1eba086706
PR libquadmath/65757 * quadmath-imp.h (math_opt_barrier, math_force_eval, math_narrow_eval, math_check_force_underflow, math_check_force_underflow_nonneg): Define. * math/ceilq.c: Backport changes from upstream glibc between 2012-11-01 and 2017-07-13. * math/remquoq.c: Likewise. * math/expq.c: Likewise. * math/llroundq.c: Likewise. * math/logq.c: Likewise. * math/atanq.c: Likewise. * math/nearbyintq.c: Likewise. * math/scalblnq.c: Likewise. * math/finiteq.c: Likewise. * math/atanhq.c: Likewise. * math/expm1q.c: Likewise. * math/sinhq.c: Likewise. * math/log10q.c: Likewise. * math/rintq.c: Likewise. * math/roundq.c: Likewise. * math/fmaq.c: Likewise. * math/erfq.c: Likewise. * math/log2q.c: Likewise. * math/lroundq.c: Likewise. * math/j1q.c: Likewise. * math/scalbnq.c: Likewise. * math/truncq.c: Likewise. * math/frexpq.c: Likewise. * math/sincosq.c: Likewise. * math/tanhq.c: Likewise. * math/asinq.c: Likewise. * math/coshq.c: Likewise. * math/j0q.c: Likewise. * math/asinhq.c: Likewise. * math/floorq.c: Likewise. * math/sinq_kernel.c: Likewise. * math/powq.c: Likewise. * math/hypotq.c: Likewise. * math/sincos_table.c: Likewise. * math/rem_pio2q.c: Likewise. * math/nextafterq.c: Likewise. * math/log1pq.c: Likewise. * math/sincosq_kernel.c: Likewise. * math/tanq.c: Likewise. * math/acosq.c: Likewise. * math/lrintq.c: Likewise. * math/llrintq.c: Likewise. From-SVN: r250343
231 lines
6.5 KiB
C
231 lines
6.5 KiB
C
/* GCC Quad-Precision Math Library
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Copyright (C) 2010, 2011 Free Software Foundation, Inc.
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Written by Francois-Xavier Coudert <fxcoudert@gcc.gnu.org>
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This file is part of the libquadmath library.
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Libquadmath is free software; you can redistribute it and/or
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modify it under the terms of the GNU Library General Public
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License as published by the Free Software Foundation; either
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version 2 of the License, or (at your option) any later version.
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Libquadmath is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
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Library General Public License for more details.
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You should have received a copy of the GNU Library General Public
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License along with libquadmath; see the file COPYING.LIB. If
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not, write to the Free Software Foundation, Inc., 51 Franklin Street - Fifth Floor,
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Boston, MA 02110-1301, USA. */
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#ifndef QUADMATH_IMP_H
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#define QUADMATH_IMP_H
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#include <stdint.h>
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#include <stdlib.h>
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#include "quadmath.h"
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#include "config.h"
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/* Under IEEE 754, an architecture may determine tininess of
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floating-point results either "before rounding" or "after
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rounding", but must do so in the same way for all operations
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returning binary results. Define TININESS_AFTER_ROUNDING to 1 for
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"after rounding" architectures, 0 for "before rounding"
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architectures. */
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#define TININESS_AFTER_ROUNDING 1
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/* Prototypes for internal functions. */
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extern int32_t __quadmath_rem_pio2q (__float128, __float128 *);
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extern void __quadmath_kernel_sincosq (__float128, __float128, __float128 *,
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__float128 *, int);
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extern __float128 __quadmath_kernel_sinq (__float128, __float128, int);
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extern __float128 __quadmath_kernel_cosq (__float128, __float128);
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extern __float128 __quadmath_x2y2m1q (__float128 x, __float128 y);
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extern int __quadmath_isinf_nsq (__float128 x);
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/* Frankly, if you have __float128, you have 64-bit integers, right? */
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#ifndef UINT64_C
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# error "No way!"
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#endif
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/* Main union type we use to manipulate the floating-point type. */
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typedef union
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{
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__float128 value;
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struct
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#ifdef __MINGW32__
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/* On mingw targets the ms-bitfields option is active by default.
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Therefore enforce gnu-bitfield style. */
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__attribute__ ((gcc_struct))
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#endif
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{
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#if __BYTE_ORDER__ == __ORDER_BIG_ENDIAN__
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unsigned negative:1;
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unsigned exponent:15;
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uint64_t mant_high:48;
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uint64_t mant_low:64;
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#else
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uint64_t mant_low:64;
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uint64_t mant_high:48;
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unsigned exponent:15;
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unsigned negative:1;
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#endif
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} ieee;
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struct
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{
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#if __BYTE_ORDER__ == __ORDER_BIG_ENDIAN__
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uint64_t high;
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uint64_t low;
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#else
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uint64_t low;
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uint64_t high;
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#endif
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} words64;
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struct
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{
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#if __BYTE_ORDER__ == __ORDER_BIG_ENDIAN__
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uint32_t w0;
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uint32_t w1;
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uint32_t w2;
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uint32_t w3;
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#else
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uint32_t w3;
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uint32_t w2;
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uint32_t w1;
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uint32_t w0;
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#endif
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} words32;
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struct
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#ifdef __MINGW32__
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/* Make sure we are using gnu-style bitfield handling. */
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__attribute__ ((gcc_struct))
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#endif
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{
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#if __BYTE_ORDER__ == __ORDER_BIG_ENDIAN__
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unsigned negative:1;
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unsigned exponent:15;
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unsigned quiet_nan:1;
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uint64_t mant_high:47;
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uint64_t mant_low:64;
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#else
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uint64_t mant_low:64;
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uint64_t mant_high:47;
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unsigned quiet_nan:1;
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unsigned exponent:15;
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unsigned negative:1;
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#endif
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} nan;
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} ieee854_float128;
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/* Get two 64 bit ints from a long double. */
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#define GET_FLT128_WORDS64(ix0,ix1,d) \
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do { \
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ieee854_float128 u; \
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u.value = (d); \
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(ix0) = u.words64.high; \
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(ix1) = u.words64.low; \
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} while (0)
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/* Set a long double from two 64 bit ints. */
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#define SET_FLT128_WORDS64(d,ix0,ix1) \
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do { \
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ieee854_float128 u; \
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u.words64.high = (ix0); \
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u.words64.low = (ix1); \
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(d) = u.value; \
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} while (0)
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/* Get the more significant 64 bits of a long double mantissa. */
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#define GET_FLT128_MSW64(v,d) \
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do { \
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ieee854_float128 u; \
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u.value = (d); \
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(v) = u.words64.high; \
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} while (0)
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/* Set the more significant 64 bits of a long double mantissa from an int. */
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#define SET_FLT128_MSW64(d,v) \
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do { \
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ieee854_float128 u; \
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u.value = (d); \
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u.words64.high = (v); \
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(d) = u.value; \
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} while (0)
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/* Get the least significant 64 bits of a long double mantissa. */
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#define GET_FLT128_LSW64(v,d) \
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do { \
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ieee854_float128 u; \
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u.value = (d); \
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(v) = u.words64.low; \
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} while (0)
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#define IEEE854_FLOAT128_BIAS 0x3fff
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#define QUADFP_NAN 0
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#define QUADFP_INFINITE 1
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#define QUADFP_ZERO 2
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#define QUADFP_SUBNORMAL 3
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#define QUADFP_NORMAL 4
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#define fpclassifyq(x) \
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__builtin_fpclassify (QUADFP_NAN, QUADFP_INFINITE, QUADFP_NORMAL, \
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QUADFP_SUBNORMAL, QUADFP_ZERO, x)
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#ifndef math_opt_barrier
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# define math_opt_barrier(x) \
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({ __typeof (x) __x = (x); __asm ("" : "+m" (__x)); __x; })
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# define math_force_eval(x) \
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({ __typeof (x) __x = (x); __asm __volatile__ ("" : : "m" (__x)); })
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#endif
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/* math_narrow_eval reduces its floating-point argument to the range
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and precision of its semantic type. (The original evaluation may
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still occur with excess range and precision, so the result may be
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affected by double rounding.) */
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#define math_narrow_eval(x) (x)
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/* If X (which is not a NaN) is subnormal, force an underflow
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exception. */
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#define math_check_force_underflow(x) \
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do \
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{ \
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__float128 force_underflow_tmp = (x); \
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if (fabsq (force_underflow_tmp) < FLT128_MIN) \
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{ \
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__float128 force_underflow_tmp2 \
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= force_underflow_tmp * force_underflow_tmp; \
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math_force_eval (force_underflow_tmp2); \
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} \
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} \
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while (0)
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/* Likewise, but X is also known to be nonnegative. */
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#define math_check_force_underflow_nonneg(x) \
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do \
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{ \
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__float128 force_underflow_tmp = (x); \
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if (force_underflow_tmp < FLT128_MIN) \
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{ \
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__float128 force_underflow_tmp2 \
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= force_underflow_tmp * force_underflow_tmp; \
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math_force_eval (force_underflow_tmp2); \
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} \
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} \
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while (0)
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#endif
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