| /dports/math/maxima/maxima-5.43.2/doc/info/ |
| H A D | Special.texi | 51 expintegral_ci (z) Exponential integral Ci
1651 @deffn {Function} expintegral_ci (@var{z})
1727 values indicate the representation is to be changed to use the
1729 @var{expintegral_si}, @var{expintegral_ci}, and @var{expintegral_hyp}
1898 The hypergeometric function. Unlike Maxima's @code{%f} hypergeometric
1984 hypergeometric functions.
2035 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
2041 -2*t*expintegral_ci(a*t))*%e^(-s*t),t));
2084 to the arguments of any hypergeometric functions in the expression @var{e}.
2099 @c foo : [hypergeometric([1,1], [2], z), hypergeometric([1/2], [1], z)];
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| H A D | maxima.info-1 | 16124 expintegral_ci (z) Exponential integral Ci
17155 -- Function: expintegral_ci (<z>)
17188 <expintegral_ci>, and <expintegral_hyp> means <expintegral_shi> or
17301 The hypergeometric function. Unlike Maxima's '%f' hypergeometric
17315 (%i1) hypergeometric([],[],x);
17322 (%o2) hypergeometric([-3],[7],x)
17417 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
17423 -2*t*expintegral_ci(a*t))*%e^(-s*t),t));
17457 applying 'hgfred' to the arguments of any hypergeometric functions
17471 (%i1) load ("hypergeometric") $
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| H A D | maxima.info-3 | 10458 hypergeometric summation, and also Gosper's algorithm for indefinite
10459 hypergeometric summation.
10471 'zeilberger' implements Gosper's algorithm for indefinite hypergeometric
10472 summation. Given a hypergeometric term F_k in k we want to find its
10473 hypergeometric anti-difference, that is, a hypergeometric term f_k such
10482 hypergeometric summation. Given a proper hypergeometric term (in n and
10520 Returns the hypergeometric anti-difference of F_k, if it exists.
10531 has a hypergeometric anti-difference. Otherwise, 'GosperSum'
10585 Attempts to compute the indefinite hypergeometric summation of
12321 * expintegral_ci: Exponential Integrals.
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| /dports/math/maxima/maxima-5.43.2/tests/ |
| H A D | rtest_hypgeo.mac | 946 radcan(specint(%e^(-s*t)*(cos(t)*expintegral_si(t)-sin(t)*expintegral_ci(t)),t)),
955 radcan(specint(%e^(-s*t)*(-sin(t)*expintegral_si(t)-cos(t)*expintegral_ci(t)),t)),
980 radcan(specint(%e^(-s*t)*(-2)*expintegral_ci(t/k),t));
988 ratsimp(specint(%e^(-s*t)*(2*log(a)-2*expintegral_ci(a*t)),t));
997 ratsimp(specint(%e^(-s*t)*(2*t*log(a)+2/a*sin(a*t)-2*t*expintegral_ci(a*t)),t));
1373 We calculate for an integer to prevent the conversion to bessel_i.
1460 The result of Maxima can be shown to be equivalent to the
1768 This is a bug. The argument of the hypergeometric function for this example
1865 to a hypergeometric function we have an argument of the form (t^2+b*t).
1950 * hypergeometric function only works for an argument t^n where n is positive
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| H A D | rtest_laplace.mac | 9 /* attempt to forestall asksign queries */
201 * (specint code doesn't match formula; code appears to be correct)
278 * Laplace transform of expintegral_ci
310 * For the following cases we have to add further algorithm:
317 * convert to Whittaker M function.
340 /* Algorithm 3: Laplace transform of a hypergeometric function
646 /* bug reported to mailing list 2012-11-25: laplace prevents user-defined simplification */
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| /dports/math/maxima/maxima-5.43.2/doc/info/de/ |
| H A D | maxima.info-5 | 70 expintegral_ci (z) Exponentielles Integral Ci
768 hypergeometric([-], [-, -], --) z
1929 -- Funktion: expintegral_ci (<z>)
1947 'expintegral_ci', 'expintegral_shi', oder 'expintegral_chi'.
2365 (%i1) hypergeometric([],[],x);
2371 (%i2) hypergeometric([-3],[7],x);
2372 (%o2) hypergeometric([-3],[7],x)
2380 (%i4) hypergeometric([5.1],[7.1 + %i],0.42);
2382 (%i5) hypergeometric([5,6],[8], 5.7 - %i);
2525 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
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| H A D | maxima.info | 1255 Ref: expintegral_ci1313264
1283 Ref: hypergeometric1327010
1486 Node: Introduction to Affine1593890
1502 Node: Introduction to asympa1599946
1515 Node: Introduction to cobyla1613266
1643 Node: Introduction to draw1801144
1688 Node: Introduction to drawdf1934107
1713 Node: Introduction to graphs2014737
1731 Node: Introduction to lbfgs2116898
1848 Node: Introduction to stats2293374
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| /dports/math/maxima/maxima-5.43.2/doc/info/de.utf8/ |
| H A D | maxima.info-5 | 70 expintegral_ci (z) Exponentielles Integral Ci
768 hypergeometric([-], [-, -], --) z
1929 -- Funktion: expintegral_ci (<z>)
1947 'expintegral_ci', 'expintegral_shi', oder 'expintegral_chi'.
2365 (%i1) hypergeometric([],[],x);
2371 (%i2) hypergeometric([-3],[7],x);
2372 (%o2) hypergeometric([-3],[7],x)
2380 (%i4) hypergeometric([5.1],[7.1 + %i],0.42);
2382 (%i5) hypergeometric([5,6],[8], 5.7 - %i);
2525 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
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| H A D | maxima.info | 1255 Ref: expintegral_ci1313264
1283 Ref: hypergeometric1327010
1486 Node: Introduction to Affine1593890
1502 Node: Introduction to asympa1599946
1515 Node: Introduction to cobyla1613266
1643 Node: Introduction to draw1801144
1688 Node: Introduction to drawdf1934107
1713 Node: Introduction to graphs2014737
1731 Node: Introduction to lbfgs2116898
1848 Node: Introduction to stats2293374
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| /dports/www/nextcloud/nextcloud/apps-pkg/text/js/highlight/ |
| H A D | maxima.js.map | 1 …expintegral_ci' +\n ' expintegral_e expintegral_e1 expintegral_ei expintegral_e_simplify expint…
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| /dports/math/maxima/maxima-5.43.2/doc/info/es/ |
| H A D | maxima.info-3 | 865 -- Funci�n: expintegral_ci (<z>)
1005 'hypergeometric' devuelve un polinomio expandido.
1008 (%i1) hypergeometric([],[],x);
1014 (%i2) hypergeometric([-3],[7],x);
1015 (%o2) hypergeometric([-3],[7],x)
1025 (%i5) hypergeometric([5,6],[8], 5.7 - %i);
1112 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
1118 -2*t*expintegral_ci(a*t))*%e^(-s*t),t));
2013 coordenadas o nombres con sub�ndices, como 'X[1]', 'X[2]', ... to
4440 SOLVE is using arc-trig functions to get a solution.
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| H A D | maxima.info-8 | 105 A recursion relation for foo isn't known to Maxima
914 (%i12) b+%; /* add b to both sides */
4134 Nonalgebraic argument given to 'to_poly'
4135 unable to solve
4286 Unable to solve
4287 Unable to solve
4811 setunits([unit]) to select a unit.
4815 setunits([unit]) to select a unit.
4967 Returns the hypergeometric anti-difference of F_k, if it exists.
6587 * expintegral_ci: Integral exponencial.
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| H A D | maxima.info-2 | 3181 Maxima was unable to evaluate the predicate:
3372 Maxima was unable to evaluate the predicate:
4396 (%i5) /* Comments /* can be nested /* to any depth */ */ */ 1 + xyz;
6007 analogous to 'subst'.
6843 hypergeometric(l1, l2, z) Funci�n hipergeom�trica
6853 expintegral_ci (z) Integral exponencial Ci
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| /dports/math/maxima/maxima-5.43.2/doc/info/es.utf8/ |
| H A D | maxima.info-3 | 865 -- Función: expintegral_ci (<z>)
1005 'hypergeometric' devuelve un polinomio expandido.
1008 (%i1) hypergeometric([],[],x);
1014 (%i2) hypergeometric([-3],[7],x);
1015 (%o2) hypergeometric([-3],[7],x)
1025 (%i5) hypergeometric([5,6],[8], 5.7 - %i);
1112 -sin(t)*expintegral_ci(t))*%e^(-s*t),t));
1118 -2*t*expintegral_ci(a*t))*%e^(-s*t),t));
2013 coordenadas o nombres con subíndices, como 'X[1]', 'X[2]', ... to
4440 SOLVE is using arc-trig functions to get a solution.
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| H A D | maxima.info-8 | 105 A recursion relation for foo isn't known to Maxima
914 (%i12) b+%; /* add b to both sides */
4134 Nonalgebraic argument given to 'to_poly'
4135 unable to solve
4286 Unable to solve
4287 Unable to solve
4811 setunits([unit]) to select a unit.
4815 setunits([unit]) to select a unit.
4967 Returns the hypergeometric anti-difference of F_k, if it exists.
6587 * expintegral_ci: Integral exponencial.
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| H A D | maxima.info-2 | 3181 Maxima was unable to evaluate the predicate:
3372 Maxima was unable to evaluate the predicate:
4396 (%i5) /* Comments /* can be nested /* to any depth */ */ */ 1 + xyz;
6007 analogous to 'subst'.
6843 hypergeometric(l1, l2, z) Función hipergeométrica
6853 expintegral_ci (z) Integral exponencial Ci
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| /dports/www/mattermost-webapp/mattermost/client/ |
| H A D | main.ea67f64bfaca6bdc766a.js.map | 1 …to-array.js","webpack://@mattermost/webapp/./node_modules/@babel/runtime-corejs2/node_modules/core…
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