代码搜索:integrals

找到约 127 项符合「integrals」的源代码

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m quadtoinfinity.m

function Isum = quadToInfinity(fun,a,dx0,tol,method) % quadToInfinity Integral from a to infinity evaluated as sum of integrals % Size of subintervals increases geometrically. Sum
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www.eeworm.com/read/458488/7296180

m gausslagquad.m

function I = gaussLagQuad(fun,nnode,wtype,varargin) % gaussLagQuad Gauss-Laguerre quadrature for integrals on [0,infinity) % % Synopsis: I = gaussLagQuad(fun,node) % I = gaussLagQuad(
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www.eeworm.com/read/458488/7296192

m quadtoinfinity.m

function Isum = quadToInfinity(fun,a,dx0,tol,method) % quadToInfinity Integral from a to infinity evaluated as sum of integrals % Size of subintervals increases geometrically. Sum
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www.eeworm.com/read/144399/12797658

m gausslagquad.m

function I = gaussLagQuad(fun,nnode,wtype,varargin) % gaussLagQuad Gauss-Laguerre quadrature for integrals on [0,infinity) % % Synopsis: I = gaussLagQuad(fun,node) % I = gaussLagQuad(
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www.eeworm.com/read/144399/12797691

m quadtoinfinity.m

function Isum = quadToInfinity(fun,a,dx0,tol,method) % quadToInfinity Integral from a to infinity evaluated as sum of integrals % Size of subintervals increases geometrically. Sum
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www.eeworm.com/read/124283/14579401

texi specfunc-ellint.texi

@cindex elliptic integrals The functions described in this section are declared in the header file @file{gsl_sf_ellint.h}. @menu * Definition of Legendre Forms:: * Definition of Carlson Forms::
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www.eeworm.com/read/212047/15166935

texi specfunc-ellint.texi

@cindex elliptic integrals The functions described in this section are declared in the header file @file{gsl_sf_ellint.h}. @menu * Definition of Legendre Forms:: * Definition of Carlson Forms::
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www.eeworm.com/read/167728/5453154

texi specfunc-ellint.texi

@cindex elliptic integrals The functions described in this section are declared in the header file @file{gsl_sf_ellint.h}. @menu * Definition of Legendre Forms:: * Definition of Carlson Forms::
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www.eeworm.com/read/172012/9726696

m gausslagquad.m

function I = gaussLagQuad(fun,nnode,wtype,varargin) % gaussLagQuad Gauss-Laguerre quadrature for integrals on [0,infinity) % % Synopsis: I = gaussLagQuad(fun,node) % I = gaussLagQuad(
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www.eeworm.com/read/172012/9726719

m quadtoinfinity.m

function Isum = quadToInfinity(fun,a,dx0,tol,method) % quadToInfinity Integral from a to infinity evaluated as sum of integrals % Size of subintervals increases geometrically. Sum
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