XX Computer Programs by Chapter and Section 3.4 hunt search a table when calls are correlated 3.5 polcoe polynomial coefficients from table of values 3.5 polcof polynomial coefficients from table of values 3.6 polin2 two-dimensional polynomial interpolation 3.6 bcucof construct two-dimensional bicubic 3.6 bcuint two-dimensional bicubic interpolation 3.6 splie2 construct two-dimensional spline 3.6 splin2 two-dimensional spline interpolation Permission is Sample page 4.2 trapzd trapezoidal rule 4.2 qtrap integrate using trapezoidal rule 42 qsimp integrate using Simpson's rule 4.3 qromb integrate using Romberg adaptive method 4.4 midpnt extended midpoint rule 4.4 qromo integrate using open Romberg adaptive method 4.4 midinf integrate a function on a semi-infinite interval 4.4 midsql integrate a function with lower square-root singularity 4.4 midsqu integrate a function with upper square-root singularity http://www.nr.com or call 1-800-872-7423 (North America 4.4 midexp integrate a function that decreases exponentially granted for internet users to make one paper 4.5 qgaus integrate a function by Gaussian quadratures 4.5 gauleg Gauss-Legendre weights and abscissas 4.5 gaulag Gauss-Laguerre weights and abscissas readable files(including this one)to any server computer,is strictly prohibited. 4.5 gauher Gauss-Hermite weights and abscissas 4.5 gaujac Gauss-Jacobi weights and abscissas copy for their 4.5 gaucof quadrature weights from orthogonal polynomials 4.5 orthog construct nonclassical orthogonal polynomials 4.6 quad3d integrate a function over a three-dimensional space 5.1 eulsum sum a series by Euler-van Wijngaarden algorithm 5.3 ddpoly evaluate a polynomial and its derivatives Copyright(C)1988-1992 by Cambridge University Press.Programs Copyright(C)1988-1992 by Numerical Recipes from NUMERICAL RECIPES IN C:THE ART OF SCIENTIFIC COMPUTING(ISBN 0-521-43108-5) 5.3 poldiv divide one polynomial by another 5.3 ratval evaluate a rational function 5.7 dfridr numerical derivative by Ridders'method 5.8 chebft fit a Chebyshev polynomial to a function personal use.Further reproduction,or 5.8 chebev Chebyshev polynomial evaluation 5.9 chder derivative of a function already Chebyshev fitted 5.9 chint integrate a function already Chebyshev fitted only),orsend email to directcustserv@cambridge.org (outside North America) 5.10 chebpc polynomial coefficients from a Chebyshev fit Software. 5.10 pcshft polynomial coefficients of a shifted polynomial 5.11 pccheb inverse of chebpc:use to economize power series 5.12 pade Pade approximant from power series coefficients ying of machine 5.13 ratlsq rational fit by least-squares method 6.1 gammln logarithm of gamma function 6.1 factrl factorial function 6.1 bico binomial coefficients function 6.1 factln logarithm of factorial functionxx Computer Programs by Chapter and Section Permission is granted for internet users to make one paper copy for their own personal use. Further reproduction, or any copyin Copyright (C) 1988-1992 by Cambridge University Press. Programs Copyright (C) 1988-1992 by Numerical Recipes Software. Sample page from NUMERICAL RECIPES IN C: THE ART OF SCIENTIFIC COMPUTING (ISBN 0-521-43108-5) g of machine￾readable files (including this one) to any server computer, is strictly prohibited. To order Numerical Recipes books or CDROMs, visit website http://www.nr.com or call 1-800-872-7423 (North America only), or send email to directcustserv@cambridge.org (outside North America). 3.4 hunt search a table when calls are correlated 3.5 polcoe polynomial coefficients from table of values 3.5 polcof polynomial coefficients from table of values 3.6 polin2 two-dimensional polynomial interpolation 3.6 bcucof construct two-dimensional bicubic 3.6 bcuint two-dimensional bicubic interpolation 3.6 splie2 construct two-dimensional spline 3.6 splin2 two-dimensional spline interpolation 4.2 trapzd trapezoidal rule 4.2 qtrap integrate using trapezoidal rule 4.2 qsimp integrate using Simpson’s rule 4.3 qromb integrate using Romberg adaptive method 4.4 midpnt extended midpoint rule 4.4 qromo integrate using open Romberg adaptive method 4.4 midinf integrate a function on a semi-infinite interval 4.4 midsql integrate a function with lower square-root singularity 4.4 midsqu integrate a function with upper square-root singularity 4.4 midexp integrate a function that decreases exponentially 4.5 qgaus integrate a function by Gaussian quadratures 4.5 gauleg Gauss-Legendre weights and abscissas 4.5 gaulag Gauss-Laguerre weights and abscissas 4.5 gauher Gauss-Hermite weights and abscissas 4.5 gaujac Gauss-Jacobi weights and abscissas 4.5 gaucof quadrature weights from orthogonal polynomials 4.5 orthog construct nonclassical orthogonal polynomials 4.6 quad3d integrate a function over a three-dimensional space 5.1 eulsum sum a series by Euler–van Wijngaarden algorithm 5.3 ddpoly evaluate a polynomial and its derivatives 5.3 poldiv divide one polynomial by another 5.3 ratval evaluate a rational function 5.7 dfridr numerical derivative by Ridders’ method 5.8 chebft fit a Chebyshev polynomial to a function 5.8 chebev Chebyshev polynomial evaluation 5.9 chder derivative of a function already Chebyshev fitted 5.9 chint integrate a function already Chebyshev fitted 5.10 chebpc polynomial coefficients from a Chebyshev fit 5.10 pcshft polynomial coefficients of a shifted polynomial 5.11 pccheb inverse of chebpc; use to economize power series 5.12 pade Pade approximant from power series coefficients ´ 5.13 ratlsq rational fit by least-squares method 6.1 gammln logarithm of gamma function 6.1 factrl factorial function 6.1 bico binomial coefficients function 6.1 factln logarithm of factorial function