k_tanf.c revision 176451
1239281Sgonzo/* k_tanf.c -- float version of k_tan.c 2239281Sgonzo * Conversion to float by Ian Lance Taylor, Cygnus Support, ian@cygnus.com. 3239281Sgonzo * Optimized by Bruce D. Evans. 4239281Sgonzo */ 5239281Sgonzo 6239281Sgonzo/* 7239281Sgonzo * ==================================================== 8239281Sgonzo * Copyright 2004 Sun Microsystems, Inc. All Rights Reserved. 9266751Sian * 10266751Sian * Permission to use, copy, modify, and distribute this 11239281Sgonzo * software is freely granted, provided that this notice 12239281Sgonzo * is preserved. 13239281Sgonzo * ==================================================== 14239281Sgonzo */ 15239281Sgonzo 16239281Sgonzo#ifndef INLINE_KERNEL_TANDF 17239281Sgonzo#include <sys/cdefs.h> 18239281Sgonzo__FBSDID("$FreeBSD: head/lib/msun/src/k_tanf.c 176451 2008-02-22 02:30:36Z das $"); 19239281Sgonzo#endif 20239281Sgonzo 21#include "math.h" 22#include "math_private.h" 23 24/* |tan(x)/x - t(x)| < 2**-25.5 (~[-2e-08, 2e-08]). */ 25static const double 26T[] = { 27 0x15554d3418c99f.0p-54, /* 0.333331395030791399758 */ 28 0x1112fd38999f72.0p-55, /* 0.133392002712976742718 */ 29 0x1b54c91d865afe.0p-57, /* 0.0533812378445670393523 */ 30 0x191df3908c33ce.0p-58, /* 0.0245283181166547278873 */ 31 0x185dadfcecf44e.0p-61, /* 0.00297435743359967304927 */ 32 0x1362b9bf971bcd.0p-59, /* 0.00946564784943673166728 */ 33}; 34 35#ifdef INLINE_KERNEL_TANDF 36extern inline 37#endif 38float 39__kernel_tandf(double x, int iy) 40{ 41 double z,r,w,s,t,u; 42 43 z = x*x; 44 /* 45 * Split up the polynomial into small independent terms to give 46 * opportunities for parallel evaluation. The chosen splitting is 47 * micro-optimized for Athlons (XP, X64). It costs 2 multiplications 48 * relative to Horner's method on sequential machines. 49 * 50 * We add the small terms from lowest degree up for efficiency on 51 * non-sequential machines (the lowest degree terms tend to be ready 52 * earlier). Apart from this, we don't care about order of 53 * operations, and don't need to to care since we have precision to 54 * spare. However, the chosen splitting is good for accuracy too, 55 * and would give results as accurate as Horner's method if the 56 * small terms were added from highest degree down. 57 */ 58 r = T[4]+z*T[5]; 59 t = T[2]+z*T[3]; 60 w = z*z; 61 s = z*x; 62 u = T[0]+z*T[1]; 63 r = (x+s*u)+(s*w)*(t+w*r); 64 if(iy==1) return r; 65 else return -1.0/r; 66} 67