This is pdfTeXk, Version 3.141592-1.40.3 (Web2C 7.5.6) (format=latex 2010.5.6) 21 MAR 2013 16:11 entering extended mode \write18 enabled. %&-line parsing enabled. **SandBoxSageAxiomInterface.tex (./SandBoxSageAxiomInterface.tex LaTeX2e <2005/12/01> Babel and hyphenation patterns for english, usenglishmax, dumylang, noh yphenation, arabic, farsi, croatian, ukrainian, russian, bulgarian, czech, slov ak, danish, dutch, finnish, basque, french, german, ngerman, ibycus, greek, mon ogreek, ancientgreek, hungarian, italian, latin, mongolian, norsk, icelandic, i nterlingua, turkish, coptic, romanian, welsh, serbian, slovenian, estonian, esp eranto, uppersorbian, indonesian, polish, portuguese, spanish, catalan, galicia n, swedish, ukenglish, pinyin, loaded. (/usr/share/texmf-texlive/tex/latex/base/article.cls Document Class: article 2005/09/16 v1.4f Standard LaTeX document class (/usr/share/texmf-texlive/tex/latex/base/size10.clo File: size10.clo 2005/09/16 v1.4f Standard LaTeX file (size option) ) \c@part=\count79 \c@section=\count80 \c@subsection=\count81 \c@subsubsection=\count82 \c@paragraph=\count83 \c@subparagraph=\count84 \c@figure=\count85 \c@table=\count86 \abovecaptionskip=\skip41 \belowcaptionskip=\skip42 \bibindent=\dimen102 ) (/usr/share/texmf/tex/latex/axiom.sty \nwmarginglue=\dimen103 \codehsize=\dimen104 \codemargin=\dimen105 \nwdefspace=\dimen106 \equivbox=\box26 LaTeX Font Info: External font `cmex10' loaded for size (Font) <7> on input line 77. LaTeX Font Info: External font `cmex10' loaded for size (Font) <5> on input line 77. \plusequivbox=\box27 \nwcodetopsep=\skip43 \nwcodepenalty=\count87 \@original@textwidth=\dimen107 \nwcodecommentsep=\skip44 \@nwlopage=\count88 \@nwhipage=\count89 \@nwlosub=\count90 \@nwhisub=\count91 \@nwpagetemp=\count92 \@nwpagecount=\count93 \sub@page=\count94 \@nwalph@n=\count95 \nw@chunkcount=\count96 \@commacount=\count97 \nwix@counter=\count98 ) (./SandBoxSageAxiomInterface.aux) \openout1 = `SandBoxSageAxiomInterface.aux'. LaTeX Font Info: Checking defaults for OML/cmm/m/it on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: Checking defaults for T1/cmr/m/n on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: Checking defaults for OT1/cmr/m/n on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: Checking defaults for OMS/cmsy/m/n on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: Checking defaults for OMX/cmex/m/n on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: Checking defaults for U/cmr/m/n on input line 8. LaTeX Font Info: ... okay on input line 8. LaTeX Font Info: External font `cmex10' loaded for size (Font) <9> on input line 25. LaTeX Font Info: External font `cmex10' loaded for size (Font) <6> on input line 25. Overfull \hbox (3.42267pt too wide) in paragraph at lines 44--46 \OT1/cmr/m/n/9 a nor-mal lin-ear rep-re-sen-ta-tion of any Ax-iom ob-ject x, us e \OT1/cmtt/m/n/9 str(x). no emph [] Overfull \hbox (11.82156pt too wide) in paragraph at lines 54--54 []\OT1/cmtt/m/n/9 You can always use x.str() to obtain the linear representatio n [] Overfull \hbox (25.9964pt too wide) in paragraph at lines 55--55 []\OT1/cmtt/m/n/9 of an object, even without changing the display2d flag. This can [] Overfull \hbox (1.2963pt too wide) in paragraph at lines 81--81 []\OT1/cmtt/m/n/9 the factor method on it. Notice that the notation \code{f.f actor()}[] [] [1 ] Overfull \hbox (16.54651pt too wide) in paragraph at lines 83--83 []\OT1/cmtt/m/n/9 because of the excellent implementation of axiom. For exampl e, [] Overfull \hbox (180.84421pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 8.201219330881975641524897300208124427852048438593149412 21237124017312418754011041266612384955016056b1[] [] Overfull \hbox (445.44113pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 93326215443944152681699238856266700490715968264381621468 5929638952175999932299156089414639761565182862536979208272237582511852109168640 00000000000000000000000[] [] Overfull \hbox (185.56915pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 x^6*y^3 + 9*x^4*y^3 + 27*x^2*y^3 + 27*y^3 + 3*x^5*y^2 + 18*x^3*y^2 + 27*x*y^2 + 3*x^4*y + 9*x^2*y + x^3[] [] Overfull \hbox (161.94443pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 (27*y^3*z^6 + 135*y^2*z^5 + (675*y^3 + 225*y)*z^4 + (225 0*y^2 + 125)*z^3 + (5625*y^3 + 1875*y)*z^2[] [] Overfull \hbox (313.14267pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 {\Tt{}a\ =\ (25*sqrt(79)*{\%}i\ +\ 25)/(6*sqrt(79)*{\%}i \ -\ 34),b\ =\ (5*sqrt(79)*{\%}i\ +\ 5)/(sqrt(79)*{\%}i\ +\ 11),\nwnewline[] [] Overfull \hbox (317.86761pt too wide) in paragraph at lines 141--141 []\OT1/cmtt/m/n/9 \ \ \ \ \ [a\ =\ (25*sqrt(79)*{\%}i\ -\ 25)/(6*sqrt(79)*{\%} i\ +\ 34),b\ =\ (5*sqrt(79)*{\%}i\ -\ 5)/(sqrt(79)*{\%}i\ -\ 11),\nwnewline[] [] [2] Overfull \hbox (6.02124pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 sage: axiom('x^2 + y^2 = (x^2 - y^2)/sqrt(x^2 + y^2)').s olve('y')[] [] Overfull \hbox (161.94443pt too wide) in paragraph at lines 141--141 [] \OT1/cmtt/m/n/9 [y = - sqrt(( - y^2 - x^2)*sqrt(y^2 + x^2) + x^2),y = s qrt(( - y^2 - x^2)*sqrt(y^2 + x^2) + x^2)][] [] Overfull \hbox (1073.85883pt too wide) in paragraph at lines 147--147 [] \OT1/cmtt/m/n/9 \left[ \left[ a=\frac{25 \sqrt{79} i+25}{6 \sqrt{79} i-3 4} , b= \frac{5 \sqrt{79} i+5}{\sqrt{79} i+11} , c=\frac{\sqrt{79} i+1}{10} \right] , \left[ a=\frac{25 \sqrt{79} i-25}{6 \sqrt{79} i+34} , b= \frac{5 \s qrt{79} i-5}{\sqrt{79} i-11} , c=-\frac{\sqrt{79} i-1}{10} \right] \right][] [] Overfull \hbox (30.72134pt too wide) in paragraph at lines 149--149 []\OT1/cmtt/m/n/9 (TODO: For OS X should create pdf output and use preview inst ead?) [] Overfull \hbox (53.27069pt too wide) in paragraph at lines 178--178 [] \OT1/cmtt/m/n/9 k*x^3*%e^(k*x)*sin(w*x) + 3*x^2*%e^(k*x)*sin(w*x) + w*x^ 3*%e^(k*x)*cos(w*x)[] [] Overfull \hbox (1536.90344pt too wide) in paragraph at lines 178--178 [] \OT1/cmtt/m/n/9 (((k*w^6 + 3*k^3*w^4 + 3*k^5*w^2 + k^7)*x^3 + (3*w^6 + 3 *k^2*w^4 - 3*k^4*w^2 - 3*k^6)*x^2 + ( - 18*k*w^4 - 12*k^3*w^2 + 6*k^5)*x - 6*w^ 4 + 36*k^2*w^2 - 6*k^4)*%e^(k*x)*sin(w*x) + (( - w^7 - 3*k^2*w^5 - 3*k^4*w^3 - k^6*w)*x^3 + (6*k*w^5 + 12*k^3*w^3 + 6*k^5*w)*x^2 + (6*w^5 - 12*k^2*w^3 - 18*k^ 4*w)*x - 24*k*w^3 + 24*k^3*w)*%e^(k*x)*cos(w*x))/(w^8 + 4*k^2*w^6 + 6*k^4*w^4 + 4*k^6*w^2 + k^8)[] [] [3] Overfull \hbox (76.89542pt too wide) in paragraph at lines 194--194 [] \OT1/cmtt/m/n/9 {\Tt{}[0,4],[3,1\nwendquote},[1,0,0, - 4],[0,1,0, - 2],[ 0,0,1, - 4/3],[1,2,3,4]][] [] Overfull \hbox (185.56915pt too wide) in paragraph at lines 243--243 [] \OT1/cmtt/m/n/9 360*(2*s - 2)/(s^2 - 2*s + 2)^4 - 480*(2*s - 2)^3/(s^2 - 2*s + 2)^5 + 120*(2*s - 2)^5/(s^2 - 2*s + 2)^6[] [] [4] Overfull \hbox (16.84644pt too wide) in paragraph at lines 244--244 \OT1/cmtt/m/n/9 Even better, use view(axiom("laplace(diff(x(t),t,2),t,s)")) to see [] ! Missing $ inserted. $ l.249 ...tinued fraction $a + 1/(b + 1/(c + \cdots ))$ is I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing $ inserted. $ l.249 ... fraction $a + 1/(b + 1/(c + \cdots))$ is I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing } inserted. } l.249 ... fraction $a + 1/(b + 1/(c + \cdots))$ is I've inserted something that you may have forgotten. (See the above.) With luck, this will get me unwedged. But if you really didn't forget anything, try typing `2' now; then my insertion and my current dilemma will both disappear. ! Extra }, or forgotten \endgroup. \@par ... \@noitemerr {\@@par }\fi \else {\@@par } \fi l.249 ... fraction $a + 1/(b + 1/(c + \cdots))$ is I've deleted a group-closing symbol because it seems to be spurious, as in `$x}$'. But perhaps the } is legitimate and you forgot something else, as in `\hbox{$x}'. In such cases the way to recover is to insert both the forgotten and the deleted material, e.g., by typing `I$}'. Overfull \hbox (6.02124pt too wide) in paragraph at lines 275--275 [] \OT1/cmtt/m/n/9 sage.: axiom('plot3d(x^2-y^2, [x,-2,2], [y,-2,2], [grid, 12,12])')[] [] Overfull \hbox (1.2963pt too wide) in paragraph at lines 285--285 [] \OT1/cmtt/m/n/9 ----------------------- - --------------- --------[] [] Overfull \hbox (1.2963pt too wide) in paragraph at lines 285--285 [] \OT1/cmtt/m/n/9 (%e - 1) (%e + 1) (%e - 1) (%e + 1)[] [] ! Missing $ inserted. $ l.286 We formally compute the limit as $n\to \infty$ of $2S/n$ as follows: I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing $ inserted. $ l.286 ...mit as $n\to\infty$ of $2S/n$ as follows: I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing } inserted. } l.286 ...mit as $n\to\infty$ of $2S/n$ as follows: I've inserted something that you may have forgotten. (See the above.) With luck, this will get me unwedged. But if you really didn't forget anything, try typing `2' now; then my insertion and my current dilemma will both disappear. ! Extra }, or forgotten \endgroup. \@par ... \@noitemerr {\@@par }\fi \else {\@@par } \fi l.286 ...mit as $n\to\infty$ of $2S/n$ as follows: I've deleted a group-closing symbol because it seems to be spurious, as in `$x}$'. But perhaps the } is legitimate and you forgot something else, as in `\hbox{$x}'. In such cases the way to recover is to insert both the forgotten and the deleted material, e.g., by typing `I$}'. ! Missing $ inserted. $ l.293 Obtaining digits of $\pi $: I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing $ inserted. $ l.293 Obtaining digits of $\pi$: I've inserted a begin-math/end-math symbol since I think you left one out. Proceed, with fingers crossed. ! Missing } inserted. } l.293 Obtaining digits of $\pi$: I've inserted something that you may have forgotten. (See the above.) With luck, this will get me unwedged. But if you really didn't forget anything, try typing `2' now; then my insertion and my current dilemma will both disappear. ! Extra }, or forgotten \endgroup. \@par ... \@noitemerr {\@@par }\fi \else {\@@par } \fi l.293 Obtaining digits of $\pi$: I've deleted a group-closing symbol because it seems to be spurious, as in `$x}$'. But perhaps the } is legitimate and you forgot something else, as in `\hbox{$x}'. In such cases the way to recover is to insert both the forgotten and the deleted material, e.g., by typing `I$}'. [5] Overfull \hbox (185.56915pt too wide) in paragraph at lines 299--299 [] \OT1/cmtt/m/n/9 3.141592653589793238462643383279502884197169399375105820 974944592307816406286208998628034825342117068b0[] [] ! Extra }, or forgotten \endgroup. l.343 } I've deleted a group-closing symbol because it seems to be spurious, as in `$x}$'. But perhaps the } is legitimate and you forgot something else, as in `\hbox{$x}'. In such cases the way to recover is to insert both the forgotten and the deleted material, e.g., by typing `I$}'. [6] LaTeX Font Info: External font `cmex10' loaded for size (Font) <12> on input line 345. LaTeX Font Info: External font `cmex10' loaded for size (Font) <8> on input line 345. Overfull \hbox (475.9254pt too wide) in paragraph at lines 345--345 [][] [] [7] [8] Overfull \hbox (103.74934pt too wide) in paragraph at lines 439--439 [] \OT1/cmtt/m/n/10 8.20121933088197564152489730020812442785204843859314941 221237124017312418754011041266612384955016056b1[] [] Overfull \hbox (397.74678pt too wide) in paragraph at lines 442--442 [] \OT1/cmtt/m/n/10 9332621544394415268169923885626670049071596826438162146 8592963895217599993229915608941463976156518286253697920827223758251185210916864 000000000000000000000000[] [] Overfull \hbox (108.9993pt too wide) in paragraph at lines 446--446 [] \OT1/cmtt/m/n/10 x^6*y^3 + 9*x^4*y^3 + 27*x^2*y^3 + 27*y^3 + 3*x^5*y^2 + 18*x^3*y^2 + 27*x*y^2 + 3*x^4*y + 9*x^2*y + x^3[] [] Overfull \hbox (240.24815pt too wide) in paragraph at lines 451--451 [] \OT1/cmtt/m/n/10 (27*y^3*z^6 + 135*y^2*z^5 + (675*y^3 + 225*y)*z^4 + (22 50*y^2 + 125)*z^3 + (5625*y^3 + 1875*y)*z^2 + 9375*y^2*z + 15625*y^3)/z^6[] [] Overfull \hbox (817.74312pt too wide) in paragraph at lines 457--457 [] \OT1/cmtt/m/n/10 [[a = (25*sqrt(79)*%i + 25)/(6*sqrt(79)*%i - 34),b = (5 *sqrt(79)*%i + 5)/(sqrt(79)*%i + 11),c = (sqrt(79)*%i + 1)/10],[a = (25*sqrt(79 )*%i - 25)/(6*sqrt(79)*%i + 34),b = (5*sqrt(79)*%i - 5)/(sqrt(79)*%i - 11),c = - (sqrt(79)*%i - 1)/10]][] [] Overfull \hbox (82.74953pt too wide) in paragraph at lines 463--463 [] \OT1/cmtt/m/n/10 [y = - sqrt(( - y^2 - x^2)*sqrt(y^2 + x^2) + x^2),y = sqrt(( - y^2 - x^2)*sqrt(y^2 + x^2) + x^2)][] [] Overfull \hbox (1095.99069pt too wide) in paragraph at lines 467--467 [] \OT1/cmtt/m/n/10 \left[ \left[ a=\frac{25 \sqrt{79} i+25}{6 \sqrt{79} i- 34} , b= \frac{5 \sqrt{79} i+5}{\sqrt{79} i+11} , c=\frac{\sqrt{79} i+1}{10} \right] , \left[ a=\frac{25 \sqrt{79} i-25}{6 \sqrt{79} i+34} , b= \frac{5 \ sqrt{79} i-5}{\sqrt{79} i-11} , c=-\frac{\sqrt{79} i-1}{10} \right] \right][ ] [] [9] Overfull \hbox (1610.4862pt too wide) in paragraph at lines 488--488 [] \OT1/cmtt/m/n/10 (((k*w^6 + 3*k^3*w^4 + 3*k^5*w^2 + k^7)*x^3 + (3*w^6 + 3*k^2*w^4 - 3*k^4*w^2 - 3*k^6)*x^2 + ( - 18*k*w^4 - 12*k^3*w^2 + 6*k^5)*x - 6*w ^4 + 36*k^2*w^2 - 6*k^4)*%e^(k*x)*sin(w*x) + (( - w^7 - 3*k^2*w^5 - 3*k^4*w^3 - k^6*w)*x^3 + (6*k*w^5 + 12*k^3*w^3 + 6*k^5*w)*x^2 + (6*w^5 - 12*k^2*w^3 - 18*k ^4*w)*x - 24*k*w^3 + 24*k^3*w)*%e^(k*x)*cos(w*x))/(w^8 + 4*k^2*w^6 + 6*k^4*w^4 + 4*k^6*w^2 + k^8)[] [] [10] Overfull \hbox (108.9993pt too wide) in paragraph at lines 541--541 [] \OT1/cmtt/m/n/10 360*(2*s - 2)/(s^2 - 2*s + 2)^4 - 480*(2*s - 2)^3/(s^2 - 2*s + 2)^5 + 120*(2*s - 2)^5/(s^2 - 2*s + 2)^6[] [] [11] [12] Overfull \hbox (108.9993pt too wide) in paragraph at lines 615--615 [] \OT1/cmtt/m/n/10 3.14159265358979323846264338327950288419716939937510582 0974944592307816406286208998628034825342117068b0[] [] [13] [14] [15] [16] [17] Overfull \hbox (4.00021pt too wide) in paragraph at lines 858--858 [] \OT1/cmtt/m/n/10 self.__commands = sum([self.completions(chr(97+ n)) for n in range(26)], [])[] [] [18] [19] Overfull \hbox (93.24944pt too wide) in paragraph at lines 946--946 [] \OT1/cmtt/m/n/10 raise TypeError, "Error executing code in Axiom \nCODE:\n\t%s\nAxiom ERROR:\n\t%s"%(cmd, out)[] [] Overfull \hbox (4.00021pt too wide) in paragraph at lines 977--977 [] \OT1/cmtt/m/n/10 options -- an optional string representing plot 2d options in gnuplot format[] [] [20] Overfull \hbox (4.00021pt too wide) in paragraph at lines 997--997 [] \OT1/cmtt/m/n/10 options -- an optional string representing plot 2d options in gnuplot format[] [] Overfull \hbox (166.7488pt too wide) in paragraph at lines 1002--1002 [] \OT1/cmtt/m/n/10 sage.: opts = '[gnuplot_preamble, "set nokey"], [gnuplot_term, ps], [gnuplot_out_file, "circle-plot.eps"]'[] [] Overfull \hbox (40.7499pt too wide) in paragraph at lines 1003--1003 [] \OT1/cmtt/m/n/10 sage.: axiom.plot2d_parametric(["sin(t)","cos(t )"], "t", [-3.1,3.1], options=opts)[] [] Overfull \hbox (56.49976pt too wide) in paragraph at lines 1008--1008 [] \OT1/cmtt/m/n/10 sage.: axiom.plot2d_parametric(["sin(5*t)","cos (11*t)"], "t", [0,2*pi()], nticks=400)[] [] Overfull \hbox (9.25017pt too wide) in paragraph at lines 1024--1024 [] \OT1/cmtt/m/n/10 axiom.plot3d(f, '[x, xmin, xmax]', '[y, ymin, ymax] ', '[grid, nx, ny]', options)[] [] [21] Overfull \hbox (9.25017pt too wide) in paragraph at lines 1031--1031 [] \OT1/cmtt/m/n/10 sage.: axiom.plot3d('1 + x^3 - y^2', '[x,-2,2]' , '[y,-2,2]', '[grid,12,12]')[] [] Overfull \hbox (9.25017pt too wide) in paragraph at lines 1032--1032 [] \OT1/cmtt/m/n/10 sage.: axiom.plot3d('sin(x)*cos(y)', '[x,-2,2]' , '[y,-2,2]', '[grid,30,30]')[] [] Overfull \hbox (25.00003pt too wide) in paragraph at lines 1047--1047 [] \OT1/cmtt/m/n/10 vars is a list or two strings representing vari ables (such as vars = ["u","v"])[] [] Overfull \hbox (66.99966pt too wide) in paragraph at lines 1057--1057 [] \OT1/cmtt/m/n/10 sage.: axiom.plot3d_parametric(["v*sin(u)","v*c os(u)","v"], ["u","v"],[-3.2,3.2],[0,3])[] [] Overfull \hbox (93.24944pt too wide) in paragraph at lines 1059--1059 [] \OT1/cmtt/m/n/10 sage.: axiom.plot3d_parametric(["v*sin(u)","v*c os(u)","v"], ["u","v"],[-3.2,3.2],[0,3],opts)[] [] Overfull \hbox (234.9982pt too wide) in paragraph at lines 1065--1065 [] \OT1/cmtt/m/n/10 sage.: _ = axiom.eval("expr_1: cos(y)*(10.0+6*c os(x)); expr_2: sin(y)*(10.0+6*cos(x)); expr_3: -6*sin(x);") # optional[] [] Overfull \hbox (45.99985pt too wide) in paragraph at lines 1066--1066 [] \OT1/cmtt/m/n/10 sage.: axiom.plot3d_parametric(["expr_1","expr_ 2","expr_3"], ["x","y"],[0,6],[0,6])[] [] [22] Overfull \hbox (182.49866pt too wide) in paragraph at lines 1116--1116 [] \OT1/cmtt/m/n/10 cmd = "ic2("+a+",%s=%s,%s=%s,diff(%s,%s)=%s );"%(vars[0],ics[0], vars[1],ics[1], vars[1], vars[0], ics[2])[] [] [23] Overfull \hbox (9.25017pt too wide) in paragraph at lines 1119--1119 [] \OT1/cmtt/m/n/10 return axiom("ic1("+a+",%s=%s,%s=%s);"%(var s[0],ics[0], vars[1],ics[1]))[] [] Overfull \hbox (77.49957pt too wide) in paragraph at lines 1137--1137 [] \OT1/cmtt/m/n/10 sage.: axiom.de_solve_laplace("diff(f(x),x,2) = 2*diff(f(x),x)-f(x)", ["x","f"], [0,1,2])[] [] Overfull \hbox (51.2498pt too wide) in paragraph at lines 1141--1141 [] \OT1/cmtt/m/n/10 sage.: f = axiom.de_solve_laplace("diff(f(x),x, 2) = 2*diff(f(x),x)-f(x)", ["x","f"])[] [] [24] [25] Overfull \hbox (98.49939pt too wide) in paragraph at lines 1234--1234 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsx = [ (pari(1/2 + i*I/10).zeta() .real()).precision(1) for i in range (70,150)][] [] Overfull \hbox (98.49939pt too wide) in paragraph at lines 1235--1235 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsy = [ (pari(1/2 + i*I/10).zeta() .imag()).precision(1) for i in range (70,150)][] [] Overfull \hbox (119.4992pt too wide) in paragraph at lines 1237--1237 [] \OT1/cmtt/m/n/10 sage.: opts='[gnuplot_preamble, "set nokey"], [ gnuplot_term, ps], [gnuplot_out_file, "zeta.eps"]'[] [] [26] Overfull \hbox (72.24962pt too wide) in paragraph at lines 1259--1259 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsx1 = [ (pari(1/2+i*I/10).zeta(). real()).precision(1) for i in range (10)][] [] Overfull \hbox (72.24962pt too wide) in paragraph at lines 1260--1260 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsy1 = [ (pari(1/2+i*I/10).zeta(). imag()).precision(1) for i in range (10)][] [] Overfull \hbox (93.24944pt too wide) in paragraph at lines 1262--1262 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsx1 = [ (pari(1/2+i*I/10).zeta(). real()).precision(1) for i in range (10,150)][] [] Overfull \hbox (93.24944pt too wide) in paragraph at lines 1263--1263 [] \OT1/cmtt/m/n/10 sage.: zeta_ptsy1 = [ (pari(1/2+i*I/10).zeta(). imag()).precision(1) for i in range (10,150)][] [] Overfull \hbox (4.00021pt too wide) in paragraph at lines 1266--1266 [] \OT1/cmtt/m/n/10 sage.: axiom.plot_multilist([[zeta_ptsx1,zeta_p tsy1],[xx,y0],[x0,yy]],opts)[] [] Overfull \hbox (4.00021pt too wide) in paragraph at lines 1272--1272 [] \OT1/cmtt/m/n/10 cmd = cmd+'[discrete,'+str(pts_list[i][0])+ ','+str(pts_list[i][1])+'],'[] [] Overfull \hbox (4.00021pt too wide) in paragraph at lines 1274--1274 [] \OT1/cmtt/m/n/10 cmd = cmd+'[discrete,'+str(pts_list[i][0])+ ','+str(pts_list[i][1])+']]'[] [] [27] Overfull \hbox (9.25017pt too wide) in paragraph at lines 1319--1319 [] \OT1/cmtt/m/n/10 return -1 # everything is supposed to be compa rable in Python, so we define[] [] [28] [29] Overfull \hbox (40.7499pt too wide) in paragraph at lines 1413--1413 [] \OT1/cmtt/m/n/10 0.528482235314230713617904919354156530216755475 87292866196865279321015401702040079[] [] [30] [31] [32] [33] [34] [35] (./SandBoxSageAxiomInterface.aux) ) (\end occurred inside a group at level 9) ### semi simple group (level 9) entered at line 338 (\begingroup) ### semi simple group (level 8) entered at line 276 (\begingroup) ### semi simple group (level 7) entered at line 244 (\begingroup) ### semi simple group (level 6) entered at line 148 (\begingroup) ### semi simple group (level 5) entered at line 148 (\begingroup) ### semi simple group (level 4) entered at line 66 (\begingroup) ### semi simple group (level 3) entered at line 54 (\begingroup) ### semi simple group (level 2) entered at line 46 (\begingroup) ### simple group (level 1) entered at line 16 ({) ### bottom level Here is how much of TeX's memory you used: 527 strings out of 94075 6240 string characters out of 1165177 59022 words of memory out of 1500000 3877 multiletter control sequences out of 10000+50000 9267 words of font info for 34 fonts, out of 1200000 for 2000 645 hyphenation exceptions out of 8191 25i,6n,18p,425b,596s stack positions out of 5000i,500n,6000p,200000b,5000s Output written on SandBoxSageAxiomInterface.dvi (35 pages, 63272 bytes).