mirror of
https://sourceware.org/git/glibc.git
synced 2024-11-14 17:11:06 +00:00
210 lines
7.7 KiB
C
210 lines
7.7 KiB
C
/*
|
|
* IBM Accurate Mathematical Library
|
|
* written by International Business Machines Corp.
|
|
* Copyright (C) 2001, 2011 Free Software Foundation
|
|
*
|
|
* This program is free software; you can redistribute it and/or modify
|
|
* it under the terms of the GNU Lesser General Public License as published by
|
|
* the Free Software Foundation; either version 2.1 of the License, or
|
|
* (at your option) any later version.
|
|
*
|
|
* This program is distributed in the hope that it will be useful,
|
|
* but WITHOUT ANY WARRANTY; without even the implied warranty of
|
|
* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
|
|
* GNU Lesser General Public License for more details.
|
|
*
|
|
* You should have received a copy of the GNU Lesser General Public License
|
|
* along with this program; if not, see <http://www.gnu.org/licenses/>.
|
|
*/
|
|
/********************************************************************/
|
|
/* */
|
|
/* MODULE_NAME: dosincos.c */
|
|
/* */
|
|
/* */
|
|
/* FUNCTIONS: dubsin */
|
|
/* dubcos */
|
|
/* docos */
|
|
/* FILES NEEDED: endian.h mydefs.h dla.h dosincos.h */
|
|
/* sincos.tbl */
|
|
/* */
|
|
/* Routines compute sin() and cos() as Double-Length numbers */
|
|
/********************************************************************/
|
|
|
|
|
|
|
|
#include "endian.h"
|
|
#include "mydefs.h"
|
|
#include <dla.h>
|
|
#include "dosincos.h"
|
|
#include "math_private.h"
|
|
|
|
#ifndef SECTION
|
|
# define SECTION
|
|
#endif
|
|
|
|
extern const union
|
|
{
|
|
int4 i[880];
|
|
double x[440];
|
|
} __sincostab attribute_hidden;
|
|
|
|
/***********************************************************************/
|
|
/* Routine receive Double-Length number (x+dx) and computing sin(x+dx) */
|
|
/* as Double-Length number and store it at array v .It computes it by */
|
|
/* arithmetic action on Double-Length numbers */
|
|
/*(x+dx) between 0 and PI/4 */
|
|
/***********************************************************************/
|
|
|
|
void
|
|
SECTION
|
|
__dubsin(double x, double dx, double v[]) {
|
|
double r,s,c,cc,d,dd,d2,dd2,e,ee,
|
|
sn,ssn,cs,ccs,ds,dss,dc,dcc;
|
|
#ifndef DLA_FMS
|
|
double p,hx,tx,hy,ty,q;
|
|
#endif
|
|
#if 0
|
|
double xx,y,yy,z,zz;
|
|
#endif
|
|
mynumber u;
|
|
int4 k;
|
|
|
|
u.x=x+big.x;
|
|
k = u.i[LOW_HALF]<<2;
|
|
x=x-(u.x-big.x);
|
|
d=x+dx;
|
|
dd=(x-d)+dx;
|
|
/* sin(x+dx)=sin(Xi+t)=sin(Xi)*cos(t) + cos(Xi)sin(t) where t ->0 */
|
|
MUL2(d,dd,d,dd,d2,dd2,p,hx,tx,hy,ty,q,c,cc);
|
|
sn=__sincostab.x[k]; /* */
|
|
ssn=__sincostab.x[k+1]; /* sin(Xi) and cos(Xi) */
|
|
cs=__sincostab.x[k+2]; /* */
|
|
ccs=__sincostab.x[k+3]; /* */
|
|
MUL2(d2,dd2,s7.x,ss7.x,ds,dss,p,hx,tx,hy,ty,q,c,cc); /* Taylor */
|
|
ADD2(ds,dss,s5.x,ss5.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc); /* series */
|
|
ADD2(ds,dss,s3.x,ss3.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc); /* for sin */
|
|
MUL2(d,dd,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,d,dd,ds,dss,r,s); /* ds=sin(t) */
|
|
|
|
MUL2(d2,dd2,c8.x,cc8.x,dc,dcc,p,hx,tx,hy,ty,q,c,cc); ;/* Taylor */
|
|
ADD2(dc,dcc,c6.x,cc6.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc); /* series */
|
|
ADD2(dc,dcc,c4.x,cc4.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc); /* for cos */
|
|
ADD2(dc,dcc,c2.x,cc2.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc); /* dc=cos(t) */
|
|
|
|
MUL2(cs,ccs,ds,dss,e,ee,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(dc,dcc,sn,ssn,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
SUB2(e,ee,dc,dcc,e,ee,r,s);
|
|
ADD2(e,ee,sn,ssn,e,ee,r,s); /* e+ee=sin(x+dx) */
|
|
|
|
v[0]=e;
|
|
v[1]=ee;
|
|
}
|
|
/**********************************************************************/
|
|
/* Routine receive Double-Length number (x+dx) and computes cos(x+dx) */
|
|
/* as Double-Length number and store it in array v .It computes it by */
|
|
/* arithmetic action on Double-Length numbers */
|
|
/*(x+dx) between 0 and PI/4 */
|
|
/**********************************************************************/
|
|
|
|
void
|
|
SECTION
|
|
__dubcos(double x, double dx, double v[]) {
|
|
double r,s,c,cc,d,dd,d2,dd2,e,ee,
|
|
sn,ssn,cs,ccs,ds,dss,dc,dcc;
|
|
#ifndef DLA_FMS
|
|
double p,hx,tx,hy,ty,q;
|
|
#endif
|
|
#if 0
|
|
double xx,y,yy,z,zz;
|
|
#endif
|
|
mynumber u;
|
|
int4 k;
|
|
u.x=x+big.x;
|
|
k = u.i[LOW_HALF]<<2;
|
|
x=x-(u.x-big.x);
|
|
d=x+dx;
|
|
dd=(x-d)+dx; /* cos(x+dx)=cos(Xi+t)=cos(Xi)cos(t) - sin(Xi)sin(t) */
|
|
MUL2(d,dd,d,dd,d2,dd2,p,hx,tx,hy,ty,q,c,cc);
|
|
sn=__sincostab.x[k]; /* */
|
|
ssn=__sincostab.x[k+1]; /* sin(Xi) and cos(Xi) */
|
|
cs=__sincostab.x[k+2]; /* */
|
|
ccs=__sincostab.x[k+3]; /* */
|
|
MUL2(d2,dd2,s7.x,ss7.x,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,s5.x,ss5.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,s3.x,ss3.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(d,dd,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,d,dd,ds,dss,r,s);
|
|
|
|
MUL2(d2,dd2,c8.x,cc8.x,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c6.x,cc6.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c4.x,cc4.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c2.x,cc2.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
|
|
MUL2(cs,ccs,ds,dss,e,ee,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(dc,dcc,sn,ssn,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
|
|
MUL2(d2,dd2,s7.x,ss7.x,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,s5.x,ss5.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,s3.x,ss3.x,ds,dss,r,s);
|
|
MUL2(d2,dd2,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(d,dd,ds,dss,ds,dss,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(ds,dss,d,dd,ds,dss,r,s);
|
|
MUL2(d2,dd2,c8.x,cc8.x,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c6.x,cc6.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c4.x,cc4.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(dc,dcc,c2.x,cc2.x,dc,dcc,r,s);
|
|
MUL2(d2,dd2,dc,dcc,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(sn,ssn,ds,dss,e,ee,p,hx,tx,hy,ty,q,c,cc);
|
|
MUL2(dc,dcc,cs,ccs,dc,dcc,p,hx,tx,hy,ty,q,c,cc);
|
|
ADD2(e,ee,dc,dcc,e,ee,r,s);
|
|
SUB2(cs,ccs,e,ee,e,ee,r,s);
|
|
|
|
v[0]=e;
|
|
v[1]=ee;
|
|
}
|
|
/**********************************************************************/
|
|
/* Routine receive Double-Length number (x+dx) and computes cos(x+dx) */
|
|
/* as Double-Length number and store it in array v */
|
|
/**********************************************************************/
|
|
void
|
|
SECTION
|
|
__docos(double x, double dx, double v[]) {
|
|
double y,yy,p,w[2];
|
|
if (x>0) {y=x; yy=dx;}
|
|
else {y=-x; yy=-dx;}
|
|
if (y<0.5*hp0.x) /* y< PI/4 */
|
|
{__dubcos(y,yy,w); v[0]=w[0]; v[1]=w[1];}
|
|
else if (y<1.5*hp0.x) { /* y< 3/4 * PI */
|
|
p=hp0.x-y; /* p = PI/2 - y */
|
|
yy=hp1.x-yy;
|
|
y=p+yy;
|
|
yy=(p-y)+yy;
|
|
if (y>0) {__dubsin(y,yy,w); v[0]=w[0]; v[1]=w[1];}
|
|
/* cos(x) = sin ( 90 - x ) */
|
|
else {__dubsin(-y,-yy,w); v[0]=-w[0]; v[1]=-w[1];
|
|
}
|
|
}
|
|
else { /* y>= 3/4 * PI */
|
|
p=2.0*hp0.x-y; /* p = PI- y */
|
|
yy=2.0*hp1.x-yy;
|
|
y=p+yy;
|
|
yy=(p-y)+yy;
|
|
__dubcos(y,yy,w);
|
|
v[0]=-w[0];
|
|
v[1]=-w[1];
|
|
}
|
|
}
|