(************** Content-type: application/mathematica ************** CreatedBy='Mathematica 5.0' 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[ 307641, 8012]*) (*NotebookOutlinePosition[ 345324, 9301]*) (* CellTagsIndexPosition[ 345280, 9297]*) (*WindowFrame->Normal*) Notebook[{ Cell[CellGroupData[{ Cell["Plotting Points, Labelling Coordinates", "Title", ShowCellBracket->False, CellMargins->{{0, 0}, {0, 0}}], Cell[CellGroupData[{ Cell["0. Intro", "Section"], Cell[TextData[{ "Plotting a function, and plotting individual points, is easy in ", StyleBox["Mathematica", FontSlant->"Italic"], ". Labelling points on the graph with text is harder, because of issues of \ font/size and where to center the text on the graph. Labelling points with \ ", StyleBox["formatted mathematical expressions", FontWeight->"Bold", FontSlant->"Italic"], ", and placing the label \"nicely\" involves asthetics that are hard to \ program. Is it worth the trouble? You have to be the judge of that. Is it \ possible? Absolutely! The following function ", StyleBox["f", FontSlant->"Italic"], "(", StyleBox["x", FontSlant->"Italic"], ") will be used to illustrate all these things:" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(f[x_]\ := \ \((x + 2)\) \((x - 1)\) \((x - 3)\)\), "\[IndentingNewLine]", \(\(basicplot\ = \ Plot[f[x], \ {x, \(-8\), 8}];\)\)}], "Input"], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.5 0.0595238 0.28416 0.0120009 [ [.05357 .27166 -12 -9 ] [.05357 .27166 12 0 ] [.20238 .27166 -6 -9 ] [.20238 .27166 6 0 ] [.35119 .27166 -12 -9 ] [.35119 .27166 12 0 ] [.64881 .27166 -9 -9 ] [.64881 .27166 9 0 ] [.79762 .27166 -3 -9 ] [.79762 .27166 3 0 ] [.94643 .27166 -9 -9 ] [.94643 .27166 9 0 ] [.4875 .04414 -18 -4.5 ] [.4875 .04414 0 4.5 ] [.4875 .16415 -18 -4.5 ] [.4875 .16415 0 4.5 ] [.4875 .40417 -12 -4.5 ] [.4875 .40417 0 4.5 ] [.4875 .52418 -12 -4.5 ] [.4875 .52418 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .05357 .28416 m .05357 .29041 L s [(-7.5)] .05357 .27166 0 1 Mshowa .20238 .28416 m .20238 .29041 L s [(-5)] .20238 .27166 0 1 Mshowa .35119 .28416 m .35119 .29041 L s [(-2.5)] .35119 .27166 0 1 Mshowa .64881 .28416 m .64881 .29041 L s [(2.5)] .64881 .27166 0 1 Mshowa .79762 .28416 m .79762 .29041 L s [(5)] .79762 .27166 0 1 Mshowa .94643 .28416 m .94643 .29041 L s [(7.5)] .94643 .27166 0 1 Mshowa .125 Mabswid .08333 .28416 m .08333 .28791 L s .1131 .28416 m .1131 .28791 L s .14286 .28416 m .14286 .28791 L s .17262 .28416 m .17262 .28791 L s .23214 .28416 m .23214 .28791 L s .2619 .28416 m .2619 .28791 L s .29167 .28416 m .29167 .28791 L s .32143 .28416 m .32143 .28791 L s .38095 .28416 m .38095 .28791 L s .41071 .28416 m .41071 .28791 L s .44048 .28416 m .44048 .28791 L s .47024 .28416 m .47024 .28791 L s .52976 .28416 m .52976 .28791 L s .55952 .28416 m .55952 .28791 L s .58929 .28416 m .58929 .28791 L s .61905 .28416 m .61905 .28791 L s .67857 .28416 m .67857 .28791 L s .70833 .28416 m .70833 .28791 L s .7381 .28416 m .7381 .28791 L s .76786 .28416 m .76786 .28791 L s .82738 .28416 m .82738 .28791 L s .85714 .28416 m .85714 .28791 L s .8869 .28416 m .8869 .28791 L s .91667 .28416 m .91667 .28791 L s .02381 .28416 m .02381 .28791 L s .97619 .28416 m .97619 .28791 L s .25 Mabswid 0 .28416 m 1 .28416 L s .5 .04414 m .50625 .04414 L s [(-20)] .4875 .04414 1 0 Mshowa .5 .16415 m .50625 .16415 L s [(-10)] .4875 .16415 1 0 Mshowa .5 .40417 m .50625 .40417 L s [(10)] .4875 .40417 1 0 Mshowa .5 .52418 m .50625 .52418 L s [(20)] .4875 .52418 1 0 Mshowa .125 Mabswid .5 .06814 m .50375 .06814 L s .5 .09215 m .50375 .09215 L s .5 .11615 m .50375 .11615 L s .5 .14015 m .50375 .14015 L s .5 .18815 m .50375 .18815 L s .5 .21216 m .50375 .21216 L s .5 .23616 m .50375 .23616 L s .5 .26016 m .50375 .26016 L s .5 .30816 m .50375 .30816 L s .5 .33216 m .50375 .33216 L s .5 .35617 m .50375 .35617 L s .5 .38017 m .50375 .38017 L s .5 .42817 m .50375 .42817 L s .5 .45217 m .50375 .45217 L s .5 .47617 m .50375 .47617 L s .5 .50018 m .50375 .50018 L s .5 .02014 m .50375 .02014 L s .5 .54818 m .50375 .54818 L s .5 .57218 m .50375 .57218 L s .5 .59618 m .50375 .59618 L s .25 Mabswid .5 0 m .5 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .32201 0 m .32216 .00111 L .34309 .1277 L .36292 .22049 L .3739 .26148 L .38395 .29299 L .39323 .31731 L .40336 .33896 L .41406 .35665 L .42424 .36891 L .42955 .37367 L .43456 .37718 L .43905 .37956 L .44158 .38059 L .44391 .38136 L .44513 .38168 L .44643 .38198 L .44755 .38219 L .44877 .38238 L .44952 .38247 L .45021 .38254 L .45087 .38259 L .45157 .38263 L .45278 .38267 L .45346 .38267 L .45411 .38266 L .45543 .3826 L .45609 .38255 L .45682 .38248 L .4581 .38233 L .4593 .38214 L .462 .38157 L .46488 .38075 L .47021 .37868 L .47513 .37617 L .48623 .36861 L .50638 .34947 L .54579 .30127 L .56558 .27697 L .58367 .25772 L .59298 .24961 L .60312 .24258 L .60868 .23964 L .61139 .23847 L .61384 .23757 L .61621 .23684 L .61877 .23621 L .62017 .23595 L .62147 .23575 L .62271 .2356 L Mistroke .62401 .2355 L .62524 .23544 L .62593 .23543 L .62657 .23543 L .62774 .23547 L .62899 .23555 L .6301 .23566 L .63114 .2358 L .63352 .23625 L .63607 .23693 L .63842 .23775 L .64369 .24027 L .64796 .24303 L .65263 .24682 L .66204 .25705 L .67234 .2725 L .68169 .29067 L .70265 .34725 L .72187 .42054 L .74268 .52587 L Mfstroke .74268 .52587 m .75693 .61803 L s % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{358, 221.125}, ImageMargins->{{177, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg`3oool00`000000oooo0?ooo`2a0?oo o`00M03oool00`000000oooo0?ooo`0k0?ooo`030000003oool0oooo0;40oooo001d0?ooo`030000 003oool0oooo03/0oooo0P00002b0?ooo`00M03oool00`000000oooo0?ooo`0k0?ooo`030000003o ool0oooo0;40oooo001d0?ooo`030000003oool0oooo03/0oooo00<000000?ooo`3oool0/@3oool0 07D0oooo00<000000?ooo`3oool0>P3oool00`000000oooo0?ooo`2a0?ooo`00M@3oool00`000000 oooo0?ooo`0j0?ooo`030000003oool0oooo0;40oooo001e0?ooo`030000003oool0oooo03X0oooo 00<000000?ooo`3oool0/@3oool007D0oooo00<000000?ooo`3oool0:`3oool4000000<0oooo0P00 00060?ooo`030000003oool0oooo0;40oooo001e0?ooo`030000003oool0oooo02/0oooo00<00000 0?ooo`3oool00`3oool010000000oooo0?ooo`0000050?ooo`030000003oool0oooo0;40oooo001e 0?ooo`030000003oool0oooo02`0oooo00<000000?ooo`3oool00P3oool010000000oooo0?ooo`00 00050?ooo`<00000/@3oool007D0oooo00<000000?ooo`3oool09@3oool4000000@0oooo00D00000 0?ooo`3oool0oooo000000020?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool0/@3o ool007H0oooo00<000000?ooo`3oool0;@3oool010000000oooo0?ooo`0000020?ooo`030000003o ool0oooo00<0oooo00<000000?ooo`3oool0/@3oool007H0oooo00<000000?ooo`3oool0:P3oool0 10000000oooo0?ooo`0000020?ooo`040000003oool0oooo000000D0oooo00<000000?ooo`3oool0 /@3oool007H0oooo00<000000?ooo`3oool0:`3oool2000000@0oooo0P0000060?ooo`030000003o ool0oooo0;40oooo001f0?ooo`030000003oool0oooo03T0oooo00<000000?ooo`3oool0/@3oool0 07H0oooo00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`2a0?ooo`00MP3oool00`000000 oooo0?ooo`0i0?ooo`030000003oool0oooo0;40oooo001g0?ooo`030000003oool0oooo03P0oooo 00<000000?ooo`3oool0/@3oool007L0oooo00<000000?ooo`3oool0>03oool200000;80oooo001g 0?ooo`030000003oool0oooo03P0oooo00<000000?ooo`3oool0/@3oool007L0oooo00<000000?oo o`3oool0>03oool00`000000oooo0?ooo`2a0?ooo`00M`3oool00`000000oooo0?ooo`0h0?ooo`03 0000003oool0oooo0;40oooo001g0?ooo`030000003oool0oooo03P0oooo00<000000?ooo`3oool0 /@3oool007P0oooo00<000000?ooo`3oool0=`3oool00`000000oooo0?ooo`2a0?ooo`00N03oool0 0`000000oooo0?ooo`0g0?ooo`030000003oool0oooo0;40oooo001h0?ooo`030000003oool0oooo 03L0oooo00<000000?ooo`3oool0/@3oool007P0oooo00<000000?ooo`3oool0=`3oool200000;80 oooo001h0?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0/@3oool007P0oooo00<0 00000?ooo`3oool0=`3oool00`000000oooo0?ooo`2a0?ooo`00N03oool00`000000oooo0?ooo`0g 0?ooo`030000003oool0oooo0;40oooo001i0?ooo`030000003oool0oooo03H0oooo00<000000?oo o`3oool0/@3oool007T0oooo00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`2a0?ooo`00 N@3oool00`000000oooo0?ooo`0f0?ooo`030000003oool0oooo0;40oooo001i0?ooo`030000003o ool0oooo03H0oooo00<000000?ooo`3oool0/@3oool007T0oooo00<000000?ooo`3oool0=P3oool0 0`000000oooo0?ooo`2a0?ooo`00N@3oool00`000000oooo0?ooo`0f0?ooo`800000/P3oool007X0 oooo00<000000?ooo`3oool0=@3oool00`000000oooo0?ooo`2a0?ooo`00NP3oool00`000000oooo 0?ooo`0e0?ooo`030000003oool0oooo0;40oooo001j0?ooo`030000003oool0oooo03D0oooo00<0 00000?ooo`3oool0/@3oool007X0oooo00<000000?ooo`3oool0=@3oool00`000000oooo0?ooo`2a 0?ooo`00NP3oool00`000000oooo0?ooo`0e0?ooo`030000003oool0oooo0;40oooo001j0?ooo`03 0000003oool0oooo03D0oooo00<000000?ooo`3oool0/@3oool007/0oooo00<000000?ooo`3oool0 =03oool00`000000oooo0?ooo`2a0?ooo`00N`3oool00`000000oooo0?ooo`0d0?ooo`800000/P3o ool007/0oooo00<000000?ooo`3oool0=03oool00`000000oooo0?ooo`2a0?ooo`00N`3oool00`00 0000oooo0?ooo`0d0?ooo`030000003oool0oooo0;40oooo001k0?ooo`030000003oool0oooo03@0 oooo00<000000?ooo`3oool0/@3oool007`0oooo00<000000?ooo`3oool0<`3oool00`000000oooo 0?ooo`2a0?ooo`00O03oool00`000000oooo0?ooo`0c0?ooo`030000003oool0oooo0;40oooo001l 0?ooo`030000003oool0oooo03<0oooo00<000000?ooo`3oool0/@3oool007`0oooo00<000000?oo o`3oool0903oool4000000<0oooo0P0000060?ooo`030000003oool0oooo0;40oooo001m0?ooo`03 0000003oool0oooo02D0oooo00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo 00<0oooo00<000000?ooo`3oool0/@3oool007d0oooo00<000000?ooo`3oool09@3oool01@000000 oooo0?ooo`3oool000000080oooo00<000000?ooo`3oool00`3oool300000;40oooo001m0?ooo`03 0000003oool0oooo01d0oooo100000040?ooo`050000003oool0oooo0?ooo`0000000P3oool00`00 0000oooo0?ooo`030?ooo`030000003oool0oooo0;40oooo001m0?ooo`030000003oool0oooo02D0 oooo00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo00<0oooo00<000000?oo o`3oool0/@3oool007d0oooo00<000000?ooo`3oool08`3oool3000000<0oooo00@000000?ooo`3o ool000001@3oool00`000000oooo0?ooo`2a0?ooo`00OP3oool00`000000oooo0?ooo`0T0?ooo`03 0000003oool0oooo0080oooo0P0000060?ooo`030000003oool0oooo0;40oooo001n0?ooo`030000 003oool0oooo0340oooo00<000000?ooo`3oool0/@3oool007h0oooo00<000000?ooo`3oool0<@3o ool00`000000oooo0?ooo`2a0?ooo`00OP3oool00`000000oooo0?ooo`0a0?ooo`030000003oool0 oooo0;40oooo001n0?ooo`030000003oool0oooo0340oooo0P00002b0?ooo`00O`3oool00`000000 oooo0?ooo`0`0?ooo`030000003oool0oooo0;40oooo001o0?ooo`030000003oool0oooo0300oooo 00<000000?ooo`3oool0/@3oool007l0oooo00<000000?ooo`3oool0<03oool00`000000oooo0?oo o`2a0?ooo`00O`3oool00`000000oooo0?ooo`0`0?ooo`030000003oool0oooo0;40oooo00200?oo o`030000003oool0oooo02l0oooo00<000000?ooo`3oool0/@3oool00800oooo00<000000?ooo`3o ool0;`3oool00`000000oooo0?ooo`2a0?ooo`00P03oool00`000000oooo0?ooo`0_0?ooo`030000 003oool0oooo0;40oooo00200?ooo`030000003oool0oooo02l0oooo00<000000?ooo`3oool0/@3o ool00800oooo00<000000?ooo`3oool0;`3oool200000;80oooo00210?ooo`030000003oool0oooo 02h0oooo00<000000?ooo`3oool0/@3oool00840oooo00<000000?ooo`3oool0;P3oool00`000000 oooo0?ooo`2a0?ooo`00P@3oool00`000000oooo0?ooo`0^0?ooo`030000003oool0oooo0;40oooo 00210?ooo`030000003oool0oooo02h0oooo00<000000?ooo`3oool0/@3oool00880oooo00<00000 0?ooo`3oool0;@3oool00`000000oooo0?ooo`2a0?ooo`00PP3oool00`000000oooo0?ooo`0]0?oo o`030000003oool0oooo0;40oooo00220?ooo`030000003oool0oooo02d0oooo00<000000?ooo`3o ool0/@3oool00880oooo00<000000?ooo`3oool0;@3oool2000002T0oooo1@0000240?ooo`00P`3o ool00`000000oooo0?ooo`0/0?ooo`030000003oool0oooo02D0oooo0`0000050?ooo`<00000P@3o ool008<0oooo00<000000?ooo`3oool0;03oool00`000000oooo0?ooo`0S0?ooo`8000002`3oool2 000007l0oooo00230?ooo`030000003oool0oooo02`0oooo00<000000?ooo`3oool08@3oool20000 00l0oooo00<000000?ooo`3oool0O03oool008<0oooo00<000000?ooo`3oool0;03oool00`000000 oooo0?ooo`0O0?ooo`8000004P3oool00`000000oooo0?ooo`1k0?ooo`00Q03oool00`000000oooo 0?ooo`0[0?ooo`030000003oool0oooo01h0oooo00<000000?ooo`3oool04`3oool00`000000oooo 0?ooo`1j0?ooo`003`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo0080oooo0`00 000/0?ooo`<00000;03oool4000000<0oooo00<000000?ooo`3oool00P3oool3000002/0oooo00<0 00000?ooo`3oool07@3oool00`000000oooo0?ooo`0:0?ooo`@000000`3oool010000000oooo0?oo o`3oool4000002`0oooo0`00000]0?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool0 0P3oool3000000h0oooo000?0?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool0;03o ool00`000000oooo0?ooo`0Y0?ooo`030000003oool0oooo00T0oooo00@000000?ooo`3oool00000 :P3oool00`000000oooo0?ooo`0L0?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool0 2@3oool010000000oooo0?ooo`00000^0?ooo`030000003oool0oooo02X0oooo00<000000?ooo`3o ool02`3oool00`000000oooo0?ooo`0;0?ooo`00403oool00`000000oooo0?ooo`0:0?ooo`030000 003oool0oooo02`0oooo00<000000?ooo`3oool0:P3oool00`000000oooo0?ooo`080?ooo`040000 003oool0oooo000002X0oooo00<000000?ooo`3oool06`3oool00`000000oooo0?ooo`0=0?ooo`03 0000003oool0oooo00T0oooo00<000000?ooo`000000;P3oool00`000000oooo0?ooo`0[0?ooo`03 0000003oool0oooo00X0oooo00<000000?ooo`3oool02`3oool000P0oooo100000040?ooo`030000 003oool0oooo00L0oooo0`00000V0?ooo`@000000P3oool3000002H0oooo100000040?ooo`030000 003oool0oooo00L0oooo0`00000[0?ooo`8000006`3oool00`000000oooo0?ooo`0?0?ooo`030000 003oool0oooo00L0oooo0`00000/0?ooo`<00000;P3oool00`000000oooo0?ooo`070?ooo`<00000 3P3oool00140oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`0/0?ooo`030000003o ool0oooo02l0oooo00<000000?ooo`3oool01P3oool2000002`0oooo00<000000?ooo`3oool06@3o ool00`000000oooo0?ooo`0A0?ooo`030000003oool0oooo00H0oooo00<000000?ooo`000000;03o ool00`000000oooo0?ooo`0_0?ooo`030000003oool0oooo00H0oooo00<000000?ooo`3oool03P3o ool000h0oooo00@000000?ooo`3oool00000203oool00`000000oooo0?ooo`0/0?ooo`030000003o ool0oooo02`0oooo00@000000?ooo`3oool00000203oool2000002`0oooo00<000000?ooo`3oool0 603oool00`000000oooo0?ooo`0?0?ooo`040000003oool0oooo000000P0oooo00@000000?ooo`3o ool00000:`3oool00`000000oooo0?ooo`0/0?ooo`040000003oool0oooo000000P0oooo00<00000 0?ooo`3oool03P3oool000h0oooo100000080?ooo`@00000:`3oool4000002`0oooo0P0000090?oo o`@00000:P3oool00`000000oooo0?ooo`0G0?ooo`030000003oool0oooo0140oooo0P0000090?oo o`@00000:`3oool4000002/0oooo100000080?ooo`@000003@3oool008H0oooo00<000000?ooo`3o ool0:@3oool00`000000oooo0?ooo`0F0?ooo`030000003oool0oooo0240oooo00<000000?ooo`3o ool0M03oool008H0oooo00<000000?ooo`3oool0:@3oool00`000000oooo0?ooo`0E0?ooo`030000 003oool0oooo02<0oooo00<000000?ooo`3oool0L`3oool008L0oooo00<000000?ooo`3oool0:03o ool00`000000oooo0?ooo`0D0?ooo`030000003oool0oooo02@0oooo00<000000?ooo`3oool0L`3o ool008L0oooo00<000000?ooo`3oool0:03oool00`000000oooo0?ooo`0C0?ooo`030000003oool0 oooo02H0oooo00<000000?ooo`3oool0LP3oool008P0oooo00<000000?ooo`3oool09`3oool00`00 0000oooo0?ooo`0B0?ooo`030000003oool0oooo02L0oooo00<000000?ooo`3oool0LP3oool00?l0 0000IP0000010?ooo`00203oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo00P0oooo 00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo00L0oooo 00<000000?ooo`3oool0203oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo00L0oooo 00<000000?ooo`3oool0203oool00`000000oooo0?ooo`070?ooo`030000003oool0oooo00P0oooo 00<000000?ooo`3oool0203oool00`000000oooo0?ooo`070?ooo`030000003oool0oooo00P0oooo 00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo00P0oooo 00<000000?ooo`3oool01P3oool2000000X0oooo00<000000?ooo`3oool01`3oool00`000000oooo 0?ooo`080?ooo`030000003oool0oooo00P0oooo00<000000?ooo`3oool01`3oool00`000000oooo 0?ooo`080?ooo`030000003oool0oooo00L0oooo00<000000?ooo`3oool0203oool00`000000oooo 0?ooo`080?ooo`030000003oool0oooo00L0oooo00<000000?ooo`3oool0203oool00`000000oooo 0?ooo`070?ooo`030000003oool0oooo00P0oooo00<000000?ooo`3oool0203oool00`000000oooo 0?ooo`070?ooo`004`3oool00`000000oooo0?ooo`0b0?ooo`030000003oool0oooo0380oooo00<0 00000?ooo`3oool02@3oool00`000000oooo0?ooo`0V0?ooo`030000003oool0oooo0100oooo00<0 00000?ooo`3oool07`3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo02H0oooo00<0 00000?ooo`3oool00?ooo`030000003oool0oooo0240oooo00<000000?oo o`3oool01P3oool00`000000oooo0?ooo`0i0?ooo`030000003oool0oooo06`0oooo002>0?ooo`03 0000003oool0oooo0240oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`0j0?ooo`03 0000003oool0oooo06/0oooo002?0?ooo`030000003oool0oooo0200oooo00<000000?ooo`3oool0 1@3oool00`000000oooo0?ooo`0k0?ooo`030000003oool0oooo06/0oooo002?0?ooo`030000003o ool0oooo0200oooo0P0000050?ooo`030000003oool0oooo03`0oooo00<000000?ooo`3oool0J`3o ool00900oooo00<000000?ooo`3oool07`3oool00`000000oooo0?ooo`030?ooo`030000003oool0 oooo03h0oooo00<000000?ooo`3oool0JP3oool00900oooo00<000000?ooo`3oool07`3oool00`00 0000oooo0?ooo`020?ooo`030000003oool0oooo03l0oooo00<000000?ooo`3oool0JP3oool00940 oooo00<000000?ooo`3oool07P3oool01@000000oooo0?ooo`3oool000000480oooo00<000000?oo o`3oool0JP3oool00940oooo00<000000?ooo`3oool07P3oool01@000000oooo0?ooo`3oool00000 04<0oooo00<000000?ooo`3oool0J@3oool00980oooo00<000000?ooo`3oool07@3oool010000000 oooo0?ooo`0000140?ooo`030000003oool0oooo06T0oooo002B0?ooo`030000003oool0oooo01d0 oooo00<000000?ooo`000000A@3oool00`000000oooo0?ooo`1Y0?ooo`00T`3oool00`000000oooo 0?ooo`0L0?ooo`800000A`3oool00`000000oooo0?ooo`1X0?ooo`00T`3oool00`000000oooo0?oo o`0L0?ooo`800000A`3oool00`000000oooo0?ooo`1X0?ooo`00U03oool00`000000oooo0?ooo`0J 0?ooo`800000B03oool00`000000oooo0?ooo`1X0?ooo`00U@3oool00`000000oooo0?ooo`0H0?oo o`030000003oool0000004P0oooo00<000000?ooo`3oool0J03oool009D0oooo00<000000?ooo`3o ool05`3oool010000000oooo0?ooo`0000190?ooo`030000003oool0oooo06L0oooo002F0?ooo`03 0000003oool0oooo01D0oooo00D000000?ooo`3oool0oooo000000190?ooo`030000003oool0oooo 06L0oooo002G0?ooo`8000004`3oool2000000@0oooo00<000000?ooo`3oool0A`3oool00`000000 oooo0?ooo`1W0?ooo`00V@3oool00`000000oooo0?ooo`0>0?ooo`8000001P3oool00`000000oooo 0?ooo`170?ooo`030000003oool0oooo06L0oooo002J0?ooo`030000003oool0oooo00/0oooo0P00 00080?ooo`030000003oool0oooo04P0oooo00<000000?ooo`3oool0IP3oool009/0oooo00<00000 0?ooo`3oool0203oool2000000X0oooo00<000000?ooo`3oool0B03oool00`000000oooo0?ooo`1V 0?ooo`00W03oool4000000@0oooo0P00000<0?ooo`800000B@3oool00`000000oooo0?ooo`1V0?oo o`00X03oool4000000h0oooo00<000000?ooo`3oool0B@3oool00`000000oooo0?ooo`1U0?ooo`00 /P3oool00`000000oooo0?ooo`190?ooo`030000003oool0oooo06D0oooo002b0?ooo`030000003o ool0oooo04T0oooo00<000000?ooo`3oool0I@3oool00;80oooo00<000000?ooo`3oool0B@3oool0 0`000000oooo0?ooo`1U0?ooo`00/P3oool00`000000oooo0?ooo`1:0?ooo`030000003oool0oooo 06@0oooo002S0?ooo`@000000`3oool2000000H0oooo00<000000?ooo`3oool0BP3oool00`000000 oooo0?ooo`1T0?ooo`00Y@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3o ool00`3oool00`000000oooo0?ooo`1:0?ooo`030000003oool0oooo06@0oooo002U0?ooo`050000 003oool0oooo0?ooo`0000000P3oool00`000000oooo0?ooo`030?ooo`<00000BP3oool00`000000 oooo0?ooo`1T0?ooo`00Y@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3o ool00`3oool00`000000oooo0?ooo`1;0?ooo`030000003oool0oooo06<0oooo002U0?ooo`050000 003oool0oooo0?ooo`0000000P3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo04/0 oooo00<000000?ooo`3oool0H`3oool00:<0oooo0`0000030?ooo`040000003oool0oooo000000D0 oooo00<000000?ooo`3oool0B`3oool00`000000oooo0?ooo`1S0?ooo`00Y@3oool00`000000oooo 0?ooo`020?ooo`8000001P3oool00`000000oooo0?ooo`1;0?ooo`030000003oool0oooo06<0oooo 002b0?ooo`030000003oool0oooo04`0oooo00<000000?ooo`3oool0HP3oool00;80oooo00<00000 0?ooo`3oool0C03oool00`000000oooo0?ooo`1R0?ooo`00/P3oool00`000000oooo0?ooo`1<0?oo o`030000003oool0oooo0680oooo002b0?ooo`030000003oool0oooo04`0oooo00<000000?ooo`3o ool0HP3oool00;80oooo0P00001>0?ooo`030000003oool0oooo0640oooo002b0?ooo`030000003o ool0oooo04d0oooo00<000000?ooo`3oool0H@3oool00;80oooo00<000000?ooo`3oool0C@3oool0 0`000000oooo0?ooo`1Q0?ooo`00/P3oool00`000000oooo0?ooo`1=0?ooo`030000003oool0oooo 0640oooo002b0?ooo`030000003oool0oooo04d0oooo00<000000?ooo`3oool0H@3oool00;80oooo 00<000000?ooo`3oool0C@3oool00`000000oooo0?ooo`1Q0?ooo`00/P3oool00`000000oooo0?oo o`1>0?ooo`030000003oool0oooo0600oooo002b0?ooo`030000003oool0oooo04h0oooo00<00000 0?ooo`3oool0H03oool00;80oooo0P00001?0?ooo`030000003oool0oooo0600oooo002b0?ooo`03 0000003oool0oooo04h0oooo00<000000?ooo`3oool0H03oool00;80oooo00<000000?ooo`3oool0 CP3oool00`000000oooo0?ooo`1P0?ooo`00/P3oool00`000000oooo0?ooo`1?0?ooo`030000003o ool0oooo05l0oooo002b0?ooo`030000003oool0oooo04l0oooo00<000000?ooo`3oool0G`3oool0 0;80oooo00<000000?ooo`3oool0C`3oool00`000000oooo0?ooo`1O0?ooo`00/P3oool00`000000 oooo0?ooo`1?0?ooo`030000003oool0oooo05l0oooo002b0?ooo`030000003oool0oooo04l0oooo 00<000000?ooo`3oool0G`3oool00;80oooo00<000000?ooo`3oool0D03oool00`000000oooo0?oo o`1N0?ooo`00/P3oool200000540oooo00<000000?ooo`3oool0GP3oool00;80oooo00<000000?oo o`3oool0D03oool00`000000oooo0?ooo`1N0?ooo`00/P3oool00`000000oooo0?ooo`1@0?ooo`03 0000003oool0oooo05h0oooo002b0?ooo`030000003oool0oooo0500oooo00<000000?ooo`3oool0 GP3oool00;80oooo00<000000?ooo`3oool0D03oool00`000000oooo0?ooo`1N0?ooo`00/P3oool0 0`000000oooo0?ooo`1A0?ooo`030000003oool0oooo05d0oooo002b0?ooo`030000003oool0oooo 0540oooo00<000000?ooo`3oool0G@3oool00;80oooo00<000000?ooo`3oool0D@3oool00`000000 oooo0?ooo`1M0?ooo`00/P3oool00`000000oooo0?ooo`1A0?ooo`030000003oool0oooo05d0oooo 002b0?ooo`800000DP3oool00`000000oooo0?ooo`1M0?ooo`00/P3oool00`000000oooo0?ooo`1B 0?ooo`030000003oool0oooo05`0oooo002b0?ooo`030000003oool0oooo0580oooo00<000000?oo o`3oool0G03oool00;80oooo00<000000?ooo`3oool0DP3oool00`000000oooo0?ooo`1L0?ooo`00 /P3oool00`000000oooo0?ooo`1B0?ooo`030000003oool0oooo05`0oooo002b0?ooo`030000003o ool0oooo0580oooo00<000000?ooo`3oool0G03oool00:<0oooo100000030?ooo`8000001P3oool0 0`000000oooo0?ooo`1B0?ooo`030000003oool0oooo05`0oooo002S0?ooo`030000003oool0oooo 00<0oooo00@000000?ooo`3oool000001@3oool00`000000oooo0?ooo`1C0?ooo`030000003oool0 oooo05/0oooo002T0?ooo`030000003oool0oooo0080oooo00@000000?ooo`3oool000001@3oool3 000005<0oooo00<000000?ooo`3oool0F`3oool00:D0oooo00D000000?ooo`3oool0oooo00000002 0?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool0D`3oool00`000000oooo0?ooo`1K 0?ooo`00YP3oool010000000oooo0?ooo`0000020?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool0D`3oool00`000000oooo0?ooo`1K0?ooo`00X`3oool010000000oooo0?ooo`000002 0?ooo`040000003oool0oooo000000D0oooo00<000000?ooo`3oool0D`3oool00`000000oooo0?oo o`1K0?ooo`00Y03oool2000000@0oooo0P0000060?ooo`030000003oool0oooo05@0oooo00<00000 0?ooo`3oool0FP3oool00;80oooo00<000000?ooo`3oool0E03oool00`000000oooo0?ooo`1J0?oo o`00/P3oool00`000000oooo0?ooo`1D0?ooo`030000003oool0oooo05X0oooo002b0?ooo`030000 003oool0oooo05@0oooo00<000000?ooo`3oool0FP3oool00;80oooo00<000000?ooo`3oool0E03o ool00`000000oooo0?ooo`1J0?ooo`00/P3oool2000005H0oooo00<000000?ooo`3oool0F@3oool0 0;80oooo00<000000?ooo`3oool0E@3oool00`000000oooo0?ooo`1I0?ooo`00/P3oool00`000000 oooo0?ooo`1E0?ooo`030000003oool0oooo05T0oooo002b0?ooo`030000003oool0oooo05D0oooo 00<000000?ooo`3oool0F@3oool00;80oooo00<000000?ooo`3oool0E@3oool00`000000oooo0?oo o`1I0?ooo`00/P3oool00`000000oooo0?ooo`1E0?ooo`030000003oool0oooo05T0oooo002b0?oo o`030000003oool0oooo05H0oooo00<000000?ooo`3oool0F03oool00;80oooo00<000000?ooo`3o ool0EP3oool00`000000oooo0?ooo`1H0?ooo`00/P3oool2000005L0oooo00<000000?ooo`3oool0 F03oool00;80oooo00<000000?ooo`3oool0EP3oool00`000000oooo0?ooo`1H0?ooo`00/P3oool0 0`000000oooo0?ooo`1F0?ooo`030000003oool0oooo05P0oooo002b0?ooo`030000003oool0oooo 05L0oooo00<000000?ooo`3oool0E`3oool00;80oooo00<000000?ooo`3oool0E`3oool00`000000 oooo0?ooo`1G0?ooo`00/P3oool00`000000oooo0?ooo`1G0?ooo`030000003oool0oooo05L0oooo 002b0?ooo`030000003oool0oooo05L0oooo00<000000?ooo`3oool0E`3oool00;80oooo00<00000 0?ooo`3oool0E`3oool00`000000oooo0?ooo`1G0?ooo`00/P3oool00`000000oooo0?ooo`1H0?oo o`030000003oool0oooo05H0oooo002b0?ooo`800000F@3oool00`000000oooo0?ooo`1F0?ooo`00 /P3oool00`000000oooo0?ooo`1H0?ooo`030000003oool0oooo05H0oooo002b0?ooo`030000003o ool0oooo05P0oooo00<000000?ooo`3oool0EP3oool00;80oooo00<000000?ooo`3oool0F03oool0 0`000000oooo0?ooo`1F0?ooo`00/P3oool00`000000oooo0?ooo`1H0?ooo`030000003oool0oooo 05H0oooo002b0?ooo`030000003oool0oooo05T0oooo00<000000?ooo`3oool0E@3oool00;80oooo 00<000000?ooo`3oool0F@3oool00`000000oooo0?ooo`1E0?ooo`00/P3oool00`000000oooo0?oo o`1I0?ooo`030000003oool0oooo05D0oooo0000\ \>"], ImageRangeCache->{{{0, 357}, {220.125, 0}} -> {-8.41961, -23.6785, \ 0.0471687, 0.233954}}] }, Open ]], Cell[CellGroupData[{ Cell[BoxData[ \(Solve[f[x] \[Equal] 6]\)], "Input"], Cell[BoxData[ \({{x \[Rule] 0}, {x \[Rule] 1 - \@6}, {x \[Rule] 1 + \@6}}\)], "Output"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell["1. Step by step", "Section"], Cell[CellGroupData[{ Cell["Quick illustration", "Subsection"], Cell[TextData[{ "Notice that the graph above has been named \"", StyleBox["basicplot", FontWeight->"Bold"], "\". Giving names to graphs makes it easy to combine them later using \ Show. Here is the definition of a blue dot at point ", Cell[BoxData[ \(\((\@6 + 1, 6)\)\)]], " plus a label, superimposed on the basic plot:" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[ \(\(\(\[IndentingNewLine]\)\(\(\(onedot\ = \ ListPlot[{{Sqrt[6] + 1, 6}}, \ PlotStyle \[Rule] {Hue[0.67], AbsolutePointSize[7]}];\)\(\[IndentingNewLine]\) \)\[IndentingNewLine] \(\(dotlabel\ = \ \ Graphics[ Text[\*"\"\<(\!\(\@6\)+1,6)\>\"", {\@6 + 1, 6}]];\)\(\[IndentingNewLine]\) \)\[IndentingNewLine] \(Show[basicplot, \ onedot, \ dotlabel];\)\)\)\)], "Input"], Cell[CellGroupData[{ Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.0238095 0.138047 0.0147151 0.0490503 [ [.16186 .00222 -3 -9 ] [.16186 .00222 3 0 ] [.2999 .00222 -3 -9 ] [.2999 .00222 3 0 ] [.43795 .00222 -3 -9 ] [.43795 .00222 3 0 ] [.576 .00222 -3 -9 ] [.576 .00222 3 0 ] [.71404 .00222 -3 -9 ] [.71404 .00222 3 0 ] [.85209 .00222 -3 -9 ] [.85209 .00222 3 0 ] [.99014 .00222 -3 -9 ] [.99014 .00222 3 0 ] [.01131 .11282 -6 -4.5 ] [.01131 .11282 0 4.5 ] [.01131 .21092 -6 -4.5 ] [.01131 .21092 0 4.5 ] [.01131 .30902 -6 -4.5 ] [.01131 .30902 0 4.5 ] [.01131 .40712 -6 -4.5 ] [.01131 .40712 0 4.5 ] [.01131 .50522 -12 -4.5 ] [.01131 .50522 0 4.5 ] [.01131 .60332 -12 -4.5 ] [.01131 .60332 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .16186 .01472 m .16186 .02097 L s [(1)] .16186 .00222 0 1 Mshowa .2999 .01472 m .2999 .02097 L s [(2)] .2999 .00222 0 1 Mshowa .43795 .01472 m .43795 .02097 L s [(3)] .43795 .00222 0 1 Mshowa .576 .01472 m .576 .02097 L s [(4)] .576 .00222 0 1 Mshowa .71404 .01472 m .71404 .02097 L s [(5)] .71404 .00222 0 1 Mshowa .85209 .01472 m .85209 .02097 L s [(6)] .85209 .00222 0 1 Mshowa .99014 .01472 m .99014 .02097 L s [(7)] .99014 .00222 0 1 Mshowa .125 Mabswid .05142 .01472 m .05142 .01847 L s .07903 .01472 m .07903 .01847 L s .10664 .01472 m .10664 .01847 L s .13425 .01472 m .13425 .01847 L s .18947 .01472 m .18947 .01847 L s .21707 .01472 m .21707 .01847 L s .24468 .01472 m .24468 .01847 L s .27229 .01472 m .27229 .01847 L s .32751 .01472 m .32751 .01847 L s .35512 .01472 m .35512 .01847 L s .38273 .01472 m .38273 .01847 L s .41034 .01472 m .41034 .01847 L s .46556 .01472 m .46556 .01847 L s .49317 .01472 m .49317 .01847 L s .52078 .01472 m .52078 .01847 L s .54839 .01472 m .54839 .01847 L s .60361 .01472 m .60361 .01847 L s .63121 .01472 m .63121 .01847 L s .65882 .01472 m .65882 .01847 L s .68643 .01472 m .68643 .01847 L s .74165 .01472 m .74165 .01847 L s .76926 .01472 m .76926 .01847 L s .79687 .01472 m .79687 .01847 L s .82448 .01472 m .82448 .01847 L s .8797 .01472 m .8797 .01847 L s .90731 .01472 m .90731 .01847 L s .93492 .01472 m .93492 .01847 L s .96253 .01472 m .96253 .01847 L s .25 Mabswid 0 .01472 m 1 .01472 L s .02381 .11282 m .03006 .11282 L s [(2)] .01131 .11282 1 0 Mshowa .02381 .21092 m .03006 .21092 L s [(4)] .01131 .21092 1 0 Mshowa .02381 .30902 m .03006 .30902 L s [(6)] .01131 .30902 1 0 Mshowa .02381 .40712 m .03006 .40712 L s [(8)] .01131 .40712 1 0 Mshowa .02381 .50522 m .03006 .50522 L s [(10)] .01131 .50522 1 0 Mshowa .02381 .60332 m .03006 .60332 L s [(12)] .01131 .60332 1 0 Mshowa .125 Mabswid .02381 .03924 m .02756 .03924 L s .02381 .06377 m .02756 .06377 L s .02381 .08829 m .02756 .08829 L s .02381 .13734 m .02756 .13734 L s .02381 .16187 m .02756 .16187 L s .02381 .18639 m .02756 .18639 L s .02381 .23544 m .02756 .23544 L s .02381 .25997 m .02756 .25997 L s .02381 .28449 m .02756 .28449 L s .02381 .33354 m .02756 .33354 L s .02381 .35807 m .02756 .35807 L s .02381 .38259 m .02756 .38259 L s .02381 .43164 m .02756 .43164 L s .02381 .45617 m .02756 .45617 L s .02381 .48069 m .02756 .48069 L s .02381 .52974 m .02756 .52974 L s .02381 .55427 m .02756 .55427 L s .02381 .57879 m .02756 .57879 L s .25 Mabswid .02381 0 m .02381 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .02 0 1 r 7 Mabswid .5 .30902 Mdot % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{239.375, 147.812}, ImageMargins->{{121, 0}, {0, 3}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgl0oooo000^0?ooo`@000006`3oool4000001/0oooo0P00000N0?ooo`030000003oool0oooo01T0 oooo0`00000M0?ooo`8000007@3oool00`000000oooo0?ooo`050?ooo`00<03oool00`000000oooo 0?ooo`0J0?ooo`030000003oool0oooo01/0oooo00@000000?ooo`3oool000007@3oool00`000000 oooo0?ooo`0L0?ooo`030000003oool0oooo01T0oooo00@000000?ooo`3oool00000703oool00`00 0000oooo0?ooo`050?ooo`00<03oool00`000000oooo0?ooo`0K0?ooo`030000003oool0oooo01d0 oooo00<000000?ooo`3oool0603oool5000001d0oooo00<000000?ooo`3oool06@3oool010000000 oooo0?ooo`00000M0?ooo`030000003oool0oooo00@0oooo000`0?ooo`030000003oool0oooo01`0 oooo00<000000?ooo`3oool06P3oool2000001/0oooo00@000000?ooo`3oool000006`3oool30000 01`0oooo0`00000N0?ooo`030000003oool0oooo00@0oooo000`0?ooo`030000003oool0oooo01d0 oooo00<000000?ooo`3oool06`3oool00`000000oooo0?ooo`0I0?ooo`030000003oool0000001/0 oooo00<000000?ooo`3oool0703oool00`000000oooo0?ooo`0O0?ooo`030000003oool0oooo00<0 oooo000^0?ooo`<00000703oool010000000oooo0?ooo`00000J0?ooo`040000003oool0oooo0000 01`0oooo0P00000K0?ooo`030000003oool0oooo01`0oooo00<000000?ooo`3oool0703oool01000 0000oooo0?ooo`0000050?ooo`004@3oool00`000000oooo0?ooo`0L0?ooo`030000003oool0oooo 01/0oooo0P00000L0?ooo`8000007P3oool00`000000oooo0?ooo`0I0?ooo`@00000703oool30000 01/0oooo100000050?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo 0?ooo`3K0?ooo`00303ooooO000000@0oooo000A0?ooo`030000003oool0oooo00@0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool0103oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool0103oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00<0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00@0oooo00<00000 0?ooo`3oool00`3oool00`000000oooo0?ooo`040?ooo`004@3oool00`000000oooo0?ooo`0L0?oo o`030000003oool0oooo01`0oooo00<000000?ooo`3oool06`3oool00`000000oooo0?ooo`0L0?oo o`030000003oool0oooo01/0oooo00<000000?ooo`3oool0703oool00`000000oooo0?ooo`0L0?oo o`030000003oool0oooo00@0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000 003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`800000g03oool0 0140oooo00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo 00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo0P00003L 0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`00 4@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool0 0`000000oooo0?ooo`3K0?ooo`004@3oool200000=`0oooo000A0?ooo`030000003oool0oooo0=/0 oooo000A0?ooo`030000003oool0oooo0=/0oooo000:0?ooo`@000000`3oool00`000000oooo0?oo o`3K0?ooo`002P3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo0=/0oooo000;0?oo o`030000003oool0oooo00<0oooo0`00003K0?ooo`00303oool00`000000oooo0?ooo`020?ooo`03 0000003oool0oooo0=/0oooo000=0?ooo`050000003oool0oooo0?ooo`000000g@3oool000X0oooo 00@000000?ooo`3oool000000`3oool00`000000oooo0?ooo`3K0?ooo`002`3oool2000000@0oooo 00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo0P00003L 0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`00 4@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool2 00000=`0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0 oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A 0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`800000g03oool00140oooo00<000000?ooo`3o ool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool000`0oooo00<000000?ooo`3oool00P3o ool00`000000oooo0?ooo`3K0?ooo`00303oool00`000000oooo0?ooo`020?ooo`030000003oool0 oooo0=/0oooo00090?ooo`D000000`3oool300000=/0oooo00090?ooo`040000003oool0oooo0000 00@0oooo00<000000?ooo`3oool0f`3oool000X0oooo00<000000?ooo`000000103oool00`000000 oooo0?ooo`3K0?ooo`002`3oool2000000@0oooo00<000000?ooo`3oool0f`3oool000`0oooo00<0 00000?ooo`3oool00P3oool00`000000oooo0?ooo`3K0?ooo`004@3oool200000=`0oooo000A0?oo o`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000 003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0 oooo0=/0oooo000A0?ooo`800000g03oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo 00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo00<00000 0?ooo`3oool0f`3oool00140oooo0P00003L0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`00 4@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`1V0?ooo`@01@3oL@3o ool000/0oooo0P0000040?ooo`030000003oool0oooo06D0oooo1P050?m`0?ooo`002P3oool01000 0000oooo0?ooo`0000030?ooo`030000003oool0oooo06D0oooo1P050?m`0?ooo`002P3oool01000 0000oooo0?ooo`0000030?ooo`<00000I@3oool600D0og00oooo000:0?ooo`<00000103oool00`00 0000oooo0?ooo`1U0?ooo`H01@3oL03oool000X0oooo00<000000?ooo`3oool0103oool00`000000 oooo0?ooo`1V0?ooo`@01@3oL@3oool000X0oooo00<000000?ooo`3oool0103oool00`000000oooo 0?ooo`3K0?ooo`002`3oool3000000<0oooo00<000000?ooo`3oool0f`3oool00140oooo0P00003L 0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`00 4@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool0 0`000000oooo0?ooo`3K0?ooo`004@3oool200000=`0oooo000A0?ooo`030000003oool0oooo0=/0 oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A 0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`800000g03oool00140oooo00<000000?ooo`3o ool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool000/0oooo0P0000040?ooo`030000003o ool0oooo0=/0oooo000:0?ooo`040000003oool0oooo000000<0oooo00<000000?ooo`3oool0f`3o ool000X0oooo00@000000?ooo`3oool000000`3oool300000=/0oooo000;0?ooo`800000103oool0 0`000000oooo0?ooo`3K0?ooo`002P3oool010000000oooo0?ooo`0000030?ooo`030000003oool0 oooo0=/0oooo000:0?ooo`040000003oool0oooo000000<0oooo00<000000?ooo`3oool0f`3oool0 00/0oooo0P0000040?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0 oooo000A0?ooo`800000g03oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo00<00000 0?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3o ool0f`3oool00140oooo0P00003L0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool0 0`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000 oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool200000=`0oooo000A 0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo00040?ooo`@0 00000`3oool2000000@0oooo00<000000?ooo`3oool0f`3oool000H0oooo00D000000?ooo`3oool0 oooo000000020?ooo`050000003oool0oooo0?ooo`000000g@3oool000H0oooo00D000000?ooo`3o ool0oooo000000020?ooo`040000003oool0oooo0?ooo`<00000f`3oool000H0oooo00D000000?oo o`3oool0oooo000000020?ooo`050000003oool0oooo0?ooo`000000g@3oool000H0oooo00D00000 0?ooo`3oool0oooo000000020?ooo`050000003oool0oooo0?ooo`000000g@3oool000@0oooo0`00 00030?ooo`040000003oool0oooo000000<0oooo00<000000?ooo`3oool0f`3oool000H0oooo00<0 00000?ooo`3oool00P3oool2000000@0oooo00<000000?ooo`3oool0f`3oool00140oooo00<00000 0?ooo`3oool0f`3oool00140oooo0P00003L0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`00 4@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool00`000000oooo0?ooo`3K0?ooo`004@3oool0 0`000000oooo0?ooo`3K0?ooo`004@3oool200000=`0oooo000A0?ooo`030000003oool0oooo0=/0 oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A 0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`030000003oool0oooo0=/0oooo000A0?ooo`80 0000g03oool00140oooo00<000000?ooo`3oool0f`3oool00140oooo00<000000?ooo`3oool0f`3o ool000@0oooo100000020?ooo`@000000`3oool00`000000oooo0?ooo`3K0?ooo`001P3oool01@00 0000oooo0?ooo`3oool0000000H0oooo00<000000?ooo`3oool0f`3oool000H0oooo00<000000?oo o`3oool00P3oool00`000000oooo0?ooo`030?ooo`<00000f`3oool000H0oooo00<000000?ooo`3o ool00`3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo0=/0oooo00060?ooo`030000 003oool0oooo00@0oooo00D000000?ooo`3oool0oooo0000003M0?ooo`00103oool3000000<0oooo 00@000000?ooo`3oool000000`3oool00`000000oooo0?ooo`3K0?ooo`001P3oool00`000000oooo 0?ooo`020?ooo`800000hP3oool00001\ \>"], ImageRangeCache->{{{0, 238.375}, {146.812, 0}} -> {-0.585246, -1.08214, \ 0.0326628, 0.091926}}], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.5 0.0595238 0.284158 0.0120062 [ [.05357 .27166 -12 -9 ] [.05357 .27166 12 0 ] [.20238 .27166 -6 -9 ] [.20238 .27166 6 0 ] [.35119 .27166 -12 -9 ] [.35119 .27166 12 0 ] [.64881 .27166 -9 -9 ] [.64881 .27166 9 0 ] [.79762 .27166 -3 -9 ] [.79762 .27166 3 0 ] [.94643 .27166 -9 -9 ] [.94643 .27166 9 0 ] [.4875 .04403 -18 -4.5 ] [.4875 .04403 0 4.5 ] [.4875 .1641 -18 -4.5 ] [.4875 .1641 0 4.5 ] [.4875 .40422 -12 -4.5 ] [.4875 .40422 0 4.5 ] [.4875 .52428 -12 -4.5 ] [.4875 .52428 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .05357 .28416 m .05357 .29041 L s [(-7.5)] .05357 .27166 0 1 Mshowa .20238 .28416 m .20238 .29041 L s [(-5)] .20238 .27166 0 1 Mshowa .35119 .28416 m .35119 .29041 L s [(-2.5)] .35119 .27166 0 1 Mshowa .64881 .28416 m .64881 .29041 L s [(2.5)] .64881 .27166 0 1 Mshowa .79762 .28416 m .79762 .29041 L s [(5)] .79762 .27166 0 1 Mshowa .94643 .28416 m .94643 .29041 L s [(7.5)] .94643 .27166 0 1 Mshowa .125 Mabswid .08333 .28416 m .08333 .28791 L s .1131 .28416 m .1131 .28791 L s .14286 .28416 m .14286 .28791 L s .17262 .28416 m .17262 .28791 L s .23214 .28416 m .23214 .28791 L s .2619 .28416 m .2619 .28791 L s .29167 .28416 m .29167 .28791 L s .32143 .28416 m .32143 .28791 L s .38095 .28416 m .38095 .28791 L s .41071 .28416 m .41071 .28791 L s .44048 .28416 m .44048 .28791 L s .47024 .28416 m .47024 .28791 L s .52976 .28416 m .52976 .28791 L s .55952 .28416 m .55952 .28791 L s .58929 .28416 m .58929 .28791 L s .61905 .28416 m .61905 .28791 L s .67857 .28416 m .67857 .28791 L s .70833 .28416 m .70833 .28791 L s .7381 .28416 m .7381 .28791 L s .76786 .28416 m .76786 .28791 L s .82738 .28416 m .82738 .28791 L s .85714 .28416 m .85714 .28791 L s .8869 .28416 m .8869 .28791 L s .91667 .28416 m .91667 .28791 L s .02381 .28416 m .02381 .28791 L s .97619 .28416 m .97619 .28791 L s .25 Mabswid 0 .28416 m 1 .28416 L s .5 .04403 m .50625 .04403 L s [(-20)] .4875 .04403 1 0 Mshowa .5 .1641 m .50625 .1641 L s [(-10)] .4875 .1641 1 0 Mshowa .5 .40422 m .50625 .40422 L s [(10)] .4875 .40422 1 0 Mshowa .5 .52428 m .50625 .52428 L s [(20)] .4875 .52428 1 0 Mshowa .125 Mabswid .5 .06805 m .50375 .06805 L s .5 .09206 m .50375 .09206 L s .5 .11607 m .50375 .11607 L s .5 .14008 m .50375 .14008 L s .5 .18811 m .50375 .18811 L s .5 .21212 m .50375 .21212 L s .5 .23613 m .50375 .23613 L s .5 .26015 m .50375 .26015 L s .5 .30817 m .50375 .30817 L s .5 .33218 m .50375 .33218 L s .5 .3562 m .50375 .3562 L s .5 .38021 m .50375 .38021 L s .5 .42823 m .50375 .42823 L s .5 .45224 m .50375 .45224 L s .5 .47626 m .50375 .47626 L s .5 .50027 m .50375 .50027 L s .5 .02002 m .50375 .02002 L s .5 .54829 m .50375 .54829 L s .5 .57231 m .50375 .57231 L s .5 .59632 m .50375 .59632 L s .25 Mabswid .5 0 m .5 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .32203 0 m .32216 .00098 L .34309 .12762 L .36292 .22046 L .3739 .26147 L .38395 .29299 L .39323 .31733 L .40336 .33898 L .41406 .35668 L .42424 .36895 L .42955 .3737 L .43456 .37721 L .43905 .3796 L .44158 .38063 L .44391 .3814 L .44513 .38172 L .44643 .38202 L .44755 .38223 L .44877 .38242 L .44952 .38251 L .45021 .38258 L .45087 .38263 L .45157 .38268 L .45278 .38271 L .45346 .38271 L .45411 .3827 L .45543 .38264 L .45609 .38259 L .45682 .38252 L .4581 .38237 L .4593 .38218 L .462 .38161 L .46488 .38079 L .47021 .37872 L .47513 .37621 L .48623 .36865 L .50638 .3495 L .54579 .30128 L .56558 .27696 L .58367 .25771 L .59298 .2496 L .60312 .24255 L .60868 .23962 L .61139 .23845 L .61384 .23754 L .61621 .23681 L .61877 .23619 L .62017 .23592 L .62147 .23573 L .62271 .23558 L Mistroke .62401 .23547 L .62524 .23542 L .62593 .23541 L .62657 .23541 L .62774 .23544 L .62899 .23552 L .6301 .23564 L .63114 .23578 L .63352 .23622 L .63607 .23691 L .63842 .23772 L .64369 .24025 L .64796 .24301 L .65263 .2468 L .66204 .25703 L .67234 .27249 L .68169 .29067 L .70265 .34727 L .72187 .4206 L .74268 .52598 L Mfstroke .74268 .52598 m .7569 .61803 L s .02 0 1 r 7 Mabswid .70533 .3562 Mdot 0 g gsave .70533 .3562 -89.3438 -10.5625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 21.125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def 63.000 14.312 moveto %%IncludeResource: font Courier %%IncludeFont: Courier %%BeginResource: font Courier-MISO %%BeginFont: Courier-MISO /Courier /Courier-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto %%IncludeResource: font Mathematica2Mono %%IncludeFont: Mathematica2Mono /Mathematica2Mono findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 14.312 moveto (H) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2Mono %%IncludeFont: Mathematica2Mono /Mathematica2Mono findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 69.000 9.062 moveto (\\217) show 77.312 9.062 moveto (!) show 79.375 9.062 moveto (!) show 81.438 9.062 moveto (!) show 82.688 9.062 moveto (!) show 77.625 14.312 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (6) show 85.688 14.312 moveto %%IncludeResource: font Mathematica1Mono %%IncludeFont: Mathematica1Mono /Mathematica1Mono findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (+) show 91.688 14.312 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (1) show 97.688 14.312 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 103.688 14.312 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (6) show %%IncludeResource: font Mathematica2Mono %%IncludeFont: Mathematica2Mono /Mathematica2Mono findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 109.688 14.312 moveto (L) show 115.688 14.312 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 10.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto 1.000 setlinewidth grestore % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{241.375, 149}, ImageMargins->{{272, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg0?ooo`030000003oool0oooo02L0oooo0P00001g 0?ooo`00CP3oool00`000000oooo0?ooo`0W0?ooo`030000003oool0oooo07H0oooo001>0?ooo`03 0000003oool0oooo02L0oooo00<000000?ooo`3oool0MP3oool004h0oooo00<000000?ooo`3oool0 9`3oool00`000000oooo0?ooo`1f0?ooo`00CP3oool00`000000oooo0?ooo`0I0?ooo`@000000`3o ool2000000D0oooo00<000000?ooo`3oool0MP3oool004l0oooo00<000000?ooo`3oool0603oool0 0`000000oooo0?ooo`030?ooo`040000003oool0oooo000000@0oooo00<000000?ooo`3oool0MP3o ool004l0oooo00<000000?ooo`3oool06@3oool00`000000oooo0?ooo`020?ooo`040000003oool0 oooo000000@0oooo0P00001g0?ooo`00C`3oool00`000000oooo0?ooo`0B0?ooo`@00000103oool0 1@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3oool00P3oool00`000000oooo0?oo o`1f0?ooo`00C`3oool00`000000oooo0?ooo`0K0?ooo`040000003oool0oooo00000080oooo00<0 00000?ooo`3oool00P3oool00`000000oooo0?ooo`1f0?ooo`00C`3oool00`000000oooo0?ooo`0H 0?ooo`040000003oool0oooo00000080oooo00@000000?ooo`3oool00000103oool00`000000oooo 0?ooo`1f0?ooo`00C`3oool00`000000oooo0?ooo`0I0?ooo`800000103oool2000000D0oooo00<0 00000?ooo`3oool0MP3oool00500oooo00<000000?ooo`3oool09@3oool00`000000oooo0?ooo`1f 0?ooo`00D03oool00`000000oooo0?ooo`0U0?ooo`800000M`3oool00500oooo00<000000?ooo`3o ool09@3oool00`000000oooo0?ooo`1f0?ooo`00D03oool00`000000oooo0?ooo`0U0?ooo`030000 003oool0oooo07H0oooo001@0?ooo`030000003oool0oooo02D0oooo00<000000?ooo`3oool0MP3o ool00500oooo00<000000?ooo`3oool09@3oool00`000000oooo0?ooo`1f0?ooo`00D@3oool00`00 0000oooo0?ooo`0T0?ooo`030000003oool0oooo07H0oooo001A0?ooo`030000003oool0oooo02@0 oooo0P00001g0?ooo`00D@3oool00`000000oooo0?ooo`0T0?ooo`030000003oool0oooo07H0oooo 001A0?ooo`030000003oool0oooo02@0oooo00<000000?ooo`3oool0MP3oool00540oooo00<00000 0?ooo`3oool0903oool00`000000oooo0?ooo`1f0?ooo`00D@3oool00`000000oooo0?ooo`0T0?oo o`030000003oool0oooo07H0oooo001B0?ooo`030000003oool0oooo02<0oooo0P00001g0?ooo`00 DP3oool00`000000oooo0?ooo`0S0?ooo`030000003oool0oooo07H0oooo001B0?ooo`030000003o ool0oooo02<0oooo00<000000?ooo`3oool0MP3oool00580oooo00<000000?ooo`3oool08`3oool0 0`000000oooo0?ooo`1f0?ooo`00DP3oool00`000000oooo0?ooo`0S0?ooo`030000003oool0oooo 07H0oooo001B0?ooo`030000003oool0oooo02<0oooo00<000000?ooo`3oool0MP3oool005<0oooo 00<000000?ooo`3oool08P3oool2000007L0oooo001C0?ooo`030000003oool0oooo0280oooo00<0 00000?ooo`3oool0MP3oool005<0oooo00<000000?ooo`3oool08P3oool00`000000oooo0?ooo`1f 0?ooo`00D`3oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo07H0oooo001D0?ooo`03 0000003oool0oooo01<0oooo100000030?ooo`8000001@3oool00`000000oooo0?ooo`1f0?ooo`00 E03oool00`000000oooo0?ooo`0E0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000 oooo0?ooo`020?ooo`030000003oool0oooo07H0oooo001D0?ooo`030000003oool0oooo01D0oooo 00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo0080oooo0P00001g0?ooo`00 E03oool00`000000oooo0?ooo`0=0?ooo`@00000103oool01@000000oooo0?ooo`3oool000000080 oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`1f0?ooo`00E@3oool00`000000oooo 0?ooo`0D0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000oooo0?ooo`020?ooo`03 0000003oool0oooo07H0oooo001E0?ooo`030000003oool0oooo0180oooo0`0000030?ooo`040000 003oool0oooo000000@0oooo00<000000?ooo`3oool0MP3oool005D0oooo00<000000?ooo`3oool0 503oool00`000000oooo0?ooo`020?ooo`8000001@3oool00`000000oooo0?ooo`1f0?ooo`00E@3o ool00`000000oooo0?ooo`0P0?ooo`030000003oool0oooo07H0oooo001E0?ooo`030000003oool0 oooo0200oooo0P00001g0?ooo`00EP3oool00`000000oooo0?ooo`0O0?ooo`030000003oool0oooo 07H0oooo001F0?ooo`030000003oool0oooo01l0oooo00<000000?ooo`3oool0MP3oool005H0oooo 00<000000?ooo`3oool07`3oool00`000000oooo0?ooo`1f0?ooo`00EP3oool00`000000oooo0?oo o`0O0?ooo`030000003oool0oooo07H0oooo001G0?ooo`030000003oool0oooo01h0oooo0P00001g 0?ooo`00E`3oool00`000000oooo0?ooo`0N0?ooo`030000003oool0oooo07H0oooo001G0?ooo`03 0000003oool0oooo01h0oooo00<000000?ooo`3oool0MP3oool005L0oooo00<000000?ooo`3oool0 7P3oool00`000000oooo0?ooo`1f0?ooo`00E`3oool00`000000oooo0?ooo`0N0?ooo`030000003o ool0oooo07H0oooo001H0?ooo`030000003oool0oooo01d0oooo00<000000?ooo`3oool0MP3oool0 05P0oooo00<000000?ooo`3oool07@3oool2000001T0oooo1`00001G0?ooo`00F03oool00`000000 oooo0?ooo`0M0?ooo`030000003oool0oooo01H0oooo0P0000070?ooo`030000003oool0oooo05@0 oooo00090?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool00P3oool3000001X0oooo 0`00000K0?ooo`@000000`3oool00`000000oooo000000020?ooo`<000006P3oool00`000000oooo 0?ooo`0D0?ooo`8000000P3oool4000000<0oooo0P0000030?ooo`<000006`3oool3000001`0oooo 00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`020?ooo`<000001`3oool000T0oooo00<0 00000?ooo`3oool02`3oool00`000000oooo0?ooo`0J0?ooo`030000003oool0oooo01P0oooo00<0 00000?ooo`3oool01P3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo01L0oooo00<0 00000?ooo`3oool04`3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo00H0oooo00<0 00000?ooo`3oool00`3oool00`000000oooo0?ooo`0K0?ooo`030000003oool0oooo01T0oooo00<0 00000?ooo`3oool02`3oool00`000000oooo0?ooo`040?ooo`002P3oool00`000000oooo0?ooo`0: 0?ooo`030000003oool0oooo01X0oooo00<000000?ooo`3oool06@3oool00`000000oooo0?ooo`06 0?ooo`030000003oool0oooo0080oooo00<000000?ooo`3oool05`3oool00`000000oooo0?ooo`0B 0?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`02 0?ooo`030000003oool0oooo01/0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`0: 0?ooo`030000003oool0oooo00@0oooo00020?ooo`@00000103oool00`000000oooo0?ooo`070?oo o`<00000503oool400000080oooo0`00000E0?ooo`@00000103oool00`000000oooo0?ooo`050?oo o`030000003oool00000008000006P3oool00`000000oooo0?ooo`0A0?ooo`030000003oool0oooo 00H0oooo00<000000?ooo`3oool01P3oool4000001/0oooo0`00000M0?ooo`030000003oool0oooo 00L0oooo0`0000070?ooo`002`3oool00`000000oooo0?ooo`060?ooo`030000003oool0oooo01X0 oooo00<000000?ooo`3oool07P3oool00`000000oooo0?ooo`040?ooo`030000003oool0000001`0 oooo0P00000A0?ooo`030000003oool0oooo00P0oooo00<000000?ooo`3oool01P3oool00`000000 oooo0?ooo`0K0?ooo`030000003oool0oooo01h0oooo00<000000?ooo`3oool01P3oool00`000000 oooo0?ooo`070?ooo`00203oool010000000oooo0?ooo`0000080?ooo`030000003oool0oooo01X0 oooo00<000000?ooo`3oool06`3oool010000000oooo0?ooo`0000060?ooo`030000003oool00000 01`0oooo00<000000?ooo`3oool03`3oool00`000000oooo0?ooo`060?ooo`040000003oool0oooo 000000P0oooo0P00000L0?ooo`030000003oool0oooo01/0oooo00@000000?ooo`3oool00000203o ool00`000000oooo0?ooo`070?ooo`00203oool4000000P0oooo1000000I0?ooo`@000006`3oool2 000000P0oooo1@00000I0?ooo`030000003oool0oooo00h0oooo00<000000?ooo`3oool0203oool2 000000T0oooo1000000J0?ooo`@000006P3oool4000000P0oooo100000060?ooo`00FP3oool00`00 0000oooo0?ooo`0K0?ooo`030000003oool0oooo00d0oooo00<000000?ooo`3oool05P3oool00`00 0000oooo0?ooo`1=0?ooo`00F`3oool00`000000oooo0?ooo`0J0?ooo`030000003oool0oooo00`0 oooo00<000000?ooo`3oool0603oool00`000000oooo0?ooo`1<0?ooo`00F`3oool00`000000oooo 0?ooo`0J0?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool06@3oool00`000000oooo 0?ooo`1<0?ooo`00l00000010?ooo`003@3oool00`000000oooo0?ooo`0P0?ooo`030000003oool0 oooo0240oooo00<000000?ooo`3oool01@3oool00`000000oooo0?ooo`0I0?ooo`030000003oool0 oooo00X0oooo00<000000?ooo`3oool04`3oool00`000000oooo0?ooo`050?ooo`030000003oool0 oooo01T0oooo00<000000?ooo`3oool08@3oool00`000000oooo0?ooo`0;0?ooo`00G03oool00`00 0000oooo0?ooo`0I0?ooo`030000003oool0oooo00T0oooo00<000000?ooo`3oool0703oool00`00 0000oooo0?ooo`1;0?ooo`00G03oool00`000000oooo0?ooo`0I0?ooo`030000003oool0oooo00T0 oooo00<000000?ooo`3oool07@3oool00`000000oooo0?ooo`1:0?ooo`00G@3oool00`000000oooo 0?ooo`0H0?ooo`030000003oool0oooo00P0oooo00<000000?ooo`3oool07P3oool00`000000oooo 0?ooo`1:0?ooo`00G@3oool00`000000oooo0?ooo`0H0?ooo`800000203oool00`000000oooo0?oo o`0O0?ooo`030000003oool0oooo04X0oooo001N0?ooo`030000003oool0oooo01L0oooo00<00000 0?ooo`3oool01P3oool00`000000oooo0?ooo`0Q0?ooo`030000003oool0oooo04T0oooo001N0?oo o`030000003oool0oooo01L0oooo00<000000?ooo`3oool01@3oool00`000000oooo0?ooo`0R0?oo o`030000003oool0oooo04T0oooo001O0?ooo`030000003oool0oooo01H0oooo00<000000?ooo`3o ool0103oool00`000000oooo0?ooo`0T0?ooo`030000003oool0oooo04P0oooo001O0?ooo`030000 003oool0oooo01H0oooo00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`0U0?ooo`030000 003oool0oooo04P0oooo001P0?ooo`030000003oool0oooo01D0oooo00<000000?ooo`3oool00`3o ool00`000000oooo0?ooo`0U0?ooo`030000003oool0oooo04P0oooo001P0?ooo`030000003oool0 oooo01D0oooo0P0000030?ooo`030000003oool0oooo02L0oooo00<000000?ooo`3oool0A`3oool0 0640oooo00<000000?ooo`3oool0503oool01@000000oooo0?ooo`3oool0000001H0oooo00<00000 0?ooo`3oool04@3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo00T0oooo00<00000 0?ooo`3oool0<03oool00640oooo00<000000?ooo`3oool0503oool010000000oooo0?ooo`00000F 0?ooo`030000003oool0oooo00@0oooo0P00000<0?ooo`030000003oool0oooo00T0oooo00<00000 0?ooo`3oool02@3oool00`000000oooo0?ooo`0_0?ooo`00HP3oool00`000000oooo0?ooo`0C0?oo o`030000003oool0000001H0oooo00<000000?ooo`3oool01@3oool2000000@0oooo0P0000070?oo o`04000000050?l01@3o00D0o`@000000`3oool00`000000oooo0?ooo`030?ooo`8000001@3oool0 0`000000oooo0?ooo`0^0?ooo`00HP3oool00`000000oooo0?ooo`0C0?ooo`8000005`3oool00`00 0000oooo0?ooo`040?ooo`030000003oool0000000<0oooo00@000000?ooo`3oool000001@3oool0 0`050?l0000000D0o`0300D0o`030?ooo`000000oooo00P0oooo00@000000?ooo`3oool00000103o ool00`000000oooo0?ooo`0^0?ooo`00H`3oool00`000000oooo0?ooo`0B0?ooo`030000003oool0 oooo01H0oooo00<000000?ooo`3oool00P3oool01@000000oooo0000003oool0000000<0oooo00@0 00000?ooo`3oool00000103oool5000000801@3o00<0oooo0000003oool0203oool010000000oooo 0?ooo`0000040?ooo`030000003oool0oooo02h0oooo001S0?ooo`030000003oool0oooo0140oooo 0`00000G0?ooo`030000003oool0oooo00<0oooo00D000000?ooo`3oool0oooo000000020?ooo`<0 00001P3oool00`050?l0000000D0o`0300D0o`030?ooo`000000oooo00P0oooo0`0000050?ooo`03 0000003oool0oooo02h0oooo001T0?ooo`030000003oool0oooo00l0oooo00<000000?ooo`000000 6@3oool00`000000oooo0?ooo`060?ooo`040000003oool0oooo000000P0oooo00<01@3o00000005 0?l00`050?l00`3oool000000?ooo`080?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3o ool0;`3oool006D0oooo00<000000?ooo`3oool03@3oool010000000oooo0?ooo`00000J0?ooo`03 0000003oool0oooo00D0oooo00@000000?ooo`3oool000002@3oool400D0o`<000002@3oool00`00 0000oooo0?ooo`030?ooo`030000003oool0oooo0300oooo001V0?ooo`030000003oool0oooo00/0 oooo00D000000?ooo`3oool0oooo0000000S0?ooo`030000003oool0oooo00<000001`3oool00`00 0000oooo0?ooo`020?ooo`030000003oool0oooo00P0oooo0`00000e0?ooo`00I`3oool00`000000 oooo0?ooo`090?ooo`030000003oool0oooo0080oooo00<000000?ooo`3oool08@3oool00`000000 oooo0?ooo`0;0?ooo`030000003oool0oooo04@0oooo001X0?ooo`8000001P3oool3000000D0oooo 00<000000?ooo`3oool08@3oool9000000D0oooo00<000000?ooo`3oool0A03oool006X0oooo1P00 00080?ooo`800000<03oool00`000000oooo0?ooo`140?ooo`00N03oool00`000000oooo0?ooo`0` 0?ooo`030000003oool0oooo04<0oooo001h0?ooo`030000003oool0oooo0300oooo00<000000?oo o`3oool0@`3oool006X0oooo100000030?ooo`8000001@3oool00`000000oooo0?ooo`0`0?ooo`03 0000003oool0oooo04<0oooo001/0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000 oooo0?ooo`020?ooo`030000003oool0oooo0340oooo00<000000?ooo`3oool0@P3oool006`0oooo 00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo0080oooo0P00000b0?ooo`03 0000003oool0oooo0480oooo001/0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000 oooo0?ooo`020?ooo`030000003oool0oooo0340oooo00<000000?ooo`3oool0@P3oool006`0oooo 00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo0080oooo00<000000?ooo`3o ool0<@3oool00`000000oooo0?ooo`120?ooo`00JP3oool3000000<0oooo00@000000?ooo`3oool0 0000103oool00`000000oooo0?ooo`0b0?ooo`030000003oool0oooo0440oooo001/0?ooo`030000 003oool0oooo0080oooo0P0000050?ooo`030000003oool0oooo0380oooo00<000000?ooo`3oool0 @@3oool007P0oooo00<000000?ooo`3oool0`3oool007P0oooo0P00000i0?ooo`030000003oool0oooo03/0oooo001h0?ooo`030000003o ool0oooo03P0oooo00<000000?ooo`3oool0>`3oool007P0oooo00<000000?ooo`3oool0>03oool0 0`000000oooo0?ooo`0k0?ooo`00N03oool00`000000oooo0?ooo`0h0?ooo`030000003oool0oooo 03/0oooo001h0?ooo`030000003oool0oooo03P0oooo00<000000?ooo`3oool0>`3oool007P0oooo 00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`0j0?ooo`00N03oool2000003X0oooo00<0 00000?ooo`3oool0>P3oool007P0oooo00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`0j 0?ooo`00N03oool00`000000oooo0?ooo`0i0?ooo`030000003oool0oooo03X0oooo001h0?ooo`03 0000003oool0oooo03T0oooo00<000000?ooo`3oool0>P3oool007P0oooo00<000000?ooo`3oool0 >@3oool00`000000oooo0?ooo`0j0?ooo`00N03oool2000003X0oooo00<000000?ooo`3oool0>P3o ool007P0oooo00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`0j0?ooo`00N03oool00`00 0000oooo0?ooo`0j0?ooo`030000003oool0oooo03T0oooo001h0?ooo`030000003oool0oooo03X0 oooo00<000000?ooo`3oool0>@3oool007P0oooo00<000000?ooo`3oool0>P3oool00`000000oooo 0?ooo`0i0?ooo`00N03oool00`000000oooo0?ooo`0j0?ooo`030000003oool0oooo03T0oooo0000 \ \>"], ImageRangeCache->{{{0, 240.375}, {148, 0}} -> {-8.43181, -23.6679, \ 0.0701555, 0.347814}}] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell["Finding and plotting the \"interesting points\"", "Subsection"], Cell["\<\ A nice graph should be clipped so that it shows the \"interesting \ points\" without a lot of extra empty space around the edges. So the first \ order of business is to find the interesting points; the zeroes, minima, \ maxima, and points of inflection:\ \>", "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(zeroes\ = \ x /. Solve[f[x] \[Equal] 0]\), "\[IndentingNewLine]", \(minmax\ = \ x /. Solve[\(f'\)[x] \[Equal] 0]\), "\[IndentingNewLine]", \(inflect\ = \ x /. Solve[\(f''\)[x] \[Equal] 0]\)}], "Input"], Cell[BoxData[ \({\(-2\), 1, 3}\)], "Output"], Cell[BoxData[ \({1\/3\ \((2 - \@19)\), 1\/3\ \((2 + \@19)\)}\)], "Output"], Cell[BoxData[ \({2\/3}\)], "Output"] }, Open ]], Cell["\<\ Put these x values together into a single list, and calculate their \ corresponding y values.\ \>", "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(xvalues\ = \ Flatten[{zeroes, minmax, inflect}]\ // \ Union\), "\[IndentingNewLine]", \(yvalues\ = \ Map[f, \ xvalues]\), "\[IndentingNewLine]", \(xypairs\ = \ Transpose[\ {xvalues, \ yvalues}]\)}], "Input"], Cell[BoxData[ \({\(-2\), 2\/3, 1, 3, 1\/3\ \((2 - \@19)\), 1\/3\ \((2 + \@19)\)}\)], "Output"], Cell[BoxData[ \({0, 56\/27, 0, 0, \((\(-3\) + 1\/3\ \((2 - \@19)\))\)\ \((\(-1\) + 1\/3\ \((2 - \@19)\))\)\ \((2 + 1\/3\ \((2 - \@19)\))\), \((\(-3\) + 1\/3\ \((2 + \@19)\))\)\ \((\(-1\) + 1\/3\ \((2 + \@19)\))\)\ \((2 + 1\/3\ \((2 + \@19)\))\)}\)], "Output"], Cell[BoxData[ \({{\(-2\), 0}, {2\/3, 56\/27}, {1, 0}, {3, 0}, {1\/3\ \((2 - \@19)\), \((\(-3\) + 1\/3\ \((2 - \@19)\))\)\ \((\(-1\) + 1\/3\ \((2 - \@19)\))\)\ \((2 + 1\/3\ \((2 - \@19)\))\)}, {1\/3\ \((2 + \@19)\), \((\(-3\) + 1\/3\ \((2 + \@19)\))\)\ \((\(-1\) + 1\/3\ \((2 + \@19)\))\)\ \((2 + 1\/3\ \((2 + \@19)\))\)}}\)], "Output"] }, Open ]], Cell[TextData[{ "A \"good\" graph of ", StyleBox["f", FontSlant->"Italic"], "(", StyleBox["x", FontSlant->"Italic"], ") will include all these points, plus just a bit extra space on all four \ edges, say, 15% of the size of the exact box containing only those points. \ So we can use the extreme values of ", StyleBox["x", FontSlant->"Italic"], " and ", StyleBox["y", FontSlant->"Italic"], " to define a good range for plotting the function, like this:" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(\(xrange\ = \ Max[xvalues]\ - \ Min[xvalues];\)\), "\[IndentingNewLine]", \(\(yrange\ = \ Max[yvalues]\ - \ Min[yvalues];\)\), "\[IndentingNewLine]", \(xplotrange\ = \ {Min[xvalues] - 0.15 xrange, \ Max[xvalues] + 0.15 xrange}\), "\[IndentingNewLine]", \(yplotrange\ = \ {Min[yvalues] - 0.15 yrange, \ Max[yvalues] + 0.15 yrange}\)}], "Input"], Cell[BoxData[ \({\(-2.75`\), 3.75`}\)], "Output"], Cell[BoxData[ \({\(-5.901096585589232`\), 10.049244733737382`}\)], "Output"] }, Open ]], Cell[TextData[{ "Call the plot of ", StyleBox["f", FontSlant->"Italic"], "(", StyleBox["x", FontSlant->"Italic"], ") \"graph1\", and the plot of the points \"graph2\" (we use the PlotStyle \ option to make big blue dots!), then combine them to make \"graph3\":" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(\(\(graph1\ = \ Show[basicplot, \ PlotRange \[Rule] {xplotrange, yplotrange}];\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(graph2\ = \ ListPlot[ xypairs, \ \ PlotRange \[Rule] {xplotrange, yplotrange}, \ \ \ PlotStyle \[Rule] {Hue[0.67], AbsolutePointSize[7]}];\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(graph3\ = \ Show[graph1, \ graph2];\)\)}], "Input"], Cell[CellGroupData[{ Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.423077 0.153846 0.228652 0.0387474 [ [.11538 .21615 -6 -9 ] [.11538 .21615 6 0 ] [.26923 .21615 -6 -9 ] [.26923 .21615 6 0 ] [.57692 .21615 -3 -9 ] [.57692 .21615 3 0 ] [.73077 .21615 -3 -9 ] [.73077 .21615 3 0 ] [.88462 .21615 -3 -9 ] [.88462 .21615 3 0 ] [.41058 .07366 -12 -4.5 ] [.41058 .07366 0 4.5 ] [.41058 .15116 -12 -4.5 ] [.41058 .15116 0 4.5 ] [.41058 .30615 -6 -4.5 ] [.41058 .30615 0 4.5 ] [.41058 .38364 -6 -4.5 ] [.41058 .38364 0 4.5 ] [.41058 .46114 -6 -4.5 ] [.41058 .46114 0 4.5 ] [.41058 .53863 -6 -4.5 ] [.41058 .53863 0 4.5 ] [.41058 .61613 -12 -4.5 ] [.41058 .61613 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .11538 .22865 m .11538 .2349 L s [(-2)] .11538 .21615 0 1 Mshowa .26923 .22865 m .26923 .2349 L s [(-1)] .26923 .21615 0 1 Mshowa .57692 .22865 m .57692 .2349 L s [(1)] .57692 .21615 0 1 Mshowa .73077 .22865 m .73077 .2349 L s [(2)] .73077 .21615 0 1 Mshowa .88462 .22865 m .88462 .2349 L s [(3)] .88462 .21615 0 1 Mshowa .125 Mabswid .14615 .22865 m .14615 .2324 L s .17692 .22865 m .17692 .2324 L s .20769 .22865 m .20769 .2324 L s .23846 .22865 m .23846 .2324 L s .3 .22865 m .3 .2324 L s .33077 .22865 m .33077 .2324 L s .36154 .22865 m .36154 .2324 L s .39231 .22865 m .39231 .2324 L s .45385 .22865 m .45385 .2324 L s .48462 .22865 m .48462 .2324 L s .51538 .22865 m .51538 .2324 L s .54615 .22865 m .54615 .2324 L s .60769 .22865 m .60769 .2324 L s .63846 .22865 m .63846 .2324 L s .66923 .22865 m .66923 .2324 L s .7 .22865 m .7 .2324 L s .76154 .22865 m .76154 .2324 L s .79231 .22865 m .79231 .2324 L s .82308 .22865 m .82308 .2324 L s .85385 .22865 m .85385 .2324 L s .08462 .22865 m .08462 .2324 L s .05385 .22865 m .05385 .2324 L s .02308 .22865 m .02308 .2324 L s .91538 .22865 m .91538 .2324 L s .94615 .22865 m .94615 .2324 L s .97692 .22865 m .97692 .2324 L s .25 Mabswid 0 .22865 m 1 .22865 L s .42308 .07366 m .42933 .07366 L s [(-4)] .41058 .07366 1 0 Mshowa .42308 .15116 m .42933 .15116 L s [(-2)] .41058 .15116 1 0 Mshowa .42308 .30615 m .42933 .30615 L s [(2)] .41058 .30615 1 0 Mshowa .42308 .38364 m .42933 .38364 L s [(4)] .41058 .38364 1 0 Mshowa .42308 .46114 m .42933 .46114 L s [(6)] .41058 .46114 1 0 Mshowa .42308 .53863 m .42933 .53863 L s [(8)] .41058 .53863 1 0 Mshowa .42308 .61613 m .42933 .61613 L s [(10)] .41058 .61613 1 0 Mshowa .125 Mabswid .42308 .01554 m .42683 .01554 L s .42308 .03492 m .42683 .03492 L s .42308 .05429 m .42683 .05429 L s .42308 .09304 m .42683 .09304 L s .42308 .11241 m .42683 .11241 L s .42308 .13178 m .42683 .13178 L s .42308 .17053 m .42683 .17053 L s .42308 .1899 m .42683 .1899 L s .42308 .20928 m .42683 .20928 L s .42308 .24803 m .42683 .24803 L s .42308 .2674 m .42683 .2674 L s .42308 .28677 m .42683 .28677 L s .42308 .32552 m .42683 .32552 L s .42308 .34489 m .42683 .34489 L s .42308 .36427 m .42683 .36427 L s .42308 .40302 m .42683 .40302 L s .42308 .42239 m .42683 .42239 L s .42308 .44176 m .42683 .44176 L s .42308 .48051 m .42683 .48051 L s .42308 .49988 m .42683 .49988 L s .42308 .51926 m .42683 .51926 L s .42308 .558 m .42683 .558 L s .42308 .57738 m .42683 .57738 L s .42308 .59675 m .42683 .59675 L s .25 Mabswid .42308 0 m .42308 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .06483 0 m .06878 .02308 L .09717 .15542 L .12314 .25716 L .14712 .3357 L .1733 .40559 L .20097 .46272 L .22726 .50229 L .241 .51764 L .25393 .52897 L .26555 .53666 L .27209 .54001 L .27811 .54247 L .28125 .54352 L .28461 .54448 L .28752 .54517 L .29068 .54577 L .2926 .54607 L .29438 .54629 L .29608 .54646 L .29789 .54659 L .30102 .54671 L .3028 .54672 L .30447 .54668 L .30788 .54649 L .30959 .54633 L .31146 .54611 L .31478 .5456 L .31787 .54499 L .32486 .54316 L .33232 .5405 L .34609 .53382 L .35879 .52573 L .38749 .50133 L .43957 .43952 L .54141 .2839 L .59258 .20543 L .63934 .1433 L .66339 .11711 L .6896 .09439 L .70398 .08491 L .71097 .08113 L .7173 .07822 L .72343 .07586 L .73004 .07385 L .73368 .07298 L .73703 .07235 L .74023 .07188 L .7436 .07153 L .74677 .07135 L Mistroke .74856 .07131 L .75021 .07132 L .75324 .07143 L .75646 .07169 L .75933 .07206 L .76203 .07251 L .76816 .07396 L .77477 .07617 L .78083 .0788 L .79446 .08693 L .80551 .09586 L .81758 .1081 L .84188 .14112 L .8685 .191 L .89266 .24967 L .94685 .43234 L Mfstroke .94685 .43234 m .98584 .61803 L s % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{288, 177.938}, ImageMargins->{{43, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg`3oool001X0oooo00<00000 0?ooo`3oool0G03oool3000004P0oooo00<000000?ooo`3oool07P3oool00`000000oooo0?ooo`0h 0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04L0oooo00<000000?oo o`3oool0803oool00`000000oooo0?ooo`0g0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`03 0000003oool0oooo04H0oooo00<000000?ooo`3oool08P3oool00`000000oooo0?ooo`0f0?ooo`00 6`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04@0oooo0P00000U0?ooo`030000 003oool0oooo03H0oooo000K0?ooo`030000003oool0oooo05/0oooo00<000000?ooo`3oool0@`3o ool00`000000oooo0?ooo`0V0?ooo`030000003oool0oooo03D0oooo000K0?ooo`030000003oool0 oooo05/0oooo0`0000120?ooo`030000003oool0oooo02P0oooo00<000000?ooo`3oool0=03oool0 01`0oooo00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`110?ooo`030000003oool0oooo 02X0oooo00<000000?ooo`3oool0<`3oool001`0oooo00<000000?ooo`3oool0FP3oool00`000000 oooo0?ooo`100?ooo`030000003oool0oooo02/0oooo00<000000?ooo`3oool0<`3oool001`0oooo 00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02d0oooo 00<000000?ooo`3oool003oool00`000000oooo0?ooo`0]0?ooo`007P3oool00`00 0000oooo0?ooo`1A0?ooo`030000003oool0oooo00@0oooo0`00000h0?ooo`030000003oool0oooo 03X0oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0BP3oool4000000@0 oooo00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`0h0?ooo`030000003oool0oooo03X0 oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0D`3oool00`000000oooo 0?ooo`020?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0?03oool00`000000oooo 0?ooo`0[0?ooo`007`3oool00`000000oooo0?ooo`1?0?ooo`040000003oool0oooo000000@0oooo 00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`0m0?ooo`030000003oool0oooo02/0oooo 000O0?ooo`030000003oool0oooo0500oooo0P0000050?ooo`030000003oool0oooo03D0oooo00<0 00000?ooo`3oool0?`3oool00`000000oooo0?ooo`0Z0?ooo`007`3oool00`000000oooo0?ooo`1G 0?ooo`<00000=@3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02X0oooo000O0?oo o`030000003oool0oooo05L0oooo00<000000?ooo`3oool0=03oool00`000000oooo0?ooo`110?oo o`030000003oool0oooo02T0oooo000P0?ooo`030000003oool0oooo05H0oooo00<000000?ooo`3o ool0<`3oool00`000000oooo0?ooo`120?ooo`030000003oool0oooo02T0oooo000P0?ooo`030000 003oool0oooo05H0oooo00<000000?ooo`3oool00?ooo`030000003oool0oooo01h0oooo00<000000?ooo`3oool0H`3oool00`00 0000oooo0?ooo`0M0?ooo`00:@3oool00`000000oooo0?ooo`1=0?ooo`030000003oool0oooo01d0 oooo00<000000?ooo`3oool0I@3oool00`000000oooo0?ooo`0L0?ooo`00:@3oool00`000000oooo 0?ooo`150?ooo`@00000103oool00`000000oooo0?ooo`0L0?ooo`030000003oool0oooo06H0oooo 00<000000?ooo`3oool0703oool002T0oooo00<000000?ooo`3oool0A@3oool00`000000oooo0?oo o`050?ooo`030000003oool0oooo01`0oooo00<000000?ooo`3oool0IP3oool00`000000oooo0?oo o`0L0?ooo`00:P3oool00`000000oooo0?ooo`150?ooo`030000003oool0oooo00@0oooo0`00000K 0?ooo`030000003oool0oooo06P0oooo00<000000?ooo`3oool06`3oool002X0oooo00<000000?oo o`3oool0AP3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo01X0oooo00<000000?oo o`3oool0J@3oool00`000000oooo0?ooo`0K0?ooo`00:P3oool00`000000oooo0?ooo`170?ooo`03 0000003oool0oooo0080oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`1Y0?ooo`03 0000003oool0oooo01/0oooo000Z0?ooo`030000003oool0oooo04@0oooo00@000000?ooo`3oool0 0000103oool00`000000oooo0?ooo`0I0?ooo`030000003oool0oooo06X0oooo00<000000?ooo`3o ool06`3oool002/0oooo00<000000?ooo`3oool0A03oool2000000D0oooo00<000000?ooo`3oool0 603oool00`000000oooo0?ooo`1/0?ooo`030000003oool0oooo01X0oooo000[0?ooo`030000003o ool0oooo04/0oooo00<000000?ooo`3oool0603oool00`000000oooo0?ooo`1/0?ooo`030000003o ool0oooo01X0oooo000[0?ooo`030000003oool0oooo04/0oooo0`00000G0?ooo`030000003oool0 oooo06d0oooo00<000000?ooo`3oool06P3oool002/0oooo00<000000?ooo`3oool0B`3oool00`00 0000oooo0?ooo`0F0?ooo`030000003oool0oooo06l0oooo00<000000?ooo`3oool06@3oool002`0 oooo00<000000?ooo`3oool0BP3oool00`000000oooo0?ooo`0F0?ooo`030000003oool0oooo06l0 oooo00<000000?ooo`3oool06@3oool002`0oooo00<000000?ooo`3oool0BP3oool00`000000oooo 0?ooo`0E0?ooo`030000003oool0oooo0700oooo00<000000?ooo`3oool06@3oool002`0oooo00<0 00000?ooo`3oool0BP3oool00`000000oooo0?ooo`0D0?ooo`030000003oool0oooo0780oooo00<0 00000?ooo`3oool0603oool002d0oooo00<000000?ooo`3oool0B@3oool3000001@0oooo00<00000 0?ooo`3oool0LP3oool00`000000oooo0?ooo`0H0?ooo`00;@3oool00`000000oooo0?ooo`190?oo o`030000003oool0oooo01<0oooo00<000000?ooo`3oool0L`3oool00`000000oooo0?ooo`0H0?oo o`00;P3oool00`000000oooo0?ooo`180?ooo`030000003oool0oooo0180oooo00<000000?ooo`3o ool0M03oool00`000000oooo0?ooo`0H0?ooo`00;P3oool00`000000oooo0?ooo`180?ooo`030000 003oool0oooo0180oooo00<000000?ooo`3oool0M@3oool00`000000oooo0?ooo`0G0?ooo`00;`3o ool00`000000oooo0?ooo`170?ooo`030000003oool0oooo0140oooo00<000000?ooo`3oool0MP3o ool00`000000oooo0?ooo`0G0?ooo`00;`3oool00`000000oooo0?ooo`170?ooo`030000003oool0 oooo0140oooo00<000000?ooo`3oool0MP3oool00`000000oooo0?ooo`0G0?ooo`00;`3oool00`00 0000oooo0?ooo`170?ooo`<00000403oool00`000000oooo0?ooo`1h0?ooo`030000003oool0oooo 01H0oooo000`0?ooo`030000003oool0oooo04H0oooo00<000000?ooo`3oool03`3oool00`000000 oooo0?ooo`1i0?ooo`030000003oool0oooo01H0oooo000`0?ooo`030000003oool0oooo04H0oooo 00<000000?ooo`3oool03`3oool00`000000oooo0?ooo`1i0?ooo`030000003oool0oooo01H0oooo 000a0?ooo`030000003oool0oooo03l0oooo00<000000?ooo`3oool00`3oool00`000000oooo0?oo o`0>0?ooo`030000003oool0oooo07X0oooo00<000000?ooo`3oool05P3oool00340oooo00<00000 0?ooo`3oool0?`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00d0oooo00<00000 0?ooo`3oool0O03oool00`000000oooo0?ooo`0E0?ooo`00<@3oool00`000000oooo0?ooo`0l0?oo o`D00000103oool3000000d0oooo00<000000?ooo`3oool0O03oool00`000000oooo0?ooo`0E0?oo o`00P3oool00`000000oooo0?ooo`0e0?ooo`80 00001@3oool00`000000oooo0000002A0?ooo`030000003oool0oooo0100oooo000k0?ooo`030000 003oool0oooo03<0oooo00@000000?ooo`3oool00000103oool200000980oooo00<000000?ooo`3o ool0403oool003/0oooo00<000000?ooo`3oool0<`3oool010000000oooo0?ooo`0000040?ooo`<0 0000TP3oool00`000000oooo0?ooo`0?0?ooo`00?03oool00`000000oooo0?ooo`0b0?ooo`<00000 103oool2000009@0oooo00<000000?ooo`3oool03`3oool003`0oooo00<000000?ooo`3oool00?ooo`00?`3oool00`00 0000oooo0?ooo`0c0?ooo`040000003oool0oooo0?ooo`<00000T`3oool00`000000oooo0?ooo`0> 0?ooo`00?`3oool00`000000oooo0?ooo`0b0?ooo`030000003oool0oooo0080oooo00<000000?oo o`3oool0T`3oool00`000000oooo0?ooo`0>0?ooo`00@03oool00`000000oooo0?ooo`0`0?ooo`03 0000003oool0oooo00<0oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0>0?ooo`00 @@3oool00`000000oooo0?ooo`0^0?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool0 T`3oool00`000000oooo0?ooo`0>0?ooo`00@P3oool00`000000oooo0?ooo`0]0?ooo`030000003o ool0oooo00@0oooo00<000000?ooo`3oool0U03oool00`000000oooo0?ooo`0=0?ooo`00@P3oool0 0`000000oooo0?ooo`0/0?ooo`030000003oool0oooo00D0oooo0`00002D0?ooo`030000003oool0 oooo00d0oooo00130?ooo`030000003oool0oooo02X0oooo00<000000?ooo`3oool01P3oool00`00 0000oooo0?ooo`2D0?ooo`030000003oool0oooo00d0oooo00140?ooo`030000003oool0oooo02P0 oooo00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`2D0?ooo`030000003oool0oooo00d0 oooo00150?ooo`030000003oool0oooo02D0oooo0P00000:0?ooo`030000003oool0oooo09@0oooo 00<000000?ooo`3oool03@3oool004H0oooo00<000000?ooo`3oool08`3oool00`000000oooo0?oo o`0:0?ooo`030000003oool0oooo09D0oooo00<000000?ooo`3oool0303oool004L0oooo00<00000 0?ooo`3oool08@3oool00`000000oooo0?ooo`0;0?ooo`030000003oool0oooo09D0oooo00<00000 0?ooo`3oool0303oool004P0oooo00<000000?ooo`3oool07P3oool2000000h0oooo0`00002E0?oo o`030000003oool0oooo00`0oooo00190?ooo`030000003oool0oooo01`0oooo00<000000?ooo`3o ool03P3oool00`000000oooo0?ooo`2E0?ooo`030000003oool0oooo00`0oooo00190?ooo`030000 003oool0oooo01/0oooo00<000000?ooo`3oool03`3oool00`000000oooo0?ooo`2F0?ooo`030000 003oool0oooo00/0oooo001:0?ooo`030000003oool0oooo01P0oooo0P00000;0?ooo`8000001@3o ool00`000000oooo0?ooo`2F0?ooo`030000003oool0oooo00/0oooo001;0?ooo`8000005P3oool2 000000`0oooo00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`2F0?ooo`030000003o ool0oooo00/0oooo001=0?ooo`8000004P3oool2000000h0oooo00@000000?ooo`3oool00000103o ool3000009H0oooo00<000000?ooo`3oool02`3oool004l0oooo0`00000=0?ooo`8000004@3oool2 000000D0oooo00<000000?ooo`3oool0UP3oool00`000000oooo0?ooo`0;0?ooo`00DP3oool50000 00<0oooo1@00000B0?ooo`040000003oool0oooo000000@0oooo00<000000?ooo`3oool0U`3oool0 0`000000oooo0?ooo`0:0?ooo`00EP3oool4000001L0oooo00@000000?ooo`3oool00000103oool0 0`000000oooo0?ooo`2G0?ooo`030000003oool0oooo00X0oooo001b0?ooo`8000001@3oool00`00 0000oooo0?ooo`2G0?ooo`030000003oool0oooo00X0oooo001i0?ooo`030000003oool0oooo09L0 oooo00<000000?ooo`3oool02P3oool007T0oooo0`00002G0?ooo`030000003oool0oooo00X0oooo 001i0?ooo`030000003oool0oooo09P0oooo00<000000?ooo`3oool02@3oool007T0oooo00<00000 0?ooo`3oool0V03oool00`000000oooo0?ooo`090?ooo`00N@3oool00`000000oooo0?ooo`2H0?oo o`030000003oool0oooo00T0oooo001i0?ooo`030000003oool0oooo09P0oooo00<000000?ooo`3o ool02@3oool007T0oooo0`00002H0?ooo`030000003oool0oooo00T0oooo001i0?ooo`030000003o ool0oooo09T0oooo00<000000?ooo`3oool0203oool007T0oooo00<000000?ooo`3oool0V@3oool0 0`000000oooo0?ooo`080?ooo`00N@3oool00`000000oooo0?ooo`2I0?ooo`030000003oool0oooo 00P0oooo001i0?ooo`030000003oool0oooo09T0oooo00<000000?ooo`3oool0203oool007T0oooo 00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`070?ooo`00N@3oool3000009X0oooo00<0 00000?ooo`3oool01`3oool007T0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`07 0?ooo`00N@3oool00`000000oooo0?ooo`2J0?ooo`030000003oool0oooo00L0oooo001[0?ooo`@0 00000`3oool2000000D0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`070?ooo`00 K@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3oool00P3oool00`000000 oooo0?ooo`2K0?ooo`030000003oool0oooo00H0oooo001]0?ooo`050000003oool0oooo0?ooo`00 00000P3oool00`000000oooo0?ooo`020?ooo`<00000V`3oool00`000000oooo0?ooo`060?ooo`00 K@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3oool00P3oool00`000000 oooo0?ooo`2K0?ooo`030000003oool0oooo00H0oooo001]0?ooo`050000003oool0oooo0?ooo`00 00000P3oool00`000000oooo0?ooo`2Y0?ooo`00J`3oool3000000<0oooo00@000000?ooo`3oool0 0000Z`3oool006d0oooo00<000000?ooo`3oool00P3oool200000:`0oooo0000\ \>"], ImageRangeCache->{{{0, 287}, {176.938, 0}} -> {-2.83281, -5.90117, \ 0.0232252, 0.0922152}}], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.423077 0.153846 0.228652 0.0387474 [ [.11538 .21615 -6 -9 ] [.11538 .21615 6 0 ] [.26923 .21615 -6 -9 ] [.26923 .21615 6 0 ] [.57692 .21615 -3 -9 ] [.57692 .21615 3 0 ] [.73077 .21615 -3 -9 ] [.73077 .21615 3 0 ] [.88462 .21615 -3 -9 ] [.88462 .21615 3 0 ] [.41058 .07366 -12 -4.5 ] [.41058 .07366 0 4.5 ] [.41058 .15116 -12 -4.5 ] [.41058 .15116 0 4.5 ] [.41058 .30615 -6 -4.5 ] [.41058 .30615 0 4.5 ] [.41058 .38364 -6 -4.5 ] [.41058 .38364 0 4.5 ] [.41058 .46114 -6 -4.5 ] [.41058 .46114 0 4.5 ] [.41058 .53863 -6 -4.5 ] [.41058 .53863 0 4.5 ] [.41058 .61613 -12 -4.5 ] [.41058 .61613 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .11538 .22865 m .11538 .2349 L s [(-2)] .11538 .21615 0 1 Mshowa .26923 .22865 m .26923 .2349 L s [(-1)] .26923 .21615 0 1 Mshowa .57692 .22865 m .57692 .2349 L s [(1)] .57692 .21615 0 1 Mshowa .73077 .22865 m .73077 .2349 L s [(2)] .73077 .21615 0 1 Mshowa .88462 .22865 m .88462 .2349 L s [(3)] .88462 .21615 0 1 Mshowa .125 Mabswid .14615 .22865 m .14615 .2324 L s .17692 .22865 m .17692 .2324 L s .20769 .22865 m .20769 .2324 L s .23846 .22865 m .23846 .2324 L s .3 .22865 m .3 .2324 L s .33077 .22865 m .33077 .2324 L s .36154 .22865 m .36154 .2324 L s .39231 .22865 m .39231 .2324 L s .45385 .22865 m .45385 .2324 L s .48462 .22865 m .48462 .2324 L s .51538 .22865 m .51538 .2324 L s .54615 .22865 m .54615 .2324 L s .60769 .22865 m .60769 .2324 L s .63846 .22865 m .63846 .2324 L s .66923 .22865 m .66923 .2324 L s .7 .22865 m .7 .2324 L s .76154 .22865 m .76154 .2324 L s .79231 .22865 m .79231 .2324 L s .82308 .22865 m .82308 .2324 L s .85385 .22865 m .85385 .2324 L s .08462 .22865 m .08462 .2324 L s .05385 .22865 m .05385 .2324 L s .02308 .22865 m .02308 .2324 L s .91538 .22865 m .91538 .2324 L s .94615 .22865 m .94615 .2324 L s .97692 .22865 m .97692 .2324 L s .25 Mabswid 0 .22865 m 1 .22865 L s .42308 .07366 m .42933 .07366 L s [(-4)] .41058 .07366 1 0 Mshowa .42308 .15116 m .42933 .15116 L s [(-2)] .41058 .15116 1 0 Mshowa .42308 .30615 m .42933 .30615 L s [(2)] .41058 .30615 1 0 Mshowa .42308 .38364 m .42933 .38364 L s [(4)] .41058 .38364 1 0 Mshowa .42308 .46114 m .42933 .46114 L s [(6)] .41058 .46114 1 0 Mshowa .42308 .53863 m .42933 .53863 L s [(8)] .41058 .53863 1 0 Mshowa .42308 .61613 m .42933 .61613 L s [(10)] .41058 .61613 1 0 Mshowa .125 Mabswid .42308 .01554 m .42683 .01554 L s .42308 .03492 m .42683 .03492 L s .42308 .05429 m .42683 .05429 L s .42308 .09304 m .42683 .09304 L s .42308 .11241 m .42683 .11241 L s .42308 .13178 m .42683 .13178 L s .42308 .17053 m .42683 .17053 L s .42308 .1899 m .42683 .1899 L s .42308 .20928 m .42683 .20928 L s .42308 .24803 m .42683 .24803 L s .42308 .2674 m .42683 .2674 L s .42308 .28677 m .42683 .28677 L s .42308 .32552 m .42683 .32552 L s .42308 .34489 m .42683 .34489 L s .42308 .36427 m .42683 .36427 L s .42308 .40302 m .42683 .40302 L s .42308 .42239 m .42683 .42239 L s .42308 .44176 m .42683 .44176 L s .42308 .48051 m .42683 .48051 L s .42308 .49988 m .42683 .49988 L s .42308 .51926 m .42683 .51926 L s .42308 .558 m .42683 .558 L s .42308 .57738 m .42683 .57738 L s .42308 .59675 m .42683 .59675 L s .25 Mabswid .42308 0 m .42308 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .02 0 1 r 7 Mabswid .11538 .22865 Mdot .52564 .30902 Mdot .57692 .22865 Mdot .88462 .22865 Mdot .30211 .54672 Mdot .74917 .07131 Mdot % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{288, 177.938}, ImageMargins->{{43, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg"], ImageRangeCache->{{{0, 287}, {176.938, 0}} -> {-2.83281, -5.90117, \ 0.0232252, 0.0922152}}], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.423077 0.153846 0.228652 0.0387474 [ [.11538 .21615 -6 -9 ] [.11538 .21615 6 0 ] [.26923 .21615 -6 -9 ] [.26923 .21615 6 0 ] [.57692 .21615 -3 -9 ] [.57692 .21615 3 0 ] [.73077 .21615 -3 -9 ] [.73077 .21615 3 0 ] [.88462 .21615 -3 -9 ] [.88462 .21615 3 0 ] [.41058 .07366 -12 -4.5 ] [.41058 .07366 0 4.5 ] [.41058 .15116 -12 -4.5 ] [.41058 .15116 0 4.5 ] [.41058 .30615 -6 -4.5 ] [.41058 .30615 0 4.5 ] [.41058 .38364 -6 -4.5 ] [.41058 .38364 0 4.5 ] [.41058 .46114 -6 -4.5 ] [.41058 .46114 0 4.5 ] [.41058 .53863 -6 -4.5 ] [.41058 .53863 0 4.5 ] [.41058 .61613 -12 -4.5 ] [.41058 .61613 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .11538 .22865 m .11538 .2349 L s [(-2)] .11538 .21615 0 1 Mshowa .26923 .22865 m .26923 .2349 L s [(-1)] .26923 .21615 0 1 Mshowa .57692 .22865 m .57692 .2349 L s [(1)] .57692 .21615 0 1 Mshowa .73077 .22865 m .73077 .2349 L s [(2)] .73077 .21615 0 1 Mshowa .88462 .22865 m .88462 .2349 L s [(3)] .88462 .21615 0 1 Mshowa .125 Mabswid .14615 .22865 m .14615 .2324 L s .17692 .22865 m .17692 .2324 L s .20769 .22865 m .20769 .2324 L s .23846 .22865 m .23846 .2324 L s .3 .22865 m .3 .2324 L s .33077 .22865 m .33077 .2324 L s .36154 .22865 m .36154 .2324 L s .39231 .22865 m .39231 .2324 L s .45385 .22865 m .45385 .2324 L s .48462 .22865 m .48462 .2324 L s .51538 .22865 m .51538 .2324 L s .54615 .22865 m .54615 .2324 L s .60769 .22865 m .60769 .2324 L s .63846 .22865 m .63846 .2324 L s .66923 .22865 m .66923 .2324 L s .7 .22865 m .7 .2324 L s .76154 .22865 m .76154 .2324 L s .79231 .22865 m .79231 .2324 L s .82308 .22865 m .82308 .2324 L s .85385 .22865 m .85385 .2324 L s .08462 .22865 m .08462 .2324 L s .05385 .22865 m .05385 .2324 L s .02308 .22865 m .02308 .2324 L s .91538 .22865 m .91538 .2324 L s .94615 .22865 m .94615 .2324 L s .97692 .22865 m .97692 .2324 L s .25 Mabswid 0 .22865 m 1 .22865 L s .42308 .07366 m .42933 .07366 L s [(-4)] .41058 .07366 1 0 Mshowa .42308 .15116 m .42933 .15116 L s [(-2)] .41058 .15116 1 0 Mshowa .42308 .30615 m .42933 .30615 L s [(2)] .41058 .30615 1 0 Mshowa .42308 .38364 m .42933 .38364 L s [(4)] .41058 .38364 1 0 Mshowa .42308 .46114 m .42933 .46114 L s [(6)] .41058 .46114 1 0 Mshowa .42308 .53863 m .42933 .53863 L s [(8)] .41058 .53863 1 0 Mshowa .42308 .61613 m .42933 .61613 L s [(10)] .41058 .61613 1 0 Mshowa .125 Mabswid .42308 .01554 m .42683 .01554 L s .42308 .03492 m .42683 .03492 L s .42308 .05429 m .42683 .05429 L s .42308 .09304 m .42683 .09304 L s .42308 .11241 m .42683 .11241 L s .42308 .13178 m .42683 .13178 L s .42308 .17053 m .42683 .17053 L s .42308 .1899 m .42683 .1899 L s .42308 .20928 m .42683 .20928 L s .42308 .24803 m .42683 .24803 L s .42308 .2674 m .42683 .2674 L s .42308 .28677 m .42683 .28677 L s .42308 .32552 m .42683 .32552 L s .42308 .34489 m .42683 .34489 L s .42308 .36427 m .42683 .36427 L s .42308 .40302 m .42683 .40302 L s .42308 .42239 m .42683 .42239 L s .42308 .44176 m .42683 .44176 L s .42308 .48051 m .42683 .48051 L s .42308 .49988 m .42683 .49988 L s .42308 .51926 m .42683 .51926 L s .42308 .558 m .42683 .558 L s .42308 .57738 m .42683 .57738 L s .42308 .59675 m .42683 .59675 L s .25 Mabswid .42308 0 m .42308 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .06483 0 m .06878 .02308 L .09717 .15542 L .12314 .25716 L .14712 .3357 L .1733 .40559 L .20097 .46272 L .22726 .50229 L .241 .51764 L .25393 .52897 L .26555 .53666 L .27209 .54001 L .27811 .54247 L .28125 .54352 L .28461 .54448 L .28752 .54517 L .29068 .54577 L .2926 .54607 L .29438 .54629 L .29608 .54646 L .29789 .54659 L .30102 .54671 L .3028 .54672 L .30447 .54668 L .30788 .54649 L .30959 .54633 L .31146 .54611 L .31478 .5456 L .31787 .54499 L .32486 .54316 L .33232 .5405 L .34609 .53382 L .35879 .52573 L .38749 .50133 L .43957 .43952 L .54141 .2839 L .59258 .20543 L .63934 .1433 L .66339 .11711 L .6896 .09439 L .70398 .08491 L .71097 .08113 L .7173 .07822 L .72343 .07586 L .73004 .07385 L .73368 .07298 L .73703 .07235 L .74023 .07188 L .7436 .07153 L .74677 .07135 L Mistroke .74856 .07131 L .75021 .07132 L .75324 .07143 L .75646 .07169 L .75933 .07206 L .76203 .07251 L .76816 .07396 L .77477 .07617 L .78083 .0788 L .79446 .08693 L .80551 .09586 L .81758 .1081 L .84188 .14112 L .8685 .191 L .89266 .24967 L .94685 .43234 L Mfstroke .94685 .43234 m .98584 .61803 L s .02 0 1 r 7 Mabswid .11538 .22865 Mdot .52564 .30902 Mdot .57692 .22865 Mdot .88462 .22865 Mdot .30211 .54672 Mdot .74917 .07131 Mdot % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{288, 177.938}, ImageMargins->{{43, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg`3oool001X0oooo00<00000 0?ooo`3oool0G03oool3000004P0oooo00<000000?ooo`3oool07P3oool00`000000oooo0?ooo`0h 0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04L0oooo00<000000?oo o`3oool0803oool00`000000oooo0?ooo`0g0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`03 0000003oool0oooo04H0oooo00<000000?ooo`3oool08P3oool00`000000oooo0?ooo`0f0?ooo`00 6`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04@0oooo0P00000U0?ooo`030000 003oool0oooo03H0oooo000K0?ooo`030000003oool0oooo05/0oooo00<000000?ooo`3oool0@`3o ool00`000000oooo0?ooo`0V0?ooo`030000003oool0oooo03D0oooo000K0?ooo`030000003oool0 oooo05/0oooo0`0000120?ooo`030000003oool0oooo02P0oooo00<000000?ooo`3oool0=03oool0 01`0oooo00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`110?ooo`030000003oool0oooo 02X0oooo00<000000?ooo`3oool0<`3oool001`0oooo00<000000?ooo`3oool0FP3oool00`000000 oooo0?ooo`100?ooo`030000003oool0oooo02/0oooo00<000000?ooo`3oool0<`3oool001`0oooo 00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02d0oooo 00<000000?ooo`3oool003oool00`000000oooo0?ooo`0]0?ooo`007P3oool00`00 0000oooo0?ooo`1A0?ooo`030000003oool0oooo00@0oooo0`00000h0?ooo`030000003oool0oooo 03X0oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0BP3oool4000000@0 oooo00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`0h0?ooo`030000003oool0oooo03X0 oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0D`3oool00`000000oooo 0?ooo`020?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0?03oool00`000000oooo 0?ooo`0[0?ooo`007`3oool00`000000oooo0?ooo`1?0?ooo`040000003oool0oooo000000@0oooo 00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`0m0?ooo`030000003oool0oooo02/0oooo 000O0?ooo`030000003oool0oooo0500oooo0P0000050?ooo`030000003oool0oooo03D0oooo00<0 00000?ooo`3oool0?`3oool00`000000oooo0?ooo`0Z0?ooo`007`3oool00`000000oooo0?ooo`1G 0?ooo`<00000=@3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02X0oooo000O0?oo o`030000003oool0oooo05L0oooo00<000000?ooo`3oool0=03oool00`000000oooo0?ooo`110?oo o`030000003oool0oooo02T0oooo000P0?ooo`030000003oool0oooo05H0oooo00<000000?ooo`3o ool0<`3oool00`000000oooo0?ooo`120?ooo`030000003oool0oooo02T0oooo000P0?ooo`030000 003oool0oooo05H0oooo00<000000?ooo`3oool00?ooo`030000003oool0oooo 01h0oooo00<000000?ooo`3oool0H`3oool00`000000oooo0?ooo`0M0?ooo`00:@3oool00`000000 oooo0?ooo`1=0?ooo`030000003oool0oooo01d0oooo00<000000?ooo`3oool0I@3oool00`000000 oooo0?ooo`0L0?ooo`00:@3oool00`000000oooo0?ooo`150?ooo`@00000103oool00`000000oooo 0?ooo`0I0?ooo`@01@3oJ03oool00`000000oooo0?ooo`0L0?ooo`00:@3oool00`000000oooo0?oo o`150?ooo`030000003oool0oooo00D0oooo00<000000?ooo`3oool0603oool600D0ofL0oooo00<0 00000?ooo`3oool0703oool002X0oooo00<000000?ooo`3oool0A@3oool00`000000oooo0?ooo`04 0?ooo`<00000603oool600D0ofP0oooo00<000000?ooo`3oool06`3oool002X0oooo00<000000?oo o`3oool0AP3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo01P0oooo1P050?mX0?oo o`030000003oool0oooo01/0oooo000Z0?ooo`030000003oool0oooo04L0oooo00<000000?ooo`3o ool00P3oool00`000000oooo0?ooo`0H0?ooo`H01@3oJ03oool00`000000oooo0?ooo`0K0?ooo`00 :P3oool00`000000oooo0?ooo`140?ooo`040000003oool0oooo000000@0oooo00<000000?ooo`3o ool06@3oool400D0ofT0oooo00<000000?ooo`3oool06`3oool002/0oooo00<000000?ooo`3oool0 A03oool2000000D0oooo00<000000?ooo`3oool0603oool00`000000oooo0?ooo`1/0?ooo`030000 003oool0oooo01X0oooo000[0?ooo`030000003oool0oooo04/0oooo00<000000?ooo`3oool0603o ool00`000000oooo0?ooo`1/0?ooo`030000003oool0oooo01X0oooo000[0?ooo`030000003oool0 oooo04/0oooo0`00000G0?ooo`030000003oool0oooo06d0oooo00<000000?ooo`3oool06P3oool0 02/0oooo00<000000?ooo`3oool0B`3oool00`000000oooo0?ooo`0F0?ooo`030000003oool0oooo 06l0oooo00<000000?ooo`3oool06@3oool002`0oooo00<000000?ooo`3oool0BP3oool00`000000 oooo0?ooo`0F0?ooo`030000003oool0oooo06l0oooo00<000000?ooo`3oool06@3oool002`0oooo 00<000000?ooo`3oool0BP3oool00`000000oooo0?ooo`0E0?ooo`030000003oool0oooo0700oooo 00<000000?ooo`3oool06@3oool002`0oooo00<000000?ooo`3oool0BP3oool00`000000oooo0?oo o`0D0?ooo`030000003oool0oooo0780oooo00<000000?ooo`3oool0603oool002d0oooo00<00000 0?ooo`3oool0B@3oool3000001@0oooo00<000000?ooo`3oool0LP3oool00`000000oooo0?ooo`0H 0?ooo`00;@3oool00`000000oooo0?ooo`190?ooo`030000003oool0oooo01<0oooo00<000000?oo o`3oool0L`3oool00`000000oooo0?ooo`0H0?ooo`00;P3oool00`000000oooo0?ooo`180?ooo`03 0000003oool0oooo0180oooo00<000000?ooo`3oool0M03oool00`000000oooo0?ooo`0H0?ooo`00 ;P3oool00`000000oooo0?ooo`180?ooo`030000003oool0oooo0180oooo00<000000?ooo`3oool0 M@3oool00`000000oooo0?ooo`0G0?ooo`00;`3oool00`000000oooo0?ooo`170?ooo`030000003o ool0oooo0140oooo00<000000?ooo`3oool0MP3oool00`000000oooo0?ooo`0G0?ooo`00;`3oool0 0`000000oooo0?ooo`170?ooo`030000003oool0oooo0140oooo00<000000?ooo`3oool0MP3oool0 0`000000oooo0?ooo`0G0?ooo`00;`3oool00`000000oooo0?ooo`170?ooo`<00000403oool00`00 0000oooo0?ooo`1h0?ooo`030000003oool0oooo01H0oooo000`0?ooo`030000003oool0oooo04H0 oooo00<000000?ooo`3oool03`3oool00`000000oooo0?ooo`1i0?ooo`030000003oool0oooo01H0 oooo000`0?ooo`030000003oool0oooo04H0oooo00<000000?ooo`3oool03`3oool00`000000oooo 0?ooo`1i0?ooo`030000003oool0oooo01H0oooo000a0?ooo`030000003oool0oooo03l0oooo00<0 00000?ooo`3oool00`3oool00`000000oooo0?ooo`0>0?ooo`030000003oool0oooo07X0oooo00<0 00000?ooo`3oool05P3oool00340oooo00<000000?ooo`3oool0?`3oool00`000000oooo0?ooo`03 0?ooo`030000003oool0oooo00d0oooo00<000000?ooo`3oool0O03oool00`000000oooo0?ooo`0E 0?ooo`00<@3oool00`000000oooo0?ooo`0l0?ooo`D00000103oool3000000d0oooo00<000000?oo o`3oool0O03oool00`000000oooo0?ooo`0E0?ooo`00P3oool00`000000oooo0?ooo`0e0?ooo`8000001@3oool00`000000oooo0000002A0?ooo`03 0000003oool0oooo0100oooo000k0?ooo`030000003oool0oooo03<0oooo00@000000?ooo`3oool0 0000103oool200000980oooo00<000000?ooo`3oool0403oool003/0oooo00<000000?ooo`3oool0 <`3oool010000000oooo0?ooo`0000040?ooo`<00000TP3oool00`000000oooo0?ooo`0?0?ooo`00 ?03oool00`000000oooo0?ooo`0b0?ooo`<00000103oool2000009@0oooo00<000000?ooo`3oool0 3`3oool003`0oooo00<000000?ooo`3oool00?ooo`00?`3oool00`000000oooo0?ooo`0c0?ooo`040000003oool0oooo 0?ooo`<00000T`3oool00`000000oooo0?ooo`0>0?ooo`00?`3oool00`000000oooo0?ooo`0b0?oo o`030000003oool0oooo0080oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0>0?oo o`00@03oool00`000000oooo0?ooo`0`0?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3o ool0T`3oool00`000000oooo0?ooo`0>0?ooo`00@@3oool00`000000oooo0?ooo`0^0?ooo`030000 003oool0oooo00@0oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0>0?ooo`00@P3o ool00`000000oooo0?ooo`0]0?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool0U03o ool00`000000oooo0?ooo`0=0?ooo`00@P3oool00`000000oooo0?ooo`0/0?ooo`030000003oool0 oooo00D0oooo0`00002D0?ooo`030000003oool0oooo00d0oooo00130?ooo`030000003oool0oooo 02X0oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`2D0?ooo`030000003oool0oooo 00d0oooo00140?ooo`030000003oool0oooo02P0oooo00<000000?ooo`3oool01`3oool00`000000 oooo0?ooo`2D0?ooo`030000003oool0oooo00d0oooo00150?ooo`030000003oool0oooo02D0oooo 0P00000:0?ooo`030000003oool0oooo09@0oooo00<000000?ooo`3oool03@3oool004H0oooo00<0 00000?ooo`3oool08`3oool00`000000oooo0?ooo`0:0?ooo`030000003oool0oooo09D0oooo00<0 00000?ooo`3oool0303oool004L0oooo00<000000?ooo`3oool08@3oool00`000000oooo0?ooo`0; 0?ooo`030000003oool0oooo09D0oooo00<000000?ooo`3oool0303oool004P0oooo00<000000?oo o`3oool07P3oool2000000h0oooo0`00002E0?ooo`030000003oool0oooo00`0oooo00190?ooo`03 0000003oool0oooo01`0oooo00<000000?ooo`3oool03P3oool00`000000oooo0?ooo`2E0?ooo`03 0000003oool0oooo00`0oooo00190?ooo`030000003oool0oooo01/0oooo00<000000?ooo`3oool0 3`3oool00`000000oooo0?ooo`2F0?ooo`030000003oool0oooo00/0oooo001:0?ooo`030000003o ool0oooo01P0oooo0P00000;0?ooo`8000001@3oool00`000000oooo0?ooo`2F0?ooo`030000003o ool0oooo00/0oooo001;0?ooo`8000005P3oool2000000`0oooo00@000000?ooo`3oool00000103o ool00`000000oooo0?ooo`2F0?ooo`030000003oool0oooo00/0oooo001=0?ooo`800000203oool4 00D0o`H0oooo0P00000>0?ooo`040000003oool0oooo000000@0oooo0`00002F0?ooo`030000003o ool0oooo00/0oooo001?0?ooo`<00000103oool600D0o`<0oooo0P00000A0?ooo`8000001@3oool0 0`000000oooo0?ooo`2F0?ooo`030000003oool0oooo00/0oooo001B0?ooo`@000001P050?l30000 0180oooo00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`2G0?ooo`030000003oool0 oooo00X0oooo001F0?ooo`H01@3o5@3oool010000000oooo0?ooo`0000040?ooo`030000003oool0 oooo09L0oooo00<000000?ooo`3oool02P3oool005H0oooo1P050?lF0?ooo`8000001@3oool00`00 0000oooo0?ooo`2G0?ooo`030000003oool0oooo00X0oooo001G0?ooo`@01@3o7P3oool00`000000 oooo0?ooo`2G0?ooo`030000003oool0oooo00X0oooo001i0?ooo`<00000U`3oool00`000000oooo 0?ooo`0:0?ooo`00N@3oool00`000000oooo0?ooo`2H0?ooo`030000003oool0oooo00T0oooo001i 0?ooo`030000003oool0oooo09P0oooo00<000000?ooo`3oool02@3oool007T0oooo00<000000?oo o`3oool0V03oool00`000000oooo0?ooo`090?ooo`00N@3oool00`000000oooo0?ooo`2H0?ooo`03 0000003oool0oooo00T0oooo001i0?ooo`<00000V03oool00`000000oooo0?ooo`090?ooo`00N@3o ool00`000000oooo0?ooo`2I0?ooo`030000003oool0oooo00P0oooo001i0?ooo`030000003oool0 oooo09T0oooo00<000000?ooo`3oool0203oool007T0oooo00<000000?ooo`3oool0V@3oool00`00 0000oooo0?ooo`080?ooo`00N@3oool00`000000oooo0?ooo`2I0?ooo`030000003oool0oooo00P0 oooo001i0?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3oool01`3oool007T0oooo0`00 002J0?ooo`030000003oool0oooo00L0oooo001i0?ooo`030000003oool0oooo09X0oooo00<00000 0?ooo`3oool01`3oool007T0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`070?oo o`00J`3oool4000000<0oooo0P0000050?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3o ool01`3oool006d0oooo00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo0080 oooo00<000000?ooo`3oool0V`3oool00`000000oooo0?ooo`060?ooo`00K@3oool01@000000oooo 0?ooo`3oool000000080oooo00<000000?ooo`3oool00P3oool3000009/0oooo00<000000?ooo`3o ool01P3oool006d0oooo00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo0080 oooo00<000000?ooo`3oool0V`3oool00`000000oooo0?ooo`060?ooo`00K@3oool01@000000oooo 0?ooo`3oool000000080oooo00<000000?ooo`3oool0Z@3oool006/0oooo0`0000030?ooo`040000 003oool0oooo00000:/0oooo001]0?ooo`030000003oool0oooo0080oooo0P00002/0?ooo`00\ \>"], ImageRangeCache->{{{0, 287}, {176.938, 0}} -> {-2.83281, -5.90117, \ 0.0232252, 0.0922152}}] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell["Adding Labels to the graph", "Subsection"], Cell[TextData[{ "The combined graph above should be good enough, but if you really want to \ paste text labels onto the graph, it is certainly possible. Use ", StyleBox["Graphics[Text[", FontWeight->"Bold"], "...", StyleBox["]]", FontWeight->"Bold"], " to create graphics items which can be combined with ", StyleBox["graph1", FontWeight->"Bold"], " and ", StyleBox["graph2. ", FontWeight->"Bold"], "You can always resize the plot using your mouse; do so before you try to \ fine-tune the offset for the labels!" }], "Text"], Cell[BoxData[ \(\(label3\ = \ \ Graphics[ Text[\ \ StyleForm[\*"\"\<(\!\(2\/3\),\!\(56\/27\))\>\"", \ FontSize \[Rule] 9], \[IndentingNewLine]\ {2/3, 56/27}, {\(-1\), \(-1\)}]];\)\)], "Input"], Cell[CellGroupData[{ Cell[BoxData[ \(\(Show[\ graph1, \ graph2, \ label3];\)\)], "Input"], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.423077 0.153846 0.228652 0.0387474 [ [.11538 .21615 -6 -9 ] [.11538 .21615 6 0 ] [.26923 .21615 -6 -9 ] [.26923 .21615 6 0 ] [.57692 .21615 -3 -9 ] [.57692 .21615 3 0 ] [.73077 .21615 -3 -9 ] [.73077 .21615 3 0 ] [.88462 .21615 -3 -9 ] [.88462 .21615 3 0 ] [.41058 .07366 -12 -4.5 ] [.41058 .07366 0 4.5 ] [.41058 .15116 -12 -4.5 ] [.41058 .15116 0 4.5 ] [.41058 .30615 -6 -4.5 ] [.41058 .30615 0 4.5 ] [.41058 .38364 -6 -4.5 ] [.41058 .38364 0 4.5 ] [.41058 .46114 -6 -4.5 ] [.41058 .46114 0 4.5 ] [.41058 .53863 -6 -4.5 ] [.41058 .53863 0 4.5 ] [.41058 .61613 -12 -4.5 ] [.41058 .61613 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .11538 .22865 m .11538 .2349 L s [(-2)] .11538 .21615 0 1 Mshowa .26923 .22865 m .26923 .2349 L s [(-1)] .26923 .21615 0 1 Mshowa .57692 .22865 m .57692 .2349 L s [(1)] .57692 .21615 0 1 Mshowa .73077 .22865 m .73077 .2349 L s [(2)] .73077 .21615 0 1 Mshowa .88462 .22865 m .88462 .2349 L s [(3)] .88462 .21615 0 1 Mshowa .125 Mabswid .14615 .22865 m .14615 .2324 L s .17692 .22865 m .17692 .2324 L s .20769 .22865 m .20769 .2324 L s .23846 .22865 m .23846 .2324 L s .3 .22865 m .3 .2324 L s .33077 .22865 m .33077 .2324 L s .36154 .22865 m .36154 .2324 L s .39231 .22865 m .39231 .2324 L s .45385 .22865 m .45385 .2324 L s .48462 .22865 m .48462 .2324 L s .51538 .22865 m .51538 .2324 L s .54615 .22865 m .54615 .2324 L s .60769 .22865 m .60769 .2324 L s .63846 .22865 m .63846 .2324 L s .66923 .22865 m .66923 .2324 L s .7 .22865 m .7 .2324 L s .76154 .22865 m .76154 .2324 L s .79231 .22865 m .79231 .2324 L s .82308 .22865 m .82308 .2324 L s .85385 .22865 m .85385 .2324 L s .08462 .22865 m .08462 .2324 L s .05385 .22865 m .05385 .2324 L s .02308 .22865 m .02308 .2324 L s .91538 .22865 m .91538 .2324 L s .94615 .22865 m .94615 .2324 L s .97692 .22865 m .97692 .2324 L s .25 Mabswid 0 .22865 m 1 .22865 L s .42308 .07366 m .42933 .07366 L s [(-4)] .41058 .07366 1 0 Mshowa .42308 .15116 m .42933 .15116 L s [(-2)] .41058 .15116 1 0 Mshowa .42308 .30615 m .42933 .30615 L s [(2)] .41058 .30615 1 0 Mshowa .42308 .38364 m .42933 .38364 L s [(4)] .41058 .38364 1 0 Mshowa .42308 .46114 m .42933 .46114 L s [(6)] .41058 .46114 1 0 Mshowa .42308 .53863 m .42933 .53863 L s [(8)] .41058 .53863 1 0 Mshowa .42308 .61613 m .42933 .61613 L s [(10)] .41058 .61613 1 0 Mshowa .125 Mabswid .42308 .01554 m .42683 .01554 L s .42308 .03492 m .42683 .03492 L s .42308 .05429 m .42683 .05429 L s .42308 .09304 m .42683 .09304 L s .42308 .11241 m .42683 .11241 L s .42308 .13178 m .42683 .13178 L s .42308 .17053 m .42683 .17053 L s .42308 .1899 m .42683 .1899 L s .42308 .20928 m .42683 .20928 L s .42308 .24803 m .42683 .24803 L s .42308 .2674 m .42683 .2674 L s .42308 .28677 m .42683 .28677 L s .42308 .32552 m .42683 .32552 L s .42308 .34489 m .42683 .34489 L s .42308 .36427 m .42683 .36427 L s .42308 .40302 m .42683 .40302 L s .42308 .42239 m .42683 .42239 L s .42308 .44176 m .42683 .44176 L s .42308 .48051 m .42683 .48051 L s .42308 .49988 m .42683 .49988 L s .42308 .51926 m .42683 .51926 L s .42308 .558 m .42683 .558 L s .42308 .57738 m .42683 .57738 L s .42308 .59675 m .42683 .59675 L s .25 Mabswid .42308 0 m .42308 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .06483 0 m .06878 .02308 L .09717 .15542 L .12314 .25716 L .14712 .3357 L .1733 .40559 L .20097 .46272 L .22726 .50229 L .241 .51764 L .25393 .52897 L .26555 .53666 L .27209 .54001 L .27811 .54247 L .28125 .54352 L .28461 .54448 L .28752 .54517 L .29068 .54577 L .2926 .54607 L .29438 .54629 L .29608 .54646 L .29789 .54659 L .30102 .54671 L .3028 .54672 L .30447 .54668 L .30788 .54649 L .30959 .54633 L .31146 .54611 L .31478 .5456 L .31787 .54499 L .32486 .54316 L .33232 .5405 L .34609 .53382 L .35879 .52573 L .38749 .50133 L .43957 .43952 L .54141 .2839 L .59258 .20543 L .63934 .1433 L .66339 .11711 L .6896 .09439 L .70398 .08491 L .71097 .08113 L .7173 .07822 L .72343 .07586 L .73004 .07385 L .73368 .07298 L .73703 .07235 L .74023 .07188 L .7436 .07153 L .74677 .07135 L Mistroke .74856 .07131 L .75021 .07132 L .75324 .07143 L .75646 .07169 L .75933 .07206 L .76203 .07251 L .76816 .07396 L .77477 .07617 L .78083 .0788 L .79446 .08693 L .80551 .09586 L .81758 .1081 L .84188 .14112 L .8685 .191 L .89266 .24967 L .94685 .43234 L Mfstroke .94685 .43234 m .98584 .61803 L s .02 0 1 r 7 Mabswid .11538 .22865 Mdot .52564 .30902 Mdot .57692 .22865 Mdot .88462 .22865 Mdot .30211 .54672 Mdot .74917 .07131 Mdot 0 g gsave .52564 .30902 -61 -4 Mabsadd m 1 1 Mabs scale currentpoint translate 0 26.5 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def 63.000 16.000 moveto %%IncludeResource: font Courier %%IncludeFont: Courier %%BeginResource: font Courier-MISO %%BeginFont: Courier-MISO /Courier /Courier-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto %%IncludeResource: font Mathematica2Mono %%IncludeFont: Mathematica2Mono /Mathematica2Mono findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 16.000 moveto (H) show 71.125 10.562 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1Mono %%IncludeFont: Mathematica1Mono /Mathematica1Mono findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 70.000 16.000 moveto (\\200) show 71.812 16.000 moveto (\\200) show 73.625 16.000 moveto (\\200) show 75.438 16.000 moveto (\\200) show 76.000 16.000 moveto (\\200) show 71.125 21.375 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 79.312 16.000 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 87.438 10.562 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (56) show %%IncludeResource: font Mathematica1Mono %%IncludeFont: Mathematica1Mono /Mathematica1Mono findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 86.312 16.000 moveto (\\200) show 88.125 16.000 moveto (\\200) show 89.938 16.000 moveto (\\200) show 91.750 16.000 moveto (\\200) show 93.562 16.000 moveto (\\200) show 95.375 16.000 moveto (\\200) show 97.188 16.000 moveto (\\200) show 97.688 16.000 moveto (\\200) show 87.438 21.375 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2Mono %%IncludeFont: Mathematica2Mono /Mathematica2Mono findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 101.000 16.000 moveto (L) show 106.375 16.000 moveto %%IncludeResource: font Courier-MISO %%IncludeFont: Courier-MISO /Courier-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto 1.000 setlinewidth grestore % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{288, 177.938}, ImageMargins->{{43, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg`3oool001X0oooo00<00000 0?ooo`3oool0G03oool3000004P0oooo00<000000?ooo`3oool07P3oool00`000000oooo0?ooo`0h 0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04L0oooo00<000000?oo o`3oool0803oool00`000000oooo0?ooo`0g0?ooo`006`3oool00`000000oooo0?ooo`1K0?ooo`03 0000003oool0oooo04H0oooo00<000000?ooo`3oool08P3oool00`000000oooo0?ooo`0f0?ooo`00 6`3oool00`000000oooo0?ooo`1K0?ooo`030000003oool0oooo04@0oooo0P00000U0?ooo`030000 003oool0oooo03H0oooo000K0?ooo`030000003oool0oooo05/0oooo00<000000?ooo`3oool0@`3o ool00`000000oooo0?ooo`0V0?ooo`030000003oool0oooo03D0oooo000K0?ooo`030000003oool0 oooo05/0oooo0`0000120?ooo`030000003oool0oooo02P0oooo00<000000?ooo`3oool0=03oool0 01`0oooo00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`110?ooo`030000003oool0oooo 02X0oooo00<000000?ooo`3oool0<`3oool001`0oooo00<000000?ooo`3oool0FP3oool00`000000 oooo0?ooo`100?ooo`030000003oool0oooo02/0oooo00<000000?ooo`3oool0<`3oool001`0oooo 00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02d0oooo 00<000000?ooo`3oool003oool00`000000oooo0?ooo`0]0?ooo`007P3oool00`00 0000oooo0?ooo`1A0?ooo`030000003oool0oooo00@0oooo0`00000h0?ooo`030000003oool0oooo 03X0oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0BP3oool4000000@0 oooo00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`0h0?ooo`030000003oool0oooo03X0 oooo00<000000?ooo`3oool0;03oool001h0oooo00<000000?ooo`3oool0D`3oool00`000000oooo 0?ooo`020?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0?03oool00`000000oooo 0?ooo`0[0?ooo`007`3oool00`000000oooo0?ooo`1?0?ooo`040000003oool0oooo000000@0oooo 00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`0m0?ooo`030000003oool0oooo02/0oooo 000O0?ooo`030000003oool0oooo0500oooo0P0000050?ooo`030000003oool0oooo03D0oooo00<0 00000?ooo`3oool0?`3oool00`000000oooo0?ooo`0Z0?ooo`007`3oool00`000000oooo0?ooo`1G 0?ooo`<00000=@3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo02X0oooo000O0?oo o`030000003oool0oooo05L0oooo00<000000?ooo`3oool0=03oool00`000000oooo0?ooo`110?oo o`030000003oool0oooo02T0oooo000P0?ooo`030000003oool0oooo05H0oooo00<000000?ooo`3o ool0<`3oool00`000000oooo0?ooo`120?ooo`030000003oool0oooo02T0oooo000P0?ooo`030000 003oool0oooo05H0oooo00<000000?ooo`3oool00?ooo`030000003oool0oooo 01h0oooo00<000000?ooo`3oool0H`3oool00`000000oooo0?ooo`0M0?ooo`00:@3oool00`000000 oooo0?ooo`1=0?ooo`030000003oool0oooo01d0oooo00<000000?ooo`3oool0I@3oool00`000000 oooo0?ooo`0L0?ooo`00:@3oool00`000000oooo0?ooo`150?ooo`@00000103oool00`000000oooo 0?ooo`0I0?ooo`@01@3oJ03oool00`000000oooo0?ooo`0L0?ooo`00:@3oool00`000000oooo0?oo o`150?ooo`030000003oool0oooo00D0oooo00<000000?ooo`3oool0603oool600D0ofL0oooo00<0 00000?ooo`3oool0703oool002X0oooo00<000000?ooo`3oool0A@3oool00`000000oooo0?ooo`04 0?ooo`<00000603oool600D0ofP0oooo00<000000?ooo`3oool06`3oool002X0oooo00<000000?oo o`3oool0AP3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo01P0oooo1P050?mX0?oo o`030000003oool0oooo01/0oooo000Z0?ooo`030000003oool0oooo04L0oooo00<000000?ooo`3o ool00P3oool00`000000oooo0?ooo`0H0?ooo`H01@3oJ03oool00`000000oooo0?ooo`0K0?ooo`00 :P3oool00`000000oooo0?ooo`140?ooo`040000003oool0oooo000000@0oooo00<000000?ooo`3o ool06@3oool400D0o`P0oooo0`00000>0?ooo`@00000C03oool00`000000oooo0?ooo`0K0?ooo`00 :`3oool00`000000oooo0?ooo`140?ooo`8000001@3oool00`000000oooo0?ooo`0H0?ooo`030000 003oool0oooo00`0oooo00<000000?ooo`3oool03@3oool00`000000oooo000000030?ooo`030000 003oool0oooo04L0oooo00<000000?ooo`3oool06P3oool002/0oooo00<000000?ooo`3oool0B`3o ool00`000000oooo0?ooo`0H0?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool03`3o ool00`000000oooo0?ooo`020?ooo`030000003oool0oooo04L0oooo00<000000?ooo`3oool06P3o ool002/0oooo00<000000?ooo`3oool0B`3oool3000001L0oooo00<000000?ooo`3oool03@3oool0 0`000000oooo0?ooo`0<0?ooo`060000003oool0oooo0000003oool000000P3oool00`000000oooo 0?ooo`160?ooo`030000003oool0oooo01X0oooo000[0?ooo`030000003oool0oooo04/0oooo00<0 00000?ooo`3oool05P3oool00`000000oooo0?ooo`060?ooo`030000003oool0oooo00<0oooo0`00 000?0?ooo`<0000000<0oooo0000000000000P0000040?ooo`030000003oool0oooo0480oooo00<0 00000?ooo`3oool06@3oool002`0oooo00<000000?ooo`3oool0BP3oool00`000000oooo0?ooo`0F 0?ooo`030000003oool0oooo00D0oooo00<000000?ooo`3oool0303oool00`000000oooo0?ooo`0D 0?ooo`030000003oool0oooo0440oooo00<000000?ooo`3oool06@3oool002`0oooo00<000000?oo o`3oool0BP3oool00`000000oooo0?ooo`0E0?ooo`030000003oool0oooo00D0oooo00<000000?oo o`3oool03P3oool00`000000oooo0?ooo`0D0?ooo`030000003oool0oooo0400oooo00<000000?oo o`3oool06@3oool002`0oooo00<000000?ooo`3oool0BP3oool00`000000oooo0?ooo`0D0?ooo`03 0000003oool0oooo00H0oooo00<000000?ooo`3oool09@3oool00`000000oooo0?ooo`110?ooo`03 0000003oool0oooo01P0oooo000]0?ooo`030000003oool0oooo04T0oooo0`00000D0?ooo`030000 003oool0oooo00H0oooo00<000000?ooo`3oool00`3oool8000000P0oooo3P0000040?ooo`030000 003oool0oooo0440oooo00<000000?ooo`3oool0603oool002d0oooo00<000000?ooo`3oool0B@3o ool00`000000oooo0?ooo`0C0?ooo`030000003oool0oooo00L0oooo00<000000?ooo`3oool09@3o ool00`000000oooo0?ooo`110?ooo`030000003oool0oooo01P0oooo000^0?ooo`030000003oool0 oooo04P0oooo00<000000?ooo`3oool04P3oool00`000000oooo0?ooo`090?ooo`030000003oool0 oooo02<0oooo00<000000?ooo`3oool0@P3oool00`000000oooo0?ooo`0H0?ooo`00;P3oool00`00 0000oooo0?ooo`180?ooo`030000003oool0oooo0180oooo00<000000?ooo`3oool02P3oool00`00 0000oooo0?ooo`030?ooo`@000003@3oool3000000<0oooo0P0000050?ooo`030000003oool0oooo 04@0oooo00<000000?ooo`3oool05`3oool002l0oooo00<000000?ooo`3oool0A`3oool00`000000 oooo0?ooo`0A0?ooo`030000003oool0oooo0180oooo00<000000?ooo`000000403oool00`000000 oooo000000020?ooo`030000003oool0oooo04T0oooo00<000000?ooo`3oool05`3oool002l0oooo 00<000000?ooo`3oool0A`3oool00`000000oooo0?ooo`0A0?ooo`030000003oool0oooo01<0oooo 00<000000?ooo`3oool03`3oool00`000000oooo000000020?ooo`030000003oool0oooo04T0oooo 00<000000?ooo`3oool05`3oool002l0oooo00<000000?ooo`3oool0A`3oool300000100oooo00<0 00000?ooo`3oool04P3oool010000000oooo0?ooo`00000=0?ooo`<000000P3oool3000004d0oooo 00<000000?ooo`3oool05P3oool00300oooo00<000000?ooo`3oool0AP3oool00`000000oooo0?oo o`0?0?ooo`030000003oool0oooo01@0oooo0`00000=0?ooo`<000000`3oool3000004`0oooo00<0 00000?ooo`3oool05P3oool00300oooo00<000000?ooo`3oool0AP3oool00`000000oooo0?ooo`0? 0?ooo`030000003oool0oooo07T0oooo00<000000?ooo`3oool05P3oool00340oooo00<000000?oo o`3oool0?`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00h0oooo00<000000?oo o`3oool0NP3oool00`000000oooo0?ooo`0F0?ooo`00<@3oool00`000000oooo0?ooo`0o0?ooo`03 0000003oool0oooo00<0oooo00<000000?ooo`3oool03@3oool00`000000oooo0?ooo`1l0?ooo`03 0000003oool0oooo01D0oooo000a0?ooo`030000003oool0oooo03`0oooo1@0000040?ooo`<00000 3@3oool00`000000oooo0?ooo`1l0?ooo`030000003oool0oooo01D0oooo000b0?ooo`030000003o ool0oooo03/0oooo00@000000?ooo`3oool000001@3oool00`000000oooo0?ooo`0<0?ooo`030000 003oool0oooo07d0oooo00<000000?ooo`3oool05@3oool00380oooo00<000000?ooo`3oool0?03o ool00`000000oooo000000050?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool0O`3o ool00`000000oooo0?ooo`0D0?ooo`00<`3oool00`000000oooo0?ooo`0l0?ooo`8000001@3oool0 0`000000oooo0?ooo`0;0?ooo`030000003oool0oooo07l0oooo00<000000?ooo`3oool0503oool0 03<0oooo00<000000?ooo`3oool0?@3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo 00X0oooo00<000000?ooo`3oool0P03oool00`000000oooo0?ooo`0D0?ooo`00=03oool00`000000 oooo0?ooo`120?ooo`<000002@3oool00`000000oooo0?ooo`210?ooo`030000003oool0oooo01@0 oooo000d0?ooo`030000003oool0oooo0480oooo00<000000?ooo`3oool02@3oool00`000000oooo 0?ooo`220?ooo`030000003oool0oooo01<0oooo000d0?ooo`030000003oool0oooo0480oooo00<0 00000?ooo`3oool0203oool00`000000oooo0?ooo`230?ooo`030000003oool0oooo01<0oooo000e 0?ooo`030000003oool0oooo0440oooo00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`24 0?ooo`030000003oool0oooo01<0oooo000e0?ooo`030000003oool0oooo0440oooo00<000000?oo o`3oool01`3oool00`000000oooo0?ooo`250?ooo`030000003oool0oooo0180oooo000f0?ooo`03 0000003oool0oooo0400oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`260?ooo`03 0000003oool0oooo0180oooo000f0?ooo`030000003oool0oooo0400oooo0`0000050?ooo`030000 003oool0oooo08L0oooo00<000000?ooo`3oool04P3oool003L0oooo00<000000?ooo`3oool0?`3o ool00`000000oooo0?ooo`050?ooo`030000003oool0oooo08L0oooo00<000000?ooo`3oool04P3o ool003L0oooo00<000000?ooo`3oool0?`3oool00`000000oooo0?ooo`040?ooo`030000003oool0 oooo08T0oooo00<000000?ooo`3oool04@3oool003P0oooo00<000000?ooo`3oool0?P3oool00`00 0000oooo0?ooo`030?ooo`030000003oool0oooo08X0oooo00<000000?ooo`3oool04@3oool003P0 oooo00<000000?ooo`3oool0?P3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo08X0 oooo00<000000?ooo`3oool04@3oool003P0oooo00<000000?ooo`3oool0?P3oool300000080oooo 00<000000?ooo`3oool0R`3oool00`000000oooo0?ooo`0A0?ooo`00>@3oool00`000000oooo0?oo o`0m0?ooo`050000003oool0oooo0?ooo`000000S`3oool00`000000oooo0?ooo`0@0?ooo`00>@3o ool00`000000oooo0?ooo`0m0?ooo`040000003oool0oooo00000900oooo00<000000?ooo`3oool0 403oool003X0oooo00<000000?ooo`3oool0?03oool010000000oooo0?ooo`00002@0?ooo`030000 003oool0oooo0100oooo000j0?ooo`030000003oool0oooo03D0oooo0P0000050?ooo`030000003o ool000000940oooo00<000000?ooo`3oool0403oool003/0oooo00<000000?ooo`3oool0<`3oool0 10000000oooo0?ooo`0000040?ooo`800000TP3oool00`000000oooo0?ooo`0@0?ooo`00>`3oool0 0`000000oooo0?ooo`0c0?ooo`040000003oool0oooo000000@0oooo0`00002B0?ooo`030000003o ool0oooo00l0oooo000l0?ooo`030000003oool0oooo0380oooo0`0000040?ooo`800000U03oool0 0`000000oooo0?ooo`0?0?ooo`00?03oool00`000000oooo0?ooo`0b0?ooo`030000003oool0oooo 00<0oooo00<000000?ooo`000000U03oool00`000000oooo0?ooo`0?0?ooo`00?@3oool00`000000 oooo0?ooo`0a0?ooo`030000003oool0oooo00<0oooo00<000000?ooo`000000U03oool00`000000 oooo0?ooo`0?0?ooo`00?P3oool00`000000oooo0?ooo`0a0?ooo`<0000000D0oooo0000003oool0 oooo0000002E0?ooo`030000003oool0oooo00h0oooo000o0?ooo`030000003oool0oooo03<0oooo 00@000000?ooo`3oool0oooo0`00002C0?ooo`030000003oool0oooo00h0oooo000o0?ooo`030000 003oool0oooo0380oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`2C0?ooo`030000 003oool0oooo00h0oooo00100?ooo`030000003oool0oooo0300oooo00<000000?ooo`3oool00`3o ool00`000000oooo0?ooo`2C0?ooo`030000003oool0oooo00h0oooo00110?ooo`030000003oool0 oooo02h0oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`2C0?ooo`030000003oool0 oooo00h0oooo00120?ooo`030000003oool0oooo02d0oooo00<000000?ooo`3oool0103oool00`00 0000oooo0?ooo`2D0?ooo`030000003oool0oooo00d0oooo00120?ooo`030000003oool0oooo02`0 oooo00<000000?ooo`3oool01@3oool3000009@0oooo00<000000?ooo`3oool03@3oool004<0oooo 00<000000?ooo`3oool0:P3oool00`000000oooo0?ooo`060?ooo`030000003oool0oooo09@0oooo 00<000000?ooo`3oool03@3oool004@0oooo00<000000?ooo`3oool0:03oool00`000000oooo0?oo o`070?ooo`030000003oool0oooo09@0oooo00<000000?ooo`3oool03@3oool004D0oooo00<00000 0?ooo`3oool09@3oool2000000X0oooo00<000000?ooo`3oool0U03oool00`000000oooo0?ooo`0= 0?ooo`00AP3oool00`000000oooo0?ooo`0S0?ooo`030000003oool0oooo00X0oooo00<000000?oo o`3oool0U@3oool00`000000oooo0?ooo`0<0?ooo`00A`3oool00`000000oooo0?ooo`0Q0?ooo`03 0000003oool0oooo00/0oooo00<000000?ooo`3oool0U@3oool00`000000oooo0?ooo`0<0?ooo`00 B03oool00`000000oooo0?ooo`0N0?ooo`8000003P3oool3000009D0oooo00<000000?ooo`3oool0 303oool004T0oooo00<000000?ooo`3oool0703oool00`000000oooo0?ooo`0>0?ooo`030000003o ool0oooo09D0oooo00<000000?ooo`3oool0303oool004T0oooo00<000000?ooo`3oool06`3oool0 0`000000oooo0?ooo`0?0?ooo`030000003oool0oooo09H0oooo00<000000?ooo`3oool02`3oool0 04X0oooo00<000000?ooo`3oool0603oool2000000/0oooo0P0000050?ooo`030000003oool0oooo 09H0oooo00<000000?ooo`3oool02`3oool004/0oooo0P00000F0?ooo`800000303oool010000000 oooo0?ooo`0000040?ooo`030000003oool0oooo09H0oooo00<000000?ooo`3oool02`3oool004d0 oooo0P0000080?ooo`@01@3o1P3oool2000000h0oooo00@000000?ooo`3oool00000103oool30000 09H0oooo00<000000?ooo`3oool02`3oool004l0oooo0`0000040?ooo`H01@3o0`3oool200000140 oooo0P0000050?ooo`030000003oool0oooo09H0oooo00<000000?ooo`3oool02`3oool00580oooo 1000000600D0o`<000004P3oool010000000oooo0?ooo`0000040?ooo`030000003oool0oooo09L0 oooo00<000000?ooo`3oool02P3oool005H0oooo1P050?lE0?ooo`040000003oool0oooo000000@0 oooo00<000000?ooo`3oool0U`3oool00`000000oooo0?ooo`0:0?ooo`00EP3oool600D0oaH0oooo 0P0000050?ooo`030000003oool0oooo09L0oooo00<000000?ooo`3oool02P3oool005L0oooo1005 0?lN0?ooo`030000003oool0oooo09L0oooo00<000000?ooo`3oool02P3oool007T0oooo0`00002G 0?ooo`030000003oool0oooo00X0oooo001i0?ooo`030000003oool0oooo09P0oooo00<000000?oo o`3oool02@3oool007T0oooo00<000000?ooo`3oool0V03oool00`000000oooo0?ooo`090?ooo`00 N@3oool00`000000oooo0?ooo`2H0?ooo`030000003oool0oooo00T0oooo001i0?ooo`030000003o ool0oooo09P0oooo00<000000?ooo`3oool02@3oool007T0oooo0`00002H0?ooo`030000003oool0 oooo00T0oooo001i0?ooo`030000003oool0oooo09T0oooo00<000000?ooo`3oool0203oool007T0 oooo00<000000?ooo`3oool0V@3oool00`000000oooo0?ooo`080?ooo`00N@3oool00`000000oooo 0?ooo`2I0?ooo`030000003oool0oooo00P0oooo001i0?ooo`030000003oool0oooo09T0oooo00<0 00000?ooo`3oool0203oool007T0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`07 0?ooo`00N@3oool3000009X0oooo00<000000?ooo`3oool01`3oool007T0oooo00<000000?ooo`3o ool0VP3oool00`000000oooo0?ooo`070?ooo`00N@3oool00`000000oooo0?ooo`2J0?ooo`030000 003oool0oooo00L0oooo001[0?ooo`@000000`3oool2000000D0oooo00<000000?ooo`3oool0VP3o ool00`000000oooo0?ooo`070?ooo`00K@3oool01@000000oooo0?ooo`3oool000000080oooo00<0 00000?ooo`3oool00P3oool00`000000oooo0?ooo`2K0?ooo`030000003oool0oooo00H0oooo001] 0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000oooo0?ooo`020?ooo`<00000V`3o ool00`000000oooo0?ooo`060?ooo`00K@3oool01@000000oooo0?ooo`3oool000000080oooo00<0 00000?ooo`3oool00P3oool00`000000oooo0?ooo`2K0?ooo`030000003oool0oooo00H0oooo001] 0?ooo`050000003oool0oooo0?ooo`0000000P3oool00`000000oooo0?ooo`2Y0?ooo`00J`3oool3 000000<0oooo00@000000?ooo`3oool00000Z`3oool006d0oooo00<000000?ooo`3oool00P3oool2 00000:`0oooo0000\ \>"], ImageRangeCache->{{{0, 287}, {176.938, 0}} -> {-2.83281, -5.90117, \ 0.0232252, 0.0922152}}] }, Open ]], Cell["\<\ ...And you can do the same thing for each point. Doing one or two \ labels this way is OK, but you might want to automate the process a bit if \ you intend to label lots of points.\ \>", "Text"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell["2. Doing the same thing, but more efficiently", "Section"], Cell[TextData[{ "This section is only of interest if you want to learn better ways to do \ this sort of thing in the future. The real power of ", StyleBox["Mathematica", FontSlant->"Italic"], " becomes apparent when you define your own functions to do complicated \ stuff, and when you learn to use powerful commands like ", StyleBox["Map", FontWeight->"Bold"], ". The function \"Map\" helps to automate work by applying a function to \ every item in a list. So if we can define a function which creates a text \ label for a given pair of ", StyleBox["x", FontSlant->"Italic"], "-", StyleBox["y", FontSlant->"Italic"], " coordinates, ", StyleBox["Map", FontWeight->"Bold"], " can be used to create text labels for all of the interesting points at \ once. View the online documentation for Map (and function definitions), or \ read about them at ", StyleBox["http://amath.colorado.edu/computing/", FontFamily->"Courier", FontColor->RGBColor[0, 0, 1]], StyleBox["Mathematica", FontFamily->"Courier", FontSlant->"Italic", FontColor->RGBColor[0, 0, 1]], StyleBox["/basics/", FontFamily->"Courier", FontColor->RGBColor[0, 0, 1]] }], "Text", TextAlignment->Left], Cell[CellGroupData[{ Cell[TextData[{ "Define the function ", StyleBox["ipoint", FontFamily->"Courier"] }], "Subsection"], Cell[TextData[{ "The first function finds the \"interesting points\" of a given function; \ let's call it \"", StyleBox["ipoints", FontWeight->"Bold"], "\". (This uses the function ", StyleBox["Solve", FontWeight->"Bold"], ", which works great for polynomials, but not for other functions, so for \ nonpolynomial functions you would have to work harder; perhaps use ", StyleBox["FindRoot", FontWeight->"Bold"], " and ", StyleBox["FindMinimum", FontWeight->"Bold"], ", For polynomials of degree 5 or above, use ", StyleBox["NSolve", FontWeight->"Bold"], ".) Some roots may be complex, so function \"", StyleBox["realnumber", FontWeight->"Bold"], "\" will be used to weed out complex (ungraphable!) ", StyleBox["x", FontSlant->"Italic"], " values:" }], "Text"], Cell[BoxData[{ \(\(\(realnumber[z_]\ := \ If[NumericQ[z], If[Im[Chop[z]] \[Equal] 0, True, False], False]\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(ipoints[h_]\ := \ Map[Together, Select[Flatten[ ExpandAll[{\[IndentingNewLine]x\ /. \ Solve[h[x] \[Equal] 0], \ \ \ (*\ the\ zeroes\ *) \[IndentingNewLine]x\ /. \ Solve[\(h'\)[x] \[Equal] 0], \ \ (*\ \(minima\ &\)\ maxima\ \ *) \[IndentingNewLine]x\ /. \ Solve[\(h''\)[x] \[Equal] 0]\ \ \ \ \ \ (*\ inflection\ points\ *) \[IndentingNewLine]}]], \ realnumber]]\)}], "Input"], Cell["Let's see if it works with our sample function:", "Text"], Cell[CellGroupData[{ Cell[BoxData[ \(\(\(xvalues\)\(\ \)\(=\)\(\ \)\(Sort[ipoints[f], Less]\)\(\ \ \ \)\( (*\ sort\ them\ by\ value\ *) \)\)\)], "Input"], Cell[BoxData[ \({\(-2\), 1\/3\ \((2 - \@19)\), 2\/3, 1, 1\/3\ \((2 + \@19)\), 3}\)], "Output"] }, Open ]], Cell[TextData[{ "Cool! Use these values to calculate the corresponding ", StyleBox["y", FontSlant->"Italic"], " values:" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(yvalues\ = \ Map[Together, Map[Expand, Map[f, xvalues]]]\), "\[IndentingNewLine]", \(xypairs\ = \ Transpose[{xvalues, yvalues}]\)}], "Input"], Cell[BoxData[ \({0, 2\/27\ \((28 + 19\ \@19)\), 56\/27, 0, \(-\(2\/27\)\)\ \((\(-28\) + 19\ \@19)\), 0}\)], "Output"], Cell[BoxData[ \({{\(-2\), 0}, {1\/3\ \((2 - \@19)\), 2\/27\ \((28 + 19\ \@19)\)}, {2\/3, 56\/27}, {1, 0}, {1\/3\ \((2 + \@19)\), \(-\(2\/27\)\)\ \((\(-28\) + 19\ \@19)\)}, {3, 0}}\)], "Output"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[TextData[{ "Define the function ", StyleBox["nicerange", FontFamily->"Courier"] }], "Subsection"], Cell[TextData[{ "The next function, \"", StyleBox["nicerange", FontWeight->"Bold"], "\", will be defined for graphing purposes, to find the range which \ includes all the given values plus p% extra on each end:" }], "Text"], Cell[BoxData[ \(nicerange[values_List, percent_] := Module[\[IndentingNewLine]\t\t{mini, maxi, padding}, \[IndentingNewLine]mini\ = \ Min[values]; \[IndentingNewLine]maxi\ = \ Max[values]; \[IndentingNewLine]padding\ = \ \((maxi - mini)\) percent/100. ; \[IndentingNewLine]{mini - padding, maxi + padding}\[IndentingNewLine]]\)], "Input"], Cell[TextData[{ "Here's what the function yields for the ", StyleBox["x", FontSlant->"Italic"], " values, with 15% padding on both ends:" }], "Text"], Cell[CellGroupData[{ Cell[BoxData[ \(nicerange[\ xvalues, \ 15]\)], "Input"], Cell[BoxData[ \({\(-2.75`\), 3.75`}\)], "Output"] }, Open ]], Cell["\<\ This will be used with the PlotRange option in the plotting \ commands.\ \>", "Text"] }, Open ]], Cell[CellGroupData[{ Cell[TextData[{ "Define the function ", StyleBox["xylabel", FontFamily->"Courier"] }], "Subsection"], Cell[TextData[{ "This function will create an (x,y) coordinate label -- a graphics object \ -- given the value {x,y} and also an offset pair used by Text: \"", StyleBox["Text[", "MR"], StyleBox["expr", "TI"], StyleBox[",", "MR"], " ", StyleBox["coords", "TI"], StyleBox[",", "MR"], " ", StyleBox["offset", "TI"], StyleBox["]", "MR"], " specifies an offset for the block of text relative to the coordinates \ given\". Font size 9 seems to work well:" }], "Text"], Cell[BoxData[ \(\(xylabel[{{x_, y_}, {odx_, ody_}}]\ := \ Graphics[ Text[StyleForm[\[IndentingNewLine]DisplayForm[{x, y}], FontFamily -> "\", \ FontSize \[Rule] 9], \ {x, y}, {odx, ody}]];\)\)], "Input"], Cell[BoxData[ \(\(offsets\ = \ {{0, 0}, {1, 0}, {0, 1}, {1, 0}, {0, \(-1\)}, {\(-1\), 0}};\)\)], "Input"] }, Open ]], Cell[CellGroupData[{ Cell["Making the complete graph, using our functions", "Subsection"], Cell[TextData[{ " ", StyleBox[" 1. ", FontWeight->"Bold"], "In order to suppress the display of intermediate plots, use the option \ \"", StyleBox["DisplayFunction\[Rule]Identity", FontWeight->"Bold"], "\". Then, when all the parts (plot, points, labels) are to be assembled \ with Show, use the option \"", StyleBox["DisplayFunction\[Rule]$DisplayFunction", FontWeight->"Bold"], "\".\n", StyleBox[" 2.", FontWeight->"Bold"], " The offset values for the labels are the one part that will still be \ adjusted by eye. This could be automated, but the function would be even \ more mysterious than those defined so far...\n", StyleBox[" 3.", FontWeight->"Bold"], " Let's define an entirely new polynomial function ", StyleBox["g", FontSlant->"Italic"], "(", StyleBox["x", FontSlant->"Italic"], ") to ensure that we don't reuse any earlier graphics." }], "Text"], Cell[BoxData[ \(g[x_]\ := \ \((x + 3)\) \((x - 2)\) \((x - 3)\)\)], "Input"] }, Open ]], Cell[CellGroupData[{ Cell[" -- First try", "Subsection"], Cell[BoxData[{ \(\(theXvalues\ = \ Sort[ipoints[g], Less];\)\), "\[IndentingNewLine]", \(\(theYvalues\ = \ Simplify[ExpandAll[Map[g, theXvalues]]];\)\), "\[IndentingNewLine]", \(\(theXYcoords\ = \ Transpose[{theXvalues, theYvalues}];\)\), "\[IndentingNewLine]", \(\(horzPlotRange = \ nicerange[theXvalues, 11];\)\), "\[IndentingNewLine]", \(\(vertPlotRange = nicerange[theYvalues, 11];\)\)}], "Input"], Cell[BoxData[{ \(\(offsets\ = \ {{0, 0}, {1, 0}, {0, 1}, {1, 0}, {0, \(-1\)}, {\(-1\), 0}};\)\), "\[IndentingNewLine]", \(\(theLabels\ = \ Map[xylabel, \ Transpose[{theXYcoords, offsets}]];\)\)}], "Input"], Cell[CellGroupData[{ Cell[BoxData[{ \(\(graph5 = Plot[g[x], {x, \(-99\), 99}, PlotRange \[Rule] {horzPlotRange, vertPlotRange}, \ DisplayFunction \[Rule] Identity];\)\), "\n", \(\(graph6 = ListPlot[theXYcoords, PlotRange \[Rule] {horzPlotRange, vertPlotRange}, \ PlotStyle \[Rule] {AbsolutePointSize[5], Hue[0.85]}, \ DisplayFunction \[Rule] Identity];\)\), "\n", \(\(Show[Flatten[{graph5, \ graph6, \ theLabels}], \ DisplayFunction \[Rule] $DisplayFunction];\)\)}], "Input"], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.5 0.136612 0.083021 0.0198113 [ [.09016 .07052 -6 -9 ] [.09016 .07052 6 0 ] [.22678 .07052 -6 -9 ] [.22678 .07052 6 0 ] [.36339 .07052 -6 -9 ] [.36339 .07052 6 0 ] [.63661 .07052 -3 -9 ] [.63661 .07052 3 0 ] [.77322 .07052 -3 -9 ] [.77322 .07052 3 0 ] [.90984 .07052 -3 -9 ] [.90984 .07052 3 0 ] [.4875 .18208 -6 -4.5 ] [.4875 .18208 0 4.5 ] [.4875 .28113 -12 -4.5 ] [.4875 .28113 0 4.5 ] [.4875 .38019 -12 -4.5 ] [.4875 .38019 0 4.5 ] [.4875 .47925 -12 -4.5 ] [.4875 .47925 0 4.5 ] [.4875 .5783 -12 -4.5 ] [.4875 .5783 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .09016 .08302 m .09016 .08927 L s [(-3)] .09016 .07052 0 1 Mshowa .22678 .08302 m .22678 .08927 L s [(-2)] .22678 .07052 0 1 Mshowa .36339 .08302 m .36339 .08927 L s [(-1)] .36339 .07052 0 1 Mshowa .63661 .08302 m .63661 .08927 L s [(1)] .63661 .07052 0 1 Mshowa .77322 .08302 m .77322 .08927 L s [(2)] .77322 .07052 0 1 Mshowa .90984 .08302 m .90984 .08927 L s [(3)] .90984 .07052 0 1 Mshowa .125 Mabswid .11749 .08302 m .11749 .08677 L s .14481 .08302 m .14481 .08677 L s .17213 .08302 m .17213 .08677 L s .19945 .08302 m .19945 .08677 L s .2541 .08302 m .2541 .08677 L s .28142 .08302 m .28142 .08677 L s .30874 .08302 m .30874 .08677 L s .33607 .08302 m .33607 .08677 L s .39071 .08302 m .39071 .08677 L s .41803 .08302 m .41803 .08677 L s .44536 .08302 m .44536 .08677 L s .47268 .08302 m .47268 .08677 L s .52732 .08302 m .52732 .08677 L s .55464 .08302 m .55464 .08677 L s .58197 .08302 m .58197 .08677 L s .60929 .08302 m .60929 .08677 L s .66393 .08302 m .66393 .08677 L s .69126 .08302 m .69126 .08677 L s .71858 .08302 m .71858 .08677 L s .7459 .08302 m .7459 .08677 L s .80055 .08302 m .80055 .08677 L s .82787 .08302 m .82787 .08677 L s .85519 .08302 m .85519 .08677 L s .88251 .08302 m .88251 .08677 L s .06284 .08302 m .06284 .08677 L s .03552 .08302 m .03552 .08677 L s .0082 .08302 m .0082 .08677 L s .93716 .08302 m .93716 .08677 L s .96448 .08302 m .96448 .08677 L s .9918 .08302 m .9918 .08677 L s .25 Mabswid 0 .08302 m 1 .08302 L s .5 .18208 m .50625 .18208 L s [(5)] .4875 .18208 1 0 Mshowa .5 .28113 m .50625 .28113 L s [(10)] .4875 .28113 1 0 Mshowa .5 .38019 m .50625 .38019 L s [(15)] .4875 .38019 1 0 Mshowa .5 .47925 m .50625 .47925 L s [(20)] .4875 .47925 1 0 Mshowa .5 .5783 m .50625 .5783 L s [(25)] .4875 .5783 1 0 Mshowa .125 Mabswid .5 .10283 m .50375 .10283 L s .5 .12264 m .50375 .12264 L s .5 .14246 m .50375 .14246 L s .5 .16227 m .50375 .16227 L s .5 .20189 m .50375 .20189 L s .5 .2217 m .50375 .2217 L s .5 .24151 m .50375 .24151 L s .5 .26132 m .50375 .26132 L s .5 .30095 m .50375 .30095 L s .5 .32076 m .50375 .32076 L s .5 .34057 m .50375 .34057 L s .5 .36038 m .50375 .36038 L s .5 .4 m .50375 .4 L s .5 .41981 m .50375 .41981 L s .5 .43963 m .50375 .43963 L s .5 .45944 m .50375 .45944 L s .5 .49906 m .50375 .49906 L s .5 .51887 m .50375 .51887 L s .5 .53868 m .50375 .53868 L s .5 .55849 m .50375 .55849 L s .5 .06321 m .50375 .06321 L s .5 .0434 m .50375 .0434 L s .5 .02359 m .50375 .02359 L s .5 .00378 m .50375 .00378 L s .5 .59812 m .50375 .59812 L s .5 .61793 m .50375 .61793 L s .25 Mabswid .5 0 m .5 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .07518 0 m .09878 .11963 L .14176 .27748 L .18153 .38897 L .21621 .46144 L .23596 .49318 L .25449 .5171 L .29179 .5492 L .31277 .55857 L .332 .56213 L .36599 .5577 L .39761 .54266 L .43231 .51584 L .46938 .47738 L .61401 .27474 L .68753 .17145 L .72775 .12405 L .74741 .10444 L .76537 .08898 L .7974 .06808 L .83182 .05668 L .86932 .05945 L .90492 .07892 L .92482 .09775 L .94284 .12011 L .98321 .18994 L s .98321 .18994 m 1 .23089 L s 1 0 .9 r 5 Mabswid .09016 .08302 Mdot .33753 .56231 Mdot .59107 .30902 Mdot .77322 .08302 Mdot .84462 .05572 Mdot .90984 .08302 Mdot 0 g gsave .09016 .08302 -76 -8.90625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 72.125 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 76.625 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 81.562 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 86.062 11.250 moveto (<) show 1.000 setlinewidth grestore gsave .33753 .56231 -198.25 -14.8125 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (1) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 76.875 18.125 moveto (I) show 79.625 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 85.875 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 93.375 12.812 moveto (\\217) show 100.750 12.812 moveto (!) show 102.375 12.812 moveto (!) show 104.000 12.812 moveto (!) show 105.625 12.812 moveto (!) show 107.250 12.812 moveto (!) show 108.875 12.812 moveto (!) show 109.750 12.812 moveto (!) show 101.250 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 112.312 18.125 moveto (M) show 115.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 124.562 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 121.375 18.125 moveto (\\200) show 122.500 18.125 moveto (\\200) show 123.625 18.125 moveto (\\200) show 124.750 18.125 moveto (\\200) show 125.875 18.125 moveto (\\200) show 127.000 18.125 moveto (\\200) show 128.125 18.125 moveto (\\200) show 129.250 18.125 moveto (\\200) show 130.375 18.125 moveto (\\200) show 131.250 18.125 moveto (\\200) show 122.312 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 135.312 18.125 moveto (I) show 138.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (154) show 153.312 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (+) show 160.812 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 171.500 12.812 moveto (\\217) show 178.875 12.812 moveto (!) show 180.500 12.812 moveto (!) show 182.125 12.812 moveto (!) show 183.750 12.812 moveto (!) show 185.375 12.812 moveto (!) show 187.000 12.812 moveto (!) show 187.875 12.812 moveto (!) show 179.375 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 190.438 18.125 moveto (M) show 193.188 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .59107 .30902 -82.1562 -25.625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 75.188 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 82.438 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (308) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 81.500 18.125 moveto (\\200) show 82.625 18.125 moveto (\\200) show 83.750 18.125 moveto (\\200) show 84.875 18.125 moveto (\\200) show 86.000 18.125 moveto (\\200) show 87.125 18.125 moveto (\\200) show 88.250 18.125 moveto (\\200) show 89.375 18.125 moveto (\\200) show 90.500 18.125 moveto (\\200) show 91.625 18.125 moveto (\\200) show 92.750 18.125 moveto (\\200) show 93.875 18.125 moveto (\\200) show 95.000 18.125 moveto (\\200) show 95.875 18.125 moveto (\\200) show 84.688 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 98.250 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .77322 .08302 -84.8125 -8.90625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 70.438 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 75.375 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 79.875 11.250 moveto (<) show 1.000 setlinewidth grestore gsave .84462 .05572 -129.625 -4 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (1) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 76.875 18.125 moveto (I) show 79.625 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 85.875 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (+) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 93.375 12.812 moveto (\\217) show 100.750 12.812 moveto (!) show 102.375 12.812 moveto (!) show 104.000 12.812 moveto (!) show 105.625 12.812 moveto (!) show 107.250 12.812 moveto (!) show 108.875 12.812 moveto (!) show 109.750 12.812 moveto (!) show 101.250 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 112.312 18.125 moveto (M) show 115.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 124.562 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 121.375 18.125 moveto (\\200) show 122.500 18.125 moveto (\\200) show 123.625 18.125 moveto (\\200) show 124.750 18.125 moveto (\\200) show 125.875 18.125 moveto (\\200) show 127.000 18.125 moveto (\\200) show 128.125 18.125 moveto (\\200) show 129.250 18.125 moveto (\\200) show 130.375 18.125 moveto (\\200) show 131.250 18.125 moveto (\\200) show 122.312 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 135.312 18.125 moveto (I) show 138.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (154) show 153.312 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 160.812 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 171.500 12.812 moveto (\\217) show 178.875 12.812 moveto (!) show 180.500 12.812 moveto (!) show 182.125 12.812 moveto (!) show 183.750 12.812 moveto (!) show 185.375 12.812 moveto (!) show 187.000 12.812 moveto (!) show 187.875 12.812 moveto (!) show 179.375 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 190.438 18.125 moveto (M) show 193.188 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .90984 .08302 -61 -8.90625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 70.438 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 75.375 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 79.875 11.250 moveto (<) show 1.000 setlinewidth grestore % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{436.938, 270.062}, ImageMargins->{{107, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHg@3oool4000003L0oooo1000000f0?ooo`030000003o ool0oooo03L0oooo1000000g0?ooo`@000007@3oool40?l0iQP0oooo0P00000W0?ooo`009P3oool0 0`000000oooo000000020?ooo`030000003oool0oooo03H0oooo00<000000?ooo`3oool0>P3oool0 0`000000oooo0?ooo`0e0?ooo`030000003oool0oooo03T0oooo00<000000?ooo`3oool0=P3oool0 0`000000oooo0?ooo`0H0?ooo`H00000103o0>HG0?ooo`040000003oool0oooo000002H0oooo000V 0?ooo`030000003oool0oooo0080oooo00<000000?ooo`3oool0=`3oool00`000000oooo0?ooo`0i 0?ooo`030000003oool0oooo03D0oooo00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`0g 0?ooo`030000003oool0oooo01@0oooo0`0000060?ooo`@0o`3V2000000B0?ooo`030000003oool0 oooo02@0oooo000R0?ooo`D000000P3oool2000003<0oooo100000040?ooo`030000003oool0oooo 0300oooo100000040?ooo`030000003oool0oooo03D0oooo00<000000?ooo`3oool0>@3oool00`00 0000oooo0?ooo`0K0?ooo`8000006`3oool00`000000oooo0?ooo`0@0?ooo`<000000`3oool30000 00l0oooo0P00000>0?ooo`8000009`3oool002H0oooo00<000000?ooo`3oool00P3oool00`000000 oooo0?ooo`0i0?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0=@3oool3000003T0 oooo00<000000?ooo`3oool07@3oool00`000000oooo0?ooo`0I0?ooo`030000003oool0oooo00`0 oooo0`0000060?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool02`3oool2000000h0 oooo00<000000?ooo`3oool0903oool002H0oooo00<000000?ooo`0000000P3oool00`000000oooo 0?ooo`0f0?ooo`040000003oool0oooo000003L0oooo0`00000g0?ooo`030000003oool0oooo03L0 oooo0`00000O0?ooo`030000003oool0oooo01H0oooo00@000000?ooo`3oool000002`3oool30000 00X0oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`0=0?ooo`8000002@3oool01000 0000oooo0?ooo`00000V0?ooo`009`3oool010000000oooo00000000000j0?ooo`800000>P3oool0 0`000000oooo0?ooo`0e0?ooo`030000003oool0oooo03T0oooo00<000000?ooo`3oool05P3oool0 0`000000oooo0?ooo`030?ooo`030000003oool0oooo00H0oooo00<000000?ooo`3oool03`3oool2 000000X0oooo0P0000000`3oool000000?ooo`0;0?ooo`050000003oool0oooo0?ooo`0000001`3o ool00`000000oooo0?ooo`070?ooo`800000203oool2000001l0oooo00D000000?ooo`3oool0oooo 000000030?ooo`009`3oool00`000000oooo0?ooo`2_0?ooo`030000003oool0oooo0540oooo00<0 00000?ooo`3oool01@3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo01X0oooo0P00 00040?ooo`030000003oool0000000H0oooo00@000000?ooo`3oool00000103oool00`000000oooo 0?ooo`030?ooo`030000003oool0oooo00X0oooo00<000000?ooo`3oool09`3oool01@000000oooo 0?ooo`3oool000000080oooo000W0?ooo`030000003oool0oooo0:l0oooo00<000000?ooo`3oool0 D@3oool00`000000oooo0?ooo`030?ooo`<000001P3oool00`000000oooo0?ooo`0I0?ooo`030000 003oool0oooo00@0oooo00@000000?ooo`3oool000001P3oool300000080oooo0`0000050?ooo`03 0000003oool0oooo00/0oooo0P00000W0?ooo`050000003oool0oooo0?ooo`0000000P3oool002L0 oooo0P00002`0?ooo`030000003oool0oooo0540oooo00<000000?ooo`3oool0303oool00`000000 oooo0?ooo`04000000<0oooo00<000000?ooo`3oool01@3oool2000000@0oooo10000000103oool0 00000000000000030?ooo`040000003oool00000000001<0oooo00<000000?ooo`3oool00`000000 103oool000000000000000040?ooo`040000003oool00000000000P0oooo0P0000030?ooo`<00000 103oool2000000@0oooo0P0000030?ooo`<000000`3oool01@000000oooo0?ooo`3oool000000080 oooo000K0?ooo`030000003oool0oooo00T0oooo00<000000?ooo`000000203oool00`000000oooo 0?ooo`2T0?ooo`030000003oool0oooo0540oooo00<000000?ooo`3oool0303oool010000000oooo 0?ooo`0000030?ooo`040000003oool0oooo000000D0oooo00@000000?ooo`0000000000103oool3 000000<0oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`0D0?ooo`050000003oool0 oooo0?ooo`0000001@3oool600000080oooo0P0000050?ooo`040000003oool0oooo000000<0oooo 00<000000?ooo`3oool00`3oool200000080oooo00D000000?ooo`3oool0oooo000000030?ooo`03 0000003oool0oooo0080oooo00D000000?ooo`3oool0oooo000000020?ooo`006P3oool00`000000 oooo0?ooo`070?ooo`8000000P3o0>H2000000@0oooo0P0000030?ooo`030000003oool0oooo0:<0 oooo00<000000?ooo`3oool0D03oool010000000oooo0?ooo`3oool8000000<0oooo0P0000020?oo o`/000000`3oool3000000<0o`3V00@000000?ooo`3oool000000`3oool00`000000oooo0?ooo`02 0?ooo`030000003oool0oooo00@0oooo300000040?ooo`050000003oool0oooo0?ooo`0000001@3o ool200000080oooo00@000000?ooo`3oool0oooo100000020?l0iP040000003oool0oooo0?ooo`80 000000<0oooo000000000000103oool3000000<0oooo00@000000?ooo`3oool000000`3oool00`00 0000oooo0?ooo`020?ooo`030000003oool0oooo0080oooo0@0000010?ooo`006P3oool00`000000 oooo0?ooo`090?ooo`040000003o0>H0o`3V0?l0iP<0oooo00@000000?ooo`3oool000000P3oool0 0`000000oooo0?ooo`2S0?ooo`030000003oool0oooo0540oooo00<000000?ooo`3oool02`3oool2 00000080oooo00<000000?ooo`000000103oool200000080oooo1@000000103o0>H000000?l0iP3o 0>H20?ooo`030000003oool0oooo0080oooo00<000000?ooo`3oool00P3oool00`000000oooo0?oo o`0D0?ooo`050000003oool0oooo0?ooo`0000000`3oool200000080oooo00<000000?ooo`000000 1P3oool30?l0iP040000003oool0oooo00000080oooo00<000000?ooo`0000000P3oool600000080 oooo00<000000?ooo`000000103oool00`000000oooo0?ooo`020?ooo`050000003oool0oooo0?oo o`0000000P3oool002L000000`3o0>Ko000002H0000000@0o`3V0000003o0>H0o`3V>00000020?l0 iP030000003o0>H0000002@0000000030?ooo`030000003oool0oooo00T0oooo00<000000?ooo`3o ool0203oool2000000T0oooo00<000000?l0iP3o0>H00P3o0>H30?ooo`040000003oool0oooo0000 0080oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`090?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool02@3oool010000000oooo0000000000020?ooo`<000000`3oool0 0`000000oooo000000020?ooo`030000003oool0oooo0080000000D0o`3V0000003o0>H0o`3V0?oo o`03000000<0oooo00<000000?ooo`0000000P3oool00`000000oooo0?ooo`060?ooo`030000003o ool0oooo00T0oooo00<000000?ooo`0000000`3oool010000000oooo0?ooo`3oool3000000<0oooo 00<000000?ooo`3oool0103oool30?l0iP030000003oool0000000<000000P3oool01@000000oooo 0000003oool000000080oooo0P0000020?ooo`@000000`3oool00`000000oooo0?ooo`020?ooo`03 0000003oool0oooo008000000P3oool001X0oooo00<000000?ooo`3oool02@3oool3000000@0oooo 00@000000?ooo`3oool000000P3oool00`000000oooo0?ooo`0]0?ooo`030000003oool0oooo03P0 oooo00<000000?ooo`3oool0>03oool00`000000oooo0?ooo`0i0?ooo`030000003oool0oooo01D0 oooo00<000000?ooo`3oool02`3oool2000000050?ooo`000000oooo0?ooo`0000001@3oool01000 0000oooo0?ooo`0000020?ooo`030000003oool0oooo008000003@3oool00`000000oooo0?ooo`0D 0?ooo`030000003oool0oooo01<0oooo00<000000?ooo`0000001@3oool00`000000oooo0?ooo`03 0?ooo`080000003oool0oooo0000003oool000000?ooo`00000;0?ooo`050000003oool0oooo0?oo o`0000000P3oool001/0oooo00<000000?ooo`3oool01P3oool300000080oooo00<000000?ooo`3o ool00P3oool200000080oooo00<000000?ooo`3oool0Y03oool00`000000oooo0?ooo`1B0?ooo`03 0000003oool0oooo0080oooo0`0000060?ooo`80000000@0oooo00000000000000001P3oool20000 0080oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`0:0?ooo`030000003oool0oooo 00X0oooo0`0000090?ooo`030000003oool0oooo01D0oooo00<000000?ooo`3oool00`0000060?oo o`8000000P3oool2000000/0oooo00D000000?ooo`3oool0oooo000000030?ooo`00:@3oool00`00 0000oooo0?ooo`2]0?ooo`030000003oool0oooo05P0oooo00<000000?ooo`3oool0503oool00`00 0000oooo0?ooo`030?ooo`h00000303oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo 00`0oooo3P0000070?ooo`00:@3oool00`000000oooo0?ooo`2]0?ooo`030000003oool0oooo05P0 oooo00<000000?ooo`3oool04P3oool200000240oooo00<000000?ooo`3oool08P3oool00`000000 oooo0?ooo`0P0?ooo`00:@3oool00`000000oooo0?ooo`2]0?ooo`030000003oool0oooo05P0oooo 00<000000?ooo`3oool04@3oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo0280oooo 00<000000?ooo`3oool07`3oool002T0oooo00<000000?ooo`3oool0[@3oool00`000000oooo0?oo o`1H0?ooo`030000003oool0oooo0100oooo00<000000?ooo`3oool0803oool010000000oooo0?oo o`00000U0?ooo`030000003oool0oooo01h0oooo000Y0?ooo`030000003oool0oooo0:d0oooo0`00 001H0?ooo`030000003oool0oooo00l0oooo00<000000?ooo`3oool08P3oool3000002H0oooo00<0 00000?ooo`3oool07@3oool002X0oooo00<000000?ooo`3oool0[03oool00`000000oooo0?ooo`1Y 0?ooo`030000003oool0oooo04`0oooo00<000000?ooo`3oool07@3oool002X0oooo00<000000?oo o`3oool0[03oool00`000000oooo0?ooo`1X0?ooo`030000003oool0oooo04h0oooo00<000000?oo o`3oool0703oool002X0oooo00<000000?ooo`3oool0[03oool00`000000oooo0?ooo`1W0?ooo`03 0000003oool0oooo0500oooo00<000000?ooo`3oool06`3oool002X0oooo00<000000?ooo`3oool0 [03oool00`000000oooo0?ooo`1V0?ooo`030000003oool0oooo0580oooo00<000000?ooo`3oool0 6P3oool002X0oooo00<000000?ooo`3oool0[03oool00`000000oooo0?ooo`1U0?ooo`030000003o ool0oooo05@0oooo00<000000?ooo`3oool06@3oool002/0oooo00<000000?ooo`3oool0Z`3oool0 0`000000oooo0?ooo`1T0?ooo`030000003oool0oooo05D0oooo00<000000?ooo`3oool06@3oool0 02/0oooo00<000000?ooo`3oool0Z`3oool00`000000oooo0?ooo`1S0?ooo`030000003oool0oooo 05L0oooo00<000000?ooo`3oool0603oool002/0oooo00<000000?ooo`3oool0Z`3oool00`000000 oooo0?ooo`1R0?ooo`030000003oool0oooo05T0oooo00<000000?ooo`3oool05`3oool002/0oooo 00<000000?ooo`3oool0Z`3oool300000640oooo00<000000?ooo`3oool0F`3oool00`000000oooo 0?ooo`0F0?ooo`00;03oool00`000000oooo0?ooo`2Z0?ooo`030000003oool0oooo0600oooo00<0 00000?ooo`3oool0G03oool00`000000oooo0?ooo`0F0?ooo`00;03oool00`000000oooo0?ooo`2Z 0?ooo`030000003oool0oooo05l0oooo00<000000?ooo`3oool0GP3oool00`000000oooo0?ooo`0E 0?ooo`00;03oool00`000000oooo0?ooo`2Z0?ooo`030000003oool0oooo05h0oooo00<000000?oo o`3oool0G`3oool00`000000oooo0?ooo`0E0?ooo`00;03oool00`000000oooo0?ooo`2Z0?ooo`03 0000003oool0oooo05h0oooo00<000000?ooo`3oool0H03oool00`000000oooo0?ooo`0D0?ooo`00 ;@3oool00`000000oooo0?ooo`2Y0?ooo`030000003oool0oooo05d0oooo00<000000?ooo`3oool0 HP3oool00`000000oooo0?ooo`0C0?ooo`00;@3oool00`000000oooo0?ooo`2Y0?ooo`030000003o ool0oooo05`0oooo00<000000?ooo`3oool0H`3oool00`000000oooo0?ooo`0C0?ooo`00;@3oool0 0`000000oooo0?ooo`2Y0?ooo`030000003oool0oooo05/0oooo00<000000?ooo`3oool0I@3oool0 0`000000oooo0?ooo`0B0?ooo`00;P3oool00`000000oooo0?ooo`2X0?ooo`<00000FP3oool00`00 0000oooo0?ooo`1V0?ooo`030000003oool0oooo0180oooo000^0?ooo`030000003oool0oooo0:P0 oooo00<000000?ooo`3oool0F@3oool00`000000oooo0?ooo`1X0?ooo`030000003oool0oooo0140 oooo000^0?ooo`030000003oool0oooo0:P0oooo00<000000?ooo`3oool0F03oool00`000000oooo 0?ooo`1Z0?ooo`030000003oool0oooo0100oooo000^0?ooo`030000003oool0oooo0:P0oooo00<0 00000?ooo`3oool0F03oool00`000000oooo0?ooo`1Z0?ooo`030000003oool0oooo0100oooo000_ 0?ooo`030000003oool0oooo0:L0oooo00<000000?ooo`3oool0E`3oool00`000000oooo0?ooo`1/ 0?ooo`030000003oool0oooo00l0oooo000_0?ooo`030000003oool0oooo0:L0oooo00<000000?oo o`3oool0EP3oool00`000000oooo0?ooo`1]0?ooo`030000003oool0oooo00l0oooo000_0?ooo`03 0000003oool0oooo0:L0oooo00<000000?ooo`3oool0E@3oool00`000000oooo0?ooo`1_0?ooo`03 0000003oool0oooo00h0oooo000_0?ooo`030000003oool0oooo0:L0oooo00<000000?ooo`3oool0 E03oool00`000000oooo0?ooo`1a0?ooo`030000003oool0oooo00d0oooo000`0?ooo`030000003o ool0oooo0:H0oooo00<000000?ooo`3oool0D`3oool00`000000oooo0?ooo`1b0?ooo`030000003o ool0oooo00d0oooo000`0?ooo`030000003oool0oooo0:H0oooo0`00001B0?ooo`030000003oool0 oooo07@0oooo00<000000?ooo`3oool0303oool00300oooo00<000000?ooo`3oool0YP3oool00`00 0000oooo0?ooo`1B0?ooo`030000003oool0oooo07@0oooo00<000000?ooo`3oool0303oool00340 oooo00<000000?ooo`3oool0Y@3oool00`000000oooo0?ooo`1A0?ooo`030000003oool0oooo07H0 oooo00<000000?ooo`3oool02`3oool00340oooo00<000000?ooo`3oool0Y@3oool00`000000oooo 0?ooo`1@0?ooo`030000003oool0oooo07P0oooo00<000000?ooo`3oool02P3oool00340oooo00<0 00000?ooo`3oool0Y@3oool00`000000oooo0?ooo`1?0?ooo`030000003oool0oooo07T0oooo00<0 00000?ooo`3oool02P3oool00340oooo00<000000?ooo`3oool0Y@3oool00`000000oooo0?ooo`1> 0?ooo`030000003oool0oooo07/0oooo00<000000?ooo`3oool02@3oool00380oooo00<000000?oo o`3oool0Y03oool00`000000oooo0?ooo`1>0?ooo`030000003oool0oooo07/0oooo00<000000?oo o`3oool02@3oool00380oooo00<000000?ooo`3oool0VP3oool3000000L0oooo00<000000?ooo`3o ool0C@3oool00`000000oooo0?ooo`1m0?ooo`030000003oool0oooo00P0oooo000b0?ooo`030000 003oool0oooo09d0oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`1<0?ooo`030000 003oool0oooo07l0oooo00<000000?ooo`3oool01`3oool003<0oooo00<000000?ooo`3oool0W03o ool00`000000oooo0?ooo`040?ooo`@00000BP3oool00`000000oooo0?ooo`200?ooo`030000003o ool0oooo00L0oooo000c0?ooo`030000003oool0oooo09T0oooo0`0000070?ooo`030000003oool0 oooo04/0oooo00<000000?ooo`3oool0P@3oool00`000000oooo0?ooo`060?ooo`00<`3oool00`00 0000oooo0?ooo`2I0?ooo`030000003oool0oooo00L0oooo00<000000?ooo`3oool0BP3oool00`00 0000oooo0?ooo`220?ooo`030000003oool0oooo00H0oooo000c0?ooo`030000003oool0oooo09T0 oooo00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`190?ooo`030000003oool0oooo08@0 oooo00<000000?ooo`3oool01@3oool003@0oooo00<000000?ooo`3oool0V03oool4000000H0oooo 00<000000?ooo`3oool0B@3oool00`000000oooo0?ooo`240?ooo`030000003oool0oooo00D0oooo 000d0?ooo`030000003oool0oooo0:80oooo00<000000?ooo`3oool0B03oool00`000000oooo0?oo o`260?ooo`030000003oool0oooo00@0oooo000d0?ooo`030000003oool0oooo0:80oooo00<00000 0?ooo`3oool0A`3oool00`000000oooo0?ooo`270?ooo`030000003oool0oooo00@0oooo000e0?oo o`030000003oool0oooo0:40oooo00<000000?ooo`3oool0AP3oool00`000000oooo0?ooo`290?oo o`030000003oool0oooo00<0oooo000e0?ooo`030000003oool0oooo0:40oooo0`0000160?ooo`03 0000003oool0oooo08T0oooo00<000000?ooo`3oool00`3oool003D0oooo00<000000?ooo`3oool0 X@3oool00`000000oooo0?ooo`150?ooo`030000003oool0oooo08X0oooo00<000000?ooo`3oool0 0`3oool003D0oooo00<000000?ooo`3oool0X@3oool00`000000oooo0?ooo`140?ooo`030000003o ool0oooo08`0oooo00<000000?ooo`3oool00P3oool003H0oooo00<000000?ooo`3oool0X03oool0 0`000000oooo0?ooo`140?ooo`030000003oool0oooo08`0oooo00<000000?ooo`3oool00P3oool0 03H0oooo00<000000?ooo`3oool0X03oool00`000000oooo0?ooo`130?ooo`030000003oool0oooo 08h0oooo00<000000?ooo`3oool00@3oool003H0oooo00<000000?ooo`3oool0X03oool00`000000 oooo0?ooo`120?ooo`030000003oool0oooo08l0oooo00<000000?ooo`3oool00@3oool003H0oooo 00<000000?ooo`3oool0X03oool00`000000oooo0?ooo`110?ooo`030000003oool0oooo0900oooo 00<000000?ooo`3oool00@3oool003L0oooo00<000000?ooo`3oool0W`3oool00`000000oooo0?oo o`110?ooo`030000003oool0oooo0940oooo0@0000010?ooo`40oooo000g0?ooo`030000003oool0 oooo09l0oooo00<000000?ooo`3oool0@03oool00`000000oooo0?ooo`2B0?ooo`4000000@3oool1 0?ooo`00=`3oool00`000000oooo0?ooo`2O0?ooo`<00000?`3oool00`000000oooo0?ooo`2C0?oo o`4000000@3oool10?ooo`00>03oool00`000000oooo0?ooo`2N0?ooo`030000003oool0oooo03l0 oooo00<000000?ooo`3oool0U03oool100000040oooo000h0?ooo`030000003oool0oooo09h0oooo 00<000000?ooo`3oool0?P3oool00`000000oooo0?ooo`2E0?ooo`4000000@3oool003P0oooo00<0 00000?ooo`3oool0WP3oool00`000000oooo0?ooo`0m0?ooo`030000003oool0oooo09P0oooo000h 0?ooo`030000003oool0oooo09h0oooo00<000000?ooo`3oool0?@3oool00`000000oooo0?ooo`2H 0?ooo`00>@3oool00`000000oooo0?ooo`2M0?ooo`030000003oool0oooo03`0oooo00<000000?oo o`3oool0V@3oool003T0oooo00<000000?ooo`3oool0W@3oool00`000000oooo0?ooo`0k0?ooo`03 0000003oool0oooo09X0oooo000i0?ooo`030000003oool0oooo09d0oooo00<000000?ooo`3oool0 >P3oool00`000000oooo0?ooo`2K0?ooo`00>P3oool00`000000oooo0?ooo`2L0?ooo`030000003o ool0oooo03X0oooo00<000000?ooo`3oool0V`3oool003X0oooo00<000000?ooo`3oool0W03oool3 000003T0oooo00<000000?ooo`3oool0W03oool003X0oooo00<000000?ooo`3oool0W03oool00`00 0000oooo0?ooo`0h0?ooo`030000003oool0oooo09d0oooo000j0?ooo`030000003oool0oooo09`0 oooo00<000000?ooo`3oool0>03oool00`000000oooo0?ooo`2M0?ooo`00>`3oool00`000000oooo 0?ooo`2K0?ooo`030000003oool0oooo03L0oooo00<000000?ooo`3oool0WP3oool003/0oooo00<0 00000?ooo`3oool0V`3oool00`000000oooo0?ooo`0f0?ooo`030000003oool0oooo09l0oooo000k 0?ooo`030000003oool0oooo09/0oooo00<000000?ooo`3oool0=@3oool00`000000oooo0?ooo`2P 0?ooo`00>`3oool00`000000oooo0?ooo`2K0?ooo`030000003oool0oooo03D0oooo00<000000?oo o`3oool0X03oool003`0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`0d0?ooo`03 0000003oool0oooo0:40oooo000l0?ooo`030000003oool0oooo09X0oooo0`00000c0?ooo`030000 003oool0oooo0:80oooo000l0?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3oool0603o ool2000000l0oooo0`0000070?ooo`030000003oool0oooo0:80oooo000m0?ooo`030000003oool0 oooo09T0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`0<0?ooo`030000003oool0 oooo00<0oooo00@000000?ooo`3oool00000Y@3oool003d0oooo00<000000?ooo`3oool0V@3oool0 0`000000oooo0?ooo`0J0?ooo`030000003oool0oooo00d0oooo00<000000?ooo`3oool00P3oool0 0`000000oooo0000002V0?ooo`00?@3oool00`000000oooo0?ooo`2I0?ooo`030000003oool0oooo 01T0oooo00<000000?ooo`3oool03`3oool010000000oooo0?ooo`3oool200000:L0oooo000m0?oo o`030000003oool0oooo09T0oooo00<000000?ooo`3oool04`3oool00`000000oooo0?ooo`040?oo o`030000003oool0oooo00/0oooo00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`03 0?ooo`030000003oool0oooo09l0oooo000n0?ooo`030000003oool0oooo09P0oooo00<000000?oo o`3oool04P3oool00`000000oooo0?ooo`030?ooo`<000000`3oool00`000000oooo0?ooo`080?oo o`<000000P3oool3000000H0oooo00<000000?ooo`3oool0WP3oool003h0oooo00<000000?ooo`3o ool0R03oool4000000<0oooo0P0000070?ooo`030000003oool0oooo0180oooo00<000000?ooo`3o ool02P3oool00`000000oooo0?ooo`0<0?ooo`030000003oool0oooo00H0oooo00<000000?ooo`3o ool0WP3oool003h0oooo00<000000?ooo`3oool0RP3oool01@000000oooo0?ooo`3oool000000080 oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`0B0?ooo`030000003oool0oooo00T0 oooo0P00000>0?ooo`030000003oool0oooo00H0oooo00<000000?ooo`3oool0WP3oool003l0oooo 00<000000?ooo`3oool0R@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3o ool0103oool400000140oooo00<000000?ooo`3oool0603oool00`000000oooo0?ooo`070?ooo`03 0000003oool0oooo09h0oooo000o0?ooo`030000003oool0oooo08T0oooo00D000000?ooo`3oool0 oooo000000020?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool04@3oool010000000 oooo0?ooo`3oool8000000H0oooo4@0000040?ooo`030000003oool0oooo09d0oooo000o0?ooo`03 0000003oool0oooo08T0oooo00D000000?ooo`3oool0oooo000000020?ooo`030000003oool0oooo 00@0oooo00<000000?ooo`3oool04P3oool00`000000oooo0?ooo`0F0?ooo`030000003oool0oooo 00T0oooo00<000000?ooo`3oool0WP3oool00400oooo00<000000?ooo`3oool0QP3oool3000000<0 oooo00@000000?ooo`3oool000001P3oool00`000000oooo0?ooo`0B0?ooo`030000003oool0oooo 01H0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`2N0?ooo`00@03oool00`000000 oooo0?ooo`280?ooo`030000003oool0oooo0080oooo0P0000070?ooo`030000003oool0oooo0180 oooo00<000000?ooo`3oool05@3oool00`000000oooo0?ooo`0:0?ooo`030000003oool0oooo09h0 oooo00100?ooo`030000003oool0oooo09H0oooo00<000000?ooo`3oool04P3oool00`000000oooo 0?ooo`0D0?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool0WP3oool00440oooo00<0 00000?ooo`3oool0U@3oool00`000000oooo0?ooo`0C0?ooo`030000003oool0oooo0080oooo0`00 000;0?ooo`80000000<0oooo0000003oool00P0000020?ooo`@000000`3oool00`000000oooo0?oo o`2O0?ooo`00@@3oool00`000000oooo0?ooo`2E0?ooo`030000003oool0oooo01P0oooo00<00000 0?ooo`3oool03@3oool00`000000oooo000000020?ooo`030000003oool000000080oooo00<00000 0?ooo`3oool0X`3oool00440oooo00<000000?ooo`3oool0U@3oool3000001T0oooo00<000000?oo o`3oool02`3oool2000000090?ooo`000000oooo0?ooo`000000oooo0000003oool000000:H0oooo 00120?ooo`030000003oool0oooo09@0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?oo o`090?ooo`8000000P3oool010000000oooo0?ooo`0000020?ooo`800000YP3oool00480oooo00<0 00000?ooo`3oool0U03oool00`000000oooo0?ooo`0G0?ooo`040000003oool0oooo000000T0oooo 103o0>H00`000000oooo000000020?ooo`030000003oool000000080oooo00<000000?ooo`3oool0 X`3oool004<0oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0H0?ooo`<000002@3o ool20?l0iP<000000P3oool2000000<0oooo0`00002U0?ooo`00@`3oool00`000000oooo0?ooo`2C 0?ooo`030000003oool0oooo02@0oooo103o0>J`0?ooo`00@`3oool00`000000oooo0?ooo`2C0?oo o`030000003oool0oooo02@0oooo103o0>J`0?ooo`00A03oool00`000000oooo0?ooo`2B0?ooo`03 0000003oool0oooo02<0oooo00<000000?ooo`3oool0/P3oool004@0oooo00<000000?ooo`3oool0 TP3oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo0;<0oooo00140?ooo`030000003o ool0oooo0980oooo00<000000?ooo`3oool08@3oool00`000000oooo0?ooo`2d0?ooo`00A@3oool0 0`000000oooo0?ooo`2A0?ooo`<000008@3oool00`000000oooo0?ooo`2d0?ooo`00A@3oool00`00 0000oooo0?ooo`2A0?ooo`030000003oool0oooo0200oooo00<000000?ooo`3oool0]@3oool004D0 oooo00<000000?ooo`3oool0T@3oool00`000000oooo0?ooo`0O0?ooo`030000003oool0oooo0;H0 oooo00160?ooo`030000003oool0oooo0900oooo00<000000?ooo`3oool07`3oool00`000000oooo 0?ooo`2f0?ooo`00AP3oool00`000000oooo0?ooo`2@0?ooo`030000003oool0oooo01h0oooo00<0 00000?ooo`3oool0]`3oool004H0oooo00<000000?ooo`3oool0T03oool00`000000oooo0?ooo`0M 0?ooo`030000003oool0oooo0;P0oooo00170?ooo`030000003oool0oooo08l0oooo00<000000?oo o`3oool0703oool00`000000oooo0?ooo`2i0?ooo`00A`3oool00`000000oooo0?ooo`2?0?ooo`03 0000003oool0oooo01`0oooo00<000000?ooo`3oool0^@3oool004L0oooo00<000000?ooo`3oool0 S`3oool00`000000oooo0?ooo`0K0?ooo`030000003oool0oooo0;X0oooo00180?ooo`030000003o ool0oooo08h0oooo0`00000J0?ooo`030000003oool0oooo0;/0oooo00180?ooo`030000003oool0 oooo08h0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`2k0?ooo`00B03oool00`00 0000oooo0?ooo`2>0?ooo`030000003oool0oooo01T0oooo00<000000?ooo`3oool0_03oool004T0 oooo00<000000?ooo`3oool0S@3oool00`000000oooo0?ooo`0H0?ooo`030000003oool0oooo0;d0 oooo00190?ooo`030000003oool0oooo08d0oooo00<000000?ooo`3oool05`3oool00`000000oooo 0?ooo`2n0?ooo`00B@3oool00`000000oooo0?ooo`2=0?ooo`030000003oool0oooo01L0oooo00<0 00000?ooo`3oool0_P3oool004X0oooo00<000000?ooo`3oool0S03oool00`000000oooo0?ooo`0F 0?ooo`030000003oool0oooo0;l0oooo001:0?ooo`030000003oool0oooo08`0oooo00<000000?oo o`3oool05@3oool00`000000oooo0?ooo`300?ooo`00BP3oool00`000000oooo0?ooo`2<0?ooo`<0 00005@3oool00`000000oooo0?ooo`300?ooo`00B`3oool00`000000oooo0?ooo`2;0?ooo`030000 003oool0oooo01@0oooo00<000000?ooo`3oool0`@3oool004/0oooo00<000000?ooo`3oool0R`3o ool00`000000oooo0?ooo`0C0?ooo`030000003oool0oooo0<80oooo001<0?ooo`030000003oool0 oooo08X0oooo00<000000?ooo`3oool04P3oool00`000000oooo0?ooo`330?ooo`00C03oool00`00 0000oooo0?ooo`2:0?ooo`030000003oool0oooo0180oooo00<000000?ooo`3oool0``3oool004`0 oooo00<000000?ooo`3oool0RP3oool00`000000oooo0?ooo`0A0?ooo`030000003oool0oooo0<@0 oooo001=0?ooo`030000003oool0oooo08T0oooo00<000000?ooo`3oool0403oool00`000000oooo 0?ooo`350?ooo`00C@3oool00`000000oooo0?ooo`1i0?ooo`@000000P3oool3000000L0oooo00<0 00000?ooo`3oool0403oool00`000000oooo0?ooo`350?ooo`00C@3oool00`000000oooo0?ooo`1k 0?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`0? 0?ooo`030000003oool0oooo00?ooo`030000003oool0oooo07X0oooo00<000000?oo o`3oool0103oool00`000000oooo0?ooo`040?ooo`@000003@3oool00`000000oooo0?ooo`370?oo o`00CP3oool00`000000oooo0?ooo`1j0?ooo`040000003oool0oooo0?ooo`<000001`3oool00`00 0000oooo0?ooo`0=0?ooo`030000003oool0oooo00?ooo`030000003oool0oooo07X0 oooo00D000000?ooo`3oool0oooo000000090?ooo`030000003oool0oooo00d0oooo00<000000?oo o`3oool0b03oool004l0oooo00<000000?ooo`3oool0M`3oool3000000<0oooo00<000000?ooo`3o ool01`3oool00`000000oooo0?ooo`0<0?ooo`030000003oool0oooo00?ooo`00DP3o ool00`000000oooo0?ooo`240?ooo`030000003oool0oooo00H0oooo00<000000?ooo`3oool0c`3o ool005<0oooo00<000000?ooo`3oool0P`3oool00`000000oooo0?ooo`050?ooo`030000003oool0 oooo0=00oooo001C0?ooo`030000003oool0oooo08<0oooo00<000000?ooo`3oool01@3oool00`00 0000oooo0?ooo`3@0?ooo`00E03oool00`000000oooo0?ooo`220?ooo`030000003oool0oooo00@0 oooo00<000000?ooo`3oool0d@3oool005@0oooo00<000000?ooo`3oool0PP3oool00`000000oooo 0?ooo`030?ooo`030000003oool0oooo0=80oooo001E0?ooo`030000003oool0oooo0840oooo00<0 00000?ooo`3oool00`3oool00`000000oooo0?ooo`3B0?ooo`00E@3oool00`000000oooo0?ooo`21 0?ooo`<000000P3oool00`000000oooo0?ooo`3C0?ooo`00EP3oool00`000000oooo0?ooo`200?oo o`050000003oool0oooo0?ooo`000000eP3oool005H0oooo00<000000?ooo`3oool0P03oool01000 0000oooo0?ooo`00003G0?ooo`00E`3oool00`000000oooo0?ooo`1o0?ooo`040000003oool0oooo 00000=L0oooo001G0?ooo`030000003oool0oooo07l0oooo00<000000?ooo`000000f03oool005P0 oooo00<000000?ooo`3oool0OP3oool200000=T0oooo001H0?ooo`030000003oool0oooo07h0oooo 0P00003I0?ooo`00F@3oool00`000000oooo0?ooo`1m0?ooo`030000003oool0oooo0=P0oooo001I 0?ooo`030000003oool0oooo07`0oooo0P00003J0?ooo`00FP3oool00`000000oooo0?ooo`1j0?oo o`030000003oool0000000800000f03oool005X0oooo00<000000?ooo`3oool0NP3oool00`000000 oooo0000003J0?ooo`00F`3oool00`000000oooo0?ooo`1h0?ooo`040000003oool0oooo00000=X0 oooo001K0?ooo`030000003oool0oooo07L0oooo00D000000?ooo`3oool0oooo0000003J0?ooo`00 G03oool00`000000oooo0?ooo`1f0?ooo`050000003oool0oooo0?ooo`000000fP3oool005`0oooo 00<000000?ooo`3oool0M@3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo0=P0oooo 001M0?ooo`030000003oool0oooo07<0oooo00<000000?ooo`3oool00`3oool00`000000oooo0?oo o`3H0?ooo`00G@3oool00`000000oooo0?ooo`1b0?ooo`030000003oool0oooo00@0oooo00<00000 0?ooo`3oool0f03oool005h0oooo00<000000?ooo`3oool0L@3oool00`000000oooo0?ooo`040?oo o`<00000f03oool005h0oooo00<000000?ooo`3oool0L03oool00`000000oooo0?ooo`050?ooo`03 0000003oool0oooo0=P0oooo001O0?ooo`030000003oool0oooo06h0oooo00<000000?ooo`3oool0 1P3oool00`000000oooo0?ooo`3H0?ooo`00G`3oool00`000000oooo0?ooo`1^0?ooo`030000003o ool0oooo00H0oooo00<000000?ooo`3oool0f03oool00600oooo00<000000?ooo`3oool0K03oool0 0`000000oooo0?ooo`070?ooo`030000003oool0oooo0=P0oooo001Q0?ooo`030000003oool0oooo 06X0oooo00<000000?ooo`3oool0203oool00`000000oooo0?ooo`3H0?ooo`00H@3oool00`000000 oooo0?ooo`1Y0?ooo`030000003oool0oooo00T0oooo00<000000?ooo`3oool0f03oool00680oooo 00<000000?ooo`3oool0I03oool500000080oooo0P0000070?ooo`030000003oool0oooo0=P0oooo 001S0?ooo`030000003oool0oooo06<0oooo00@000000?ooo`3oool000000P3oool010000000oooo 0?ooo`0000060?ooo`030000003oool0oooo0=P0oooo001S0?ooo`030000003oool0oooo06@0oooo 0P0000030?ooo`040000003oool0oooo000000H0oooo1000003G0?ooo`00I03oool00`000000oooo 0?ooo`1S0?ooo`8000000`3oool010000000oooo0?ooo`0000060?ooo`030000003oool0oooo0=P0 oooo001T0?ooo`030000003oool0oooo0680oooo00@000000?ooo`3oool000000P3oool010000000 oooo0?ooo`0000060?ooo`030000003oool0oooo0=P0oooo001U0?ooo`030000003oool0oooo0600 oooo0P0000020?ooo`040000003oool0oooo00000080oooo00<000000?ooo`3oool0103oool00`00 0000oooo0?ooo`3H0?ooo`00IP3oool00`000000oooo0?ooo`1N0?ooo`030000003oool0oooo0080 0000103oool2000000L0oooo00<000000?ooo`3oool0f03oool006H0oooo00<000000?ooo`3oool0 G@3oool00`000000oooo0?ooo`0@0?ooo`030000003oool0oooo0=P0oooo001W0?ooo`030000003o ool0oooo05/0oooo00<000000?ooo`3oool04@3oool00`000000oooo0?ooo`3H0?ooo`00J03oool0 0`000000oooo0?ooo`1I0?ooo`030000003oool0oooo0180oooo00<000000?ooo`3oool0f03oool0 06P0oooo00<000000?ooo`3oool0F@3oool00`000000oooo0?ooo`0B0?ooo`030000003oool0oooo 0=P0oooo001Y0?ooo`030000003oool0oooo05L0oooo00<000000?ooo`3oool04`3oool300000=P0 oooo001Z0?ooo`030000003oool0oooo05D0oooo00<000000?ooo`3oool0503oool00`000000oooo 0?ooo`3H0?ooo`00J`3oool00`000000oooo0?ooo`1C0?ooo`030000003oool0oooo01D0oooo00<0 00000?ooo`3oool0f03oool006/0oooo00<000000?ooo`3oool0DP3oool00`000000oooo0?ooo`0F 0?ooo`030000003oool0oooo0=P0oooo001/0?ooo`030000003oool0oooo0500oooo00<000000?oo o`3oool05`3oool00`000000oooo0?ooo`3H0?ooo`00K@3oool00`000000oooo0?ooo`1>0?ooo`03 0000003oool0oooo01P0oooo00<000000?ooo`3oool0f03oool006h0oooo00<000000?ooo`3oool0 C03oool00`000000oooo0?ooo`0I0?ooo`030000003oool0oooo0=P0oooo001^0?ooo`030000003o ool0oooo04/0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`3H0?ooo`00K`3oool0 0`000000oooo0?ooo`190?ooo`030000003oool0oooo01/0oooo0`00003H0?ooo`00L03oool00`00 0000oooo0?ooo`160?ooo`8000007P3oool00`000000oooo0?ooo`3H0?ooo`00L@3oool00`000000 oooo0?ooo`140?ooo`030000003oool0oooo01h0oooo00<000000?ooo`3oool0f03oool00780oooo 0P0000130?ooo`030000003oool0oooo01l0oooo00<000000?ooo`3oool0f03oool007@0oooo00<0 00000?ooo`3oool0?`3oool00`000000oooo0?ooo`0P0?ooo`030000003oool0oooo0=P0oooo001e 0?ooo`030000003oool0oooo03`0oooo0P00000S0?ooo`030000003oool0oooo0=P0oooo001f0?oo o`030000003oool0oooo03X0oooo00<000000?ooo`3oool08`3oool00`000000oooo0?ooo`3H0?oo o`00M`3oool00`000000oooo0?ooo`0h0?ooo`030000003oool0oooo02@0oooo00<000000?ooo`3o ool0f03oool007P0oooo00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`0U0?ooo`030000 003oool0oooo0=P0oooo001i0?ooo`030000003oool0oooo03<0oooo0P00000X0?ooo`<00000f03o ool007X0oooo0P00000b0?ooo`030000003oool0oooo02P0oooo00<000000?ooo`3oool0f03oool0 0180oooo0P00000d0?ooo`<00000<@3oool00`000000oooo0?ooo`0]0?ooo`800000:`3oool00`00 0000oooo0?ooo`3H0?ooo`00503oool00`000000oooo0?ooo`0a0?ooo`030000003oool0oooo00<0 oooo00<000000?ooo`3oool0;03oool00`000000oooo0?ooo`0Z0?ooo`800000;@3oool00`000000 oooo0?ooo`3H0?ooo`00503oool00`000000oooo0?ooo`0b0?ooo`030000003oool0oooo0080oooo 00<000000?ooo`3oool0;@3oool00`000000oooo0?ooo`0W0?ooo`800000;`3oool00`000000oooo 0?ooo`3H0?ooo`003@3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo00D0oooo00<0 00000?ooo`3oool07`3oool00`000000oooo0?ooo`0:0?ooo`050000003oool0oooo0?ooo`000000 1`3oool00`000000oooo0?ooo`0V0?ooo`8000002P3oool01@000000oooo0?ooo`3oool0000001D0 oooo0`00000a0?ooo`030000003oool0oooo0=P0oooo000<0?ooo`030000003oool0oooo00D0oooo 00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`0Q0?ooo`030000003oool0000000H0oooo 00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo02T0 oooo0P0000090?ooo`050000003oool0oooo0?ooo`0000004P3oool2000003@0oooo00<000000?oo o`3oool0f03oool000`0oooo00<000000?ooo`3oool00`3oool3000000D0oooo00<000000?ooo`3o ool0403oool2000000l0oooo00@000000?ooo`3oool000001P3oool300000080oooo0`0000050?oo o`030000003oool0oooo02<0oooo0P0000060?ooo`8000001`3oool01@000000oooo0?ooo`3oool0 00000100oooo0P00000f0?ooo`030000003oool0oooo0=P0oooo000<0?ooo`030000003oool0oooo 00/0oooo00<000000?ooo`3oool00`00000=0?ooo`800000103oool2000000<0oooo0`0000030?oo o`040000003oool00000000001<0oooo00<000000?ooo`3oool00`000000103oool0000000000000 00040?ooo`030000003oool0oooo0080oooo00<000000?ooo`3oool00`3oool2000000<0oooo0`00 00050?ooo`800000103oool200000080oooo100000030?ooo`060000003oool0oooo0?ooo`000000 oooo103o0>H60?ooo`D00000>03oool00`000000oooo0?ooo`3H0?ooo`00303oool00`000000oooo 0?ooo`0;0?ooo`040000003oool0oooo000000h0oooo0`0000060?ooo`050000003oool0oooo0?oo o`000000103oool00`000000oooo0?ooo`0D0?ooo`050000003oool0oooo0?ooo`0000001@3oool6 000000<0oooo00<000000?ooo`3oool01@3oool01@000000oooo0?ooo`3oool0000000D0oooo0`00 00060?ooo`040000003oool0oooo0?ooo`H000000`3oool00`000000oooo0?l0iP030?l0iPH00000 ?@3oool300000=P0oooo000;0?ooo`040000003oool0oooo0?ooo`L00000103oool01@000000oooo 0?ooo`3oool0000000@0oooo100000030?ooo`@0000000<0oooo0000003oool0103oool01@000000 oooo0?ooo`3oool0000000@0oooo00<000000?ooo`3oool0103oool<000000@0oooo00D000000?oo o`3oool0oooo000000050?ooo`8000000P3oool00`000000oooo0?ooo`05000000D0oooo00D00000 0?ooo`3oool0oooo000000030?ooo`@0000000<0oooo0000003oool0103oool01@000000oooo0?oo o`3oool0000000@0oooo1P0000040?l0iT<0oooo00<000000?ooo`3oool0f03oool000`0oooo00<0 00000?ooo`3oool02`3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo00X0oooo00@0 00000?ooo`3oool00000103oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo0080oooo 00<000000?ooo`3oool0503oool01@000000oooo0?ooo`3oool0000000<0oooo0P0000020?ooo`03 0000003oool0000000@0oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`020?ooo`03 0000003oool0oooo00<0oooo00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`020?oo o`030000003oool0oooo0080oooo00H000000?ooo`3oool0oooo0000003oool40?l0iT<0oooo00<0 00000?ooo`3oool0f03oool000`0oooo00<000000?ooo`3oool02`3oool00`000000oooo00000002 0?ooo`030000003oool0oooo00d0oooo00<000000?ooo`3oool00`3oool01@000000oooo0?ooo`3o ool0000000@0oooo00<000000?ooo`3oool0503oool01@000000oooo0?ooo`3oool000000080oooo 00<000000?ooo`3oool00`3oool2000000@0oooo00<000000?ooo`3oool01@3oool01@000000oooo 0?ooo`3oool0000000P0oooo00<000000?ooo`3oool00`3oool01@000000oooo0?ooo`3oool00000 00@0oooo00D000000?ooo`3oool0oooo000000180?ooo`030000003oool0oooo0=P0oooo000<0?oo o`030000003oool0oooo00/0oooo00<000000?ooo`3oool00`00000@0?ooo`030000003oool0oooo 00<000000`3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo01@0oooo00D000000?oo o`3oool0oooo000000030?ooo`<000000`3oool00`000000oooo0?ooo`080?ooo`<000000`3oool0 0`000000oooo0?ooo`070?ooo`030000003oool0oooo00<000000`3oool00`000000oooo0?ooo`02 0?ooo`050000003oool0oooo0?ooo`000000B03oool00`000000oooo0?ooo`3H0?ooo`00303oool0 0`000000oooo0?ooo`0;0?ooo`030000003oool0oooo01<0oooo00<000000?ooo`3oool02`3oool0 0`000000oooo0?ooo`0D0?ooo`030000003oool0oooo02H0oooo00<000000?ooo`3oool02`3oool0 1@000000oooo0?ooo`3oool0000004P0oooo00<000000?ooo`3oool0f03oool000d0oooo00<00000 0?ooo`3oool00P3oool3000000H0oooo00<000000?ooo`3oool04P3oool>000000`0oooo0`000009 0?ooo`030000003oool0oooo02D0oooo3P0000030?ooo`030000003oool0oooo03L0oooo10000002 0?ooo`<000001`3oool00`000000oooo0?ooo`3H0?ooo`004`3oool00`000000oooo0?ooo`0d0?oo o`030000003oool0oooo07`0oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`040?oo o`030000003oool0oooo0=P0oooo000C0?ooo`030000003oool0oooo03D0oooo00<000000?ooo`3o ool0O03oool00`000000oooo0?ooo`050?ooo`030000003oool0oooo00@0oooo1000003G0?ooo`00 4`3oool00`000000oooo0?ooo`0f0?ooo`030000003oool0oooo07`0oooo00@000000?ooo`3oool0 oooo0`0000070?ooo`030000003oool0oooo0=P0oooo000C0?ooo`030000003oool0oooo03<0oooo 00@000000?ooo`3oool00000O`3oool010000000oooo0?ooo`0000090?ooo`030000003oool0oooo 0=P0oooo000C0?ooo`030000003oool0oooo03@0oooo0`00001l0?ooo`040000003oool0oooo0000 0080oooo00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`3H0?ooo`00bP3oool2000000<0 oooo100000060?ooo`030000003oool0oooo0=P0oooo003I0?ooo`030000003oool0oooo0=P0oooo 003I0?ooo`030000003oool0oooo0=P0oooo003I0?ooo`030000003oool0oooo0=P0oooo003I0?oo o`030000003oool0oooo0=P0oooo003I0?ooo`<00000f03oool00=T0oooo00<000000?ooo`3oool0 f03oool00=T0oooo00<000000?ooo`3oool0f03oool00=T0oooo00<000000?ooo`3oool0f03oool0 0=T0oooo00<000000?ooo`3oool0f03oool00=T0oooo00<000000?ooo`3oool0f03oool00=T0oooo 00<000000?ooo`3oool0f03oool00=T0oooo00<000000?ooo`3oool0f03oool00=T0oooo0`00003H 0?ooo`00\ \>"], ImageRangeCache->{{{0, 435.938}, {269.062, 0}} -> {-3.66493, -4.19074, \ 0.016814, 0.115944}}] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[" -- Refinement", "Subsection"], Cell["\<\ It looks like more room is needed on the sides and top and bottom \ of the graph . The first attempt used 11% but let's increase that to \ 20%:\ \>", "Text"], Cell[BoxData[{ \(\(horzPlotRange = \ nicerange[theXvalues, 20];\)\), "\[IndentingNewLine]", \(\(vertPlotRange = nicerange[theYvalues, 20];\)\)}], "Input"], Cell["\<\ Next, the labels need to be offset better than this; they collide \ with the axes and with each other Try:\ \>", "Text"], Cell[BoxData[{ \(\(offsets\ = \ {{1, \(-1.5\)}, {0.5, \(-1\)}, {\(-1\), \(-1\)}, {0, \ \(-1.1\)}, {0, 1.7}, {0, \(-1.1\)}};\)\), "\n", \(\(theLabels\ = \ Map[xylabel, \ Transpose[{theXYcoords, offsets}]];\)\)}], "Input"], Cell["Now make the graphs again. Throw in another big label:", "Text"], Cell[CellGroupData[{ Cell[BoxData[{ \(\(\(graph7 = Plot[g[x], {x, \(-33\), 33}, PlotRange \[Rule] {horzPlotRange, vertPlotRange}, \ DisplayFunction \[Rule] Identity];\)\(\[IndentingNewLine]\) \)\), "\n", \(\(\(graph8 = ListPlot[theXYcoords, PlotRange \[Rule] {horzPlotRange, vertPlotRange}, \ PlotStyle \[Rule] {AbsolutePointSize[5], Hue[0.85]}, \ DisplayFunction \[Rule] Identity];\)\(\[IndentingNewLine]\) \)\), "\[IndentingNewLine]", \(\(\(biglabel\ = \ Graphics[ Text[StyleForm["\", FontFamily -> "\", \ FontSize \[Rule] 18, \ FontWeight \[Rule] "\"], \ {2.5, 23}, {0, 0}]];\)\(\[IndentingNewLine]\) \)\), "\n", \(\(Show[Flatten[{graph7, \ graph8, \ theLabels, \ biglabel}], \ DisplayFunction \[Rule] $DisplayFunction];\)\)}], "Input"], Cell[GraphicsData["PostScript", "\<\ %! %%Creator: Mathematica %%AspectRatio: .61803 MathPictureStart /Mabs { Mgmatrix idtransform Mtmatrix dtransform } bind def /Mabsadd { Mabs 3 -1 roll add 3 1 roll add exch } bind def %% Graphics %%IncludeResource: font Courier %%IncludeFont: Courier /Courier findfont 10 scalefont setfont % Scaling calculations 0.5 0.119048 0.112078 0.0172642 [ [.02381 .09958 -6 -9 ] [.02381 .09958 6 0 ] [.2619 .09958 -6 -9 ] [.2619 .09958 6 0 ] [.7381 .09958 -3 -9 ] [.7381 .09958 3 0 ] [.97619 .09958 -3 -9 ] [.97619 .09958 3 0 ] [.4875 .02576 -12 -4.5 ] [.4875 .02576 0 4.5 ] [.4875 .1984 -6 -4.5 ] [.4875 .1984 0 4.5 ] [.4875 .28472 -12 -4.5 ] [.4875 .28472 0 4.5 ] [.4875 .37104 -12 -4.5 ] [.4875 .37104 0 4.5 ] [.4875 .45736 -12 -4.5 ] [.4875 .45736 0 4.5 ] [.4875 .54368 -12 -4.5 ] [.4875 .54368 0 4.5 ] [ 0 0 0 0 ] [ 1 .61803 0 0 ] ] MathScale % Start of Graphics 1 setlinecap 1 setlinejoin newpath 0 g .25 Mabswid [ ] 0 setdash .02381 .11208 m .02381 .11833 L s [(-4)] .02381 .09958 0 1 Mshowa .2619 .11208 m .2619 .11833 L s [(-2)] .2619 .09958 0 1 Mshowa .7381 .11208 m .7381 .11833 L s [(2)] .7381 .09958 0 1 Mshowa .97619 .11208 m .97619 .11833 L s [(4)] .97619 .09958 0 1 Mshowa .125 Mabswid .08333 .11208 m .08333 .11583 L s .14286 .11208 m .14286 .11583 L s .20238 .11208 m .20238 .11583 L s .32143 .11208 m .32143 .11583 L s .38095 .11208 m .38095 .11583 L s .44048 .11208 m .44048 .11583 L s .55952 .11208 m .55952 .11583 L s .61905 .11208 m .61905 .11583 L s .67857 .11208 m .67857 .11583 L s .79762 .11208 m .79762 .11583 L s .85714 .11208 m .85714 .11583 L s .91667 .11208 m .91667 .11583 L s .25 Mabswid 0 .11208 m 1 .11208 L s .5 .02576 m .50625 .02576 L s [(-5)] .4875 .02576 1 0 Mshowa .5 .1984 m .50625 .1984 L s [(5)] .4875 .1984 1 0 Mshowa .5 .28472 m .50625 .28472 L s [(10)] .4875 .28472 1 0 Mshowa .5 .37104 m .50625 .37104 L s [(15)] .4875 .37104 1 0 Mshowa .5 .45736 m .50625 .45736 L s [(20)] .4875 .45736 1 0 Mshowa .5 .54368 m .50625 .54368 L s [(25)] .4875 .54368 1 0 Mshowa .125 Mabswid .5 .04302 m .50375 .04302 L s .5 .06029 m .50375 .06029 L s .5 .07755 m .50375 .07755 L s .5 .09481 m .50375 .09481 L s .5 .12934 m .50375 .12934 L s .5 .14661 m .50375 .14661 L s .5 .16387 m .50375 .16387 L s .5 .18113 m .50375 .18113 L s .5 .21566 m .50375 .21566 L s .5 .23293 m .50375 .23293 L s .5 .25019 m .50375 .25019 L s .5 .26746 m .50375 .26746 L s .5 .30198 m .50375 .30198 L s .5 .31925 m .50375 .31925 L s .5 .33651 m .50375 .33651 L s .5 .35378 m .50375 .35378 L s .5 .3883 m .50375 .3883 L s .5 .40557 m .50375 .40557 L s .5 .42283 m .50375 .42283 L s .5 .4401 m .50375 .4401 L s .5 .47463 m .50375 .47463 L s .5 .49189 m .50375 .49189 L s .5 .50915 m .50375 .50915 L s .5 .52642 m .50375 .52642 L s .5 .00849 m .50375 .00849 L s .5 .56095 m .50375 .56095 L s .5 .57821 m .50375 .57821 L s .5 .59547 m .50375 .59547 L s .5 .61274 m .50375 .61274 L s .25 Mabswid .5 0 m .5 .61803 L s 0 0 m 1 0 L 1 .61803 L 0 .61803 L closepath clip newpath .5 Mabswid .11948 0 m .16062 .18519 L .20257 .32626 L .24278 .42322 L .26304 .45916 L .28527 .48944 L .30426 .50822 L .31491 .51606 L .32462 .5216 L .33365 .52543 L .34348 .5282 L .35277 .52952 L .36136 .52969 L .37118 .52866 L .38177 .52618 L .39177 .52258 L .40094 .51827 L .42223 .50479 L .44464 .48588 L .4869 .43949 L .53312 .37731 L .61634 .25413 L .65722 .19718 L .69491 .15166 L .7156 .13074 L .73836 .11189 L .74939 .10452 L .76124 .09803 L .76778 .09512 L .77375 .09288 L .77943 .09116 L .78546 .08975 L .79594 .08842 L .80566 .08849 L .81161 .08917 L .81721 .09028 L .82767 .09358 L .83771 .09832 L .84694 .10407 L .86775 .12227 L .8881 .14749 L .90664 .17728 L .94828 .26994 L .98686 .39076 L s .98686 .39076 m 1 .44423 L s 1 0 .9 r 5 Mabswid .14286 .11208 Mdot .35842 .52974 Mdot .57937 .30902 Mdot .7381 .11208 Mdot .80031 .08829 Mdot .85714 .11208 Mdot 0 g gsave .14286 .11208 -91 -1.54687 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 72.125 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 76.625 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 81.562 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 86.062 11.250 moveto (<) show 1.000 setlinewidth grestore gsave .35842 .52974 -163.938 -4 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (1) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 76.875 18.125 moveto (I) show 79.625 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 85.875 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 93.375 12.812 moveto (\\217) show 100.750 12.812 moveto (!) show 102.375 12.812 moveto (!) show 104.000 12.812 moveto (!) show 105.625 12.812 moveto (!) show 107.250 12.812 moveto (!) show 108.875 12.812 moveto (!) show 109.750 12.812 moveto (!) show 101.250 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 112.312 18.125 moveto (M) show 115.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 124.562 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 121.375 18.125 moveto (\\200) show 122.500 18.125 moveto (\\200) show 123.625 18.125 moveto (\\200) show 124.750 18.125 moveto (\\200) show 125.875 18.125 moveto (\\200) show 127.000 18.125 moveto (\\200) show 128.125 18.125 moveto (\\200) show 129.250 18.125 moveto (\\200) show 130.375 18.125 moveto (\\200) show 131.250 18.125 moveto (\\200) show 122.312 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 135.312 18.125 moveto (I) show 138.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (154) show 153.312 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (+) show 160.812 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 171.500 12.812 moveto (\\217) show 178.875 12.812 moveto (!) show 180.500 12.812 moveto (!) show 182.125 12.812 moveto (!) show 183.750 12.812 moveto (!) show 185.375 12.812 moveto (!) show 187.000 12.812 moveto (!) show 187.875 12.812 moveto (!) show 179.375 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 190.438 18.125 moveto (M) show 193.188 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .57937 .30902 -61 -4 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 75.188 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 82.438 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (308) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 81.500 18.125 moveto (\\200) show 82.625 18.125 moveto (\\200) show 83.750 18.125 moveto (\\200) show 84.875 18.125 moveto (\\200) show 86.000 18.125 moveto (\\200) show 87.125 18.125 moveto (\\200) show 88.250 18.125 moveto (\\200) show 89.375 18.125 moveto (\\200) show 90.500 18.125 moveto (\\200) show 91.625 18.125 moveto (\\200) show 92.750 18.125 moveto (\\200) show 93.875 18.125 moveto (\\200) show 95.000 18.125 moveto (\\200) show 95.875 18.125 moveto (\\200) show 84.688 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 98.250 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .7381 .11208 -72.9062 -3.50937 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 70.438 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 75.375 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 79.875 11.250 moveto (<) show 1.000 setlinewidth grestore gsave .80031 .08829 -129.625 -33.1938 Mabsadd m 1 1 Mabs scale currentpoint translate 0 29.625 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def /MISOfy { /newfontname exch def /oldfontname exch def oldfontname findfont dup length dict begin {1 index /FID ne {def} {pop pop} ifelse} forall /Encoding ISOLatin1Encoding def currentdict end newfontname exch definefont pop } def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 18.125 moveto (9) show 68.375 11.062 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman %%BeginResource: font Times-Roman-MISO %%BeginFont: Times-Roman-MISO /Times-Roman /Times-Roman-MISO MISOfy %%EndFont %%EndResource %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (1) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 67.438 18.125 moveto (\\200) show 68.562 18.125 moveto (\\200) show 69.688 18.125 moveto (\\200) show 70.812 18.125 moveto (\\200) show 71.938 18.125 moveto (\\200) show 72.812 18.125 moveto (\\200) show 68.375 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 76.875 18.125 moveto (I) show 79.625 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show 85.875 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (+) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 93.375 12.812 moveto (\\217) show 100.750 12.812 moveto (!) show 102.375 12.812 moveto (!) show 104.000 12.812 moveto (!) show 105.625 12.812 moveto (!) show 107.250 12.812 moveto (!) show 108.875 12.812 moveto (!) show 109.750 12.812 moveto (!) show 101.250 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 112.312 18.125 moveto (M) show 115.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 124.562 11.062 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (2) show %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 121.375 18.125 moveto (\\200) show 122.500 18.125 moveto (\\200) show 123.625 18.125 moveto (\\200) show 124.750 18.125 moveto (\\200) show 125.875 18.125 moveto (\\200) show 127.000 18.125 moveto (\\200) show 128.125 18.125 moveto (\\200) show 129.250 18.125 moveto (\\200) show 130.375 18.125 moveto (\\200) show 131.250 18.125 moveto (\\200) show 122.312 24.500 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (27) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 135.312 18.125 moveto (I) show 138.062 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (154) show 153.312 18.125 moveto %%IncludeResource: font Mathematica1 %%IncludeFont: Mathematica1 /Mathematica1 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (-) show 160.812 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show 0.000 0.000 0.000 setrgbcolor %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 171.500 12.812 moveto (\\217) show 178.875 12.812 moveto (!) show 180.500 12.812 moveto (!) show 182.125 12.812 moveto (!) show 183.750 12.812 moveto (!) show 185.375 12.812 moveto (!) show 187.000 12.812 moveto (!) show 187.875 12.812 moveto (!) show 179.375 18.125 moveto %%IncludeResource: font Times-Roman-MISO %%IncludeFont: Times-Roman-MISO /Times-Roman-MISO findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (31) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 190.438 18.125 moveto (M) show 193.188 18.125 moveto (=) show 1.000 setlinewidth grestore gsave .85714 .11208 -72.9062 -3.50937 Mabsadd m 1 1 Mabs scale currentpoint translate 0 17.8125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 63.000 11.250 moveto (8) show 65.938 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (3) show 70.438 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (,) show 75.375 11.250 moveto %%IncludeResource: font Times-Roman %%IncludeFont: Times-Roman /Times-Roman findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (0) show %%IncludeResource: font Mathematica2 %%IncludeFont: Mathematica2 /Mathematica2 findfont 9.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 79.875 11.250 moveto (<) show 1.000 setlinewidth grestore gsave .79762 .50915 -128.875 -13.0625 Mabsadd m 1 1 Mabs scale currentpoint translate 0 26.125 translate 1 -1 scale /g { setgray} bind def /k { setcmykcolor} bind def /p { gsave} bind def /r { setrgbcolor} bind def /w { setlinewidth} bind def /C { curveto} bind def /F { fill} bind def /L { lineto} bind def /rL { rlineto} bind def /P { grestore} bind def /s { stroke} bind def /S { show} bind def /N {currentpoint 3 -1 roll show moveto} bind def /Msf { findfont exch scalefont [1 0 0 -1 0 0 ] makefont setfont} bind def /m { moveto} bind def /Mr { rmoveto} bind def /Mx {currentpoint exch pop moveto} bind def /My {currentpoint pop exch moveto} bind def /X {0 rmoveto} bind def /Y {0 exch rmoveto} bind def 63.000 17.438 moveto %%IncludeResource: font Times-Bold %%IncludeFont: Times-Bold /Times-Bold findfont 18.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto 63.000 17.438 moveto %%IncludeResource: font Times-Bold %%IncludeFont: Times-Bold /Times-Bold findfont 18.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor (My) show 93.438 17.438 moveto (Super) show 143.812 17.438 moveto (Graph) show 194.750 17.438 moveto %%IncludeResource: font Times-Bold %%IncludeFont: Times-Bold /Times-Bold findfont 18.000 scalefont [1 0 0 -1 0 0 ] makefont setfont 0.000 0.000 0.000 setrgbcolor 0.000 0.000 rmoveto 1.000 setlinewidth grestore % End of Graphics MathPictureEnd \ \>"], "Graphics", ImageSize->{491.562, 303.812}, ImageMargins->{{43, 0}, {0, 0}}, ImageRegion->{{0, 1}, {0, 1}}, ImageCache->GraphicsData["Bitmap", "\<\ CF5dJ6E]HGAYHf4PAg9QL6QYHgP3oool00`000000oooo0?ooo`2h0?ooo`030000003oool0oooo 0?<0oooo000j0?ooo`030000003oool0oooo0;P0oooo00<000000?ooo`3oool0l`3oool003/0oooo 00<000000?ooo`3oool0]`3oool00`000000oooo0?ooo`3c0?ooo`00>`3oool00`000000oooo0?oo o`2g0?ooo`<00000l`3oool003/0oooo00<000000?ooo`3oool0]`3oool00`000000oooo0?ooo`3c 0?ooo`00>`3oool00`000000oooo0?ooo`2g0?ooo`030000003oool0oooo0?<0oooo000l0?ooo`03 0000003oool0oooo0;H0oooo00<000000?ooo`3oool0l`3oool003`0oooo00<000000?ooo`3oool0 ]P3oool00`000000oooo0?ooo`3c0?ooo`00?03oool00`000000oooo0?ooo`2f0?ooo`030000003o ool0oooo0?<0oooo000l0?ooo`030000003oool0oooo0:/0oooo0`0000080?ooo`030000003oool0 oooo0?<0oooo000m0?ooo`030000003oool0oooo0:d0oooo00<000000?ooo`3oool01@3oool00`00 0000oooo0?ooo`3c0?ooo`00?@3oool00`000000oooo0?ooo`2]0?ooo`030000003oool0oooo00D0 oooo1000003b0?ooo`00?@3oool00`000000oooo0?ooo`2T0?ooo`@000000P3oool3000000P0oooo 00<000000?ooo`3oool0l`3oool003d0oooo00<000000?ooo`3oool0ZP3oool00`000000oooo0?oo o`080?ooo`030000003oool0oooo0?<0oooo000n0?ooo`030000003oool0oooo0:T0oooo00<00000 0?ooo`3oool0203oool00`000000oooo0?ooo`3c0?ooo`00?P3oool00`000000oooo0?ooo`2Y0?oo o`@000001`3oool00`000000oooo0?ooo`1D0?ooo`800000=03oool3000006H0oooo000n0?ooo`03 0000003oool0oooo0;@0oooo00<000000?ooo`3oool0EP3oool00`000000oooo0?ooo`0a0?ooo`03 0000003oool0oooo00<0oooo00<000000?ooo`3oool0H03oool003h0oooo00<000000?ooo`3oool0 ]03oool00`000000oooo0?ooo`1F0?ooo`030000003oool0oooo0380oooo00<000000?ooo`3oool0 0P3oool00`000000oooo0?ooo`1P0?ooo`00?P3oool00`000000oooo0?ooo`2d0?ooo`030000003o ool0oooo04h0oooo00<000000?ooo`3oool0103oool00`000000oooo0?ooo`050?ooo`030000003o ool0oooo01l0oooo00<000000?ooo`3oool02P3oool01@000000oooo0?ooo`3oool0000000L0oooo 00<000000?ooo`3oool0IC0?ooo`030000003oool0oooo00X0oooo000;0?ooo`D00000=03oool00`000000 oooo0?ooo`0k0?ooo`030000003oool0oooo0700oooo00<000000?ooo`3oool0L03oool00`000000 oooo0?ooo`0I0?ooo`<00000103o0>H4000004`0oooo1@00000;0?ooo`001P3oool4000000050?oo o`000000oooo0?ooo`000000=@3oool00`000000oooo0?ooo`0d0?ooo`@00000103oool00`000000 oooo0?ooo`1_0?ooo`030000003oool0oooo0740oooo00<000000?ooo`3oool04@3oool7000000<0 oooo103o0>H40?ooo`<00000B@3oool010000000oooo0?ooo`00000<0?ooo`00303oool00`000000 oooo0000000f0?ooo`030000003oool0oooo03`0oooo00<000000?ooo`3oool0KP3oool00`000000 oooo0?ooo`1b0?ooo`030000003oool0oooo00d0oooo0`00000E0?ooo`800000B03oool00`000000 oooo0000000<0?ooo`003@3oool2000003H0oooo00<000000?ooo`3oool0>@3oool010000000oooo 0?ooo`00001`0?ooo`<00000K`3oool010000000oooo0?ooo`00000=0?ooo`8000006P3oool30000 04H0oooo0P00000<0?ooo`003P3oool00`000000oooo0?ooo`0d0?ooo`030000003oool0oooo03X0 oooo0P00001a0?ooo`030000003oool0oooo0700oooo0P00000<0?ooo`8000007`3oool2000004D0 oooo00<000000?ooo`3oool02P3oool004D0oooo00<000000?ooo`3oool0[@3oool00`000000oooo 0?ooo`1l0?ooo`8000008`3oool200000500oooo00150?ooo`030000003oool0oooo0:d0oooo00<0 00000?ooo`3oool0NP3oool2000002L0oooo0P00001>0?ooo`00AP3oool00`000000oooo0?ooo`2/ 0?ooo`030000003oool0oooo07P0oooo0P00000[0?ooo`800000C03oool004H0oooo00<000000?oo o`3oool0[03oool00`000000oooo0?ooo`1g0?ooo`030000003oool0oooo02d0oooo00<000000?oo o`3oool0B@3oool004H0oooo00<000000?ooo`3oool0[03oool00`000000oooo0?ooo`1f0?ooo`03 0000003oool0oooo02l0oooo00<000000?ooo`3oool0B03oool004D0oooo103o0>J/0?ooo`030000 003oool0oooo0700oooo103o0>H2000003<0oooo00<000000?ooo`3o0>H00`3o0>I40?ooo`00A@3o ool40?l0iZ`0oooo00<000000?ooo`3oool0L03oool40?l0iSH0oooo00<000000?l0iP3o0>H00P3o 0>I40?ooo`00A@0000040?l0i_l00000800000040?l0iSL00000103o0>I4000000002`3oool00`00 0000oooo0?ooo`0K0?ooo`030000003oool0oooo01T0oooo103o0>HJ0?ooo`030000003oool0oooo 01X0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`0J0?ooo`030000003oool0oooo 01/0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`0J0?ooo`030000003oool0oooo 01X0oooo00<000000?ooo`3oool06P3oool00`000000oooo0?ooo`0I0?ooo`@0o`3V6`3oool00`00 0000oooo0?ooo`0I0?ooo`@0o`3V6P3oool00`000000oooo0?ooo`0J0?ooo`030000003oool0oooo 00X0oooo000;0?ooo`030000003oool0oooo03T0oooo00<000000?ooo`3oool0=P3oool00`000000 oooo0?ooo`1b0?ooo`030000003oool0oooo06l0oooo00<000000?ooo`000000=`3oool00`000000 oooo0?ooo`020?ooo`030000003oool0oooo03D0oooo00<000000?ooo`3oool02P3oool000/0oooo 00<000000?ooo`3oool0>P3oool00`000000oooo0?ooo`0e0?ooo`030000003oool0oooo0780oooo 00<000000?ooo`3oool0J@3oool00`000000oooo0?ooo`020?ooo`040000003oool00000000000L0 oooo00<000000?ooo`3oool09`3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo0080 oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`0_0?ooo`030000003oool0oooo00X0 oooo000g0?ooo`030000003oool0oooo00h0oooo00<000000?ooo`3oool0ZP3oool00`000000oooo 0?ooo`1X0?ooo`030000003oool0oooo00<0000000<0oooo000000000000103oool2000000<0oooo 00<000000?ooo`3oool09@3oool010000000oooo0?ooo`3oool2000000030?ooo`000000000000@0 oooo0P0000040?ooo`030000003oool0oooo03/0oooo000[0?ooo`030000003oool0oooo00X0oooo 00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo0:X0oooo 00<000000?ooo`3oool0J03oool010000000oooo0?ooo`0000080?ooo`040000003oool0oooo0000 0080oooo00<000000?ooo`3oool09@3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo 00<0oooo00@000000?ooo`3oool000000`3oool00`000000oooo0?ooo`0k0?ooo`00:P3oool00`00 0000oooo0?ooo`070?ooo`80000000<0oooo000000000000103oool2000000@0oooo00<000000?oo o`3oool00P3oool00`000000oooo0?ooo`2Z0?ooo`030000003oool0oooo06L0oooo00H000000?oo o`3oool000000?ooo`0000070?ooo`040000003oool0oooo000000<0oooo00<000000?ooo`3oool0 8`3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo00<0oooo00<000000?ooo`3oool0 0P0000030?ooo`030000003oool0oooo03X0oooo000Z0?ooo`030000003oool0oooo00T0oooo00<0 00000?ooo`3oool00`3oool010000000oooo0?ooo`0000030?ooo`030000003oool0oooo0080oooo 00<000000?ooo`3oool0ZP3oool00`000000oooo0?ooo`1X0?ooo`8000000`3oool00`000000oooo 0?ooo`040?ooo`040000003oool0oooo00000080oooo00<000000?ooo`3oool09@3oool00`000000 oooo0?ooo`020?ooo`030000003oool0oooo00@0oooo00P000000?ooo`3oool000000?ooo`000000 oooo000003d0oooo000Y0?ooo`030000003oool0oooo0080oooo100000040?ooo`030000003oool0 oooo00<0oooo00@000000?ooo`3oool00000103oool00`000000oooo0?ooo`020?ooo`030000003o ool0oooo0:T0oooo0`00001W0?ooo`80000000D0oooo0000003oool0oooo000000060?ooo`040000 003oool0oooo00000080oooo00<000000?ooo`3oool09@3oool00`000000oooo0?ooo`030?ooo`03 0000003oool0oooo00<0oooo00@000000?ooo`3oool000000P3oool2000003d0oooo000Z0?ooo`03 0000003oool0oooo00P0oooo00<000000?ooo`3oool0103oool010000000oooo0?ooo`0000030?oo o`030000003oool0oooo00<0oooo00<000000?ooo`3oool0Z@3oool00`000000oooo0?ooo`1V0?oo o`050000003oool0oooo0000003oool00`0000070?ooo`8000000P3oool00`000000oooo0?ooo`0W 0?ooo`030000003oool0oooo00<000001P3oool2000000<0oooo00<000000?ooo`3oool0?03oool0 02X0oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`030?ooo`040000003oool0oooo 000000<0oooo00<000000?ooo`3oool00`3oool00`000000oooo0?ooo`2Y0?ooo`030000003oool0 oooo06D0oooo00<000000?ooo`3oool0C@3oool00`000000oooo0?ooo`0k0?ooo`00:`3oool00`00 0000oooo0?ooo`060?ooo`<000001P3oool2000000<0oooo00<000000?ooo`3oool0103oool00`00 0000oooo0?ooo`2Y0?ooo`030000003oool0oooo06@0oooo00<000000?ooo`3oool0C`3oool00`00 0000oooo0?ooo`0j0?ooo`00BP3oool00`000000oooo0?ooo`2X0?ooo`030000003oool0oooo06<0 oooo00<000000?ooo`3oool0D@3oool00`000000oooo0?ooo`0i0?ooo`00BP3oool00`000000oooo 0?ooo`2X0?ooo`030000003oool0oooo0680oooo00<000000?ooo`3oool0D`3oool00`000000oooo 0?ooo`0h0?ooo`00BP3oool00`000000oooo0?ooo`2X0?ooo`030000003oool0oooo0640oooo00<0 00000?ooo`3oool0E@3oool00`000000oooo0?ooo`0g0?ooo`00BP3oool00`000000oooo0?ooo`2X 0?ooo`030000003oool0oooo0600oooo00<000000?ooo`3oool0EP3oool00`000000oooo0?ooo`0g 0?ooo`00B`3oool00`000000oooo0?ooo`2W0?ooo`030000003oool0oooo05l0oooo00<000000?oo o`3oool0F03oool00`000000oooo0?ooo`0f0?ooo`00B`3oool00`000000oooo0?ooo`2W0?ooo`<0 0000GP3oool00`000000oooo0?ooo`1J0?ooo`030000003oool0oooo03D0oooo001;0?ooo`030000 003oool0oooo0:L0oooo00<000000?ooo`3oool0G@3oool00`000000oooo0?ooo`1L0?ooo`030000 003oool0oooo03@0oooo001;0?ooo`030000003oool0oooo0:L0oooo00<000000?ooo`3oool0G03o ool00`000000oooo0?ooo`1M0?ooo`030000003oool0oooo03@0oooo001<0?ooo`030000003oool0 oooo0:H0oooo00<000000?ooo`3oool0F`3oool00`000000oooo0?ooo`1O0?ooo`030000003oool0 oooo03<0oooo001<0?ooo`030000003oool0oooo0:H0oooo00<000000?ooo`3oool0FP3oool00`00 0000oooo0?ooo`1P0?ooo`030000003oool0oooo03<0oooo001<0?ooo`030000003oool0oooo0:H0 oooo00<000000?ooo`3oool0FP3oool00`000000oooo0?ooo`1Q0?ooo`030000003oool0oooo0380 oooo001<0?ooo`030000003oool0oooo0:H0oooo00<000000?ooo`3oool0F@3oool00`000000oooo 0?ooo`1S0?ooo`030000003oool0oooo0340oooo001<0?ooo`030000003oool0oooo0:H0oooo00<0 00000?ooo`3oool0F03oool00`000000oooo0?ooo`1T0?ooo`030000003oool0oooo0340oooo001= 0?ooo`030000003oool0oooo0:D0oooo0`00001G0?ooo`030000003oool0oooo06H0oooo00<00000 0?ooo`3oool0<03oool004d0oooo00<000000?ooo`3oool0Y@3oool00`000000oooo0?ooo`1F0?oo o`030000003oool0oooo06L0oooo00<000000?ooo`3oool0<03oool004d0oooo00<000000?ooo`3o ool0Y@3oool00`000000oooo0?ooo`1E0?ooo`030000003oool0oooo06T0oooo00<000000?ooo`3o ool0;`3oool004d0oooo00<000000?ooo`3oool0Y@3oool00`000000oooo0?ooo`1E0?ooo`030000 003oool0oooo06X0oooo00<000000?ooo`3oool0;P3oool004h0oooo00<000000?ooo`3oool0Y03o ool00`000000oooo0?ooo`1D0?ooo`030000003oool0oooo06/0oooo00<000000?ooo`3oool0;P3o ool004h0oooo00<000000?ooo`3oool0Y03oool00`000000oooo0?ooo`1C0?ooo`030000003oool0 oooo06d0oooo00<000000?ooo`3oool0;@3oool004h0oooo00<000000?ooo`3oool0Y03oool00`00 0000oooo0?ooo`1B0?ooo`030000003oool0oooo06h0oooo00<000000?ooo`3oool0;@3oool004h0 oooo00<000000?ooo`3oool0Y03oool00`000000oooo0?ooo`1A0?ooo`030000003oool0oooo0700 oooo00<000000?ooo`3oool0;03oool004l0oooo00<000000?ooo`3oool0X`3oool300000540oooo 00<000000?ooo`3oool0L03oool00`000000oooo0?ooo`0/0?ooo`00C`3oool00`000000oooo0?oo o`2S0?ooo`030000003oool0oooo0500oooo00<000000?ooo`3oool0LP3oool00`000000oooo0?oo o`0[0?ooo`00C`3oool00`000000oooo0?ooo`2S0?ooo`030000003oool0oooo04l0oooo00<00000 0?ooo`3oool0L`3oool00`000000oooo0?ooo`0[0?ooo`00C`3oool00`000000oooo0?ooo`2S0?oo o`030000003oool0oooo04h0oooo00<000000?ooo`3oool0M@3oool00`000000oooo0?ooo`0Z0?oo o`00D03oool00`000000oooo0?ooo`2R0?ooo`030000003oool0oooo04d0oooo00<000000?ooo`3o ool0MP3oool00`000000oooo0?ooo`0Z0?ooo`00D03oool00`000000oooo0?ooo`2R0?ooo`030000 003oool0oooo04`0oooo00<000000?ooo`3oool0N03oool00`000000oooo0?ooo`0Y0?ooo`00D03o ool00`000000oooo0?ooo`2R0?ooo`030000003oool0oooo04`0oooo00<000000?ooo`3oool0N03o ool00`000000oooo0?ooo`0Y0?ooo`00D03oool00`000000oooo0?ooo`2G0?ooo`<00000203oool0 0`000000oooo0?ooo`1;0?ooo`030000003oool0oooo07X0oooo00<000000?ooo`3oool0:03oool0 0540oooo00<000000?ooo`3oool0V@3oool00`000000oooo0?ooo`050?ooo`030000003oool0oooo 04X0oooo00<000000?ooo`3oool0N`3oool00`000000oooo0?ooo`0X0?ooo`00D@3oool00`000000 oooo0?ooo`2I0?ooo`030000003oool0oooo00D0oooo100000180?ooo`030000003oool0oooo07`0 oooo00<000000?ooo`3oool0:03oool00540oooo00<000000?ooo`3oool0UP3oool3000000P0oooo 00<000000?ooo`3oool0B@3oool00`000000oooo0?ooo`1m0?ooo`030000003oool0oooo02L0oooo 001B0?ooo`030000003oool0oooo09D0oooo00<000000?ooo`3oool0203oool00`000000oooo0?oo o`180?ooo`030000003oool0oooo07h0oooo00<000000?ooo`3oool09`3oool00580oooo00<00000 0?ooo`3oool0U@3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo04L0oooo00<00000 0?ooo`3oool0P03oool00`000000oooo0?ooo`0V0?ooo`00DP3oool00`000000oooo0?ooo`2E0?oo o`@000001`3oool00`000000oooo0?ooo`160?ooo`030000003oool0oooo0840oooo00<000000?oo o`3oool09P3oool00580oooo00<000000?ooo`3oool0X03oool00`000000oooo0?ooo`160?ooo`03 0000003oool0oooo0880oooo00<000000?ooo`3oool09@3oool005<0oooo00<000000?ooo`3oool0 W`3oool00`000000oooo0?ooo`150?ooo`030000003oool0oooo08<0oooo00<000000?ooo`3oool0 9@3oool005<0oooo00<000000?ooo`3oool0W`3oool00`000000oooo0?ooo`140?ooo`030000003o ool0oooo08D0oooo00<000000?ooo`3oool0903oool005<0oooo00<000000?ooo`3oool0W`3oool3 000004@0oooo00<000000?ooo`3oool0Q@3oool00`000000oooo0?ooo`0T0?ooo`00E03oool00`00 0000oooo0?ooo`2N0?ooo`030000003oool0oooo04<0oooo00<000000?ooo`3oool0QP3oool00`00 0000oooo0?ooo`0T0?ooo`00E03oool00`000000oooo0?ooo`2N0?ooo`030000003oool0oooo0480 oooo00<000000?ooo`3oool0R03oool00`000000oooo0?ooo`0S0?ooo`00E03oool00`000000oooo 0?ooo`2N0?ooo`030000003oool0oooo0440oooo00<000000?ooo`3oool0R@3oool00`000000oooo 0?ooo`0S0?ooo`00E03oool00`000000oooo0?ooo`2N0?ooo`030000003oool0oooo0440oooo00<0 00000?ooo`3oool0RP3oool00`000000oooo0?ooo`0R0?ooo`00E@3oool00`000000oooo0?ooo`2M 0?ooo`030000003oool0oooo0400oooo00<000000?ooo`3oool0R`3oool00`000000oooo0?ooo`0R 0?ooo`00E@3oool00`000000oooo0?ooo`2M0?ooo`030000003oool0oooo03l0oooo00<000000?oo o`3oool0S@3oool00`000000oooo0?ooo`0Q0?ooo`00E@3oool00`000000oooo0?ooo`2M0?ooo`03 0000003oool0oooo03l0oooo00<000000?ooo`3oool0S@3oool00`000000oooo0?ooo`0Q0?ooo`00 EP3oool00`000000oooo0?ooo`2L0?ooo`030000003oool0oooo03h0oooo00<000000?ooo`3oool0 S`3oool00`000000oooo0?ooo`0P0?ooo`00EP3oool00`000000oooo0?ooo`2L0?ooo`<00000?@3o ool00`000000oooo0?ooo`2@0?ooo`030000003oool0oooo0200oooo001F0?ooo`030000003oool0 oooo09`0oooo00<000000?ooo`3oool0?03oool00`000000oooo0?ooo`2A0?ooo`030000003oool0 oooo0200oooo001F0?ooo`030000003oool0oooo09`0oooo00<000000?ooo`3oool0?03oool00`00 0000oooo0?ooo`2B0?ooo`030000003oool0oooo01l0oooo001G0?ooo`030000003oool0oooo09/0 oooo00<000000?ooo`3oool0>`3oool00`000000oooo0?ooo`2C0?ooo`030000003oool0oooo01l0 oooo001G0?ooo`030000003oool0oooo09/0oooo00<000000?ooo`3oool0>P3oool00`000000oooo 0?ooo`2E0?ooo`030000003oool0oooo01h0oooo001G0?ooo`030000003oool0oooo09/0oooo00<0 00000?ooo`3oool0>P3oool00`000000oooo0?ooo`2E0?ooo`030000003oool0oooo01h0oooo001H 0?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3oool0>@3oool00`000000oooo0?ooo`2G 0?ooo`030000003oool0oooo01d0oooo001H0?ooo`030000003oool0oooo09X0oooo00<000000?oo o`3oool0>03oool00`000000oooo0?ooo`2H0?ooo`030000003oool0oooo01d0oooo001H0?ooo`03 0000003oool0oooo09X0oooo0`00000g0?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3o ool0703oool005P0oooo00<000000?ooo`3oool0VP3oool00`000000oooo0?ooo`0g0?ooo`030000 003oool0oooo09X0oooo00<000000?ooo`3oool0703oool005T0oooo00<000000?ooo`3oool0V@3o ool00`000000oooo0?ooo`0f0?ooo`030000003oool0oooo09/0oooo00<000000?ooo`3oool0703o ool005T0oooo00<000000?ooo`3oool0V@3oool00`000000oooo0?ooo`0e0?ooo`030000003oool0 oooo09d0oooo00<000000?ooo`3oool06`3oool005T0oooo00<000000?ooo`3oool0V@3oool00`00 0000oooo0?ooo`0e0?ooo`030000003oool0oooo09d0oooo00<000000?ooo`3oool06`3oool005X0 oooo00<000000?ooo`3oool0V03oool00`000000oooo0?ooo`0d0?ooo`030000003oool0oooo09l0 oooo00<000000?ooo`3oool06P3oool005X0oooo00<000000?ooo`3oool0V03oool00`000000oooo 0?ooo`0c0?ooo`030000003oool0oooo0:00oooo00<000000?ooo`3oool06P3oool005X0oooo00<0 00000?ooo`3oool0V03oool00`000000oooo0?ooo`0c0?ooo`030000003oool0oooo0:40oooo00<0 00000?ooo`3oool06@3oool005X0oooo00<000000?ooo`3oool0V03oool00`000000oooo0?ooo`0b 0?ooo`030000003oool0oooo0:80oooo00<000000?ooo`3oool06@3oool005/0oooo00<000000?oo o`3oool0U`3oool300000340oooo00<000000?ooo`3oool0Y03oool00`000000oooo0?ooo`0H0?oo o`00F`3oool00`000000oooo0?ooo`2G0?ooo`030000003oool0oooo0340oooo00<000000?ooo`3o ool0Y03oool00`000000oooo0?ooo`0H0?ooo`00F`3oool00`000000oooo0?ooo`2G0?ooo`030000 003oool0oooo0300oooo00<000000?ooo`3oool0Y@3oool00`000000oooo0?ooo`0H0?ooo`00G03o ool00`000000oooo0?ooo`2F0?ooo`030000003oool0oooo02l0oooo00<000000?ooo`3oool0Y`3o ool00`000000oooo0?ooo`0G0?ooo`00G03oool00`000000oooo0?ooo`2F0?ooo`030000003oool0 oooo02l0oooo00<000000?ooo`3oool0Y`3oool00`000000oooo0?ooo`0G0?ooo`00G03oool00`00 0000oooo0?ooo`2F0?ooo`030000003oool0oooo02h0oooo00<000000?ooo`3oool0Z03oool00`00 0000oooo0?ooo`0G0?ooo`00G03oool00`000000oooo0?ooo`250?ooo`@000000`3oool2000000P0 oooo00<000000?ooo`3oool0;@3oool00`000000oooo0?ooo`2Z0?ooo`030000003oool0oooo01H0 oooo001M0?ooo`030000003oool0oooo08H0oooo00D000000?ooo`3oool0oooo000000020?ooo`03 0000003oool0oooo00D0oooo00<000000?ooo`3oool0;@3oool00`000000oooo0?ooo`2Z0?ooo`03 0000003oool0oooo01H0oooo001M0?ooo`030000003oool0oooo08H0oooo00D000000?ooo`3oool0 oooo000000020?ooo`030000003oool0oooo00D0oooo1000000[0?ooo`030000003oool0oooo0:/0 oooo00<000000?ooo`3oool05P3oool005d0oooo00<000000?ooo`3oool0QP3oool01@000000oooo 0?ooo`3oool000000080oooo00<000000?ooo`3oool01@3oool00`000000oooo0?ooo`0[0?ooo`03 0000003oool0oooo0:d0oooo00<000000?ooo`3oool05@3oool005h0oooo00<000000?ooo`3oool0 Q@3oool01@000000oooo0?ooo`3oool000000080oooo00<000000?ooo`3oool01@3oool00`000000 oooo0?ooo`0[0?ooo`030000003oool0oooo0:d0oooo00<000000?ooo`3oool05@3oool005h0oooo 00<000000?ooo`3oool0P`3oool3000000<0oooo00@000000?ooo`3oool000001`3oool00`000000 oooo0?ooo`0Z0?ooo`030000003oool0oooo0:h0oooo00<000000?ooo`3oool05@3oool005h0oooo 00<000000?ooo`3oool0Q@3oool00`000000oooo0?ooo`020?ooo`800000203oool00`000000oooo 0?ooo`0Y0?ooo`030000003oool0oooo0;00oooo00<000000?ooo`3oool0503oool005h0oooo00<0 00000?ooo`3oool0U03oool00`000000oooo0?ooo`0Y0?ooo`030000003oool0oooo0;00oooo00<0 00000?ooo`3oool0503oool005l0oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0X 0?ooo`030000003oool0oooo0;40oooo00<000000?ooo`3oool0503oool005l0oooo00<000000?oo o`3oool0T`3oool00`000000oooo0?ooo`0W0?ooo`030000003oool0oooo0;<0oooo00<000000?oo o`3oool04`3oool005l0oooo00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0W0?ooo`03 0000003oool0oooo0;<0oooo00<000000?ooo`3oool04`3oool00600oooo00<000000?ooo`3oool0 TP3oool3000002H0oooo00<000000?ooo`3oool0]03oool00`000000oooo0?ooo`0C0?ooo`00H03o ool00`000000oooo0?ooo`2B0?ooo`030000003oool0oooo02<0oooo103o0>Jf0?ooo`030000003o ool0oooo01<0oooo001P0?ooo`030000003oool0oooo0980oooo00<000000?ooo`3oool08`3oool4 0?l0i[L0oooo00<000000?ooo`3oool04P3oool00600oooo00<000000?ooo`3oool0TP3oool00`00 0000oooo0?ooo`0S0?ooo`@0o`3V]`3oool00`000000oooo0?ooo`0B0?ooo`00H@3oool00`000000 oooo0?ooo`2A0?ooo`030000003oool0oooo02<0oooo103o0>Jg0?ooo`030000003oool0oooo0180 oooo001Q0?ooo`030000003oool0oooo0940oooo00<000000?ooo`3oool08`3oool00`000000oooo 0?ooo`060?ooo`8000003P3oool300000:00oooo00<000000?ooo`3oool04@3oool00640oooo00<0 00000?ooo`3oool0T@3oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo00T0oooo00<0 00000?ooo`3oool02`3oool00`000000oooo0?ooo`030?ooo`030000003oool0oooo09X0oooo00<0 00000?ooo`3oool04@3oool00680oooo00<000000?ooo`3oool0T03oool00`000000oooo0?ooo`0Q 0?ooo`030000003oool0oooo00X0oooo00<000000?ooo`3oool0303oool00`000000oooo0?ooo`02 0?ooo`030000003oool0oooo09X0oooo00<000000?ooo`3oool04@3oool00680oooo00<000000?oo o`3oool0T03oool300000200oooo00<000000?ooo`3oool02P3oool00`000000oooo0?ooo`0>0?oo o`050000003oool0oooo0?ooo`000000W@3oool00`000000oooo0?ooo`0@0?ooo`00HP3oool00`00 0000oooo0?ooo`2@0?ooo`030000003oool0oooo0200oooo00<000000?ooo`3oool0103oool00`00 0000oooo0?ooo`040?ooo`030000003oool0oooo00X0oooo00@000000?ooo`3oool00000103oool0 0`000000oooo0?ooo`040?ooo`030000003oool0oooo09<0oooo00<000000?ooo`3oool0403oool0 0680oooo00<000000?ooo`3oool0T03oool00`000000oooo0?ooo`0O0?ooo`030000003oool0oooo 00@0oooo00<000000?ooo`3oool00`3oool3000000<0oooo00<000000?ooo`3oool01`3oool30000 0080oooo0`0000070?ooo`030000003oool0oooo0980oooo00<000000?ooo`3oool0403oool006<0 oooo00<000000?ooo`3oool0S`3oool00`000000oooo0?ooo`0N0?ooo`030000003oool0oooo00D0 oooo00<000000?ooo`3oool02P3oool00`000000oooo0?ooo`0E0?ooo`030000003oool0oooo09<0 oooo00<000000?ooo`3oool03`3oool006<0oooo00<000000?ooo`3oool0S`3oool00`000000oooo 0?ooo`0N0?ooo`030000003oool0oooo00D0oooo00<000000?ooo`3oool02@3oool2000001L0oooo 00<000000?ooo`3oool0T`3oool00`000000oooo0?ooo`0?0?ooo`00H`3oool00`000000oooo0?oo o`2?0?ooo`030000003oool0oooo01d0oooo00<000000?ooo`3oool01P3oool00`000000oooo0?oo o`0R0?ooo`030000003oool0oooo09<0oooo00<000000?ooo`3oool03`3oool006@0oooo00<00000 0?ooo`3oool0SP3oool00`000000oooo0?ooo`0L0?ooo`030000003oool0oooo00H0oooo00@00000 0?ooo`3oool0oooo1`0000070?oooa400000103oool00`000000oooo0?ooo`2C0?ooo`030000003o ool0oooo00h0oooo001T0?ooo`030000003oool0oooo08h0oooo00<000000?ooo`3oool0703oool0 0`000000oooo0?ooo`070?ooo`030000003oool0oooo0280oooo00<000000?ooo`3oool0U03oool0 0`000000oooo0?ooo`0>0?ooo`00I@3oool00`000000oooo0?ooo`2=0?ooo`030000003oool0oooo 01/0oooo00<000000?ooo`3oool0203oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo 09@0oooo00<000000?ooo`3oool03P3oool006D0oooo00<000000?ooo`3oool0S@3oool3000001X0 oooo00<000000?ooo`3oool02@3oool00`000000oooo0?ooo`0R0?ooo`030000003oool0oooo09D0 oooo00<000000?ooo`3oool03@3oool006H0oooo00<000000?ooo`3oool0S03oool00`000000oooo 0?ooo`0J0?ooo`030000003oool0oooo00T0oooo00<000000?ooo`3oool08P3oool00`000000oooo 0?ooo`2E0?ooo`030000003oool0oooo00d0oooo001V0?ooo`030000003oool0oooo08`0oooo00<0 00000?ooo`3oool06@3oool00`000000oooo0?ooo`0;0?ooo`030000003oool0oooo0080oooo0`00 000;0?ooo`8000000`3oool200000080oooo100000030?ooo`030000003oool0oooo09H0oooo00<0 00000?ooo`3oool03@3oool006H0oooo00<000000?ooo`3oool0S03oool00`000000oooo0?ooo`0H 0?ooo`030000003oool0oooo0140oooo00<000000?ooo`3oool03@3oool00`000000oooo00000002 0?ooo`030000003oool000000080oooo00<000000?ooo`3oool0V`3oool00`000000oooo0?ooo`0< 0?ooo`00I`3oool00`000000oooo0?ooo`2;0?ooo`030000003oool0oooo01P0oooo00<000000?oo o`3oool04P3oool00`000000oooo0?ooo`0<0?ooo`030000003oool000000080oooo00D000000?oo o`000000oooo0000002N0?ooo`030000003oool0oooo00`0oooo001W0?ooo`030000003oool0oooo 08/0oooo00<000000?ooo`3oool05`3oool00`000000oooo0?ooo`0D0?ooo`030000003oool0oooo 00X0oooo00@000000?ooo`3oool000000P3oool00`000000oooo0?ooo`02000009h0oooo00<00000 0?ooo`3oool0303oool006P0oooo00<000000?ooo`3oool0RP3oool00`000000oooo0?ooo`0F0?oo o`030000003oool0oooo0180oooo00@000000?ooo`3oool000003@3oool00`000000oooo00000002 0?ooo`030000003oool000000080oooo00<000000?ooo`3oool0W03oool00`000000oooo0?ooo`0; 0?ooo`00J03oool00`000000oooo0?ooo`2:0?ooo`030000003oool0oooo01H0oooo00<000000?oo o`3oool04`3oool3000000/0oooo0`0000020?ooo`8000000`3oool3000009h0oooo00<000000?oo o`3oool02`3oool006T0oooo00<000000?ooo`3oool0R@3oool3000001D0oooo00<000000?ooo`3o ool0c@3oool00`000000oooo0?ooo`0;0?ooo`00J@3oool00`000000oooo0?ooo`290?ooo`030000 003oool0oooo01@0oooo00<000000?ooo`3oool0c`3oool00`000000oooo0?ooo`0:0?ooo`00J@3o ool00`000000oooo0?ooo`290?ooo`030000003oool0oooo01@0oooo00<000000?ooo`3oool0c`3o ool00`000000oooo0?ooo`0:0?ooo`00JP3oool00`000000oooo0?ooo`280?ooo`030000003oool0 oooo01<0oooo00<000000?ooo`3oool0d03oool00`000000oooo0?ooo`0:0?ooo`00JP3oool00`00 0000oooo0?ooo`280?ooo`030000003oool0oooo0180oooo00<000000?ooo`3oool0d@3oool00`00 0000oooo0?ooo`0:0?ooo`00J`3oool00`000000oooo0?ooo`270?ooo`030000003oool0oooo0180 oooo00<000000?ooo`3oool0dP3oool00`000000oooo0?ooo`090?ooo`00J`3oool00`000000oooo 0?ooo`1f0?ooo`@000000P3oool3000000P0oooo00<000000?ooo`3oool04@3oool00`000000oooo 0?ooo`3C0?ooo`030000003oool0oooo00T0oooo001/0?ooo`030000003oool0oooo07L0oooo00<0 00000?ooo`3oool0103oool00`000000oooo0?ooo`050?ooo`030000003oool0oooo0100oooo00<0 00000?ooo`3oool0e03oool00`000000oooo0?ooo`090?ooo`00K03oool00`000000oooo0?ooo`1g 0?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3oool01@3oool4000000l0oooo00<00000 0?ooo`3oool0e@3oool00`000000oooo0?ooo`080?ooo`00K03oool00`000000oooo0?ooo`1g0?oo o`040000003oool0oooo0?ooo`<00000203oool00`000000oooo0?ooo`0?0?ooo`030000003oool0 oooo0=H0oooo00<000000?ooo`3oool0203oool006d0oooo00<000000?ooo`3oool0MP3oool01@00 0000oooo0?ooo`3oool0000000X0oooo00<000000?ooo`3oool03P3oool00`000000oooo0?ooo`3G 0?ooo`030000003oool0oooo00P0oooo001]0?ooo`030000003oool0oooo07@0oooo0`0000030?oo o`030000003oool0oooo00P0oooo00<000000?ooo`3oool03P3oool00`000000oooo0?ooo`3H0?oo o`030000003oool0oooo00L0oooo001^0?ooo`030000003oool0oooo07D0oooo00@000000?ooo`3o ool0oooo100000070?ooo`030000003oool0oooo00d0oooo00<000000?ooo`3oool0f@3oool00`00 0000oooo0?ooo`070?ooo`00KP3oool00`000000oooo0?ooo`240?ooo`030000003oool0oooo00`0 oooo00<000000?ooo`3oool0fP3oool00`000000oooo0?ooo`070?ooo`00KP3oool00`000000oooo 0?ooo`240?ooo`030000003oool0oooo00/0oooo00<000000?ooo`3oool0g03oool00`000000oooo 0?ooo`060?ooo`00K`3oool00`000000oooo0?ooo`230?ooo`030000003oool0oooo00/0oooo00<0 00000?ooo`3oool0g03oool00`000000oooo0?ooo`060?ooo`00K`3oool00`000000oooo0?ooo`23 0?ooo`030000003oool0oooo00X0oooo00<000000?ooo`3oool0g@3oool00`000000oooo0?ooo`06 0?ooo`00L03oool00`000000oooo0?ooo`220?ooo`<000002@3oool00`000000oooo0?ooo`3O0?oo o`030000003oool0oooo00D0oooo001`0?ooo`030000003oool0oooo0880oooo00<000000?ooo`3o ool0203oool00`000000oooo0?ooo`3P0?ooo`030000003oool0oooo00D0oooo001a0?ooo`030000 003oool0oooo0840oooo00<000000?ooo`3oool0203oool00`000000oooo0?ooo`3P0?ooo`030000 003oool0oooo00D0oooo001a0?ooo`030000003oool0oooo0840oooo00<000000?ooo`3oool01`3o ool00`000000oooo0?ooo`3R0?ooo`030000003oool0oooo00@0oooo001a0?ooo`030000003oool0 oooo0840oooo00<000000?ooo`3oool01P3oool00`000000oooo0?ooo`3S0?ooo`030000003oool0 oooo00@0oooo001b0?ooo`030000003oool0oooo0800oooo00<000000?ooo`3oool01@3oool00`00 0000oooo0?ooo`3T0?ooo`030000003oool0oooo00@0oooo001b0?ooo`030000003oool0oooo0800 oooo00<000000?ooo`3oool01@3oool00`000000oooo0?ooo`3T0?ooo`030000003oool0oooo00@0 oooo001c0?ooo`030000003oool0oooo07l0oooo00<000000?ooo`3oool0103oool00`000000oooo 0?ooo`3V0?ooo`030000003oool0oooo00<0oooo001c0?ooo`030000003oool0oooo07l0oooo0`00 00030?ooo`030000003oool0oooo0>L0oooo00<000000?ooo`3oool00`3oool007@0oooo00<00000 0?ooo`3oool0OP3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo0>P0oooo00<00000 0?ooo`3oool00`3oool007@0oooo00<000000?ooo`3oool0OP3oool00`000000oooo0?ooo`020?oo o`030000003oool0oooo0>P0oooo00<000000?ooo`3oool00`3oool007@0oooo00<000000?ooo`3o ool0OP3oool01@000000oooo0?ooo`3oool000000>`0oooo00<000000?ooo`3oool00P3oool007D0 oooo00<000000?ooo`3oool0O@3oool010000000oooo0?ooo`00003]0?ooo`030000003oool0oooo 0080oooo001e0?ooo`030000003oool0oooo07d0oooo00<000000?ooo`000000kP3oool00`000000 oooo0?ooo`020?ooo`00MP3oool00`000000oooo0?ooo`1l0?ooo`800000l03oool00`000000oooo 0?ooo`010?ooo`00MP3oool00`000000oooo0?ooo`1l0?ooo`800000l03oool00`000000oooo0?oo o`010?ooo`00M`3oool00`000000oooo0?ooo`1k0?ooo`030000003oool0oooo0>l0oooo00<00000 0?ooo`3oool00@3oool007L0oooo00<000000?ooo`3oool0NP3oool400000>l0oooo00<000000?oo o`3oool00@3oool007P0oooo00<000000?ooo`3oool0N03oool00`000000oooo0000003b0?ooo`40 00000@3oool10?ooo`00N03oool00`000000oooo0?ooo`1h0?ooo`030000003oool000000?80oooo 0@0000010?ooo`40oooo001i0?ooo`030000003oool0oooo07H0oooo00@000000?ooo`3oool00000 lP3oool100000040oooo0@3oool007T0oooo00<000000?ooo`3oool0M@3oool01@000000oooo0?oo o`3oool000000?80oooo0@0000010?ooo`40oooo001j0?ooo`030000003oool0oooo07<0oooo00<0 00000?ooo`3oool00P3oool00`000000oooo0?ooo`3a0?ooo`4000000@3oool007X0oooo00<00000 0?ooo`3oool0L`3oool00`000000oooo0?ooo`020?ooo`030000003oool0oooo0?40oooo0@000001 0?ooo`00N`3oool00`000000oooo0?ooo`1a0?ooo`030000003oool0oooo00<0oooo00<000000?oo o`3oool0l@3oool100000040oooo001k0?ooo`030000003oool0oooo0700oooo00<000000?ooo`3o ool0103oool300000?40oooo0@0000010?ooo`00O03oool00`000000oooo0?ooo`1^0?ooo`030000 003oool0oooo00D0oooo00<000000?ooo`3oool0l`3oool007d0oooo00<000000?ooo`3oool0K03o ool00`000000oooo0?ooo`060?ooo`030000003oool0oooo0?<0oooo001m0?ooo`030000003oool0 oooo06/0oooo00<000000?ooo`3oool01`3oool00`000000oooo0?ooo`3c0?ooo`00OP3oool00`00 0000oooo0?ooo`1Z0?ooo`030000003oool0oooo00L0oooo00<000000?ooo`3oool0l`3oool007h0 oooo00<000000?ooo`3oool0J@3oool00`000000oooo0?ooo`080?ooo`030000003oool0oooo0?<0 oooo001o0?ooo`030000003oool0oooo06L0oooo00<000000?ooo`3oool02@3oool00`000000oooo 0?ooo`3c0?ooo`00O`3oool00`000000oooo0?ooo`1R0?ooo`D000000P3oool2000000P0oooo00<0 00000?ooo`3oool0l`3oool00800oooo00<000000?ooo`3oool0H@3oool010000000oooo0?ooo`00 00020?ooo`040000003oool0oooo000000L0oooo00<000000?ooo`3oool0l`3oool00800oooo00<0 00000?ooo`3oool0HP3oool2000000<0oooo00@000000?ooo`3oool000001`3oool400000?80oooo 00210?ooo`030000003oool0oooo0640oooo0P0000030?ooo`040000003oool0oooo000000L0oooo 00<000000?ooo`3oool0l`3oool00880oooo00<000000?ooo`3oool0G`3oool010000000oooo0?oo o`0000020?ooo`040000003oool0oooo000000L0oooo00<000000?ooo`3oool0l`3oool008<0oooo 00<000000?ooo`3oool0GP3oool010000000oooo0?ooo`0000020?ooo`040000003oool0oooo0000 00L0oooo00<000000?ooo`3oool0l`3oool008<0oooo00<000000?ooo`3oool0G@3oool010000000 oooo0000000000040?ooo`800000203oool00`000000oooo0?ooo`3c0?ooo`00Q03oool00`000000 oooo0?ooo`1K0?ooo`030000003oool0oooo0100oooo00<000000?ooo`3oool0l`3oool008D0oooo 00<000000?ooo`3oool0F@3oool00`000000oooo0?ooo`0A0?ooo`030000003oool0oooo0?<0oooo 00260?ooo`030000003oool0oooo05L0oooo00<000000?ooo`3oool04P3oool00`000000oooo0?oo o`3c0?ooo`00Q`3oool00`000000oooo0?ooo`1E0?ooo`030000003oool0oooo01<0oooo0`00003c 0?ooo`00Q`3oool00`000000oooo0?ooo`1D0?ooo`030000003oool0oooo01@0oooo00<000000?oo o`3oool0l`3oool008P0oooo00<000000?ooo`3oool0DP3oool00`000000oooo0?ooo`0E0?ooo`03 0000003oool0oooo0?<0oooo00290?ooo`030000003oool0oooo0540oooo00<000000?ooo`3oool0 5@3oool00`000000oooo0?ooo`3c0?ooo`00RP3oool00`000000oooo0?ooo`1?0?ooo`030000003o ool0oooo01H0oooo00<000000?ooo`3oool0l`3oool008X0oooo00<000000?ooo`3oool0CP3oool0 0`000000oooo0?ooo`0G0?ooo`030000003oool0oooo0?<0oooo002;0?ooo`030000003oool0oooo 04`0oooo00<000000?ooo`3oool0603oool00`000000oooo0?ooo`3c0?ooo`00S03oool00`000000 oooo0?ooo`1:0?ooo`030000003oool0oooo01T0oooo00<000000?ooo`3oool0l`3oool008d0oooo 00<000000?ooo`3oool0A`3oool2000001`0oooo00<000000?ooo`3oool0l`3oool008h0oooo00<0 00000?ooo`3oool0A@3oool00`000000oooo0?ooo`0L0?ooo`<00000l`3oool008l0oooo00<00000 0?ooo`3oool0@`3oool00`000000oooo0?ooo`0M0?ooo`030000003oool0oooo05d0oooo1000000P 0?ooo`D00000>03oool500000300oooo002@0?ooo`030000003oool0oooo0440oooo00<000000?oo o`3oool07P3oool00`000000oooo0?ooo`1M0?ooo`80000000<0oooo000000000000803oool30000 03X0oooo0`00000a0?ooo`00T@3oool00`000000oooo0?ooo`0o0?ooo`030000003oool0oooo01l0 oooo00<000000?ooo`3oool0G@3oool200000080oooo00<000000?ooo`3oool07P3oool3000003X0 oooo0`00000a0?ooo`00T@3oool00`000000oooo0?ooo`0m0?ooo`8000008P3oool00`000000oooo 0?ooo`1Q0?ooo`8000007`3oool3000003X0oooo0`00000a0?ooo`00TP3oool00`000000oooo0?oo o`0k0?ooo`030000003oool0oooo0280oooo00<000000?ooo`3oool0CP3oool3000000<0oooo00@0 00000?ooo`3oool0oooo1@0000040?ooo`8000002@3oool00`000000oooo00000004000000D0oooo 10000000103oool000000000000000020?ooo`<0000000<0oooo0000000000001@3oool500000003 0?ooo`000000000000<000002`3oool6000000@0oooo1@0000050?ooo`<0000000D0oooo00000000 000000000?ooo`03000000030?ooo`000000000000<0oooo1@0000000`3oool00000000000020000 0240oooo002C0?ooo`030000003oool0oooo03T0oooo00<000000?ooo`3oool08`3oool00`000000 oooo0?ooo`1?0?ooo`030000003oool0oooo0080oooo0P0000030?ooo`<000001@3oool2000000T0 oooo0`0000030?ooo`8000000`3oool8000000<0oooo100000000`3oool00000000000030?ooo`<0 00000P3oool2000000040?ooo`0000000000000000X0oooo0`0000030?ooo`@000000`3oool30000 00@0oooo200000020?ooo`@0000000<0oooo0000000000000`3oool300000080oooo0`00000R0?oo o`00U03oool00`000000oooo0?ooo`0f0?ooo`8000009P3oool00`000000oooo0?ooo`1?0?ooo`04 0000003oool0oooo0?ooo`<000000`3oool3000000@0oooo100000080?ooo`8000001@3oool20000 0080oooo0`0000020?ooo`<000000`3oool300000080oooo0`000000103oool00000000000000006 0?ooo`<000002@3oool3000000D0oooo0`0000030?ooo`<00000103oool300000080oooo0`000002 0?ooo`<000000P3oool300000080oooo0`0000020?ooo`<000008P3oool009D0oooo00<000000?oo o`3oool0=03oool00`000000oooo0?ooo`0V0?ooo`<00000C`3oool010000000oooo0?ooo`3oool3 000000<0oooo0`0000040?ooo`@00000203oool00`000000oooo0?ooo`040?ooo`8000000P3oool3 00000080oooo0`0000030?ooo`<000000P3oool3000000040?ooo`0000000000000000H0oooo0`00 00090?ooo`<000001@3oool3000000<0oooo0`0000040?ooo`<000000P3oool300000080oooo0`00 00020?ooo`<000000P3oool300000080oooo0`00000R0?ooo`00UP3oool00`000000oooo0?ooo`0a 0?ooo`800000:@3oool00`000000oooo0?ooo`1?0?ooo`030000003oool0oooo00D000000P3oool3 000000<0oooo0`0000000`3oool000000?ooo`0=0?ooo`<000000P3oool300000080oooo0`000003 0?ooo`<000000P3oool3000000040?ooo`0000000000000000H0oooo0`0000080?ooo`<000001P3o ool3000000<0oooo0`0000050?ooo`<0000000@0oooo00000000000000000P3oool300000080oooo 0`0000020?ooo`<000000P3oool300000280oooo002G0?ooo`800000;`3oool2000002/0oooo00<0 00000?ooo`3oool0C`3oool00`000000oooo0?ooo`03000000040?ooo`000000oooo0?ooo`<00000 0`3oool3000000030?ooo`000000000000/0oooo1@0000020?ooo`<000000P3oool3000000<0oooo 0`0000020?ooo`<0000000<0oooo0000000000001P000000103oool000000000000000080?ooo`<0 00001@3oool500000080oooo0`0000080?ooo`@000000P3oool300000080oooo0`0000020?ooo`<0 00000P3oool300000280oooo002I0?ooo`030000003oool0oooo02/0oooo00<000000?ooo`3oool0 :`3oool00`000000oooo0?ooo`1?0?ooo`030000003oool0000000<0000000@0oooo000000000000 oooo0`0000020?ooo`@000000P3oool00`000000oooo0?ooo`070?ooo`H000000`3oool300000080 oooo0`0000030?ooo`<000000P3oool3000000040?ooo`000000000000000080oooo0`000000103o ool000000000000000080?ooo`<00000303oool3000000@0oooo0`0000020?ooo`<000000P3oool3 00000080oooo0`0000020?ooo`<000000P3oool300000280oooo002J0?ooo`800000:@3oool20000 02h0oooo00<000000?ooo`3oool0C`3oool00`000000oooo00000002000000<0oooo00<000000?oo o`0000000P0000020?ooo`<000000`3oool2000000L0oooo1@0000050?ooo`<000000P3oool30000 00<0oooo1`0000030?ooo`8000000P3oool200000080oooo0`0000000`3oool00000000000050?oo o`<00000303oool3000000040?ooo`00000000000?ooo`<000000P3oool300000080oooo1`000003 0?ooo`P000008P3oool009`0oooo0P00000U0?ooo`800000<03oool00`000000oooo0?ooo`1?0?oo o`D000000`3oool00`000000oooo00000002000000030?ooo`000000000000<0000000<0oooo0000 000000000P0000050?ooo`@000001P3oool4000000030?ooo`0000000000008000000P3oool30000 0080oooo0P0000050?ooo`@000000P3oool3000000040?ooo`0000000000000000D0oooo0`00000; 0?ooo`<0000000@0oooo00000000000000000`3oool500000080oooo0`0000020?ooo`800000103o ool3000000040?ooo`0000000000000002<0oooo002N0?ooo`<00000803oool200000380oooo00<0 00000?ooo`3oool0C`3oool4000000D0oooo1000000@0?ooo`<000001@3oool00`000000oooo0?oo o`0Y0?ooo`<000001`3oool00`000000oooo0?ooo`0L0?ooo`<000009`3oool00:40oooo0P00000K 0?ooo`<00000=03oool00`000000oooo0?ooo`1?0?ooo`@000001@3oool400000100oooo0`000004 0?ooo`800000:`3oool3000000H0oooo0P00000N0?ooo`<000009`3oool00:<0oooo0`0000080?oo o`@0o`3V203oool4000003L0oooo00<000000?ooo`3oool0C`3oool3000000L0oooo0`00000A0?oo o`<000000P3oool3000002`0oooo0`0000040?ooo`<000007P3oool3000002L0oooo002V0?ooo`D0 00000`3oool40?l0iPH0oooo0P00000k0?ooo`<00000CP3oool4000000L0oooo1000000A0?ooo`@0 000000<0oooo0000003oool0;P3oool5000000030?ooo`000000000001d0oooo1000000W0?ooo`00 Z`3oool3000000@0o`3V1P00000m0?ooo`030000003oool0oooo0?<0oooo002^0?ooo`@0o`3V@`3o ool00`000000oooo0?ooo`3c0?ooo`00D@3oool2000003@0oooo0`00001[0?ooo`030000003oool0 oooo0?<0oooo001C0?ooo`030000003oool0oooo0340oooo00<000000?ooo`3oool00`3oool00`00 0000oooo0?ooo`1U0?ooo`030000003oool0oooo0?<0oooo001C0?ooo`030000003oool0oooo0380 oooo00<000000?ooo`3oool00P3oool00`000000oooo0?ooo`1U0?ooo`030000003oool0oooo0?<0 oooo001B0?ooo`030000003oool0oooo03@0oooo00D000000?ooo`3oool0oooo0000001F0?ooo`@0 00000P3oool3000000P0oooo00<000000?ooo`3oool0l`3oool004/0oooo00<000000?ooo`3oool0 1@3oool00`000000oooo0?ooo`040?ooo`030000003oool0oooo01l0oooo00<000000?ooo`3oool0 1`3oool010000000oooo0?ooo`0000040?ooo`030000003oool0oooo00@0oooo00<000000?ooo`3o ool0000000<0oooo00<000000?ooo`3oool0903oool300000?<0oooo001B 0?ooo`030000003oool0oooo03@0oooo00<000000?ooo`3oool0J@3oool00`000000oooo0?ooo`3c 0?ooo`00DP3oool00`000000oooo0?ooo`0e0?ooo`030000003oool0oooo06P0oooo00<000000?oo o`3oool0l`3oool00580oooo00<000000?ooo`3oool0=P3oool00`000000oooo0?ooo`1W0?ooo`03 0000003oool0oooo0?<0oooo001B0?ooo`030000003oool0oooo03<0oooo00@000000?ooo`3oool0 0000J@3oool00`000000oooo0?ooo`3c0?ooo`00DP3oool00`000000oooo0?ooo`0d0?ooo`<00000 J@3oool00`000000oooo0?ooo`3c0?ooo`00m@3oool00`000000oooo0?ooo`3c0?ooo`00m@3oool0 0`000000oooo0?ooo`3c0?ooo`00m@3oool300000?<0oooo003e0?ooo`030000003oool0oooo0?<0 oooo003e0?ooo`030000003oool0oooo0?<0oooo003e0?ooo`030000003oool0oooo0?<0oooo003e 0?ooo`030000003oool0oooo0?<0oooo003e0?ooo`030000003oool0oooo0?<0oooo003e0?ooo`03 0000003oool0oooo0?<0oooo003e0?ooo`030000003oool0oooo0?<0oooo003e0?ooo`<00000l`3o ool00?D0oooo00<000000?ooo`3oool0l`3oool00?D0oooo00<000000?ooo`3oool0l`3oool00?D0 oooo00<000000?ooo`3oool0l`3oool00?D0oooo00<000000?ooo`3oool0l`3oool00?D0oooo00<0 00000?ooo`3oool0l`3oool00?D0oooo00<000000?ooo`3oool0l`3oool00?D0oooo00<000000?oo o`3oool0l`3oool00?D0oooo00<000000?ooo`3oool0l`3oool00?D0oooo0`00003c0?ooo`00m@3o ool00`000000oooo0?ooo`3c0?ooo`00m@3oool00`000000oooo0?ooo`3c0?ooo`00\ \>"], ImageRangeCache->{{{0, 490.562}, {302.812, 0}} -> {-4.20516, -6.49211, \ 0.0171442, 0.118221}}] }, Open ]] }, Open ]] }, Open ]] }, Open ]] }, FrontEndVersion->"5.0 for X", ScreenRectangle->{{0, 1600}, {0, 1200}}, WindowSize->{729, 892}, WindowMargins->{{Automatic, 55}, {141, Automatic}}, StyleDefinitions -> Notebook[{ Cell[CellGroupData[{ Cell["Style Definitions", "Subtitle"], 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, CellLabelMargins->{{12, Inherited}, {Inherited, Inherited}}, ScriptMinSize->9], Cell[StyleData[All, "Presentation"], PageWidth->WindowWidth, CellLabelMargins->{{24, Inherited}, {Inherited, Inherited}}, ScriptMinSize->12], Cell[StyleData[All, "Condensed"], PageWidth->WindowWidth, CellLabelMargins->{{8, Inherited}, {Inherited, Inherited}}, ScriptMinSize->8], 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->{{12, Inherited}, {20, 40}}, 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", 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", Background->RGBColor[0, 1, 1]], Cell[StyleData["Title", "Presentation"], CellMargins->{{24, 10}, {20, 40}}, LineSpacing->{1, 0}, FontSize->44], Cell[StyleData["Title", "Condensed"], CellMargins->{{8, 10}, {4, 8}}, FontSize->20], Cell[StyleData["Title", "Printout"], CellMargins->{{2, 10}, {12, 30}}, FontSize->24] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subtitle"], CellMargins->{{12, Inherited}, {20, 15}}, 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", Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subtitle", CounterAssignments->{{"Section", 0}, {"Equation", 0}, {"Figure", 0}, { "Subsubtitle", 0}}, FontFamily->"Helvetica", FontSize->24, Background->RGBColor[0, 1, 1]], Cell[StyleData["Subtitle", "Presentation"], CellMargins->{{24, 10}, {20, 20}}, LineSpacing->{1, 0}, FontSize->36], Cell[StyleData["Subtitle", "Condensed"], CellMargins->{{8, 10}, {4, 4}}, FontSize->14], Cell[StyleData["Subtitle", "Printout"], CellMargins->{{2, 10}, {12, 8}}, FontSize->18] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsubtitle"], CellMargins->{{12, Inherited}, {20, 15}}, 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", Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsubtitle", CounterAssignments->{{"Section", 0}, {"Equation", 0}, {"Figure", 0}}, FontFamily->"Helvetica", FontSize->14, FontSlant->"Italic", Background->RGBColor[0, 1, 1]], Cell[StyleData["Subsubtitle", "Presentation"], CellMargins->{{24, 10}, {20, 20}}, LineSpacing->{1, 0}, FontSize->24], Cell[StyleData["Subsubtitle", "Condensed"], CellMargins->{{8, 10}, {8, 8}}, FontSize->12], Cell[StyleData["Subsubtitle", "Printout"], CellMargins->{{2, 10}, {12, 8}}, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Section"], CellDingbat->"\[FilledSquare]", CellMargins->{{25, Inherited}, {8, 24}}, CellGroupingRules->{"SectionGrouping", 30}, 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", Inherited}, LineSpacing->{1, 7}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Section", CounterAssignments->{{"Subsection", 0}, {"Subsubsection", 0}}, FontFamily->"Helvetica", FontSize->16, FontWeight->"Bold", Background->RGBColor[1, 1, 0]], Cell[StyleData["Section", "Presentation"], CellMargins->{{40, 10}, {11, 32}}, LineSpacing->{1, 0}, FontSize->24], Cell[StyleData["Section", "Condensed"], CellMargins->{{18, Inherited}, {6, 12}}, FontSize->12], Cell[StyleData["Section", "Printout"], CellMargins->{{13, 0}, {7, 22}}, FontSize->14] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsection"], CellDingbat->"\[FilledSmallSquare]", CellMargins->{{22, Inherited}, {8, 20}}, 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", Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsection", CounterAssignments->{{"Subsubsection", 0}}, FontFamily->"Times", FontSize->14, FontWeight->"Bold", Background->RGBColor[0, 1, 0]], Cell[StyleData["Subsection", "Presentation"], CellMargins->{{36, 10}, {11, 32}}, LineSpacing->{1, 0}, FontSize->22], Cell[StyleData["Subsection", "Condensed"], CellMargins->{{16, Inherited}, {6, 12}}, FontSize->12], Cell[StyleData["Subsection", "Printout"], CellMargins->{{9, 0}, {7, 22}}, FontSize->12] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Subsubsection"], CellDingbat->"\[FilledSmallSquare]", CellMargins->{{22, Inherited}, {8, 18}}, 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", Inherited}, LanguageCategory->"NaturalLanguage", CounterIncrements->"Subsubsection", FontFamily->"Times", FontWeight->"Bold"], Cell[StyleData["Subsubsection", "Presentation"], CellMargins->{{34, 10}, {11, 26}}, LineSpacing->{1, 0}, FontSize->18], Cell[StyleData["Subsubsection", "Condensed"], CellMargins->{{17, Inherited}, {6, 12}}, FontSize->10], Cell[StyleData["Subsubsection", "Printout"], CellMargins->{{9, 0}, {7, 14}}, FontSize->11] }, Closed]] }, Open ]], Cell[CellGroupData[{ Cell["Styles for Body Text", "Section"], Cell[CellGroupData[{ Cell[StyleData["Text"], CellMargins->{{12, 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", Inherited}, Hyphenation->True, LineSpacing->{1, 3}, CounterIncrements->"Text"], Cell[StyleData["Text", "Presentation"], CellMargins->{{24, 10}, {10, 10}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["Text", "Condensed"], CellMargins->{{8, 10}, {6, 6}}, LineSpacing->{1, 1}, FontSize->11], Cell[StyleData["Text", "Printout"], CellMargins->{{2, 2}, {6, 6}}, TextJustification->0.5, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["SmallText"], CellMargins->{{12, 10}, {6, 6}}, DefaultNewInlineCellStyle->"None", Hyphenation->True, LineSpacing->{1, 3}, LanguageCategory->"NaturalLanguage", CounterIncrements->"SmallText", FontFamily->"Helvetica", FontSize->9], Cell[StyleData["SmallText", "Presentation"], CellMargins->{{24, 10}, {8, 8}}, LineSpacing->{1, 5}, FontSize->12], Cell[StyleData["SmallText", "Condensed"], CellMargins->{{8, 10}, {5, 5}}, LineSpacing->{1, 2}, FontSize->9], Cell[StyleData["SmallText", "Printout"], CellMargins->{{2, 2}, {5, 5}}, TextJustification->0.5, 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->{{45, 10}, {5, 7}}, Evaluatable->True, CellGroupingRules->"InputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, DefaultFormatType->DefaultInputFormatType, 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, Inherited}, {8, 10}}, LineSpacing->{1, 0}, FontSize->16], Cell[StyleData["Input", "Condensed"], CellMargins->{{40, 10}, {2, 3}}, FontSize->11], Cell[StyleData["Input", "Printout"], CellMargins->{{39, 0}, {4, 6}}, LinebreakAdjustments->{0.85, 2, 10, 1, 1}, FontSize->9] }, Closed]], Cell[StyleData["InputOnly"], Evaluatable->True, CellGroupingRules->"InputGrouping", CellHorizontalScrolling->True, DefaultFormatType->DefaultInputFormatType, 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[CellGroupData[{ Cell[StyleData["Output"], CellMargins->{{47, 10}, {7, 5}}, CellEditDuplicate->True, CellGroupingRules->"OutputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, DefaultFormatType->DefaultOutputFormatType, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Output"], Cell[StyleData["Output", "Presentation"], CellMargins->{{72, Inherited}, {10, 8}}, LineSpacing->{1, 0}, FontSize->16], Cell[StyleData["Output", "Condensed"], CellMargins->{{41, Inherited}, {3, 2}}, FontSize->11], Cell[StyleData["Output", "Printout"], CellMargins->{{39, 0}, {6, 4}}, FontSize->9] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Message"], CellMargins->{{45, Inherited}, {Inherited, Inherited}}, CellGroupingRules->"OutputGrouping", PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, ShowCellLabel->False, DefaultFormatType->DefaultOutputFormatType, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, AutoItalicWords->{}, LanguageCategory->None, FormatType->InputForm, CounterIncrements->"Message", StyleMenuListing->None, FontSize->11, FontColor->RGBColor[0, 0, 1]], Cell[StyleData["Message", "Presentation"], CellMargins->{{72, Inherited}, {Inherited, Inherited}}, LineSpacing->{1, 0}, FontSize->16], Cell[StyleData["Message", "Condensed"], CellMargins->{{41, Inherited}, {Inherited, Inherited}}, FontSize->11], Cell[StyleData["Message", "Printout"], CellMargins->{{39, Inherited}, {Inherited, Inherited}}, FontSize->7, FontColor->GrayLevel[0]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Print"], CellMargins->{{45, Inherited}, {Inherited, Inherited}}, CellGroupingRules->"OutputGrouping", CellHorizontalScrolling->True, PageBreakWithin->False, GroupPageBreakWithin->False, GeneratedCell->True, CellAutoOverwrite->True, ShowCellLabel->False, DefaultFormatType->DefaultOutputFormatType, 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->16], Cell[StyleData["Print", "Condensed"], CellMargins->{{41, Inherited}, {Inherited, Inherited}}, FontSize->11], 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", "Condensed"], ImageMargins->{{38, Inherited}, {Inherited, 0}}, Magnification->0.6], 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, 0, 1]], Cell[StyleData["CellLabel", "Presentation"], FontSize->12], Cell[StyleData["CellLabel", "Condensed"], FontSize->9], Cell[StyleData["CellLabel", "Printout"], FontFamily->"Courier", FontSize->8, FontSlant->"Italic", FontColor->GrayLevel[0]] }, 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"], HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Plain", FontSlant->"Plain"], Cell[StyleData["MO"], HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Plain", FontSlant->"Italic"], Cell[StyleData["MB"], HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, StyleMenuListing->None, FontFamily->"Courier", FontWeight->"Bold", FontSlant->"Plain"], Cell[StyleData["MBO"], 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"], Cell[StyleData["SO10", "EnhancedPrintout"], StyleMenuListing->None, FontFamily->"Futura", 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], Cell[StyleData["InlineFormula", "Presentation"], CellMargins->{{24, 10}, {10, 10}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["InlineFormula", "Condensed"], CellMargins->{{8, 10}, {6, 6}}, LineSpacing->{1, 1}, FontSize->11], Cell[StyleData["InlineFormula", "Printout"], CellMargins->{{2, 0}, {6, 6}}, FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["DisplayFormula"], CellMargins->{{42, Inherited}, {Inherited, Inherited}}, CellHorizontalScrolling->True, DefaultFormatType->DefaultInputFormatType, HyphenationOptions->{"HyphenationCharacter"->"\[Continuation]"}, LanguageCategory->"Formula", ScriptLevel->0, SingleLetterItalics->True, UnderoverscriptBoxOptions->{LimitsPositioning->True}], Cell[StyleData["DisplayFormula", "Presentation"], LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["DisplayFormula", "Condensed"], LineSpacing->{1, 1}, FontSize->11], Cell[StyleData["DisplayFormula", "Printout"], FontSize->10] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Program"], CellFrame->{{0, 0}, {0.5, 0.5}}, CellMargins->{{10, 4}, {0, 8}}, CellHorizontalScrolling->True, Hyphenation->False, LanguageCategory->"Formula", ScriptLevel->1, FontFamily->"Courier"], Cell[StyleData["Program", "Presentation"], CellMargins->{{24, 10}, {10, 10}}, LineSpacing->{1, 5}, FontSize->16], Cell[StyleData["Program", "Condensed"], CellMargins->{{8, 10}, {6, 6}}, LineSpacing->{1, 1}, FontSize->11], Cell[StyleData["Program", "Printout"], CellMargins->{{2, 0}, {6, 6}}, FontSize->9] }, Closed]] }, Closed]], Cell[CellGroupData[{ Cell["Outline Styles", "Section"], Cell[CellGroupData[{ Cell[StyleData["Outline1"], CellMargins->{{12, 10}, {7, 7}}, CellGroupingRules->{"SectionGrouping", 50}, ParagraphIndent->-38, CounterIncrements->"Outline1", FontSize->18, FontWeight->"Bold", CounterBoxOptions->{CounterFunction:>CapitalRomanNumeral}], Cell[StyleData["Outline1", "Printout"], CounterBoxOptions->{CounterFunction:>CapitalRomanNumeral}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Outline2"], CellMargins->{{59, 10}, {7, 7}}, CellGroupingRules->{"SectionGrouping", 60}, ParagraphIndent->-27, CounterIncrements->"Outline2", FontSize->15, FontWeight->"Bold", CounterBoxOptions->{CounterFunction:>(Part[ CharacterRange[ "A", "Z"], #]&)}], Cell[StyleData["Outline2", "Printout"], CounterBoxOptions->{CounterFunction:>(Part[ CharacterRange[ "A", "Z"], #]&)}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Outline3"], CellMargins->{{108, 10}, {7, 7}}, CellGroupingRules->{"SectionGrouping", 70}, ParagraphIndent->-21, CounterIncrements->"Outline3", FontSize->12, CounterBoxOptions->{CounterFunction:>Identity}], Cell[StyleData["Outline3", "Printout"], CounterBoxOptions->{CounterFunction:>Identity}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["Outline4"], CellMargins->{{158, 10}, {7, 7}}, CellGroupingRules->{"SectionGrouping", 80}, ParagraphIndent->-18, CounterIncrements->"Outline4", FontSize->10, CounterBoxOptions->{CounterFunction:>(Part[ CharacterRange[ "a", "z"], #]&)}], Cell[StyleData["Outline4", "Printout"]] }, 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, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookLocate[ #2]}]&), Active->True, ButtonNote->ButtonData}], Cell[StyleData["Hyperlink", "Presentation"], FontSize->16], Cell[StyleData["Hyperlink", "Condensed"], FontSize->11], Cell[StyleData["Hyperlink", "Printout"], FontSize->10, FontColor->GrayLevel[0], 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, 0, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "MainBook", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["MainBookLink", "Presentation"], FontSize->16], Cell[StyleData["MainBookLink", "Condensed"], FontSize->11], 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, 0, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "AddOns", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["AddOnsLink", "Presentation"], FontSize->16], Cell[StyleData["AddOnsLink", "Condensed"], FontSize->11], 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, 0, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "RefGuide", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["RefGuideLink", "Presentation"], FontSize->16], Cell[StyleData["RefGuideLink", "Condensed"], FontSize->11], Cell[StyleData["RefGuideLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["GettingStartedLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0, 0, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "GettingStarted", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["GettingStartedLink", "Presentation"], FontSize->16], Cell[StyleData["GettingStartedLink", "Condensed"], FontSize->11], Cell[StyleData["GettingStartedLink", "Printout"], FontSize->10, FontColor->GrayLevel[0], FontVariations->{"Underline"->False}] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["OtherInformationLink"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, FontColor->RGBColor[0, 0, 1], FontVariations->{"Underline"->True}, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`HelpBrowserLookup[ "OtherInformation", #]}]&), Active->True, ButtonFrame->"None"}], Cell[StyleData["OtherInformationLink", "Presentation"], FontSize->16], Cell[StyleData["OtherInformationLink", "Condensed"], FontSize->11], Cell[StyleData["OtherInformationLink", "Printout"], FontSize->10, 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[ ], #, After]}]&)}], Cell[StyleData["Evaluate"], StyleMenuListing->None, ButtonStyleMenuListing->Automatic, ButtonBoxOptions->{ButtonFunction:>(FrontEndExecute[ { FrontEnd`NotebookApply[ FrontEnd`InputNotebook[ ], #, All], 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[0.890623, 0.864698, 0.384756], TagBoxOptions->{Editable->False, Selectable->False, StripWrapperBoxes->False}], Cell[StyleData["Placeholder", "Presentation"]], Cell[StyleData["Placeholder", "Condensed"]], Cell[StyleData["Placeholder", "Printout"]] }, Closed]], Cell[CellGroupData[{ Cell[StyleData["PrimaryPlaceholder"], StyleMenuListing->None, DrawHighlighted->True, FontSlant->"Italic", Background->RGBColor[0.912505, 0.891798, 0.507774], TagBoxOptions->{Editable->False, Selectable->False, StripWrapperBoxes->False}], Cell[StyleData["PrimaryPlaceholder", "Presentation"]], Cell[StyleData["PrimaryPlaceholder", "Condensed"]], 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}, LineSpacing->{1.25, 0}, StyleMenuListing->None, FontFamily->"Courier"], Cell[StyleData["TraditionalForm"], InputAutoReplacements->{ "->"->"\[Rule]", ":>"->"\[RuleDelayed]", "<="->"\[LessEqual]", ">="->"\[GreaterEqual]", "!="->"\[NotEqual]", "=="->"\[Equal]", Inherited}, 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[1, 0.749996, 0.8]] }, 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[0.760006, 0.330007, 0.8]] }, 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->{} *) (*CellTagsIndex CellTagsIndex->{} *) (*NotebookFileOutline Notebook[{ Cell[CellGroupData[{ Cell[1776, 53, 114, 2, 76, "Title"], Cell[CellGroupData[{ Cell[1915, 59, 27, 0, 77, "Section"], Cell[1945, 61, 767, 19, 86, "Text"], Cell[CellGroupData[{ Cell[2737, 84, 179, 3, 43, "Input"], Cell[2919, 89, 24508, 575, 230, 4462, 323, "GraphicsData", "PostScript", \ "Graphics"] }, Open ]], Cell[CellGroupData[{ Cell[27464, 669, 55, 1, 27, "Input"], Cell[27522, 672, 91, 1, 37, "Output"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[27662, 679, 34, 0, 77, "Section"], Cell[CellGroupData[{ Cell[27721, 683, 40, 0, 61, "Subsection"], Cell[27764, 685, 356, 9, 50, "Text"], Cell[CellGroupData[{ Cell[28145, 698, 459, 10, 114, "Input"], Cell[CellGroupData[{ Cell[28629, 712, 12466, 380, 159, 3759, 268, "GraphicsData", "PostScript", \ "Graphics"], Cell[41098, 1094, 23029, 646, 157, 7883, 454, "GraphicsData", "PostScript", \ "Graphics"] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[64188, 1747, 69, 0, 61, "Subsection"], Cell[64260, 1749, 278, 5, 50, "Text"], Cell[CellGroupData[{ Cell[64563, 1758, 242, 4, 59, "Input"], Cell[64808, 1764, 48, 1, 27, "Output"], Cell[64859, 1767, 78, 1, 43, "Output"], Cell[64940, 1770, 40, 1, 43, "Output"] }, Open ]], Cell[64995, 1774, 117, 3, 32, "Text"], Cell[CellGroupData[{ Cell[65137, 1781, 258, 5, 59, "Input"], Cell[65398, 1788, 105, 2, 43, "Output"], Cell[65506, 1792, 335, 7, 81, "Output"], Cell[65844, 1801, 438, 8, 117, "Output"] }, Open ]], Cell[66297, 1812, 501, 16, 68, "Text"], Cell[CellGroupData[{ Cell[66823, 1832, 425, 8, 75, "Input"], Cell[67251, 1842, 53, 1, 27, "Output"], Cell[67307, 1845, 80, 1, 27, "Output"] }, Open ]], Cell[67402, 1849, 293, 9, 50, "Text"], Cell[CellGroupData[{ Cell[67720, 1862, 513, 12, 107, "Input"], Cell[CellGroupData[{ Cell[68258, 1878, 25047, 597, 186, 4815, 343, "GraphicsData", "PostScript", \ "Graphics"], Cell[93308, 2477, 13572, 404, 186, 3853, 279, "GraphicsData", "PostScript", \ "Graphics"], Cell[106883, 2883, 25112, 604, 186, 4949, 351, "GraphicsData", "PostScript", \ "Graphics"] }, Open ]] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[132056, 3494, 48, 0, 61, "Subsection"], Cell[132107, 3496, 562, 16, 68, "Text"], Cell[132672, 3514, 237, 4, 64, "Input"], Cell[CellGroupData[{ Cell[132934, 3522, 72, 1, 27, "Input"], Cell[133009, 3525, 30068, 767, 186, 8750, 499, "GraphicsData", "PostScript", \ "Graphics"] }, Open ]], Cell[163092, 4295, 205, 4, 50, "Text"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[163346, 4305, 64, 0, 77, "Section"], Cell[163413, 4307, 1238, 34, 123, "Text"], Cell[CellGroupData[{ Cell[164676, 4345, 109, 4, 61, "Subsection"], Cell[164788, 4351, 818, 25, 86, "Text"], Cell[165609, 4378, 712, 15, 123, "Input"], Cell[166324, 4395, 63, 0, 32, "Text"], Cell[CellGroupData[{ Cell[166412, 4399, 145, 2, 27, "Input"], Cell[166560, 4403, 105, 2, 43, "Output"] }, Open ]], Cell[166680, 4408, 144, 5, 32, "Text"], Cell[CellGroupData[{ Cell[166849, 4417, 176, 3, 43, "Input"], Cell[167028, 4422, 128, 2, 43, "Output"], Cell[167159, 4426, 230, 4, 79, "Output"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[167438, 4436, 111, 4, 61, "Subsection"], Cell[167552, 4442, 233, 6, 50, "Text"], Cell[167788, 4450, 409, 7, 123, "Input"], Cell[168200, 4459, 159, 5, 32, "Text"], Cell[CellGroupData[{ Cell[168384, 4468, 59, 1, 27, "Input"], Cell[168446, 4471, 53, 1, 27, "Output"] }, Open ]], Cell[168514, 4475, 95, 3, 32, "Text"] }, Open ]], Cell[CellGroupData[{ Cell[168646, 4483, 109, 4, 61, "Subsection"], Cell[168758, 4489, 485, 14, 68, "Text"], Cell[169246, 4505, 265, 5, 43, "Input"], Cell[169514, 4512, 123, 2, 27, "Input"] }, Open ]], Cell[CellGroupData[{ Cell[169674, 4519, 68, 0, 61, "Subsection"], Cell[169745, 4521, 926, 27, 104, "Text"], Cell[170674, 4550, 81, 1, 27, "Input"] }, Open ]], Cell[CellGroupData[{ Cell[170792, 4556, 36, 0, 61, "Subsection"], Cell[170831, 4558, 455, 8, 91, "Input"], Cell[171289, 4568, 238, 4, 43, "Input"], Cell[CellGroupData[{ Cell[171552, 4576, 550, 11, 91, "Input"], Cell[172105, 4589, 61693, 1615, 279, 26282, 1173, "GraphicsData", \ "PostScript", "Graphics"] }, Open ]] }, Open ]], Cell[CellGroupData[{ Cell[233847, 6210, 37, 0, 61, "Subsection"], Cell[233887, 6212, 168, 4, 50, "Text"], Cell[234058, 6218, 172, 3, 43, "Input"], Cell[234233, 6223, 131, 3, 32, "Text"], Cell[234367, 6228, 240, 4, 43, "Input"], Cell[234610, 6234, 71, 0, 32, "Text"], Cell[CellGroupData[{ Cell[234706, 6238, 913, 19, 203, "Input"], Cell[235622, 6259, 71967, 1747, 312, 27343, 1192, "GraphicsData", \ "PostScript", "Graphics"] }, Open ]] }, Open ]] }, Open ]] }, Open ]] } ] *) (******************************************************************* End of Mathematica Notebook file. *******************************************************************)