* Copyright (c) 1985 Regents of the University of California.
* Redistribution and use in source and binary forms are permitted
* provided that this notice is preserved and that due credit is given
* to the University of California at Berkeley. The name of the University
* may not be used to endorse or promote products derived from this
* software without specific prior written permission. This software
* is provided ``as is'' without express or implied warranty.
* All recipients should regard themselves as participants in an ongoing
* research project and hence should feel obligated to report their
* experiences (good or bad) with these elementary function codes, using
* the sendbug(8) program, to the authors.
static char sccsid
[] = "@(#)exp__E.c 5.2 (Berkeley) %G%";
* ASSUMPTION: c << x SO THAT fl(x+c)=x.
* (c is the correction term for x)
* / exp(x+c) - 1 - x , 1E-19 < |x| < .3465736
* DOUBLE PRECISION (IEEE 53 bits, VAX D FORMAT 56 BITS)
* KERNEL FUNCTION OF EXP, EXPM1, POW FUNCTIONS
* CODED IN C BY K.C. NG, 1/31/85;
* REVISED BY K.C. NG on 3/16/85, 4/16/85.
* Required system supported function:
* 1. Rational approximation. Let r=x+c.
* exp(r) - 1 = ---------------------- ,
* exp__E(r) is computed using
* x*x (x/2)*W - ( Q - ( 2*P + x*P ) )
* --- + (c + x*[---------------------------------- + c ])
* where P := p1*x^2 + p2*x^4,
* Q := q1*x^2 + q2*x^4 (for 56 bits precision, add q3*x^6)
* (See the listing below for the values of p1,p2,q1,q2,q3. The poly-
* nomials P and Q may be regarded as the approximations to sinh
* sinh(r/2) = r/2 + r * P , cosh(r/2) = 1 + Q . )
* The coefficients were obtained by a special Remez algorithm.
* | exp(x) - 1 | 2**(-57), (IEEE double)
* | ------------ - (exp__E(x,0)+x)/x | <=
* | x | 2**(-69). (VAX D)
* The hexadecimal values are the intended ones for the following constants.
* The decimal values may be used, provided that the compiler will convert
* from decimal to binary accurately enough to produce the hexadecimal values
#if defined(vax)||defined(tahoe) /* VAX D format */
#define _0x(A,B) 0x/**/A/**/B
#define _0x(A,B) 0x/**/B/**/A
/* p1 = 1.5150724356786683059E-2 , Hex 2^ -6 * .F83ABE67E1066A */
/* p2 = 6.3112487873718332688E-5 , Hex 2^-13 * .845B4248CD0173 */
/* q1 = 1.1363478204690669916E-1 , Hex 2^ -3 * .E8B95A44A2EC45 */
/* q2 = 1.2624568129896839182E-3 , Hex 2^ -9 * .A5790572E4F5E7 */
/* q3 = 1.5021856115869022674E-6 ; Hex 2^-19 * .C99EB4604AC395 */
static long p1x
[] = { _0x(3abe
,3d78
), _0x(066a
,67e1
)};
static long p2x
[] = { _0x(5b42
,3984), _0x(0173,48cd
)};
static long q1x
[] = { _0x(b95a
,3ee8
), _0x(ec45
,44a2
)};
static long q2x
[] = { _0x(7905,3ba5
), _0x(f5e7
,72e4
)};
static long q3x
[] = { _0x(9eb4
,36c9
), _0x(c395
,604a
)};
#define p1 (*(double*)p1x)
#define p2 (*(double*)p2x)
#define q1 (*(double*)q1x)
#define q2 (*(double*)q2x)
#define q3 (*(double*)q3x)
#else /* defined(vax)||defined(tahoe) */
p1
= 1.3887401997267371720E-2 , /*Hex 2^ -7 * 1.C70FF8B3CC2CF */p2
= 3.3044019718331897649E-5 , /*Hex 2^-15 * 1.15317DF4526C4 */q1
= 1.1110813732786649355E-1 , /*Hex 2^ -4 * 1.C719538248597 */q2
= 9.9176615021572857300E-4 ; /*Hex 2^-10 * 1.03FC4CB8C98E8 */#endif /* defined(vax)||defined(tahoe) */
static double zero
=0.0, one
=1.0, half
=1.0/2.0, small
=1.0E-19;
double copysign(),z
,p
,q
,xp
,xh
,w
;
if(copysign(x
,one
)>small
) {
#if defined(vax)||defined(tahoe)
q
= z
*( q1
+z
*( q2
+z
* q3
));#else /* defined(vax)||defined(tahoe) */
#endif /* defined(vax)||defined(tahoe) */
c
+= x
*((xh
*w
-(q
-(p
+xp
)))/(one
-w
)+c
); if(x
!=zero
) one
+small
; /* raise the inexact flag */
return(copysign(zero
,x
));
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