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/* mpfr_csch - Hyperbolic cosecant function.
Copyright 2005-2017 Free Software Foundation, Inc.
Contributed by the AriC and Caramba projects, INRIA.
This file is part of the GNU MPFR Library.
The GNU MPFR Library 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 3 of the License, or (at your
option) any later version.
The GNU MPFR Library 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 the GNU MPFR Library; see the file COPYING.LESSER. If not, see
http://www.gnu.org/licenses/ or write to the Free Software Foundation, Inc.,
51 Franklin St, Fifth Floor, Boston, MA 02110-1301, USA. */
/* the hyperbolic cosecant is defined by csch(x) = 1/sinh(x).
csch (NaN) = NaN.
csch (+Inf) = +0.
csch (-Inf) = -0.
csch (+0) = +Inf.
csch (-0) = -Inf.
*/
#define FUNCTION mpfr_csch
#define INVERSE mpfr_sinh
#define ACTION_NAN(y) do { MPFR_SET_NAN(y); MPFR_RET_NAN; } while (1)
#define ACTION_INF(y) do { MPFR_SET_SAME_SIGN(y,x); MPFR_SET_ZERO (y); \
MPFR_RET(0); } while (1)
#define ACTION_ZERO(y,x) do { MPFR_SET_SAME_SIGN(y,x); MPFR_SET_INF(y); \
mpfr_set_divby0 (); MPFR_RET(0); } while (1)
/* (This analysis is adapted from that for mpfr_csc.)
Near x=0, we have csch(x) = 1/x - x/6 + ..., more precisely we have
|csch(x) - 1/x| <= 0.2 for |x| <= 1. The error term has the opposite
sign as 1/x, thus |csch(x)| <= |1/x|. Then:
(i) either x is a power of two, then 1/x is exactly representable, and
as long as 1/2*ulp(1/x) > 0.2, we can conclude;
(ii) otherwise assume x has <= n bits, and y has <= n+1 bits, then
|y - 1/x| >= 2^(-2n) ufp(y), where ufp means unit in first place.
Since |csch(x) - 1/x| <= 0.2, if 2^(-2n) ufp(y) >= 0.4, then
|y - csch(x)| >= 2^(-2n-1) ufp(y), and rounding 1/x gives the correct
result. If x < 2^E, then y > 2^(-E), thus ufp(y) > 2^(-E-1).
A sufficient condition is thus EXP(x) <= -2 MAX(PREC(x),PREC(Y)). */
#define ACTION_TINY(y,x,r) \
if (MPFR_EXP(x) <= -2 * (mpfr_exp_t) MAX(MPFR_PREC(x), MPFR_PREC(y))) \
{ \
int signx = MPFR_SIGN(x); \
inexact = mpfr_ui_div (y, 1, x, r); \
if (inexact == 0) /* x is a power of two */ \
{ /* result always 1/x, except when rounding to zero */ \
if (rnd_mode == MPFR_RNDA) \
rnd_mode = (signx > 0) ? MPFR_RNDU : MPFR_RNDD; \
if (rnd_mode == MPFR_RNDU || (rnd_mode == MPFR_RNDZ && signx < 0)) \
{ \
if (signx < 0) \
mpfr_nextabove (y); /* -2^k + epsilon */ \
inexact = 1; \
} \
else if (rnd_mode == MPFR_RNDD || rnd_mode == MPFR_RNDZ) \
{ \
if (signx > 0) \
mpfr_nextbelow (y); /* 2^k - epsilon */ \
inexact = -1; \
} \
else /* round to nearest */ \
inexact = signx; \
} \
MPFR_SAVE_EXPO_UPDATE_FLAGS (expo, __gmpfr_flags); \
goto end; \
}
#include "gen_inverse.h"
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