1998-03-09 06:34:43 +00:00
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/* $NetBSD: ldexp.c,v 1.1 1995/02/10 17:50:24 cgd Exp $ */
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2000-05-10 19:04:57 +00:00
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/* $FreeBSD$ */
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1998-03-09 06:34:43 +00:00
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/*
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* Copyright (c) 1994, 1995 Carnegie-Mellon University.
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* All rights reserved.
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*
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* Author: Chris G. Demetriou
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*
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* Permission to use, copy, modify and distribute this software and
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* its documentation is hereby granted, provided that both the copyright
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* notice and this permission notice appear in all copies of the
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* software, derivative works or modified versions, and any portions
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* thereof, and that both notices appear in supporting documentation.
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*
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* CARNEGIE MELLON ALLOWS FREE USE OF THIS SOFTWARE IN ITS "AS IS"
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* CONDITION. CARNEGIE MELLON DISCLAIMS ANY LIABILITY OF ANY KIND
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* FOR ANY DAMAGES WHATSOEVER RESULTING FROM THE USE OF THIS SOFTWARE.
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*
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* Carnegie Mellon requests users of this software to return to
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*
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* Software Distribution Coordinator or Software.Distribution@CS.CMU.EDU
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* School of Computer Science
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* Carnegie Mellon University
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* Pittsburgh PA 15213-3890
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*
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* any improvements or extensions that they make and grant Carnegie the
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* rights to redistribute these changes.
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*/
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#include <sys/types.h>
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#include <machine/ieee.h>
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#include <errno.h>
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#include <math.h>
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/*
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* double ldexp(double val, int exp)
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* returns: val * (2**exp)
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*/
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double
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ldexp(val, exp)
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double val;
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int exp;
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{
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register int oldexp, newexp, mulexp;
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union doub {
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double v;
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struct ieee_double s;
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} u, mul;
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/*
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* If input is zero, or no change, just return input.
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* Likewise, if input is Inf or NaN, just return it.
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*/
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u.v = val;
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oldexp = u.s.dbl_exp;
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if (val == 0 || exp == 0 || oldexp == DBL_EXP_INFNAN)
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return (val);
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/*
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* Compute new exponent and check for over/under flow.
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* Underflow, unfortunately, could mean switching to denormal.
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* If result out of range, set ERANGE and return 0 if too small
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* or Inf if too big, with the same sign as the input value.
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*/
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newexp = oldexp + exp;
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if (newexp >= DBL_EXP_INFNAN) {
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/* u.s.dbl_sign = val < 0; -- already set */
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u.s.dbl_exp = DBL_EXP_INFNAN;
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u.s.dbl_frach = u.s.dbl_fracl = 0;
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errno = ERANGE;
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return (u.v); /* Inf */
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}
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if (newexp <= 0) {
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/*
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* The output number is either a denormal or underflows
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* (see comments in machine/ieee.h).
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*/
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if (newexp <= -DBL_FRACBITS) {
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/* u.s.dbl_sign = val < 0; -- already set */
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u.s.dbl_exp = 0;
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u.s.dbl_frach = u.s.dbl_fracl = 0;
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errno = ERANGE;
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return (u.v); /* zero */
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}
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/*
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* We are going to produce a denorm. Our `exp' argument
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* might be as small as -2097, and we cannot compute
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* 2^-2097, so we may have to do this as many as three
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* steps (not just two, as for positive `exp's below).
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*/
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mul.v = 0;
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while (exp <= -DBL_EXP_BIAS) {
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mul.s.dbl_exp = 1;
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val *= mul.v;
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exp += DBL_EXP_BIAS - 1;
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}
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mul.s.dbl_exp = exp + DBL_EXP_BIAS;
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val *= mul.v;
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return (val);
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}
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/*
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* Newexp is positive.
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*
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* If oldexp is zero, we are starting with a denorm, and simply
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* adjusting the exponent will produce bogus answers. We need
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* to fix that first.
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*/
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if (oldexp == 0) {
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/*
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* Multiply by 2^mulexp to make the number normalizable.
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* We cannot multiply by more than 2^1023, but `exp'
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* argument might be as large as 2046. A single
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* adjustment, however, will normalize the number even
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* for huge `exp's, and then we can use exponent
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* arithmetic just as for normal `double's.
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*/
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mulexp = exp <= DBL_EXP_BIAS ? exp : DBL_EXP_BIAS;
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mul.v = 0;
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mul.s.dbl_exp = mulexp + DBL_EXP_BIAS;
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val *= mul.v;
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if (mulexp == exp)
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return (val);
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u.v = val;
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newexp -= mulexp;
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}
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/*
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* Both oldexp and newexp are positive; just replace the
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* old exponent with the new one.
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*/
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u.s.dbl_exp = newexp;
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return (u.v);
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}
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