267 lines
6.1 KiB
C
267 lines
6.1 KiB
C
/*
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(c) copyright 1988 by the Vrije Universiteit, Amsterdam, The Netherlands.
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See the copyright notice in the ACK home directory, in the file "Copyright".
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*/
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/* $Id$ */
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/*
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DIVIDE EXTENDED FORMAT
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*/
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#include "FP_bias.h"
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#include "FP_trap.h"
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#include "FP_types.h"
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/*
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November 15, 1984
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This is a routine to do the work.
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There are two versions:
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One is based on the partial products method
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and makes no use possible machine instructions
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to divide (hardware dividers).
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The other is used when USE_DIVIDE is defined. It is much faster on
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machines with fast 4 byte operations.
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*/
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/********************************************************/
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void
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div_ext(e1,e2)
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EXTEND *e1,*e2;
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{
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short error = 0;
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B64 result;
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register unsigned long *lp;
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#ifndef USE_DIVIDE
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short count;
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#else
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unsigned short u[9], v[5];
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register int j;
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register unsigned short *u_p = u;
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int maxv = 4;
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#endif
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if ((e2->m1 | e2->m2) == 0) {
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/*
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* Exception 8.2 - Divide by zero
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*/
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trap(EFDIVZ);
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e1->m1 = e1->m2 = 0L;
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e1->exp = EXT_MAX;
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return;
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}
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if ((e1->m1 | e1->m2) == 0) { /* 0 / anything == 0 */
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e1->exp = 0; /* make sure */
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return;
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}
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#ifndef USE_DIVIDE
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/*
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* numbers are right shifted one bit to make sure
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* that m1 is quaranteed to be larger if its
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* maximum bit is set
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*/
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b64_rsft(&e1->mantissa); /* 64 bit shift right */
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b64_rsft(&e2->mantissa); /* 64 bit shift right */
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e1->exp++;
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e2->exp++;
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#endif
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/* check for underflow, divide by zero, etc */
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e1->sign ^= e2->sign;
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e1->exp -= e2->exp;
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#ifndef USE_DIVIDE
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/* do division of mantissas */
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/* uses partial product method */
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/* init control variables */
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count = 64;
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result.h_32 = 0L;
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result.l_32 = 0L;
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/* partial product division loop */
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while (count--) {
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/* first left shift result 1 bit */
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/* this is ALWAYS done */
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b64_lsft(&result);
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/* compare dividend and divisor */
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/* if dividend >= divisor add a bit */
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/* and subtract divisior from dividend */
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if ( (e1->m1 < e2->m1) ||
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((e1->m1 == e2->m1) && (e1->m2 < e2->m2) ))
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; /* null statement */
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/* i.e., don't add or subtract */
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else {
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result.l_32++; /* ADD */
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if (e2->m2 > e1->m2)
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e1->m1 -= 1; /* carry in */
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e1->m1 -= e2->m1; /* do SUBTRACTION */
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e1->m2 -= e2->m2; /* SUBTRACTION */
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}
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/* shift dividend left one bit OR */
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/* IF it equals ZERO we can break out */
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/* of the loop, but still must shift */
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/* the quotient the remaining count bits */
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/* NB save the results of this test in error */
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/* if not zero, then the result is inexact. */
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/* this would be reported in IEEE standard */
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/* lp points to dividend */
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lp = &e1->m1;
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error = ((*lp | *(lp+1)) != 0L) ? 1 : 0;
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if (error) { /* more work */
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/* assume max bit == 0 (see above) */
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b64_lsft(&e1->mantissa);
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continue;
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}
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else
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break; /* leave loop */
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} /* end of divide by subtraction loop */
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if (count > 0) {
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lp = &result.h_32;
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if (count > 31) { /* move to higher word */
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*lp = *(lp+1);
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count -= 32;
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*(lp+1) = 0L; /* clear low word */
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}
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if (*lp)
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*lp <<= count; /* shift rest of way */
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lp++; /* == &result.l_32 */
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if (*lp) {
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result.h_32 |= (*lp >> 32-count);
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*lp <<= count;
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}
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}
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#else /* USE_DIVIDE */
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u[4] = (e1->m2 & 1) << 15;
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b64_rsft(&(e1->mantissa));
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u[0] = e1->m1 >> 16;
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u[1] = e1->m1;
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u[2] = e1->m2 >> 16;
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u[3] = e1->m2;
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u[5] = 0; u[6] = 0; u[7] = 0;
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v[1] = e2->m1 >> 16;
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v[2] = e2->m1;
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v[3] = e2->m2 >> 16;
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v[4] = e2->m2;
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while (! v[maxv]) maxv--;
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result.h_32 = 0;
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result.l_32 = 0;
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lp = &result.h_32;
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/*
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* Use an algorithm of Knuth (The art of programming, Seminumerical
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* algorithms), to divide u by v. u and v are both seen as numbers
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* with base 65536.
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*/
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for (j = 0; j <= 3; j++, u_p++) {
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unsigned long q_est, temp;
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if (j == 2) lp++;
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if (u_p[0] == 0 && u_p[1] < v[1]) continue;
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temp = ((unsigned long)u_p[0] << 16) + u_p[1];
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if (u_p[0] >= v[1]) {
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q_est = 0x0000FFFFL;
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}
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else {
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q_est = temp / v[1];
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}
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temp -= q_est * v[1];
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while (temp < 0x10000 && v[2]*q_est > ((temp<<16)+u_p[2])) {
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q_est--;
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temp += v[1];
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}
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/* Now, according to Knuth, we have an estimate of the
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quotient, that is either correct or one too big, but
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almost always correct.
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*/
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if (q_est != 0) {
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int i;
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unsigned long k = 0;
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int borrow = 0;
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for (i = maxv; i > 0; i--) {
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unsigned long tmp = q_est * v[i] + k + borrow;
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unsigned short md = tmp;
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borrow = (md > u_p[i]);
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u_p[i] -= md;
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k = tmp >> 16;
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}
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k += borrow;
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borrow = u_p[0] < k;
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u_p[0] -= k;
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if (borrow) {
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/* So, this does not happen often; the estimate
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was one too big; correct this
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*/
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*lp |= (j & 1) ? (q_est - 1) : ((q_est-1)<<16);
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borrow = 0;
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for (i = maxv; i > 0; i--) {
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unsigned long tmp
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= v[i]+(unsigned long)u_p[i]+borrow;
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u_p[i] = tmp;
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borrow = tmp >> 16;
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}
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u_p[0] += borrow;
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}
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else *lp |= (j & 1) ? q_est : (q_est<<16);
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}
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}
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#ifdef EXCEPTION_INEXACT
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u_p = &u[0];
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for (j = 7; j >= 0; j--) {
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if (*u_p++) {
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error = 1;
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break;
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}
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}
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#endif
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#endif
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#ifdef EXCEPTION_INEXACT
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if (error) {
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/*
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* report here exception 8.5 - Inexact
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* from Draft 8.0 of IEEE P754:
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* In the absence of an invalid operation exception,
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* if the rounded result of an operation is not exact or if
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* it overflows without a trap, then the inexact exception
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* shall be assigned. The rounded or overflowed result
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* shall be delivered to the destination.
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*/
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INEXACT();
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#endif
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e1->mantissa = result;
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nrm_ext(e1);
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if (e1->exp < EXT_MIN) {
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/*
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* Exception 8.4 - Underflow
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*/
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trap(EFUNFL); /* underflow */
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e1->exp = EXT_MIN;
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e1->m1 = e1->m2 = 0L;
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return;
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}
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if (e1->exp >= EXT_MAX) {
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/*
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* Exception 8.3 - Overflow
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*/
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trap(EFOVFL); /* overflow */
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e1->exp = EXT_MAX;
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e1->m1 = e1->m2 = 0L;
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return;
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}
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}
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