScriptMinSize->5, PrivateFontOptions->{"FontType"->"Outline"}] }, Closed]], Cell[CellGroupData[{ Cell["Notebook Options", "Section"], Cell["\<\ The options defined for the style below will be used at the Notebook level.\ \>", "Text"], Cell[StyleData["Notebook"], PageHeaders->{{Cell[ TextData[ { CounterBox[ "Page"]}], "PageNumber"], None, Cell[ TextData[ { ValueBox[ "FileName"]}], "Header"]}, {Cell[ TextData[ { ValueBox[ "FileName"]}], "Header"], None, Cell[ TextData[ { CounterBox[ "Page"]}], "PageNumber"]}}, CellFrameLabelMargins->6, StyleMenuListing->None] }, Closed]], Cell[CellGroupData[{ Cell["Styles for Headings", "Section"], Cell[CellGroupData[{ Cell[StyleData["Title"], CellMargins->{{27, Inherited}, {10, 30}}, CellGroupingRules->{"TitleGrouping", 0}, PageBreakBelow->False, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LineSpacing->{1, 11}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Title", CounterAssignments->{{"Section", 0}, {"Equation", 0}, {"Figure", 0}, { "Subtitle", 0}, {"Subsubtitle", 0}}, FontFamily->"Helvetica", FontSize->36, FontWeight->"Bold", FontColor->RGBColor[0.894118, 0.435294, 0]], Cell[StyleData["Title", "Presentation"], CellMargins->{{72, 50}, {10, 80}}, LineSpacing->{1, 0}, FontSize->45], Cell[StyleData["Title", "SlideShow"], CellMargins->{{72, 50}, {10, 80}}, FontSize->45], Cell[StyleData["Title", "Printout"], CellMargins->{{2, 10}, {12, 30}}, FontSize->24] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subtitle"], CellMargins->{{27, Inherited}, {20, 2}}, CellGroupingRules->{"TitleGrouping", 10}, PageBreakBelow->False, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subtitle", CounterAssignments->{{"Section", 0}, {"Equation", 0}, {"Figure", 0}, { "Subsubtitle", 0}}, FontFamily->"Helvetica", FontSize->24], Cell[StyleData["Subtitle", "Presentation"], CellMargins->{{72, 50}, {20, 2}}, LineSpacing->{1, 0}, FontSize->30], Cell[StyleData["Subtitle", "SlideShow"], CellMargins->{{72, 50}, {30, 2}}, FontSize->30], Cell[StyleData["Subtitle", "Printout"], CellMargins->{{2, 10}, {12, 8}}, FontSize->18] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsubtitle"], CellMargins->{{27, Inherited}, {8, 2}}, CellGroupingRules->{"TitleGrouping", 20}, PageBreakBelow->False, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsubtitle", CounterAssignments->{{"Section", 0}, {"Equation", 0}, {"Figure", 0}}, StyleMenuListing->None, FontFamily->"Helvetica", FontSize->16], Cell[StyleData["Subsubtitle", "Presentation"], CellMargins->{{54, 10}, {20, 20}}, LineSpacing->{1, 0}, FontSize->24], Cell[StyleData["Subsubtitle", "SlideShow"], CellMargins->{{72, 25}, {30, 10}}], Cell[StyleData["Subsubtitle", "Printout"], CellMargins->{{2, 10}, {12, 8}}, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Section"], CellMargins->{{27, Inherited}, {8, 34}}, CellGroupingRules->{"SectionGrouping", 30}, PageBreakBelow->False, CellFrameMargins->4, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LineSpacing->{1, 2}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Section", CounterAssignments->{{"Subsection", 0}, {"Subsubsection", 0}}, FontFamily->"Helvetica", FontSize->20, FontWeight->"Bold", FontColor->RGBColor[0.847059, 0.192004, 0.182818]], Cell[StyleData["Section", "Presentation"], CellFrame->{{0, 0}, {0, 2}}, ShowGroupOpenCloseIcon->True, CellMargins->{{72, 50}, {11, 30}}, CellFrameColor->RGBColor[1, 0.796078, 0.501961], FontSize->30], Cell[StyleData["Section", "SlideShow"], CellMargins->{{71, 50}, {11, 35}}, FontSize->30], Cell[StyleData["Section", "Printout"], CellMargins->{{2, 0}, {7, 22}}, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsection"], CellMargins->{{60, Inherited}, {8, 12}}, CellGroupingRules->{"SectionGrouping", 40}, PageBreakBelow->False, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsection", CounterAssignments->{{"Subsubsection", 0}}, FontFamily->"Helvetica", FontSize->16, FontWeight->"Bold", FontColor->RGBColor[0.858824, 0.411765, 0.364706]], Cell[StyleData["Subsection", "Presentation"], CellMargins->{{72, 50}, {6, 15}}, LineSpacing->{1, 0}, FontSize->24], Cell[StyleData["Subsection", "SlideShow"], CellMargins->{{99, 50}, {8, 12}}, LineSpacing->{1, 0}, FontSize->24], Cell[StyleData["Subsection", "Printout"], CellMargins->{{21, 0}, {8, 22}}, FontSize->12] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsubsection"], CellMargins->{{60, Inherited}, {2, 12}}, CellGroupingRules->{"SectionGrouping", 50}, PageBreakBelow->False, DefaultNewInlineCellStyle->"None", InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsubsection", FontFamily->"Helvetica", FontWeight->"Bold", FontColor->RGBColor[0.929198, 0.518471, 0.354726]], Cell[StyleData["Subsubsection", "Presentation"], CellMargins->{{72, 50}, {6, 20}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Subsubsection", "SlideShow"], CellMargins->{{99, 50}, {6, 20}}, FontSize->18], Cell[StyleData["Subsubsection", "Printout"], CellMargins->{{2, 0}, {7, 14}}, FontSize->11] }, Closed]] }, Open ]], Cell[CellGroupData[{ Cell["Styles for Body Text", "Section"], Cell[CellGroupData[{ Cell[StyleData["Text"], CellMargins->{{60, 10}, {7, 7}}, InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, LineSpacing->{1, 3}, CounterIncrements->"Text", FontFamily->"Helvetica"], Cell[StyleData["Text", "Presentation"], CellMargins->{{72, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->17], Cell[StyleData["Text", "SlideShow"], CellMargins->{{100, 50}, {10, 10}}, FontSize->17], Cell[StyleData["Text", "Printout"], CellMargins->{{2, 2}, {6, 6}}, TextJustification->0.5, Hyphenation->True, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SmallText"], CellMargins->{{60, 10}, {6, 6}}, DefaultNewInlineCellStyle->"None", LineSpacing->{1, 3}, LanguageCategory->"NaturalLanguage", CounterIncrements->"SmallText", FontFamily->"Helvetica", FontSize->9], Cell[StyleData["SmallText", "Presentation"], CellMargins->{{72, 50}, {8, 8}}, LineSpacing->{1, 5}, FontSize->10], Cell[StyleData["SmallText", "SlideShow"], CellMargins->{{100, 50}, {8, 8}}, LineSpacing->{1, 5}, FontSize->10], Cell[StyleData["SmallText", "Printout"], CellMargins->{{2, 2}, {5, 5}}, TextJustification->0.5, Hyphenation->True, FontSize->7] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Styles for Input/Output", "Section"], Cell["\<\ The cells in this section define styles used for input and output to the \ kernel. Be careful when modifying, renaming, or removing these styles, \ because the front end associates special meanings with these style names. \ Some attributes for these styles are actually set in FormatType Styles (in \ the last section of this stylesheet). \ \>", "Text"], Cell[CellGroupData[{ Cell[StyleData["Input"], CellMargins->{{66, 10}, {5, 7}}, Evaluatable->True, CellGroupingRules->"InputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, DefaultFormatType->DefaultInputFormatType, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->"Mathematica", FormatType->InputForm, ShowStringCharacters->True, NumberMarks->True, LinebreakAdjustments->{0.85, 2, 10, 0, 1}, CounterIncrements->"Input", FontWeight->"Bold"], Cell[StyleData["Input", "Presentation"], CellMargins->{{72, 50}, {8, 10}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Input", "SlideShow"], CellMargins->{{100, 50}, {8, 10}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Input", "Printout"], CellMargins->{{39, 0}, {4, 6}}, LinebreakAdjustments->{0.85, 2, 10, 1, 1}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["InputOnly"], CellMargins->{{66, 10}, {7, 7}}, Evaluatable->True, CellGroupingRules->"InputGrouping", CellHorizontalScrolling->True, DefaultFormatType->DefaultInputFormatType, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->"Mathematica", FormatType->InputForm, ShowStringCharacters->True, NumberMarks->True, LinebreakAdjustments->{0.85, 2, 10, 0, 1}, CounterIncrements->"Input", StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["InputOnly", "Presentation"], CellMargins->{{72, Inherited}, {8, 10}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["InputOnly", "SlideShow"], CellMargins->{{100, Inherited}, {8, 10}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["InputOnly", "Printout"], CellMargins->{{39, 0}, {4, 6}}, LinebreakAdjustments->{0.85, 2, 10, 1, 1}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Output"], CellMargins->{{66, 10}, {7, 5}}, CellEditDuplicate->True, CellGroupingRules->"OutputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, DefaultFormatType->DefaultOutputFormatType, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Output"], Cell[StyleData["Output", "Presentation"], CellMargins->{{72, 50}, {10, 8}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Output", "SlideShow"], CellMargins->{{100, 50}, {10, 8}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Output", "Printout"], CellMargins->{{39, 0}, {6, 4}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Message"], CellMargins->{{66, Inherited}, {Inherited, Inherited}}, CellGroupingRules->"OutputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, ShowCellLabel->False, DefaultFormatType->DefaultOutputFormatType, "TwoByteSyntaxCharacterAutoReplacement"->True, AutoStyleOptions->{"UnmatchedBracketStyle"->None}, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Message", StyleMenuListing->None, FontFamily->"Helvetica", FontSize->10, FontColor->RGBColor[0, 0.376471, 0.490196]], Cell[StyleData["Message", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 0}, FontSize->14], Cell[StyleData["Message", "SlideShow"], CellMargins->{{100, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 0}, FontSize->14], Cell[StyleData["Message", "Printout"], CellMargins->{{39, Inherited}, {Inherited, Inherited}}, FontSize->7] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Print"], CellMargins->{{66, Inherited}, {Inherited, Inherited}}, CellGroupingRules->"OutputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, ShowCellLabel->False, DefaultFormatType->DefaultOutputFormatType, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Print", StyleMenuListing->None], Cell[StyleData["Print", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Print", "SlideShow"], CellMargins->{{100, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Print", "Printout"], CellMargins->{{39, Inherited}, {Inherited, Inherited}}, FontSize->8] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Graphics"], CellMargins->{{4, Inherited}, {Inherited, Inherited}}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, ShowCellLabel->False, DefaultFormatType->DefaultOutputFormatType, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Graphics", ImageMargins->{{43, Inherited}, {Inherited, 0}}, StyleMenuListing->None, FontFamily->"Courier", FontSize->10], Cell[StyleData["Graphics", "Presentation"], ImageMargins->{{62, Inherited}, {Inherited, 0}}], Cell[StyleData["Graphics", "SlideShow"], ImageMargins->{{100, Inherited}, {Inherited, 0}}], Cell[StyleData["Graphics", "Printout"], ImageMargins->{{30, Inherited}, {Inherited, 0}}, Magnification->0.8] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["CellLabel"], LanguageCategory->None, StyleMenuListing->None, FontFamily->"Helvetica", FontSize->9, FontColor->RGBColor[0.24416, 0.602594, 0.809735]], Cell[StyleData["CellLabel", "Presentation"], FontSize->12], Cell[StyleData["CellLabel", "SlideShow"], FontSize->12], Cell[StyleData["CellLabel", "Printout"], FontFamily->"Courier", FontSize->8, FontSlant->"Italic"] }, Open ]], Cell[CellGroupData[{ Cell[StyleData["FrameLabel"], LanguageCategory->None, StyleMenuListing->None, FontFamily->"Helvetica", FontSize->9], Cell[StyleData["FrameLabel", "Presentation"], FontSize->12], Cell[StyleData["FrameLabel", "SlideShow"], FontSize->12], Cell[StyleData["FrameLabel", "Printout"], FontFamily->"Courier", FontSize->8, FontSlant->"Italic", FontColor->GrayLevel[0]] }, Closed]] }, Open ]], Cell[CellGroupData[{ Cell["Presentation Specific", "Section"], Cell[CellGroupData[{ Cell[StyleData["BulletedList"], CellMargins->{{45, 10}, {7, 7}}, CellFrameLabels->{{ Cell[ "\[FilledSmallSquare]", "BulletedList", CellBaseline -> Baseline], Inherited}, {Inherited, Inherited}}, InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, CounterIncrements->"BulletedList", FontFamily->"Helvetica"], Cell[StyleData["BulletedList", "Presentation"], CellMargins->{{56, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->18], Cell[StyleData["BulletedList", "SlideShow"], CellMargins->{{85, 50}, {10, 10}}, FontSize->18], Cell[StyleData["BulletedList", "Printout"], CellMargins->{{2, 2}, {6, 6}}, TextJustification->0.5, Hyphenation->True, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Author"], CellMargins->{{139, 27}, {2, 20}}, FontFamily->"Times", FontSize->24, FontSlant->"Italic"], Cell[StyleData["Author", "Presentation"], CellMargins->{{198, 27}, {2, 25}}, FontSize->32], Cell[StyleData["Author", "SlideShow"], CellMargins->{{198, 27}, {2, 50}}, FontSize->32], Cell[StyleData["Author", "Printout"], CellMargins->{{100, 27}, {2, 20}}, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Affiliation"], CellMargins->{{141, 27}, {30, 12}}, FontFamily->"Times", FontSize->24, FontSlant->"Italic"], Cell[StyleData["Affiliation", "Presentation"], CellMargins->{{198, 27}, {35, 10}}, FontSize->32], Cell[StyleData["Affiliation", "SlideShow"], CellMargins->{{198, 27}, {100, 10}}, FontSize->32], Cell[StyleData["Affiliation", "Printout"], CellMargins->{{100, 27}, {2, 12}}, FontSize->14] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Header Graphic", "Section"], Cell[CellGroupData[{ Cell[StyleData["ConferenceGraphicCell"], ShowCellBracket->True, CellMargins->{{0, 0}, {0, 0}}, Evaluatable->False, PageBreakBelow->False, ImageMargins->{{0, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, Background->GrayLevel[1], Magnification->1], Cell[StyleData["ConferenceGraphicCell", "Presentation"], ShowCellBracket->False], Cell[StyleData["ConferenceGraphicCell", "SlideShow"], ShowCellBracket->False], Cell[StyleData["ConferenceGraphicCell", "Printout"], FontSize->8, Magnification->0.75] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["GraphicNoMagnification"], CellMargins->{{60, 10}, {7, 7}}, LineSpacing->{1, 3}, CounterIncrements->"Text", FontFamily->"Helvetica", Magnification->1], Cell[StyleData["GraphicNoMagnification", "Presentation"], CellMargins->{{72, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->17], Cell[StyleData["GraphicNoMagnification", "SlideShow"], CellMargins->{{100, 50}, {10, 10}}, FontSize->17], Cell[StyleData["GraphicNoMagnification", "Printout"], CellMargins->{{2, 2}, {6, 6}}, FontSize->10] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Inline Formatting", "Section"], Cell["\<\ These styles are for modifying individual words or letters in a cell \ exclusive of the cell tag.\ \>", "Text"], Cell[StyleData["RM"], StyleMenuListing->None, FontWeight->"Plain", FontSlant->"Plain"], Cell[StyleData["BF"], StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["IT"], StyleMenuListing->None, FontSlant->"Italic"], Cell[StyleData["TR"], StyleMenuListing->None, FontFamily->"Times", FontWeight->"Plain", FontSlant->"Plain"], Cell[StyleData["TI"], StyleMenuListing->None, FontFamily->"Times", FontWeight->"Plain", FontSlant->"Italic"], Cell[StyleData["TB"], StyleMenuListing->None, FontFamily->"Times", FontWeight->"Bold", FontSlant->"Plain"], Cell[StyleData["TBI"], StyleMenuListing->None, FontFamily->"Times", FontWeight->"Bold", FontSlant->"Italic"], Cell[StyleData["MR"], "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Plain", FontSlant->"Plain"], Cell[StyleData["MO"], "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Plain", FontSlant->"Italic"], Cell[StyleData["MB"], "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Bold", FontSlant->"Plain"], Cell[StyleData["MBO"], "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Bold", FontSlant->"Italic"], Cell[StyleData["SR"], StyleMenuListing->None, FontFamily->"Helvetica", FontWeight->"Plain", FontSlant->"Plain"], Cell[StyleData["SO"], StyleMenuListing->None, FontFamily->"Helvetica", FontWeight->"Plain", FontSlant->"Italic"], Cell[StyleData["SB"], StyleMenuListing->None, FontFamily->"Helvetica", FontWeight->"Bold", FontSlant->"Plain"], Cell[StyleData["SBO"], StyleMenuListing->None, FontFamily->"Helvetica", FontWeight->"Bold", FontSlant->"Italic"], Cell[CellGroupData[{ Cell[StyleData["SO10"], StyleMenuListing->None, FontFamily->"Helvetica", FontSize->10, FontWeight->"Plain", FontSlant->"Italic"], Cell[StyleData["SO10", "Printout"], StyleMenuListing->None, FontFamily->"Helvetica", FontSize->7, FontWeight->"Plain", FontSlant->"Italic"] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Formulas and Programming", "Section"], Cell[CellGroupData[{ Cell[StyleData["InlineFormula"], CellMargins->{{10, 4}, {0, 8}}, CellHorizontalScrolling->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Formula", ScriptLevel->1, SingleLetterItalics->True, StyleMenuListing->None], Cell[StyleData["InlineFormula", "Presentation"], LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["InlineFormula", "SlideShow"], LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["InlineFormula", "Printout"], CellMargins->{{2, 0}, {6, 6}}, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DisplayFormula"], CellMargins->{{60, Inherited}, {Inherited, Inherited}}, CellHorizontalScrolling->True, DefaultFormatType->DefaultInputFormatType, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Formula", ScriptLevel->0, SingleLetterItalics->True, UnderoverscriptBoxOptions->{LimitsPositioning->True}], Cell[StyleData["DisplayFormula", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["DisplayFormula", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["DisplayFormula", "Printout"], FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Program"], CellFrame->{{0, 0}, {0.5, 0.5}}, CellMargins->{{60, 4}, {0, 8}}, CellHorizontalScrolling->True, Hyphenation->False, LanguageCategory->"Formula", ScriptLevel->1, FontFamily->"Courier"], Cell[StyleData["Program", "Presentation"], CellMargins->{{72, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["Program", "SlideShow"], CellMargins->{{100, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["Program", "Printout"], CellMargins->{{2, 0}, {6, 6}}, FontSize->9] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Hyperlink Styles", "Section"], Cell["\<\ The cells below define styles useful for making hypertext ButtonBoxes. The \ \"Hyperlink\" style is for links within the same Notebook, or between \ Notebooks.\ \>", "Text"], Cell[CellGroupData[{ Cell[StyleData["Hyperlink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0, 0.376471, 0.490196], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookLocate[ #2]}]&), Active->True, ButtonFrame->"None", ButtonNote->ButtonData}], Cell[StyleData["Hyperlink", "Presentation"], FontSize->16], Cell[StyleData["Hyperlink", "SlideShow"]], Cell[StyleData["Hyperlink", "Printout"], FontSize->10, FontVariations->{"Underline"->False}] }, Closed]], Cell["\<\ The following styles are for linking automatically to the on-line help \ system.\ \>", "Text"], Cell[CellGroupData[{ Cell[StyleData["MainBookLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "MainBook", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["MainBookLink", "Presentation"], FontSize->16], Cell[StyleData["MainBookLink", "SlideShow"]], Cell[StyleData["MainBookLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["AddOnsLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontFamily->"Courier", FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "AddOns", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["AddOnsLink", "Presentation"], FontSize->16], Cell[StyleData["AddOnsLink", "SlideShow"]], Cell[StyleData["AddOnsLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["RefGuideLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontFamily->"Courier", FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "RefGuide", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["RefGuideLink", "Presentation"], FontSize->16], Cell[StyleData["RefGuideLink", "SlideShow"]], Cell[StyleData["RefGuideLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["RefGuideLinkText"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "RefGuide", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["RefGuideLinkText", "Presentation"], FontSize->16], Cell[StyleData["RefGuideLinkText", "SlideShow"]], Cell[StyleData["RefGuideLinkText", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["GettingStartedLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "GettingStarted", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["GettingStartedLink", "Presentation"], FontSize->16], Cell[StyleData["GettingStartedLink", "SlideShow"]], Cell[StyleData["GettingStartedLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DemosLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "Demos", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["DemosLink", "SlideShow"]], Cell[StyleData["DemosLink", "Printout"], FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["TourLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "Tour", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["TourLink", "SlideShow"]], Cell[StyleData["TourLink", "Printout"], FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["OtherInformationLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "OtherInformation", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["OtherInformationLink", "Presentation"], FontSize->16], Cell[StyleData["OtherInformationLink", "SlideShow"]], Cell[StyleData["OtherInformationLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["MasterIndexLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0.269993, 0.308507, 0.6], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "MasterIndex", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["MasterIndexLink", "SlideShow"]], Cell[StyleData["MasterIndexLink", "Printout"], FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Styles for Headers and Footers", "Section"], Cell[StyleData["Header"], CellMargins->{{0, 0}, {4, 1}}, DefaultNewInlineCellStyle->"None", LanguageCategory->"NaturalLanguage", StyleMenuListing->None, FontSize->10, FontSlant->"Italic"], Cell[StyleData["Footer"], CellMargins->{{0, 0}, {0, 4}}, DefaultNewInlineCellStyle->"None", LanguageCategory->"NaturalLanguage", StyleMenuListing->None, FontSize->9, FontSlant->"Italic"], Cell[StyleData["PageNumber"], CellMargins->{{0, 0}, {4, 1}}, StyleMenuListing->None, FontFamily->"Times", FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell["Palette Styles", "Section"], Cell["\<\ The cells below define styles that define standard ButtonFunctions, for use \ in palette buttons.\ \>", "Text"], Cell[StyleData["Paste"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, Placeholder]}]&)}], Cell[StyleData["Evaluate"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, All], FrontEnd`SelectionEvaluate[ FrontEnd`InputNotebook[ ], All]}]&)}], Cell[StyleData["EvaluateCell"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, All], FrontEnd`SelectionMove[ FrontEnd`InputNotebook[ ], All, Cell, 1], FrontEnd`SelectionEvaluateCreateCell[ FrontEnd`InputNotebook[ ], All]}]&)}], Cell[StyleData["CopyEvaluate"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`SelectionCreateCell[ FrontEnd`InputNotebook[ ], All], FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, All], FrontEnd`SelectionEvaluate[ FrontEnd`InputNotebook[ ], All]}]&)}], Cell[StyleData["CopyEvaluateCell"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`SelectionCreateCell[ FrontEnd`InputNotebook[ ], All], FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, All], FrontEnd`SelectionEvaluateCreateCell[ FrontEnd`InputNotebook[ ], All]}]&)}] }, Closed]], Cell[CellGroupData[{ Cell["Placeholder Styles", "Section"], Cell["\<\ The cells below define styles useful for making placeholder objects in \ palette templates.\ \>", "Text"], Cell[CellGroupData[{ Cell[StyleData["Placeholder"], Placeholder->True, StyleMenuListing->None, FontSlant->"Italic", FontColor->RGBColor[0.951324, 0.721569, 0.178317], TagBoxOptions->{Editable->False, Selectable->False, StripWrapperBoxes->False}], Cell[StyleData["Placeholder", "Presentation"]], Cell[StyleData["Placeholder", "SlideShow"]], Cell[StyleData["Placeholder", "Printout"]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["PrimaryPlaceholder"], StyleMenuListing->None, DrawHighlighted->True, FontSlant->"Italic", Background->RGBColor[0.984314, 0.871046, 0.349798], TagBoxOptions->{Editable->False, Selectable->False, StripWrapperBoxes->False}], Cell[StyleData["PrimaryPlaceholder", "Presentation"]], Cell[StyleData["PrimaryPlaceholder", "SlideShow"]], Cell[StyleData["PrimaryPlaceholder", "Printout"]] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["FormatType Styles", "Section"], Cell["\<\ The cells below define styles that are mixed in with the styles of most \ cells. If a cell's FormatType matches the name of one of the styles defined \ below, then that style is applied between the cell's style and its own \ options. This is particularly true of Input and Output.\ \>", "Text"], Cell[StyleData["CellExpression"], PageWidth->Infinity, CellMargins->{{6, Inherited}, {Inherited, Inherited}}, ShowCellLabel->False, ShowSpecialCharacters->False, AllowInlineCells->False, Hyphenation->False, AutoItalicWords->{}, StyleMenuListing->None, FontFamily->"Courier", FontSize->12, Background->GrayLevel[1]], Cell[StyleData["InputForm"], InputAutoReplacements->{}, AllowInlineCells->False, Hyphenation->False, StyleMenuListing->None, FontFamily->"Courier"], Cell[StyleData["OutputForm"], PageWidth->Infinity, TextAlignment->Left, LineSpacing->{0.6, 1}, StyleMenuListing->None, FontFamily->"Courier"], Cell[StyleData["StandardForm"], InputAutoReplacements->{ "->"->"\[Rule]", ":>"->"\[RuleDelayed]", "<="->"\[LessEqual]", ">="->"\[GreaterEqual]", "!="->"\[NotEqual]", "=="->"\[Equal]", Inherited}, "TwoByteSyntaxCharacterAutoReplacement"->True, LineSpacing->{1.25, 0}, StyleMenuListing->None, FontFamily->"Courier"], Cell[StyleData["TraditionalForm"], InputAutoReplacements->{ "->"->"\[Rule]", ":>"->"\[RuleDelayed]", "<="->"\[LessEqual]", ">="->"\[GreaterEqual]", "!="->"\[NotEqual]", "=="->"\[Equal]", Inherited}, "TwoByteSyntaxCharacterAutoReplacement"->True, LineSpacing->{1.25, 0}, SingleLetterItalics->True, TraditionalFunctionNotation->True, DelimiterMatching->None, StyleMenuListing->None], Cell["\<\ The style defined below is mixed in to any cell that is in an inline cell \ within another.\ \>", "Text"], Cell[StyleData["InlineCell"], LanguageCategory->"Formula", ScriptLevel->1, StyleMenuListing->None], Cell[StyleData["InlineCellEditing"], StyleMenuListing->None, Background->RGBColor[0.984314, 0.916869, 0.563256]] }, Closed]], Cell[CellGroupData[{ Cell["Automatic Styles", "Section"], Cell["\<\ The cells below define styles that are used to affect the display of certain \ types of objects in typeset expressions. For example, \"UnmatchedBracket\" \ style defines how unmatched bracket, curly bracket, and parenthesis \ characters are displayed (typically by coloring them to make them stand out).\ \ \>", "Text"], Cell[StyleData["UnmatchedBracket"], StyleMenuListing->None, FontColor->RGBColor[0.52549, 0.737255, 0.882353]], Cell[StyleData["Completions"], StyleMenuListing->None, FontFamily->"Courier"] }, Closed]], Cell[CellGroupData[{ Cell["Styles from HelpBrowser", "Section"], Cell[CellGroupData[{ Cell[StyleData["MathCaption"], CellFrame->{{0, 0}, {0, 0.5}}, CellMargins->{{66, 12}, {2, 24}}, PageBreakBelow->False, CellFrameMargins->{{8, 8}, {8, 2}}, CellFrameColor->GrayLevel[0.700008], CellFrameLabelMargins->4, LineSpacing->{1, 1}, ParagraphSpacing->{0, 8}, StyleMenuListing->None, FontColor->GrayLevel[0.2]], Cell[StyleData["MathCaption", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["MathCaption", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["MathCaption", "Printout"], CellMargins->{{39, 0}, {0, 14}}, Hyphenation->True, FontSize->9, FontColor->GrayLevel[0]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["ObjectName"], ShowCellBracket->True, CellMargins->{{66, 4}, {8, 8}}, Evaluatable->True, CellGroupingRules->"InputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, CellLabelAutoDelete->False, CellLabelMargins->{{14, Inherited}, {Inherited, Inherited}}, DefaultFormatType->DefaultInputFormatType, ShowSpecialCharacters->Automatic, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Mathematica", FormatType->StandardForm, ShowStringCharacters->True, NumberMarks->True, StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["ObjectName", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["ObjectName", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["ObjectName", "Printout"], ShowCellBracket->False, CellMargins->{{39, 0}, {6, 6}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Usage"], ShowCellBracket->True, CellMargins->{{66, 4}, {8, 8}}, Evaluatable->True, CellGroupingRules->"InputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, CellLabelAutoDelete->False, CellLabelMargins->{{14, Inherited}, {Inherited, Inherited}}, DefaultFormatType->DefaultInputFormatType, ShowSpecialCharacters->Automatic, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Mathematica", FormatType->StandardForm, ShowStringCharacters->True, NumberMarks->True, StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["Usage", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["Usage", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["Usage", "Printout"], ShowCellBracket->False, CellMargins->{{39, 0}, {6, 6}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Notes"], ShowCellBracket->True, CellMargins->{{66, 4}, {8, 8}}, Evaluatable->True, CellGroupingRules->"InputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, CellLabelAutoDelete->False, CellLabelMargins->{{14, Inherited}, {Inherited, Inherited}}, DefaultFormatType->DefaultInputFormatType, ShowSpecialCharacters->Automatic, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Mathematica", FormatType->StandardForm, ShowStringCharacters->True, NumberMarks->True, StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["Notes", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["Notes", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["Notes", "Printout"], ShowCellBracket->False, CellMargins->{{39, 0}, {6, 6}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["InlineOutput"], ShowCellBracket->True, CellMargins->{{66, 4}, {8, 8}}, Evaluatable->True, CellGroupingRules->"InputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, CellLabelAutoDelete->False, CellLabelMargins->{{14, Inherited}, {Inherited, Inherited}}, DefaultFormatType->DefaultInputFormatType, ShowSpecialCharacters->Automatic, "TwoByteSyntaxCharacterAutoReplacement"->True, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Mathematica", FormatType->StandardForm, ShowStringCharacters->True, NumberMarks->True, StyleMenuListing->None, FontWeight->"Bold"], Cell[StyleData["InlineOutput", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["InlineOutput", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["InlineOutput", "Printout"], ShowCellBracket->False, CellMargins->{{39, 0}, {6, 6}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell["Emphasis Boxes and Pictures", "Subsection"], Cell[CellGroupData[{ Cell[StyleData["Box"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnSpacings->1}], Cell[StyleData["Box", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["Box", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["Box", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DoubleBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnSpacings->2, RowAlignments->Top}], Cell[StyleData["DoubleBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DoubleBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DoubleBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["1ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnSpacings->1}], Cell[StyleData["1ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["1ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["1ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["2ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], SingleLetterItalics->False, LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->{0.31, 0.67}}], Cell[StyleData["2ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["2ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["2ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->9, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["2ColumnEvenBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->0.46}], Cell[StyleData["2ColumnEvenBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["2ColumnEvenBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["2ColumnEvenBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["2ColumnSmallBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnSpacings->1.5, ColumnWidths->0.35, ColumnAlignments->{Right, Left}}], Cell[StyleData["2ColumnSmallBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["2ColumnSmallBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["2ColumnSmallBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["3ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->0.32}], Cell[StyleData["3ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["3ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["3ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["3ColumnSmallBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnSpacings->1.5, ColumnWidths->0.24, ColumnAlignments->{Right, Center, Left}}], Cell[StyleData["3ColumnSmallBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["3ColumnSmallBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["3ColumnSmallBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["4ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], SingleLetterItalics->False, LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->{0.13, 0.35, 0.13, 0.35}}], Cell[StyleData["4ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["4ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["4ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["5ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->0.202}], Cell[StyleData["5ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["5ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["5ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->9, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["6ColumnBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxFrame->0.5, BoxMargins->True}, GridBoxOptions->{ColumnWidths->{0.12, 0.22, 0.12, 0.12, 0.22, 0.12}}], Cell[StyleData["6ColumnBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["6ColumnBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["6ColumnBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["FramedBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnAlignments->{Left}}], Cell[StyleData["FramedBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["FramedBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["FramedBox", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DefinitionBox"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.4, 0.6}, ColumnAlignments->{Left}}], Cell[StyleData["DefinitionBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DefinitionBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DefinitionBox", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DefinitionBox3Col"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.35, 0.2, 0.45}, ColumnAlignments->{Left}}], Cell[StyleData["DefinitionBox3Col", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DefinitionBox3Col", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DefinitionBox3Col", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DefinitionBox4Col"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.15, 0.35, 0.15, 0.35}, ColumnAlignments->{Left}}], Cell[StyleData["DefinitionBox4Col", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DefinitionBox4Col", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DefinitionBox4Col", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DefinitionBox5Col"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->0.2, ColumnAlignments->{Left}}], Cell[StyleData["DefinitionBox5Col", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DefinitionBox5Col", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DefinitionBox5Col", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DefinitionBox6Col"], CellFrame->0.5, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakWithin->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.13, 0.24, 0.13, 0.13, 0.24, 0.13}, ColumnAlignments->{Left}}], Cell[StyleData["DefinitionBox6Col", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["DefinitionBox6Col", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["DefinitionBox6Col", "Printout"], CellMargins->{{2, 4}, {0, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["TopBox"], CellFrame->{{0.5, 0.5}, {0, 0.5}}, CellMargins->{{27, 12}, {0, 8}}, CellHorizontalScrolling->True, PageBreakBelow->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.31, 0.62}, ColumnAlignments->{Left}}], Cell[StyleData["TopBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["TopBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["TopBox", "Printout"], CellMargins->{{2, 0}, {0, 8}}, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["MiddleBox"], CellFrame->{{0.5, 0.5}, {0, 0}}, CellMargins->{{27, 12}, {0, -7}}, CellHorizontalScrolling->True, PageBreakAbove->False, PageBreakBelow->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.31, 0.62}, ColumnAlignments->{Left}}], Cell[StyleData["MiddleBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["MiddleBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["MiddleBox", "Printout"], CellMargins->{{2, 0}, {0, 2}}, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["BottomBox"], CellFrame->{{0.5, 0.5}, {0.5, 0}}, CellMargins->{{27, 12}, {0, -7}}, CellHorizontalScrolling->True, PageBreakAbove->False, PageBreakBelow->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.31, 0.62}, ColumnAlignments->{Left}}], Cell[StyleData["BottomBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["BottomBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["BottomBox", "Printout"], CellMargins->{{2, 0}, {0, -5}}, FontSize->10, Background->GrayLevel[1], GridBoxOptions->{RowMinHeight->2.2}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["TopSpanBox"], CellFrame->{{0.5, 0.5}, {0, 0.5}}, CellMargins->{{27, 12}, {-2, 8}}, CellHorizontalScrolling->True, PageBreakBelow->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.9, 0.03}, ColumnAlignments->{Left}}], Cell[StyleData["TopSpanBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["TopSpanBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["TopSpanBox", "Printout"], CellMargins->{{2, 0}, {-2, 8}}, FontSize->10, Background->GrayLevel[1]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["MiddleSpanBox"], CellFrame->{{0.5, 0.5}, {0, 0}}, CellMargins->{{27, 12}, {0, 0}}, CellHorizontalScrolling->True, PageBreakAbove->False, PageBreakBelow->False, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], AutoIndent->False, AutoSpacing->False, LineIndent->0, StyleMenuListing->None, FontWeight->"Plain", Background->RGBColor[0.964706, 0.929412, 0.839216], GridBoxOptions->{RowSpacings->1.5, ColumnSpacings->1, ColumnWidths->{0.9, 0.03}, ColumnAlignments->{Left}}], Cell[StyleData["MiddleSpanBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["MiddleSpanBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["MiddleSpanBox", "Printout"], CellMargins->{{2, 0}, {-5, 0}}, FontSize->10, Background->GrayLevel[1], GridBoxOptions->{RowMinHeight->1.8}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Picture"], CellMargins->{{27, Inherited}, {4, 4}}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, StyleMenuListing->None], Cell[StyleData["Picture", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["Picture", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["Picture", "Printout"], CellMargins->{{2, Inherited}, {4, 4}}, Magnification->0.65] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["OpenCloseItemizedPicture"], CellMargins->{{88, 4}, {4, 4}}, PrivateCellOptions->{"DefaultCellGroupOpen"->False}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, StyleMenuListing->None], Cell[StyleData["OpenCloseItemizedPicture", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["OpenCloseItemizedPicture", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["OpenCloseItemizedPicture", "Printout"], CellMargins->{{76, 2}, {0, 0}}, CellElementSpacings->{"CellMinHeight"->1, "ClosedCellHeight"->0}, CellOpen->False] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["ItemizedPicture"], CellMargins->{{88, 4}, {4, 4}}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, StyleMenuListing->None], Cell[StyleData["ItemizedPicture", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["ItemizedPicture", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["ItemizedPicture", "Printout"], CellMargins->{{77, 2}, {4, -4}}, Magnification->0.5] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["ListGraphic"], CellMargins->{{88, 4}, {4, 4}}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, StyleMenuListing->None], Cell[StyleData["ListGraphic", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["ListGraphic", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["ListGraphic", "Printout"], CellMargins->{{77, 2}, {4, -4}}, Magnification->0.5] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["ListNoteBox"], CellFrame->0.5, CellMargins->{{88, 12}, {8, 8}}, CellHorizontalScrolling->True, CellFrameColor->RGBColor[0.74902, 0.694118, 0.552941], LineIndent->0, StyleMenuListing->None, Background->RGBColor[0.964706, 0.929412, 0.839216], FrameBoxOptions->{BoxMargins->{{1, 1}, {1.5, 1.5}}}, GridBoxOptions->{ColumnSpacings->1}], Cell[StyleData["ListNoteBox", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["ListNoteBox", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["ListNoteBox", "Printout"], CellMargins->{{77, 4}, {6, 2}}, FontSize->10, Background->GrayLevel[0.900008]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["PictureGroup"], CellMargins->{{41, 4}, {0, 4}}, CellGroupingRules->"GraphicsGrouping", CellHorizontalScrolling->True, StyleMenuListing->None], Cell[StyleData["PictureGroup", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["PictureGroup", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["PictureGroup", "Printout"], CellMargins->{{76, 2}, {0, 0}}, CellElementSpacings->{"CellMinHeight"->1, "ClosedCellHeight"->0}, CellOpen->False] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Sound"], ShowCellBracket->True, CellMargins->{{27, Inherited}, {0, 8}}, StyleMenuListing->None], Cell[StyleData["Sound", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["Sound", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["Sound", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->10] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Tables", "Subsection"], Cell[CellGroupData[{ Cell[StyleData["2ColumnTable"], CellMargins->{{35, 4}, {0, 8}}, CellHorizontalScrolling->True, LineIndent->0, StyleMenuListing->None, GridBoxOptions->{ColumnWidths->{0.34, 0.64}, ColumnAlignments->{Left}}], Cell[StyleData["2ColumnTable", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["2ColumnTable", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["2ColumnTable", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["2ColumnEvenTable"], CellMargins->{{35, 4}, {0, 8}}, CellHorizontalScrolling->True, LineIndent->0, StyleMenuListing->None, GridBoxOptions->{ColumnWidths->0.49, ColumnAlignments->{Left}}], Cell[StyleData["2ColumnEvenTable", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["2ColumnEvenTable", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["2ColumnEvenTable", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["3ColumnTable"], CellMargins->{{35, 4}, {0, 8}}, CellHorizontalScrolling->True, LineIndent->0, StyleMenuListing->None, GridBoxOptions->{ColumnWidths->{0.28, 0.28, 0.43}, ColumnAlignments->{Left}}], Cell[StyleData["3ColumnTable", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, FontSize->18], Cell[StyleData["3ColumnTable", "SlideShow"], CellMargins->{{100, 50}, {Inherited, Inherited}}], Cell[StyleData["3ColumnTable", "Printout"], CellMargins->{{2, 0}, {0, 8}}, FontSize->9] }, Closed]] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Slide Show Styles", "Section"], Cell[CellGroupData[{ Cell[StyleData["SlideShowNavigationBar"], CellFrame->True, CellMargins->{{0, 0}, {3, 50}}, CellElementSpacings->{"CellMinHeight"->0.8125}, CellGroupingRules->{"SectionGrouping", 0}, CellFrameMargins->False, CellFrameColor->GrayLevel[1], CellFrameLabelMargins->False, CounterIncrements->"SlideShowNavigationBar", StyleMenuListing->None, FontSize->10, Background->GrayLevel[1], Magnification->1, GridBoxOptions->{GridBaseline->Center, RowSpacings->0, ColumnSpacings->0, ColumnWidths->{3.5, 3.5, 3.5, 3.5, 40, 5, 4}, RowAlignments->Baseline, ColumnAlignments->{ Center, Center, Center, Center, Center, Center, Right, Center}}], Cell[StyleData["SlideShowNavigationBar", "Presentation"], FontSize->10, Magnification->1], Cell[StyleData["SlideShowNavigationBar", "SlideShow"], Deletable->False, ShowCellBracket->False, CellMargins->{{-1, -1}, {-1, -1}}, PageBreakAbove->True, CellFrameMargins->{{1, 1}, {0, 0}}], Cell[StyleData["SlideShowNavigationBar", "Printout"], CellOpen->False, FontSize->1] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SlideShowSection"], CellFrame->{{0, 0}, {0, 0.5}}, CellMargins->{{0, 0}, {10, 0}}, CellGroupingRules->{"SectionGrouping", 40}, PageBreakBelow->False, CellFrameMargins->{{12, 4}, {6, 12}}, InputAutoReplacements->{"TeX"->StyleBox[ RowBox[ {"T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "LaTeX"->StyleBox[ RowBox[ {"L", StyleBox[ AdjustmentBox[ "A", BoxMargins -> {{-0.36, -0.1}, {0, 0}}, BoxBaselineShift -> -0.2], FontSize -> Smaller], "T", AdjustmentBox[ "E", BoxMargins -> {{-0.075, -0.085}, {0, 0}}, BoxBaselineShift -> 0.5], "X"}]], "mma"->"Mathematica", "Mma"->"Mathematica", "MMA"->"Mathematica", "gridMathematica"->FormBox[ RowBox[ {"grid", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], "webMathematica"->FormBox[ RowBox[ {"web", AdjustmentBox[ StyleBox[ "Mathematica", FontSlant -> "Italic"], BoxMargins -> {{-0.175, 0}, {0, 0}}]}], TextForm], Inherited}, CounterIncrements->"Section", CounterAssignments->{{"Subsection", 0}, {"Subsubsection", 0}}, StyleMenuListing->None, FontFamily->"Helvetica", FontSize->24, FontWeight->"Plain", FontColor->GrayLevel[1], Background->RGBColor[1, 0.8, 0.396078]], Cell[StyleData["SlideShowSection", "Presentation"], CellFrameMargins->{{20, 10}, {10, 18}}, FontSize->27], Cell[StyleData["SlideShowSection", "SlideShow"], ShowCellBracket->False, PageBreakAbove->True], Cell[StyleData["SlideShowSection", "Printout"], CellMargins->{{18, 30}, {0, 30}}, CellFrameMargins->5, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SlideHyperlink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontSize->26, FontColor->GrayLevel[0.400015], ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookLocate[ #2]}]&), Active->True, ButtonMinHeight->0.85, ButtonMargins->0.5, ButtonNote->None}], Cell[StyleData["SlideHyperlink", "Presentation"], CellMargins->{{14, 10}, {6, 12}}], Cell[StyleData["SlideHyperlink", "SlideShow"]], Cell[StyleData["SlideHyperlink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SlidePreviousNextLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontFamily->"Helvetica", FontSize->16, FontColor->GrayLevel[0.500008], ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookLocate[ #2]}]&), Active->True, ButtonMinHeight->0.85, ButtonMargins->0.5, ButtonNote->None}], Cell[StyleData["SlidePreviousNextLink", "Presentation"], FontSize->12], Cell[StyleData["SlidePreviousNextLink", "SlideShow"]], Cell[StyleData["SlidePreviousNextLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["PreviousNext"], CellMargins->{{60, 10}, {7, 7}}, TextAlignment->0.75, LineSpacing->{1, 3}, CounterIncrements->"PreviousNext", FontFamily->"Helvetica", FontSize->14, FontColor->GrayLevel[0.500008]], Cell[StyleData["PreviousNext", "Presentation"], CellMargins->{{24, 50}, {10, 10}}, LineSpacing->{1, 5}, FontSize->12], Cell[StyleData["PreviousNext", "SlideShow"], CellMargins->{{50, 50}, {50, 15}}, FontSize->14], Cell[StyleData["PreviousNext", "Printout"], CellMargins->{{2, 2}, {6, 6}}, TextJustification->0.5, Hyphenation->True, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SlideTOCLink"], CellMargins->{{24, Inherited}, {Inherited, Inherited}}, StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontFamily->"Helvetica", ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookLocate[ #2]}]&), Active->True, ButtonMargins->1.5, ButtonNote->ButtonData}], Cell[StyleData["SlideTOCLink", "Presentation"], CellMargins->{{35, 10}, {8, 8}}, FontSize->18], Cell[StyleData["SlideTOCLink", "SlideShow"]], Cell[StyleData["SlideTOCLink", "Printout"], FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SlideTOC"], CellDingbat->"\[Bullet]", CellMargins->{{18, Inherited}, {Inherited, Inherited}}, StyleMenuListing->None, FontFamily->"Helvetica"], Cell[StyleData["SlideTOC", "Presentation"], CellMargins->{{25, 10}, {10, 5}}, FontSize->18], Cell[StyleData["SlideTOC", "SlideShow"], FontSize->14], Cell[StyleData["SlideTOC", "Printout"], FontSize->10, FontColor->GrayLevel[0]] }, Closed]] }, Closed]] }, Open ]] }] ] (******************************************************************* Cached data follows. If you edit this Notebook file directly, not using Mathematica, you must remove the line containing CacheID at the top of the file. The cache data will then be recreated when you save this file from within Mathematica. *******************************************************************) (*CellTagsOutline CellTagsIndex->{ "SlideShowHeader"->{ Cell[1776, 53, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[454965, 5688, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[487543, 6162, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[520028, 6637, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[552748, 7115, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[586042, 7610, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[618413, 8081, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[651006, 8553, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[683688, 9035, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[716450, 9509, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[749183, 9981, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[785610, 10548, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[897294, 12769, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[928720, 13202, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"]}, "NumericPlot3D"->{ Cell[518256, 6576, 61, 1, 101, "Section", CellTags->"NumericPlot3D"]}, "CenteredNumericPlot3D"->{ Cell[550741, 7051, 77, 1, 101, "Section", CellTags->"CenteredNumericPlot3D"]}, "CenteredContourPlot"->{ Cell[583461, 7529, 73, 1, 101, "Section", CellTags->"CenteredContourPlot"]}, "Graphics3DViewer"->{ Cell[616755, 8024, 67, 1, 101, "Section", CellTags->"Graphics3DViewer"], Cell[817968, 11007, 64, 1, 64, "Subsubsection", CellTags->"Graphics3DViewer"], Cell[818035, 11010, 385, 8, 55, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[818423, 11020, 1571, 35, 375, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[819997, 11057, 1060, 18, 247, "Input", CellTags->"Graphics3DViewer"], Cell[821060, 11077, 1542, 27, 327, "Input", CellTags->"Graphics3DViewer"], Cell[822605, 11106, 562, 11, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823170, 11119, 387, 10, 71, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823560, 11131, 338, 9, 55, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823901, 11142, 833, 17, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[824737, 11161, 828, 16, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[825568, 11179, 1110, 21, 199, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[826681, 11202, 1131, 22, 199, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[827815, 11226, 1310, 26, 247, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[829128, 11254, 797, 15, 135, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"]}, "CenteredPlot3D"->{ Cell[649126, 8495, 63, 1, 100, "Section", CellTags->"CenteredPlot3D"]}, "Plot3DExt"->{ Cell[681719, 8967, 53, 1, 100, "Section", CellTags->"Plot3DExt"]}, "RainbowParametricPlot"->{ Cell[714401, 9449, 77, 1, 101, "Section", CellTags->"RainbowParametricPlot"]}, "LineIntegralIllustration"->{ Cell[747163, 9923, 83, 1, 101, "Section", CellTags->"LineIntegralIllustration"]}, "ShowApproximations3D"->{ Cell[779896, 10395, 75, 1, 101, "Section", CellTags->"ShowApproximations3D"]}, "CenteredContourPlotcode"->{ Cell[835177, 11392, 2585, 50, 786, "Input", InitializationCell->True, CellTags->"CenteredContourPlotcode"]}, "ccp9172out"->{ Cell[837765, 11444, 2327, 43, 838, "Input", InitializationCell->True, CellTags->"ccp9172out"], Cell[847466, 11650, 2317, 43, 838, "Input", InitializationCell->True, CellTags->"ccp9172out"]}, "CenteredNumericPlot3Dcode"->{ Cell[841668, 11533, 2991, 56, 942, "Input", InitializationCell->True, CellTags->"CenteredNumericPlot3Dcode"]}, "CenteredPlot3Dcode"->{ Cell[844747, 11595, 270, 6, 84, "Input", InitializationCell->True, CellTags->"CenteredPlot3Dcode"], Cell[845020, 11603, 2443, 45, 812, "Input", InitializationCell->True, CellTags->"CenteredPlot3Dcode"]}, "NumericPlot3DCode"->{ Cell[849820, 11698, 99, 2, 48, "Subsubsection", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[849922, 11702, 311, 7, 71, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[850236, 11711, 234, 6, 39, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[850473, 11719, 1667, 43, 151, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[852143, 11764, 1657, 47, 135, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[853803, 11813, 2210, 53, 199, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[856016, 11868, 707, 18, 71, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[856726, 11888, 282, 6, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857011, 11896, 334, 7, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857348, 11905, 316, 7, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857667, 11914, 664, 20, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"]}, "RainbowParametricPlotcode"->{ Cell[891924, 12643, 219, 6, 39, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[892146, 12651, 999, 18, 217, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[893148, 12671, 1061, 21, 231, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"]}, "LineIntegralIllustrationcode"->{ Cell[894595, 12707, 1925, 36, 295, "Input", InitializationCell->True, CellTags->"LineIntegralIllustrationcode"]} } *) (*CellTagsIndex CellTagsIndex->{ {"SlideShowHeader", 1045755, 16486}, {"NumericPlot3D", 1047162, 16515}, {"CenteredNumericPlot3D", 1047272, 16518}, {"CenteredContourPlot", 1047388, 16521}, {"Graphics3DViewer", 1047499, 16524}, {"CenteredPlot3D", 1049139, 16566}, {"Plot3DExt", 1049238, 16569}, {"RainbowParametricPlot", 1049344, 16572}, {"LineIntegralIllustration", 1049465, 16575}, {"ShowApproximations3D", 1049585, 16578}, {"CenteredContourPlotcode", 1049705, 16581}, {"ccp9172out", 1049848, 16585}, {"CenteredNumericPlot3Dcode", 1050104, 16592}, {"CenteredPlot3Dcode", 1050257, 16596}, {"NumericPlot3DCode", 1050518, 16603}, {"RainbowParametricPlotcode", 1051835, 16637}, {"LineIntegralIllustrationcode", 1052246, 16647} } *) (*NotebookFileOutline Notebook[{ Cell[CellGroupData[{ Cell[1776, 53, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[3458, 99, 451296, 5575, 169, 451181, 5571, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False] }, Open ]], Cell[CellGroupData[{ Cell[454791, 5679, 65, 0, 220, "Title"], Cell[454859, 5681, 28, 0, 91, "Author"], Cell[454890, 5683, 38, 0, 149, "Affiliation"] }, Open ]], Cell[CellGroupData[{ Cell[454965, 5688, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[456647, 5734, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[485678, 6102, 27, 0, 84, "Section"], Cell[485708, 6104, 109, 2, 44, "Text"], Cell[485820, 6108, 125, 2, 44, "Text"], Cell[485948, 6112, 121, 2, 44, "Text"], Cell[486072, 6116, 115, 2, 44, "Text"], Cell[486190, 6120, 111, 2, 44, "Text"], Cell[486304, 6124, 101, 2, 44, "Text"], Cell[486408, 6128, 125, 2, 44, "Text"], Cell[486536, 6132, 131, 2, 44, "Text"], Cell[486670, 6136, 123, 2, 44, "Text"], Cell[486796, 6140, 698, 16, 41, "PreviousNext"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[487543, 6162, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[489225, 6208, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[518256, 6576, 61, 1, 101, "Section", CellTags->"NumericPlot3D"], Cell[518320, 6579, 88, 2, 41, "Input"], Cell[518411, 6583, 116, 2, 41, "Input"], Cell[518530, 6587, 113, 2, 41, "Input"], Cell[518646, 6591, 120, 3, 41, "Input"], Cell[518769, 6596, 131, 3, 41, "Input"], Cell[518903, 6601, 169, 4, 41, "Input"], Cell[519075, 6607, 91, 2, 41, "Input"], Cell[519169, 6611, 109, 2, 40, "SmallText"], Cell[519281, 6615, 698, 16, 41, "PreviousNext"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[520028, 6637, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[521710, 6683, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[550741, 7051, 77, 1, 101, "Section", CellTags->"CenteredNumericPlot3D"], Cell[550821, 7054, 88, 2, 41, "Input"], Cell[550912, 7058, 129, 3, 41, "Input"], Cell[551044, 7063, 173, 3, 67, "Input"], Cell[551220, 7068, 136, 3, 41, "Input"], Cell[551359, 7073, 178, 3, 67, "Input"], Cell[551540, 7078, 166, 4, 67, "Input"], Cell[551709, 7084, 169, 3, 94, "Input"], Cell[551881, 7089, 117, 2, 40, "SmallText"] }, Open ]] }, Open ]], Cell[552025, 7095, 698, 16, 41, "PreviousNext"], Cell[CellGroupData[{ Cell[552748, 7115, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[554430, 7161, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[583461, 7529, 73, 1, 101, "Section", CellTags->"CenteredContourPlot"], Cell[583537, 7532, 115, 2, 41, "Input"], Cell[583655, 7536, 111, 2, 41, "Input"], Cell[583769, 7540, 134, 3, 41, "Input"], Cell[583906, 7545, 87, 2, 41, "Input"], Cell[583996, 7549, 141, 3, 41, "Input"], Cell[584140, 7554, 217, 5, 67, "Input"], Cell[584360, 7561, 152, 3, 41, "Input"], Cell[584515, 7566, 224, 4, 67, "Input"], Cell[584742, 7572, 240, 4, 67, "Input"], Cell[584985, 7578, 194, 4, 67, "Input"] }, Open ]] }, Open ]], Cell[585206, 7586, 110, 2, 44, "Text"], Cell[585319, 7590, 698, 16, 41, "PreviousNext"], Cell[CellGroupData[{ Cell[586042, 7610, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[587724, 7656, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[616755, 8024, 67, 1, 101, "Section", CellTags->"Graphics3DViewer"], Cell[616825, 8027, 87, 2, 41, "Input"], Cell[616915, 8031, 186, 4, 67, "Input"], Cell[617104, 8037, 79, 2, 41, "Input"], Cell[617186, 8041, 93, 2, 41, "Input"], Cell[617282, 8045, 159, 4, 41, "Input"], Cell[617444, 8051, 109, 2, 41, "Input"] }, Open ]], Cell[617568, 8056, 107, 2, 44, "Text"], Cell[617678, 8060, 698, 16, 87, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[618413, 8081, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[620095, 8127, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[649126, 8495, 63, 1, 100, "Section", CellTags->"CenteredPlot3D"], Cell[649192, 8498, 149, 3, 67, "Input"], Cell[649344, 8503, 163, 3, 41, "Input"], Cell[649510, 8508, 158, 3, 41, "Input"], Cell[649671, 8513, 199, 5, 41, "Input"], Cell[649873, 8520, 275, 5, 74, "Input"] }, Open ]], Cell[650163, 8528, 105, 2, 43, "Text"], Cell[650271, 8532, 698, 16, 87, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[651006, 8553, 1679, 44, 37, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[652688, 8599, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[681719, 8967, 53, 1, 100, "Section", CellTags->"Plot3DExt"], Cell[681775, 8970, 149, 3, 67, "Input"], Cell[681927, 8975, 188, 4, 67, "Input"], Cell[682118, 8981, 79, 2, 41, "Input"], Cell[682200, 8985, 89, 2, 41, "Input"], Cell[682292, 8989, 109, 2, 41, "Input"], Cell[682404, 8993, 152, 3, 41, "Input"], Cell[682559, 8998, 194, 5, 67, "Input"], Cell[682756, 9005, 79, 2, 41, "Input"] }, Open ]], Cell[682850, 9010, 100, 2, 44, "Text"], Cell[682953, 9014, 698, 16, 41, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[683688, 9035, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[685370, 9081, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[714401, 9449, 77, 1, 101, "Section", CellTags->"RainbowParametricPlot"], Cell[714481, 9452, 305, 7, 67, "Input"], Cell[714789, 9461, 311, 7, 67, "Input"], Cell[715103, 9470, 221, 4, 67, "Input"], Cell[715327, 9476, 258, 5, 93, "Input"] }, Open ]], Cell[715600, 9484, 112, 2, 44, "Text"], Cell[715715, 9488, 698, 16, 41, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[716450, 9509, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[718132, 9555, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[747163, 9923, 83, 1, 101, "Section", CellTags->"LineIntegralIllustration"], Cell[747249, 9926, 159, 4, 93, "Input"], Cell[747411, 9932, 523, 11, 157, "Input"], Cell[747937, 9945, 187, 3, 67, "Input"], Cell[748127, 9950, 188, 3, 67, "Input"] }, Open ]], Cell[748330, 9956, 115, 2, 44, "Text"], Cell[748448, 9960, 698, 16, 41, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[749183, 9981, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[750865, 10027, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[779896, 10395, 75, 1, 101, "Section", CellTags->"ShowApproximations3D"], Cell[779974, 10398, 221, 5, 93, "Input"], Cell[780198, 10405, 173, 4, 41, "Input"], Cell[780374, 10411, 79, 2, 41, "Input"], Cell[780456, 10415, 88, 2, 41, "Input"], Cell[780547, 10419, 264, 5, 93, "Input"], Cell[780814, 10426, 247, 5, 67, "Input"], Cell[781064, 10433, 79, 2, 41, "Input"], Cell[781146, 10437, 111, 2, 41, "Input"], Cell[781260, 10441, 238, 5, 67, "Input"] }, Open ]], Cell[781513, 10449, 79, 2, 41, "Input"], Cell[781595, 10453, 172, 3, 67, "Input"], Cell[781770, 10458, 173, 3, 67, "Input"], Cell[781946, 10463, 172, 3, 67, "Input"], Cell[782121, 10468, 110, 2, 41, "Input"], Cell[782234, 10472, 175, 3, 67, "Input"], Cell[782412, 10477, 83, 2, 41, "Input"], Cell[782498, 10481, 1141, 19, 379, "Input"], Cell[783642, 10502, 86, 2, 41, "Input"], Cell[783731, 10506, 1141, 19, 379, "Input"], Cell[784875, 10527, 698, 16, 41, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[785610, 10548, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[787292, 10594, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[CellGroupData[{ Cell[816323, 10962, 176, 6, 92, "Section"], Cell[CellGroupData[{ Cell[816524, 10972, 35, 0, 50, "Subsection"], Cell[816562, 10974, 1309, 24, 347, "Input", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell[817908, 11003, 35, 0, 39, "Subsection"], Cell[CellGroupData[{ Cell[817968, 11007, 64, 1, 64, "Subsubsection", CellTags->"Graphics3DViewer"], Cell[818035, 11010, 385, 8, 55, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[818423, 11020, 1571, 35, 375, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[819997, 11057, 1060, 18, 247, "Input", CellTags->"Graphics3DViewer"], Cell[821060, 11077, 1542, 27, 327, "Input", CellTags->"Graphics3DViewer"], Cell[822605, 11106, 562, 11, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823170, 11119, 387, 10, 71, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823560, 11131, 338, 9, 55, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[823901, 11142, 833, 17, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[824737, 11161, 828, 16, 151, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[825568, 11179, 1110, 21, 199, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[826681, 11202, 1131, 22, 199, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[827815, 11226, 1310, 26, 247, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"], Cell[829128, 11254, 797, 15, 135, "Input", InitializationCell->True, CellTags->"Graphics3DViewer"] }, Closed]], Cell[CellGroupData[{ Cell[829962, 11274, 33, 0, 31, "Subsubsection"], Cell[829998, 11276, 412, 9, 157, "Input", InitializationCell->True], Cell[830413, 11287, 2239, 38, 596, "Input", InitializationCell->True], Cell[832655, 11327, 538, 12, 180, "Input", InitializationCell->True], Cell[833196, 11341, 639, 14, 226, "Input", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell[833872, 11360, 43, 0, 31, "Subsubsection"], Cell[833918, 11362, 1012, 21, 353, "Input", InitializationCell->True], Cell[834933, 11385, 241, 5, 67, "Input", InitializationCell->True], Cell[835177, 11392, 2585, 50, 786, "Input", InitializationCell->True, CellTags->"CenteredContourPlotcode"], Cell[837765, 11444, 2327, 43, 838, "Input", InitializationCell->True, CellTags->"ccp9172out"], Cell[840095, 11489, 1357, 35, 301, "Input", InitializationCell->True], Cell[841455, 11526, 210, 5, 41, "Input", InitializationCell->True], Cell[841668, 11533, 2991, 56, 942, "Input", InitializationCell->True, CellTags->"CenteredNumericPlot3Dcode"], Cell[844662, 11591, 82, 2, 41, "Input"], Cell[844747, 11595, 270, 6, 84, "Input", InitializationCell->True, CellTags->"CenteredPlot3Dcode"], Cell[845020, 11603, 2443, 45, 812, "Input", InitializationCell->True, CellTags->"CenteredPlot3Dcode"], Cell[847466, 11650, 2317, 43, 838, "Input", InitializationCell->True, CellTags->"ccp9172out"] }, Closed]], Cell[CellGroupData[{ Cell[849820, 11698, 99, 2, 48, "Subsubsection", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[849922, 11702, 311, 7, 71, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[850236, 11711, 234, 6, 39, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[850473, 11719, 1667, 43, 151, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[852143, 11764, 1657, 47, 135, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[853803, 11813, 2210, 53, 199, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[856016, 11868, 707, 18, 71, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[856726, 11888, 282, 6, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857011, 11896, 334, 7, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857348, 11905, 316, 7, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"], Cell[857667, 11914, 664, 20, 55, "Input", InitializationCell->True, CellTags->"NumericPlot3DCode"] }, Closed]], Cell[CellGroupData[{ Cell[858368, 11939, 62, 1, 31, "Subsubsection", InitializationCell->True], Cell[858433, 11942, 445, 9, 171, "Input", InitializationCell->True], Cell[858881, 11953, 1163, 35, 93, "Input", InitializationCell->True], Cell[860047, 11990, 246, 5, 67, "Input", InitializationCell->True], Cell[860296, 11997, 495, 10, 145, "Input", InitializationCell->True], Cell[860794, 12009, 2940, 57, 977, "Input", InitializationCell->True], Cell[863737, 12068, 391, 8, 119, "Input", InitializationCell->True], Cell[864131, 12078, 2009, 39, 561, "Input", InitializationCell->True], Cell[866143, 12119, 736, 13, 249, "Input", InitializationCell->True], Cell[866882, 12134, 742, 13, 249, "Input", InitializationCell->True], Cell[867627, 12149, 170, 4, 41, "Input", InitializationCell->True], Cell[867800, 12155, 214, 4, 93, "Input", InitializationCell->True], Cell[868017, 12161, 143, 3, 41, "Input", InitializationCell->True], Cell[868163, 12166, 3389, 56, 1159, "Input", InitializationCell->True], Cell[871555, 12224, 184, 5, 41, "Input", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell[871776, 12234, 41, 0, 31, "Subsubsection"], Cell[871820, 12236, 446, 9, 75, "Input", InitializationCell->True], Cell[872269, 12247, 1970, 37, 267, "Input", InitializationCell->True], Cell[874242, 12286, 254, 6, 43, "Input", InitializationCell->True], Cell[874499, 12294, 2152, 41, 414, "Input", InitializationCell->True], Cell[876654, 12337, 2520, 48, 350, "Input", InitializationCell->True], Cell[879177, 12387, 464, 9, 97, "Input", InitializationCell->True], Cell[879644, 12398, 464, 9, 97, "Input", InitializationCell->True], Cell[880111, 12409, 485, 9, 97, "Input", InitializationCell->True], Cell[880599, 12420, 1811, 31, 257, "Input", InitializationCell->True], Cell[882413, 12453, 181, 4, 27, "Input", InitializationCell->True], Cell[882597, 12459, 356, 6, 59, "Input", InitializationCell->True], Cell[882956, 12467, 3144, 59, 466, "Input", InitializationCell->True], Cell[886103, 12528, 3184, 60, 482, "Input", InitializationCell->True] }, Closed]], Cell[CellGroupData[{ Cell[889324, 12593, 39, 0, 31, "Subsubsection"], Cell[889366, 12595, 250, 6, 43, "Input", InitializationCell->True], Cell[889619, 12603, 2302, 38, 411, "Input", InitializationCell->True], Cell[891924, 12643, 219, 6, 39, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[892146, 12651, 999, 18, 217, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"], Cell[893148, 12671, 1061, 21, 231, "Input", InitializationCell->True, CellTags->"RainbowParametricPlotcode"] }, Closed]], Cell[CellGroupData[{ Cell[894246, 12697, 38, 0, 31, "Subsubsection"], Cell[894287, 12699, 305, 6, 47, "Input", InitializationCell->True], Cell[894595, 12707, 1925, 36, 295, "Input", InitializationCell->True, CellTags->"LineIntegralIllustrationcode"] }, Closed]], Cell[896535, 12746, 698, 16, 35, "PreviousNext"] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[897294, 12769, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[898976, 12815, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[927985, 13181, 698, 16, 41, "PreviousNext"] }, Open ]], Cell[CellGroupData[{ Cell[928720, 13202, 1679, 44, 92, "SlideShowNavigationBar", CellTags->"SlideShowHeader"], Cell[930402, 13248, 29006, 364, 94, 28717, 355, "GraphicsData", "Bitmap", \ "Graphics", Evaluatable->False], Cell[959411, 13614, 676, 16, 41, "PreviousNext"] }, Open ]], Cell[960102, 13633, 163, 4, 40, "Output"] } ] *) (******************************************************************* End of Mathematica Notebook file. *******************************************************************)