Numerical Recipes Routines and Examples in BASIC (First Edition)Cambridge University Press, 26 avr. 1991 - 398 pages This book contains the routines and demonstration programs from the first edition of the highly acclaimed reference book, Numerical Recipes: The Art of Scientific Computing. It includes computer code and code captions from the book and example book and the commentary from the example book. The author employs a contemporary version of BASIC, Microsoft QuickBasic 4.5, which roughly follows the structure of FORTRAN; in fact, the recipes found in this book are easily adapted for other modern forms of BASIC. This book is recommended for use with one of the main Numerical Recipes books, such as Numerical Recipes in Fortran 77 [link to 43064X]. The programs contained in this book are also available as machine-readable code on the Numerical Recipes Code CD-ROM with Windows/Macintosh Single Screen License [link to 576083]. |
Table des matières
Preliminaries | 1 |
Linear Algebraic Equations | 9 |
Interpolation and Extrapolation | 39 |
Integration of Functions | 60 |
Evaluation of Functions | 78 |
Special Functions | 92 |
Random Numbers | 137 |
Sorting | 169 |
Eigensystems | 250 |
Fourier Methods | 271 |
Statistical Description of Data | 297 |
Modeling of Data | 333 |
Ordinary Differential Equations | 360 |
TwoPoint Boundary Value Problems | 376 |
Partial Differential Equations | 390 |
Expressions et termes fréquents
ALPHA ANORM array Bessel function BESSJO BETA CALL CHISQ CLOSE 1 END CLS NPTS coefficients Compute COVAR DATA DATA1 DATA2 DATQ DECLARE FUNCTION BESSJO DECLARE FUNCTION FUNC DECLARE SUB derivative deviate double precision Driver for routine DYDX eigenvalues eigenvectors elements ELSEIF END IF END END SUB equations ERASE evaluated EXIT FUNCTION FORTRAN FUNCTION A sample function value GAMMLN IDUM& Incomplete Gamma Function INDEXV INDX initial integral interpolation IORDER IRBIT1 ISEED ISIGN ITER ITMAX JMAX LINE INPUT DUM LISTA LOOP WHILE TEXT LUDCMP matrix MFIT MVAL NBINS NBMAX NCITY NDAT NDATA NDIM NPOLES NPTS NTERM Numerical Recipes NVAR output polynomial PRINT PRINT PROB RAN1 IDUM& RAN3 root sample program SPLINE STEP SUB A sample subroutine transform VAL MID VAL NVAL variable WKSP XACC XMIN zero