diff options
author | Eric Andersen <andersen@codepoet.org> | 2001-05-10 00:40:28 +0000 |
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committer | Eric Andersen <andersen@codepoet.org> | 2001-05-10 00:40:28 +0000 |
commit | 1077fa4d772832f77a677ce7fb7c2d513b959e3f (patch) | |
tree | 579bee13fb0b58d2800206366ec2caecbb15f3fc /libm/float/ellpkf.c | |
parent | 22358dd7ce7bb49792204b698f01a6f69b9c8e08 (diff) |
uClibc now has a math library. muahahahaha!
-Erik
Diffstat (limited to 'libm/float/ellpkf.c')
-rw-r--r-- | libm/float/ellpkf.c | 128 |
1 files changed, 128 insertions, 0 deletions
diff --git a/libm/float/ellpkf.c b/libm/float/ellpkf.c new file mode 100644 index 000000000..2cc13d90a --- /dev/null +++ b/libm/float/ellpkf.c @@ -0,0 +1,128 @@ +/* ellpkf.c + * + * Complete elliptic integral of the first kind + * + * + * + * SYNOPSIS: + * + * float m1, y, ellpkf(); + * + * y = ellpkf( m1 ); + * + * + * + * DESCRIPTION: + * + * Approximates the integral + * + * + * + * pi/2 + * - + * | | + * | dt + * K(m) = | ------------------ + * | 2 + * | | sqrt( 1 - m sin t ) + * - + * 0 + * + * where m = 1 - m1, using the approximation + * + * P(x) - log x Q(x). + * + * The argument m1 is used rather than m so that the logarithmic + * singularity at m = 1 will be shifted to the origin; this + * preserves maximum accuracy. + * + * K(0) = pi/2. + * + * ACCURACY: + * + * Relative error: + * arithmetic domain # trials peak rms + * IEEE 0,1 30000 1.3e-7 3.4e-8 + * + * ERROR MESSAGES: + * + * message condition value returned + * ellpkf domain x<0, x>1 0.0 + * + */ + +/* ellpk.c */ + + +/* +Cephes Math Library, Release 2.0: April, 1987 +Copyright 1984, 1987 by Stephen L. Moshier +Direct inquiries to 30 Frost Street, Cambridge, MA 02140 +*/ + +#include <math.h> + +static float P[] = +{ + 1.37982864606273237150E-4, + 2.28025724005875567385E-3, + 7.97404013220415179367E-3, + 9.85821379021226008714E-3, + 6.87489687449949877925E-3, + 6.18901033637687613229E-3, + 8.79078273952743772254E-3, + 1.49380448916805252718E-2, + 3.08851465246711995998E-2, + 9.65735902811690126535E-2, + 1.38629436111989062502E0 +}; + +static float Q[] = +{ + 2.94078955048598507511E-5, + 9.14184723865917226571E-4, + 5.94058303753167793257E-3, + 1.54850516649762399335E-2, + 2.39089602715924892727E-2, + 3.01204715227604046988E-2, + 3.73774314173823228969E-2, + 4.88280347570998239232E-2, + 7.03124996963957469739E-2, + 1.24999999999870820058E-1, + 4.99999999999999999821E-1 +}; +static float C1 = 1.3862943611198906188E0; /* log(4) */ + +extern float MACHEPF, MAXNUMF; + +float polevlf(float, float *, int); +float p1evlf(float, float *, int); +float logf(float); +float ellpkf(float xx) +{ +float x; + +x = xx; +if( (x < 0.0) || (x > 1.0) ) + { + mtherr( "ellpkf", DOMAIN ); + return( 0.0 ); + } + +if( x > MACHEPF ) + { + return( polevlf(x,P,10) - logf(x) * polevlf(x,Q,10) ); + } +else + { + if( x == 0.0 ) + { + mtherr( "ellpkf", SING ); + return( MAXNUMF ); + } + else + { + return( C1 - 0.5 * logf(x) ); + } + } +} |