1 # libm test inputs for gen-auto-libm-tests.c.
2 # Copyright (C) 1997-2014 Free Software Foundation, Inc.
3 # This file is part of the GNU C Library.
5 # The GNU C Library is free software; you can redistribute it and/or
6 # modify it under the terms of the GNU Lesser General Public
7 # License as published by the Free Software Foundation; either
8 # version 2.1 of the License, or (at your option) any later version.
10 # The GNU C Library is distributed in the hope that it will be useful,
11 # but WITHOUT ANY WARRANTY; without even the implied warranty of
12 # MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
13 # Lesser General Public License for more details.
15 # You should have received a copy of the GNU Lesser General Public
16 # License along with the GNU C Library; if not, see
17 # <http://www.gnu.org/licenses/>. */
32 acos 0x0.ffffffffffffp0
33 acos -0x0.ffffffffffffp0
34 acos 0x0.ffffffffffffffffp0
35 acos -0x0.ffffffffffffffffp0
46 acosh max no-test-inline
59 asin 0x0.ffffffffffffp0
60 asin -0x0.ffffffffffffp0
61 asin 0x0.ffffffffffffffffp0
62 asin -0x0.ffffffffffffffffp0
63 # Bug 16351: underflow exception may be missing.
64 asin min missing-underflow
65 asin -min missing-underflow
66 asin min_subnorm missing-underflow
67 asin -min_subnorm missing-underflow
77 # Bug 16350: underflow exception may be missing.
78 asinh min missing-underflow
79 asinh -min missing-underflow
80 asinh min_subnorm missing-underflow
81 asinh -min_subnorm missing-underflow
82 asinh max no-test-inline
83 asinh -max no-test-inline
96 # Bug 15319: underflow exception may be missing.
97 atan 0x1p-100 missing-underflow
98 atan 0x1p-600 missing-underflow
99 atan 0x1p-10000 missing-underflow
100 atan min missing-underflow
101 atan -min missing-underflow
102 atan min_subnorm missing-underflow
103 atan -min_subnorm missing-underflow
105 # atan2 (0,x) == 0 for x > 0.
107 # atan2 (-0,x) == -0 for x > 0.
111 # atan2 (+0,x) == +pi for x < 0.
113 # atan2 (-0,x) == -pi for x < 0.
117 # atan2 (y,+0) == pi/2 for y > 0.
119 # atan2 (y,-0) == pi/2 for y > 0.
121 # atan2 (y,+0) == -pi/2 for y < 0.
123 # atan2 (y,-0) == -pi/2 for y < 0.
133 atan2 max min_subnorm
134 atan2 -max -min_subnorm
135 atan2 -max min_subnorm
136 atan2 max -min_subnorm
141 atan2 0.390625 .00029
142 atan2 1.390625 0.9296875
143 atan2 -0.00756827042671106339 -.001792735857538728036
144 atan2 0x1.00000000000001p0 0x1.00000000000001p0
149 atan2 min_subnorm min_subnorm
150 atan2 min_subnorm -min_subnorm
151 atan2 -min_subnorm min_subnorm
152 atan2 -min_subnorm -min_subnorm
157 atan2 min_subnorm -max
158 atan2 -min_subnorm -max
159 # Bug 15319: underflow exception may be missing.
160 # Bug 16349: errno setting may be missing.
161 atan2 1 max missing-underflow
162 atan2 -1 max missing-underflow
163 atan2 min max missing-underflow missing-errno
164 atan2 -min max missing-underflow missing-errno
165 atan2 min_subnorm max missing-underflow missing-errno
166 atan2 -min_subnorm max missing-underflow missing-errno
176 # Bug 16352: underflow exception may be missing.
177 # Bug 16357: spurious underflow may occur.
178 atanh min missing-underflow spurious-underflow:ldbl-96-intel:x86
179 atanh -min missing-underflow spurious-underflow:ldbl-96-intel:x86
180 atanh min_subnorm missing-underflow
181 atanh -min_subnorm missing-underflow
183 # cabs (x,y) == cabs (y,x).
185 # cabs (x,y) == cabs (-x,y).
187 # cabs (x,y) == cabs (-y,x).
189 # cabs (x,y) == cabs (-x,-y).
190 cabs -12.390625 -0.75
191 # cabs (x,y) == cabs (-y,-x).
192 cabs -0.75 -12.390625
193 # cabs (x,0) == fabs (x).
202 # carg (x + i 0) == 0 for x > 0.
204 # carg (x - i 0) == -0 for x > 0.
208 # carg (x + i 0) == +pi for x < 0.
210 # carg (x - i 0) == -pi for x < 0.
214 # carg (+0 + i y) == pi/2 for y > 0.
216 # carg (-0 + i y) == pi/2 for y > 0.
218 # carg (+0 + i y) == -pi/2 for y < 0.
220 # carg (-0 + i y) == -pi/2 for y < 0.
263 ccos 0x1p-16434 22730
265 ccos min_subnorm_p120 0x1p-120
266 ccos 0x1p-120 min_subnorm_p120
287 ccosh -11357.25 -0.75
291 ccosh 22730 0x1p-16434
293 ccosh min_subnorm_p120 0x1p-120
294 ccosh 0x1p-120 min_subnorm_p120
313 cexp -10000 0x1p16383
324 cexp 22730 0x1p-16434
330 # Bug 16348: spurious underflow may occur.
331 cexp min min_subnorm spurious-underflow:ldbl-96-intel:x86 spurious-underflow:ldbl-96-intel:x86_64
332 cexp min -min_subnorm spurious-underflow:ldbl-96-intel:x86 spurious-underflow:ldbl-96-intel:x86_64
337 clog 0x1.fffffep+127 0x1.fffffep+127
338 clog 0x1.fffffep+127 1.0
339 clog 0x1p-149 0x1p-149
340 clog 0x1p-147 0x1p-147
341 clog 0x1.fffffffffffffp+1023 0x1.fffffffffffffp+1023
342 clog 0x1.fffffffffffffp+1023 0x1p+1023
343 clog 0x1p-1074 0x1p-1074
344 clog 0x1p-1073 0x1p-1073
345 clog 0x1.fp+16383 0x1.fp+16383
346 clog 0x1.fp+16383 0x1p+16383
347 clog 0x1p-16440 0x1p-16441
349 clog 0x1p-149 0x1.fp+127
350 clog -0x1p-149 0x1.fp+127
351 clog 0x1p-149 -0x1.fp+127
352 clog -0x1p-149 -0x1.fp+127
353 clog -0x1.fp+127 0x1p-149
354 clog -0x1.fp+127 -0x1p-149
355 clog 0x1.fp+127 0x1p-149
356 clog 0x1.fp+127 -0x1p-149
357 clog 0x1p-1074 0x1.fp+1023
358 clog -0x1p-1074 0x1.fp+1023
359 clog 0x1p-1074 -0x1.fp+1023
360 clog -0x1p-1074 -0x1.fp+1023
361 clog -0x1.fp+1023 0x1p-1074
362 clog -0x1.fp+1023 -0x1p-1074
363 clog 0x1.fp+1023 0x1p-1074
364 clog 0x1.fp+1023 -0x1p-1074
365 clog 0x1p-16445 0x1.fp+16383
366 clog -0x1p-16445 0x1.fp+16383
367 clog 0x1p-16445 -0x1.fp+16383
368 clog -0x1p-16445 -0x1.fp+16383
369 clog -0x1.fp+16383 0x1p-16445
370 clog -0x1.fp+16383 -0x1p-16445
371 clog 0x1.fp+16383 0x1p-16445
372 clog 0x1.fp+16383 -0x1p-16445
373 clog 0x1p-16494 0x1.fp+16383
374 clog -0x1p-16494 0x1.fp+16383
375 clog 0x1p-16494 -0x1.fp+16383
376 clog -0x1p-16494 -0x1.fp+16383
377 clog -0x1.fp+16383 0x1p-16494
378 clog -0x1.fp+16383 -0x1p-16494
379 clog 0x1.fp+16383 0x1p-16494
380 clog 0x1.fp+16383 -0x1p-16494
382 clog 1.0 0x1.234566p-10
383 clog -1.0 0x1.234566p-20
384 clog 0x1.234566p-30 1.0
385 clog -0x1.234566p-40 -1.0
386 clog 0x1.234566p-50 1.0
387 clog 0x1.234566p-60 1.0
398 clog 0x1.000566p0 0x1.234p-10
399 clog 0x1.000566p0 0x1.234p-100
400 clog -0x1.0000000123456p0 0x1.2345678p-30
401 clog -0x1.0000000123456p0 0x1.2345678p-1000
402 clog 0x1.00000000000000123456789abcp0 0x1.23456789p-60
403 clog 0x1.00000000000000123456789abcp0 0x1.23456789p-1000
405 clog 0x0.ffffffp0 0x0.ffffffp-100
406 clog 0x0.fffffffffffff8p0 0x0.fffffffffffff8p-1000
407 clog 0x0.ffffffffffffffffp0 0x0.ffffffffffffffffp-15000
409 clog 0x1a6p-10 0x3a5p-10
410 clog 0xf2p-10 0x3e3p-10
411 clog 0x4d4ep-15 0x6605p-15
412 clog 0x2818p-15 0x798fp-15
413 clog 0x9b57bp-20 0xcb7b4p-20
414 clog 0x2731p-20 0xfffd0p-20
415 clog 0x2ede88p-23 0x771c3fp-23
416 clog 0x11682p-23 0x7ffed1p-23
417 clog 0xa1f2c1p-24 0xc643aep-24
418 clog 0x659feap-24 0xeaf6f9p-24
419 clog 0x4447d7175p-35 0x6c445e00ap-35
420 clog 0x2dd46725bp-35 0x7783a1284p-35
421 clog 0x164c74eea876p-45 0x16f393482f77p-45
422 clog 0xfe961079616p-45 0x1bc37e09e6d1p-45
423 clog 0xa4722f19346cp-51 0x7f9631c5e7f07p-51
424 clog 0x10673dd0f2481p-51 0x7ef1d17cefbd2p-51
425 clog 0x8ecbf810c4ae6p-52 0xd479468b09a37p-52
426 clog 0x5b06b680ea2ccp-52 0xef452b965da9fp-52
427 clog 0x659b70ab7971bp-53 0x1f5d111e08abecp-53
428 clog 0x15cfbd1990d1ffp-53 0x176a3973e09a9ap-53
429 clog 0x1367a310575591p-54 0x3cfcc0a0541f60p-54
430 clog 0x55cb6d0c83af5p-55 0x7fe33c0c7c4e90p-55
431 clog 0x298c62cb546588a7p-63 0x7911b1dfcc4ecdaep-63
432 clog 0x4d9c37e2b5cb4533p-63 0x65c98be2385a042ep-63
433 clog 0x602fd5037c4792efp-64 0xed3e2086dcca80b8p-64
434 clog 0x6b10b4f3520217b6p-64 0xe8893cbb449253a1p-64
435 clog 0x81b7efa81fc35ad1p-65 0x1ef4b835f1c79d812p-65
436 clog 0x3f96469050f650869c2p-75 0x6f16b2c9c8b05988335p-75
437 clog 0x3157fc1d73233e580c8p-75 0x761b52ccd435d7c7f5fp-75
438 clog 0x155f8afc4c48685bf63610p-85 0x17d0cf2652cdbeb1294e19p-85
439 clog 0x13836d58a13448d750b4b9p-85 0x195ca7bc3ab4f9161edbe6p-85
440 clog 0x1df515eb171a808b9e400266p-95 0x7c71eb0cd4688dfe98581c77p-95
441 clog 0xe33f66c9542ca25cc43c867p-95 0x7f35a68ebd3704a43c465864p-95
442 clog 0x6771f22c64ed551b857c128b4cp-105 0x1f570e7a13cc3cf2f44fd793ea1p-105
443 clog 0x15d8ab6ed05ca514086ac3a1e84p-105 0x1761e480aa094c0b10b34b09ce9p-105
444 clog 0x187190c1a334497bdbde5a95f48p-106 0x3b25f08062d0a095c4cfbbc338dp-106
445 clog 0x6241ef0da53f539f02fad67dabp-106 0x3fb46641182f7efd9caa769dac0p-106
446 clog 0x3e1d0a105ac4ebeacd9c6952d34cp-112 0xf859b3d1b06d005dcbb5516d5479p-112
447 clog 0x47017a2e36807acb1e5214b209dep-112 0xf5f4a550c9d75e3bb1839d865f0dp-112
448 clog 0x148f818cb7a9258fca942ade2a0cap-113 0x18854a34780b8333ec53310ad7001p-113
449 clog 0xfd95243681c055c2632286921092p-113 0x1bccabcd29ca2152860ec29e34ef7p-113
450 clog 0xdb85c467ee2aadd5f425fe0f4b8dp-114 0x3e83162a0f95f1dcbf97dddf410eap-114
451 clog 0x1415bcaf2105940d49a636e98ae59p-115 0x7e6a150adfcd1b0921d44b31f40f4p-115
461 cos 0.80190127184058835
472 cos 0x1.000000cf4a2a2p0
473 cos 0x1.0000010b239a9p0
474 cos 0x1.00000162a932bp0
475 cos 0x1.000002d452a10p0
476 cos 0x1.000005bc7d86dp0
497 cosh 709.8893558127259666434838436543941497802734375
498 cosh -709.8893558127259666434838436543941497802734375
506 # GCC bug 59666: results on directed rounding may be incorrect.
507 cosh max no-test-inline xfail-rounding:ldbl-128ibm
508 cosh -max no-test-inline xfail-rounding:ldbl-128ibm
509 # Bug 16354: spurious underflow may occur.
510 cosh min spurious-underflow
511 cosh -min spurious-underflow
512 cosh min_subnorm spurious-underflow
513 cosh -min_subnorm spurious-underflow
514 # Test values either side of overflow for each floating-point format.
519 # GCC bug 59666: results on directed rounding may be incorrect.
520 cosh 0x2.c679d1f73f0fap+8 xfail-rounding:ldbl-128ibm
521 cosh 0x2.c679d1f73f0fcp+8 xfail-rounding:ldbl-128ibm
522 cosh -0x2.c679d1f73f0fap+8 xfail-rounding:ldbl-128ibm
523 cosh -0x2.c679d1f73f0fcp+8 xfail-rounding:ldbl-128ibm
524 cosh 0x2.c679d1f73f0fb624d358b213a7p+8 xfail-rounding:ldbl-128ibm
525 cosh 0x2.c679d1f73f0fb624d358b213a8p+8 xfail-rounding:ldbl-128ibm
526 cosh -0x2.c679d1f73f0fb624d358b213a7p+8 xfail-rounding:ldbl-128ibm
527 cosh -0x2.c679d1f73f0fb624d358b213a8p+8 xfail-rounding:ldbl-128ibm
528 cosh 0x2.c5d37700c6bb03a4p+12 no-test-inline xfail-rounding:ldbl-128ibm
529 cosh 0x2.c5d37700c6bb03a8p+12 no-test-inline xfail-rounding:ldbl-128ibm
530 cosh -0x2.c5d37700c6bb03a4p+12 no-test-inline xfail-rounding:ldbl-128ibm
531 cosh -0x2.c5d37700c6bb03a8p+12 no-test-inline xfail-rounding:ldbl-128ibm
532 cosh 0x2.c5d37700c6bb03a6c24b6c9b494cp+12 no-test-inline xfail-rounding:ldbl-128ibm
533 cosh 0x2.c5d37700c6bb03a6c24b6c9b494ep+12 no-test-inline xfail-rounding:ldbl-128ibm
534 cosh -0x2.c5d37700c6bb03a6c24b6c9b494cp+12 no-test-inline xfail-rounding:ldbl-128ibm
535 cosh -0x2.c5d37700c6bb03a6c24b6c9b494ep+12 no-test-inline xfail-rounding:ldbl-128ibm
539 # Bug 14473: cpow results inaccurate.
543 cpow 0.75 1.25 0.75 1.25
544 cpow 0.75 1.25 1.0 1.0
545 cpow 0.75 1.25 1.0 0.0
546 cpow 0.75 1.25 0.0 1.0
560 # Principal square root should be returned (i.e., non-negative real part).
563 csqrt 0x1.fffffep+127 0x1.fffffep+127
564 csqrt 0x1.fffffep+127 1.0
565 csqrt 0x1p-149 0x1p-149
566 csqrt 0x1p-147 0x1p-147
569 csqrt 0x1p-50 0x1p-149
570 csqrt 0x1p+127 0x1p-149
571 csqrt 0x1p-149 0x1p+127
572 csqrt 0x1.000002p-126 0x1.000002p-126
573 csqrt -0x1.000002p-126 -0x1.000002p-126
575 csqrt 0x1.fffffffffffffp+1023 0x1.fffffffffffffp+1023
576 csqrt 0x1.fffffffffffffp+1023 0x1p+1023
577 csqrt 0x1p-1074 0x1p-1074
578 csqrt 0x1p-1073 0x1p-1073
581 csqrt 0x1p-500 0x1p-1074
582 csqrt 0x1p+1023 0x1p-1074
583 csqrt 0x1p-1074 0x1p+1023
584 csqrt 0x1.0000000000001p-1022 0x1.0000000000001p-1022
585 csqrt -0x1.0000000000001p-1022 -0x1.0000000000001p-1022
587 csqrt 0x1.fp+16383 0x1.fp+16383
588 csqrt 0x1.fp+16383 0x1p+16383
589 csqrt 0x1p-16440 0x1p-16441
592 csqrt 0x1p-5000 0x1p-16445
593 csqrt 0x1p+16383 0x1p-16445
594 csqrt 0x1p-16445 0x1p+16383
595 csqrt 0x1.0000000000000002p-16382 0x1.0000000000000002p-16382
596 csqrt -0x1.0000000000000002p-16382 -0x1.0000000000000002p-16382
599 csqrt 0x1p-5000 0x1p-16494
600 csqrt 0x1p+16383 0x1p-16494
601 csqrt 0x1p-16494 0x1p+16383
602 csqrt 0x1.0000000000000000000000000001p-16382 0x1.0000000000000000000000000001p-16382
603 csqrt -0x1.0000000000000000000000000001p-16382 -0x1.0000000000000000000000000001p-16382
617 # GCC bug 59666: results on directed rounding may be incorrect.
618 ctan 1 5680 xfail-rounding:ldbl-128ibm
619 ctan 1 5690 xfail-rounding:ldbl-128ibm
627 # GCC bug 59666: results on directed rounding may be incorrect.
628 ctan 50000 50000 xfail-rounding:ldbl-128ibm
629 ctan 50000 -50000 xfail-rounding:ldbl-128ibm
630 ctan -50000 50000 xfail-rounding:ldbl-128ibm
631 ctan -50000 -50000 xfail-rounding:ldbl-128ibm
633 ctan 0x1.921fb6p+0 0x1p-149
634 ctan 0x1.921fb54442d18p+0 0x1p-1074
635 ctan 0x1.921fb54442d1846ap+0 0x1p-16445
651 # GCC bug 59666: results on directed rounding may be incorrect.
652 ctanh 5680 1 xfail-rounding:ldbl-128ibm
653 ctanh 5690 1 xfail-rounding:ldbl-128ibm
655 ctanh 0 0x3.243f6cp-1
661 # GCC bug 59666: results on directed rounding may be incorrect.
662 ctanh 50000 50000 xfail-rounding:ldbl-128ibm
663 ctanh 50000 -50000 xfail-rounding:ldbl-128ibm
664 ctanh -50000 50000 xfail-rounding:ldbl-128ibm
665 ctanh -50000 -50000 xfail-rounding:ldbl-128ibm
667 ctanh 0x1p-149 0x1.921fb6p+0
668 ctanh 0x1p-1074 0x1.921fb54442d18p+0
669 ctanh 0x1p-16445 0x1.921fb54442d1846ap+0
680 erf -0x1.fffffffffffff8p-2
692 erfc -0x1.fffffffffffff8p-2
696 erfc 0x1.ffff56789abcdef0123456789a8p+2
713 exp 88.72269439697265625
715 # Bug 16284: results on directed rounding may be incorrect.
716 # GCC bug 59666: results on directed rounding may be incorrect.
717 exp 1000.0 xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
718 exp 710 xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
720 # Bug 16284: results on directed rounding may be incorrect.
721 # GCC bug 59666: results on directed rounding may be incorrect.
722 exp 0x2.c679d1f73f0fb628p+8 xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
723 exp 1e5 xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
724 exp max xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
725 exp -7.4444006192138124e+02
726 exp -0x1.75f113c30b1c8p+9
737 # Bug 16284: results on directed rounding may be incorrect.
738 # GCC bug 59666: results on directed rounding may be incorrect.
739 exp10 4932 xfail-rounding:flt-32 xfail-rounding:ldbl-128ibm
740 # Bug 16361: underflow exception may be misssing
741 exp10 -4932 missing-underflow:ldbl-96-intel:x86 missing-underflow:ldbl-96-intel:x86_64
742 # Bug 16284: results on directed rounding may be incorrect.
743 # GCC bug 59666: results on directed rounding may be incorrect.
744 exp10 1e5 xfail-rounding:flt-32 xfail-rounding:ldbl-128ibm
746 # Bug 16284: results on directed rounding may be incorrect.
747 # GCC bug 59666: results on directed rounding may be incorrect.
748 exp10 1e6 xfail-rounding:flt-32 xfail-rounding:ldbl-128ibm
750 # Bug 16284: results on directed rounding may be incorrect.
751 # GCC bug 59666: results on directed rounding may be incorrect.
752 exp10 max xfail-rounding:flt-32 xfail-rounding:ldbl-128ibm
755 # Bug 16284: results on directed rounding may be incorrect.
756 # GCC bug 59666: results on directed rounding may be incorrect.
757 exp10 0x1.348e45573a1dd72cp+8 xfail-rounding:flt-32 xfail-rounding:dbl-64 xfail-rounding:ldbl-128ibm
784 # GCC bug 59666: results on directed rounding may be incorrect.
785 expm1 11356.25 xfail-rounding:ldbl-128ibm
806 # GCC bug 59666: results on directed rounding may be incorrect.
807 expm1 100000.0 xfail-rounding:ldbl-128ibm
808 expm1 max xfail-rounding:ldbl-128ibm
831 # hypot (x,y) == hypot (+-x, +-y).
840 # hypot (x,0) == fabs (x).
846 hypot 0x1p+0 0x1.fp-129
847 hypot 0x1.23456789abcdef0123456789ab8p-500 0x1.23456789abcdef0123456789ab8p-500
848 hypot 0x3p125 0x4p125 no-test-inline:flt-32
849 hypot 0x1.234566p-126 0x1.234566p-126 no-test-inline:flt-32
850 hypot 0x3p1021 0x4p1021 no-test-inline:dbl-64
851 hypot 0x1p+0 0x0.3ep-1022 no-test-inline:dbl-64
852 hypot 0x3p16381 0x4p16381 no-test-inline
853 hypot 0x1p-149 0x1p-149
854 hypot 0x1p-1074 0x1p-1074
855 hypot 0x1p-16445 0x1p-16445 no-test-inline
856 hypot 0x1p-16494 0x1p-16494 no-test-inline
857 hypot 0x0.fffffep-126 0x0.fp-127
858 hypot 0x0.fffffep-126 0x0.fp-130
859 hypot 0x0.fffffffffffffp-1022 0x0.fp-1023
860 hypot 0x0.fffffffffffffp-1022 0x0.fp-1026
861 hypot 0x0.ffffffp-16382 0x0.fp-16383 no-test-inline
862 hypot 0x0.ffffffp-16382 0x0.fp-16386 no-test-inline
863 hypot 0 min_subnorm no-test-inline
877 j0 -0x1.001000001p+593
892 j1 0x1.ff00000000002p+840
897 # jn (0, x) == j0 (x).
910 # jn (1, x) == j1 (x).
937 jn 2 2.4048255576957729
938 jn 3 2.4048255576957729
939 jn 4 2.4048255576957729
940 jn 5 2.4048255576957729
941 jn 6 2.4048255576957729
942 jn 7 2.4048255576957729
943 jn 8 2.4048255576957729
944 jn 9 2.4048255576957729
1031 # Bug 16339: underflow exception may be missing.
1032 log1p min missing-underflow
1033 log1p min_subnorm missing-underflow
1034 log1p -min missing-underflow
1035 log1p -min_subnorm missing-underflow
1067 # pow (x, +-0) == 1.
1094 # pow (+0, y) == +0 for y an odd integer > 0.
1097 pow 0.0 0x1.fffffffffffffp+52
1098 pow 0.0 0x1.fffffffffffffffep+63
1099 pow 0.0 0x1.ffffffffffffffffffffffffff8p+105
1100 pow 0.0 0x1.ffffffffffffffffffffffffffffp+112
1102 # pow (-0, y) == -0 for y an odd integer > 0.
1106 pow -0 0x1.fffffffffffffp+52
1107 pow -0 0x1.fffffffffffffp+53
1108 pow -0 0x1.fffffffffffffffep+63
1109 pow -0 0x1.fffffffffffffffep+64
1110 pow -0 0x1.ffffffffffffffffffffffffff8p+105
1111 pow -0 0x1.ffffffffffffffffffffffffff8p+106
1112 pow -0 0x1.ffffffffffffffffffffffffffffp+112
1113 pow -0 0x1.ffffffffffffffffffffffffffffp+113
1115 # pow (+0, y) == +0 for y > 0 and not an odd integer.
1122 # pow (-0, y) == +0 for y > 0 and not an odd integer.
1136 pow -7.49321e+133 -9.80818e+16
1140 pow -1.0 -0x1.fffffffffffffp+52
1141 pow -1.0 -0x1.fffffffffffffp+53
1142 pow -1.0 -0x1.fffffffffffffffep+63
1143 pow -1.0 -0x1.fffffffffffffffep+64
1144 pow -1.0 -0x1.ffffffffffffffffffffffffff8p+105
1145 pow -1.0 -0x1.ffffffffffffffffffffffffff8p+106
1146 pow -1.0 -0x1.ffffffffffffffffffffffffffffp+112
1147 pow -1.0 -0x1.ffffffffffffffffffffffffffffp+113
1152 pow -1.0 0x1.fffffffffffffp+52
1153 pow -1.0 0x1.fffffffffffffp+53
1154 pow -1.0 0x1.fffffffffffffffep+63
1155 pow -1.0 0x1.fffffffffffffffep+64
1156 pow -1.0 0x1.ffffffffffffffffffffffffff8p+105
1157 pow -1.0 0x1.ffffffffffffffffffffffffff8p+106
1158 pow -1.0 0x1.ffffffffffffffffffffffffffffp+112
1159 pow -1.0 0x1.ffffffffffffffffffffffffffffp+113
1169 pow -2.0 -0x1.fffffffffffffp+52
1170 pow -2.0 -0x1.fffffffffffffp+53
1171 pow -2.0 -0x1.fffffffffffffffep+63
1172 pow -2.0 -0x1.fffffffffffffffep+64
1173 pow -2.0 -0x1.ffffffffffffffffffffffffff8p+105
1174 pow -2.0 -0x1.ffffffffffffffffffffffffff8p+106
1175 pow -2.0 -0x1.ffffffffffffffffffffffffffffp+112
1176 pow -2.0 -0x1.ffffffffffffffffffffffffffffp+113
1181 pow -2.0 0x1.fffffffffffffp+52
1182 pow -2.0 0x1.fffffffffffffp+53
1183 pow -2.0 0x1.fffffffffffffffep+63
1184 pow -2.0 0x1.fffffffffffffffep+64
1185 pow -2.0 0x1.ffffffffffffffffffffffffff8p+105
1186 pow -2.0 0x1.ffffffffffffffffffffffffff8p+106
1187 pow -2.0 0x1.ffffffffffffffffffffffffffffp+112
1188 pow -2.0 0x1.ffffffffffffffffffffffffffffp+113
1198 pow -max -0x1.fffffffffffffp+52
1199 pow -max -0x1.fffffffffffffp+53
1200 pow -max -0x1.fffffffffffffffep+63
1201 pow -max -0x1.fffffffffffffffep+64
1202 pow -max -0x1.ffffffffffffffffffffffffff8p+105
1203 pow -max -0x1.ffffffffffffffffffffffffff8p+106
1204 pow -max -0x1.ffffffffffffffffffffffffffffp+112
1205 pow -max -0x1.ffffffffffffffffffffffffffffp+113
1210 pow -max 0x1.fffffffffffffp+52
1211 pow -max 0x1.fffffffffffffp+53
1212 pow -max 0x1.fffffffffffffffep+63
1213 pow -max 0x1.fffffffffffffffep+64
1214 pow -max 0x1.ffffffffffffffffffffffffff8p+105
1215 pow -max 0x1.ffffffffffffffffffffffffff8p+106
1216 pow -max 0x1.ffffffffffffffffffffffffffffp+112
1217 pow -max 0x1.ffffffffffffffffffffffffffffp+113
1227 pow -0.5 -0x1.fffffffffffffp+52
1228 pow -0.5 -0x1.fffffffffffffp+53
1229 pow -0.5 -0x1.fffffffffffffffep+63
1230 pow -0.5 -0x1.fffffffffffffffep+64
1231 pow -0.5 -0x1.ffffffffffffffffffffffffff8p+105
1232 pow -0.5 -0x1.ffffffffffffffffffffffffff8p+106
1233 pow -0.5 -0x1.ffffffffffffffffffffffffffffp+112
1234 pow -0.5 -0x1.ffffffffffffffffffffffffffffp+113
1239 pow -0.5 0x1.fffffffffffffp+52
1240 pow -0.5 0x1.fffffffffffffp+53
1241 pow -0.5 0x1.fffffffffffffffep+63
1242 pow -0.5 0x1.fffffffffffffffep+64
1243 pow -0.5 0x1.ffffffffffffffffffffffffff8p+105
1244 pow -0.5 0x1.ffffffffffffffffffffffffff8p+106
1245 pow -0.5 0x1.ffffffffffffffffffffffffffffp+112
1246 pow -0.5 0x1.ffffffffffffffffffffffffffffp+113
1257 pow -min -0x1.fffffffffffffp+52
1258 pow -min -0x1.fffffffffffffp+53
1259 pow -min -0x1.fffffffffffffffep+63
1260 pow -min -0x1.fffffffffffffffep+64
1261 pow -min -0x1.ffffffffffffffffffffffffff8p+105
1262 pow -min -0x1.ffffffffffffffffffffffffff8p+106
1263 pow -min -0x1.ffffffffffffffffffffffffffffp+112
1264 pow -min -0x1.ffffffffffffffffffffffffffffp+113
1269 pow -min 0x1.fffffffffffffp+52
1270 pow -min 0x1.fffffffffffffp+53
1271 pow -min 0x1.fffffffffffffffep+63
1272 pow -min 0x1.fffffffffffffffep+64
1273 pow -min 0x1.ffffffffffffffffffffffffff8p+105
1274 pow -min 0x1.ffffffffffffffffffffffffff8p+106
1275 pow -min 0x1.ffffffffffffffffffffffffffffp+112
1276 pow -min 0x1.ffffffffffffffffffffffffffffp+113
1280 pow 0x0.ffffffp0 100
1281 pow 0x0.ffffffp0 1000
1282 pow 0x0.ffffffp0 0x1p24
1283 pow 0x0.ffffffp0 0x1p30
1284 pow 0x0.ffffffp0 0x1.234566p30
1285 pow 0x0.ffffffp0 -10
1286 pow 0x0.ffffffp0 -100
1287 pow 0x0.ffffffp0 -1000
1288 pow 0x0.ffffffp0 -0x1p24
1289 pow 0x0.ffffffp0 -0x1p30
1290 pow 0x0.ffffffp0 -0x1.234566p30
1291 pow 0x1.000002p0 0x1p24
1292 pow 0x1.000002p0 0x1.234566p29
1293 pow 0x1.000002p0 -0x1.234566p29
1295 pow 0x0.fffffffffffff8p0 0x1.23456789abcdfp62
1296 pow 0x0.fffffffffffff8p0 -0x1.23456789abcdfp62
1297 pow 0x1.0000000000001p0 0x1.23456789abcdfp61
1298 pow 0x1.0000000000001p0 -0x1.23456789abcdfp61
1300 pow 0x0.ffffffffffffffffp0 0x1.23456789abcdef0ep77
1301 pow 0x0.ffffffffffffffffp0 -0x1.23456789abcdef0ep77
1302 pow 0x1.0000000000000002p0 0x1.23456789abcdef0ep76
1303 pow 0x1.0000000000000002p0 -0x1.23456789abcdef0ep76
1305 pow 0x0.ffffffffffffffffffffffffffff8p0 0x1.23456789abcdef0123456789abcdp126
1306 pow 0x0.ffffffffffffffffffffffffffff8p0 -0x1.23456789abcdef0123456789abcdp126
1307 pow 0x1.0000000000000000000000000001p0 0x1.23456789abcdef0123456789abcdp125
1308 pow 0x1.0000000000000000000000000001p0 -0x1.23456789abcdef0123456789abcdp125
1324 pow min_subnorm min_subnorm
1325 pow min_subnorm -min_subnorm
1327 pow max -min_subnorm
1328 pow 0.99 min_subnorm
1329 pow 0.99 -min_subnorm
1330 pow 1.01 min_subnorm
1331 pow 1.01 -min_subnorm
1348 sin 0.80190127184058835
1359 sin 0.93340582292648832662962377071381
1360 sin 2.3328432680770916363144351635128
1361 sin 3.7439477503636453548097051680088
1362 sin 3.9225160069792437411706487182528
1363 sin 4.0711651639931289992091478779912
1364 sin 4.7858438478542097982426639646292
1365 sin 5.9840767662578002727968851104379
1385 sincos 0.80190127184058835
1391 sincos 0x1.fffff8p+127
1392 sincos 0x1.fffffep+127
1413 sqrt 0x1.fffffffffffffp+1023
1414 sqrt 0x1.ffffffffffffbp+1023
1415 sqrt 0x1.ffffffffffff7p+1023
1416 sqrt 0x1.ffffffffffff3p+1023
1417 sqrt 0x1.fffffffffffefp+1023
1418 sqrt 0x1.fffffffffffebp+1023
1419 sqrt 0x1.fffffffffffe7p+1023
1420 sqrt 0x1.fffffffffffe3p+1023
1421 sqrt 0x1.fffffffffffdfp+1023
1422 sqrt 0x1.fffffffffffdbp+1023
1423 sqrt 0x1.fffffffffffd7p+1023
1424 sqrt 0x1.0000000000003p-1022
1425 sqrt 0x1.0000000000007p-1022
1426 sqrt 0x1.000000000000bp-1022
1427 sqrt 0x1.000000000000fp-1022
1428 sqrt 0x1.0000000000013p-1022
1429 sqrt 0x1.0000000000017p-1022
1430 sqrt 0x1.000000000001bp-1022
1431 sqrt 0x1.000000000001fp-1022
1432 sqrt 0x1.0000000000023p-1022
1433 sqrt 0x1.0000000000027p-1022
1434 sqrt 0x1.000000000002bp-1022
1435 sqrt 0x1.000000000002fp-1022
1436 sqrt 0x1.0000000000033p-1022
1437 sqrt 0x1.0000000000037p-1022
1438 sqrt 0x1.7167bc36eaa3bp+6
1439 sqrt 0x1.7570994273ad7p+6
1440 sqrt 0x1.7dae969442fe6p+6
1441 sqrt 0x1.7f8444fcf67e5p+6
1442 sqrt 0x1.8364650e63a54p+6
1443 sqrt 0x1.85bedd274edd8p+6
1444 sqrt 0x1.8609cf496ab77p+6
1445 sqrt 0x1.873849c70a375p+6
1446 sqrt 0x1.8919c962cbaaep+6
1447 sqrt 0x1.8de4493e22dc6p+6
1448 sqrt 0x1.924829a17a288p+6
1449 sqrt 0x1.92702cd992f12p+6
1450 sqrt 0x1.92b763a8311fdp+6
1451 sqrt 0x1.947da013c7293p+6
1452 sqrt 0x1.9536091c494d2p+6
1453 sqrt 0x1.61b04c6p-1019
1454 sqrt 0x1.93789f1p-1018
1455 sqrt 0x1.a1989b4p-1018
1456 sqrt 0x1.f93bc9p-1018
1457 sqrt 0x1.2f675e3p-1017
1458 sqrt 0x1.a158508p-1017
1459 sqrt 0x1.cd31f078p-1017
1460 sqrt 0x1.33b43b08p-1016
1461 sqrt 0x1.6e66a858p-1016
1462 sqrt 0x1.8661cbf8p-1016
1463 sqrt 0x1.bbb221b4p-1016
1464 sqrt 0x1.c4942f3cp-1016
1465 sqrt 0x1.dbb258c8p-1016
1466 sqrt 0x1.57103ea4p-1015
1467 sqrt 0x1.9b294f88p-1015
1468 sqrt 0x1.0000000000001p+0
1469 sqrt 0x1.fffffffffffffp-1
1616 tgamma -0x0.ffffffp0
1617 tgamma -0x1.000002p0
1618 tgamma -0x1.fffffep0
1619 tgamma -0x2.000004p0
1620 tgamma -0x2.fffffcp0
1621 tgamma -0x3.000004p0
1622 tgamma -0x3.fffffcp0
1623 tgamma -0x4.000008p0
1624 tgamma -0x4.fffff8p0
1625 tgamma -0x5.000008p0
1626 tgamma -0x5.fffff8p0
1627 tgamma -0x6.000008p0
1628 tgamma -0x6.fffff8p0
1629 tgamma -0x7.000008p0
1630 tgamma -0x7.fffff8p0
1634 tgamma -0x13.ffffep0
1635 tgamma -0x14.00002p0
1636 tgamma -0x1d.ffffep0
1637 tgamma -0x1e.00002p0
1638 tgamma -0x27.ffffcp0
1639 tgamma -0x28.00004p0
1640 tgamma -0x28.ffffcp0
1641 tgamma -0x29.00004p0
1642 tgamma -0x29.ffffcp0
1643 tgamma -0x2a.00004p0
1644 tgamma 0x8.0000000000008p0
1645 tgamma 0x7.ffffffffffffcp0
1646 tgamma 0x7.0000000000004p0
1647 tgamma 0x6.ffffffffffffcp0
1648 tgamma 0x6.0000000000004p0
1649 tgamma 0x5.ffffffffffffcp0
1650 tgamma 0x5.0000000000004p0
1651 tgamma 0x4.ffffffffffffcp0
1652 tgamma 0x4.0000000000004p0
1653 tgamma 0x3.ffffffffffffep0
1654 tgamma 0x3.0000000000002p0
1655 tgamma 0x2.ffffffffffffep0
1656 tgamma 0x2.0000000000002p0
1657 tgamma 0x1.fffffffffffffp0
1658 tgamma 0x1.0000000000001p0
1659 tgamma 0x0.fffffffffffff8p0
1660 tgamma -0x0.fffffffffffff8p0
1661 tgamma -0x1.0000000000001p0
1662 tgamma -0x1.fffffffffffffp0
1663 tgamma -0x2.0000000000002p0
1664 tgamma -0x2.ffffffffffffep0
1665 tgamma -0x3.0000000000002p0
1666 tgamma -0x3.ffffffffffffep0
1667 tgamma -0x4.0000000000004p0
1668 tgamma -0x4.ffffffffffffcp0
1669 tgamma -0x5.0000000000004p0
1670 tgamma -0x5.ffffffffffffcp0
1671 tgamma -0x6.0000000000004p0
1672 tgamma -0x6.ffffffffffffcp0
1673 tgamma -0x7.0000000000004p0
1674 tgamma -0x7.ffffffffffffcp0
1675 tgamma -0x8.0000000000008p0
1676 tgamma -0x9.ffffffffffff8p0
1677 tgamma -0xa.0000000000008p0
1678 tgamma -0x13.ffffffffffffp0
1679 tgamma -0x14.000000000001p0
1680 tgamma -0x1d.ffffffffffffp0
1681 tgamma -0x1e.000000000001p0
1682 tgamma -0x27.fffffffffffep0
1683 tgamma -0x28.000000000002p0
1684 tgamma -0x28.fffffffffffep0
1685 tgamma -0x29.000000000002p0
1686 tgamma -0x29.fffffffffffep0
1687 tgamma -0x2a.000000000002p0
1688 tgamma -0x31.fffffffffffep0
1689 tgamma -0x32.000000000002p0
1690 tgamma -0x63.fffffffffffcp0
1691 tgamma -0x64.000000000004p0
1692 tgamma -0x95.fffffffffff8p0
1693 tgamma -0x96.000000000008p0
1694 tgamma -0xb4.fffffffffff8p0
1695 tgamma -0xb5.000000000008p0
1696 tgamma -0xb5.fffffffffff8p0
1697 tgamma -0xb6.000000000008p0
1698 tgamma -0xb6.fffffffffff8p0
1699 tgamma -0xb7.000000000008p0
1700 tgamma -0xb7.fffffffffff8p0
1701 tgamma -0xb8.000000000008p0
1702 tgamma 0x8.00000000000000000000000004p0
1703 tgamma 0x7.fffffffffffffffffffffffffep0
1704 tgamma 0x7.00000000000000000000000002p0
1705 tgamma 0x6.fffffffffffffffffffffffffep0
1706 tgamma 0x6.00000000000000000000000002p0
1707 tgamma 0x5.fffffffffffffffffffffffffep0
1708 tgamma 0x5.00000000000000000000000002p0
1709 tgamma 0x4.fffffffffffffffffffffffffep0
1710 tgamma 0x4.00000000000000000000000002p0
1711 tgamma 0x3.ffffffffffffffffffffffffffp0
1712 tgamma 0x3.00000000000000000000000001p0
1713 tgamma 0x2.ffffffffffffffffffffffffffp0
1714 tgamma 0x2.00000000000000000000000001p0
1715 tgamma 0x1.ffffffffffffffffffffffffff8p0
1716 tgamma 0x1.000000000000000000000000008p0
1717 tgamma 0x0.ffffffffffffffffffffffffffcp0
1718 tgamma -0x0.ffffffffffffffffffffffffffcp0
1719 tgamma -0x1.000000000000000000000000008p0
1720 tgamma -0x1.ffffffffffffffffffffffffff8p0
1721 tgamma -0x2.00000000000000000000000001p0
1722 tgamma -0x2.ffffffffffffffffffffffffffp0
1723 tgamma -0x3.00000000000000000000000001p0
1724 tgamma -0x3.ffffffffffffffffffffffffffp0
1725 tgamma -0x4.00000000000000000000000002p0
1726 tgamma -0x4.fffffffffffffffffffffffffep0
1727 tgamma -0x5.00000000000000000000000002p0
1728 tgamma -0x5.fffffffffffffffffffffffffep0
1729 tgamma -0x6.00000000000000000000000002p0
1730 tgamma -0x6.fffffffffffffffffffffffffep0
1731 tgamma -0x7.00000000000000000000000002p0
1732 tgamma -0x7.fffffffffffffffffffffffffep0
1733 tgamma -0x8.00000000000000000000000004p0
1734 tgamma -0x9.fffffffffffffffffffffffffcp0
1735 tgamma -0xa.00000000000000000000000004p0
1736 tgamma -0x13.fffffffffffffffffffffffff8p0
1737 tgamma -0x14.00000000000000000000000008p0
1738 tgamma -0x1d.fffffffffffffffffffffffff8p0
1739 tgamma -0x1e.00000000000000000000000008p0
1740 tgamma -0x27.fffffffffffffffffffffffffp0
1741 tgamma -0x28.0000000000000000000000001p0
1742 tgamma -0x28.fffffffffffffffffffffffffp0
1743 tgamma -0x29.0000000000000000000000001p0
1744 tgamma -0x29.fffffffffffffffffffffffffp0
1745 tgamma -0x2a.0000000000000000000000001p0
1746 tgamma -0x31.fffffffffffffffffffffffffp0
1747 tgamma -0x32.0000000000000000000000001p0
1748 tgamma -0x63.ffffffffffffffffffffffffep0
1749 tgamma -0x64.0000000000000000000000002p0
1750 tgamma -0x95.ffffffffffffffffffffffffcp0
1751 tgamma -0x96.0000000000000000000000004p0
1752 tgamma -0xb4.ffffffffffffffffffffffffcp0
1753 tgamma -0xb5.0000000000000000000000004p0
1754 tgamma -0xb5.ffffffffffffffffffffffffcp0
1755 tgamma -0xb6.0000000000000000000000004p0
1756 tgamma -0xb6.ffffffffffffffffffffffffcp0
1757 tgamma -0xb7.0000000000000000000000004p0
1758 tgamma -0xb7.ffffffffffffffffffffffffcp0
1759 tgamma -0xb8.0000000000000000000000004p0
1760 tgamma -0xbb.ffffffffffffffffffffffffcp0
1761 tgamma -0xbc.0000000000000000000000004p0
1762 tgamma -0xbc.ffffffffffffffffffffffffcp0
1763 tgamma -0xbd.0000000000000000000000004p0
1764 tgamma -0xbd.ffffffffffffffffffffffffcp0
1765 tgamma -0xbe.0000000000000000000000004p0
1766 tgamma -0xbe.ffffffffffffffffffffffffcp0
1767 tgamma -0xbf.0000000000000000000000004p0
1768 tgamma 0x8.000000000000001p0
1769 tgamma 0x7.fffffffffffffff8p0
1770 tgamma 0x7.0000000000000008p0
1771 tgamma 0x6.fffffffffffffff8p0
1772 tgamma 0x6.0000000000000008p0
1773 tgamma 0x5.fffffffffffffff8p0
1774 tgamma 0x5.0000000000000008p0
1775 tgamma 0x4.fffffffffffffff8p0
1776 tgamma 0x4.0000000000000008p0
1777 tgamma 0x3.fffffffffffffffcp0
1778 tgamma 0x3.0000000000000004p0
1779 tgamma 0x2.fffffffffffffffcp0
1780 tgamma 0x2.0000000000000004p0
1781 tgamma 0x1.fffffffffffffffep0
1782 tgamma 0x1.0000000000000002p0
1783 tgamma 0x0.ffffffffffffffffp0
1784 tgamma -0x0.ffffffffffffffffp0
1785 tgamma -0x1.0000000000000002p0
1786 tgamma -0x1.fffffffffffffffep0
1787 tgamma -0x2.0000000000000004p0
1788 tgamma -0x2.fffffffffffffffcp0
1789 tgamma -0x3.0000000000000004p0
1790 tgamma -0x3.fffffffffffffffcp0
1791 tgamma -0x4.0000000000000008p0
1792 tgamma -0x4.fffffffffffffff8p0
1793 tgamma -0x5.0000000000000008p0
1794 tgamma -0x5.fffffffffffffff8p0
1795 tgamma -0x6.0000000000000008p0
1796 tgamma -0x6.fffffffffffffff8p0
1797 tgamma -0x7.0000000000000008p0
1798 tgamma -0x7.fffffffffffffff8p0
1799 tgamma -0x8.000000000000001p0
1800 tgamma -0x9.fffffffffffffffp0
1801 tgamma -0xa.000000000000001p0
1802 tgamma -0x13.ffffffffffffffep0
1803 tgamma -0x14.000000000000002p0
1804 tgamma -0x1d.ffffffffffffffep0
1805 tgamma -0x1e.000000000000002p0
1806 tgamma -0x27.ffffffffffffffcp0
1807 tgamma -0x28.000000000000004p0
1808 tgamma -0x28.ffffffffffffffcp0
1809 tgamma -0x29.000000000000004p0
1810 tgamma -0x29.ffffffffffffffcp0
1811 tgamma -0x2a.000000000000004p0
1812 tgamma -0x31.ffffffffffffffcp0
1813 tgamma -0x32.000000000000004p0
1814 tgamma -0x63.ffffffffffffff8p0
1815 tgamma -0x64.000000000000008p0
1816 tgamma -0x95.ffffffffffffffp0
1817 tgamma -0x96.00000000000001p0
1818 tgamma -0xb4.ffffffffffffffp0
1819 tgamma -0xb5.00000000000001p0
1820 tgamma -0xb5.ffffffffffffffp0
1821 tgamma -0xb6.00000000000001p0
1822 tgamma -0xb6.ffffffffffffffp0
1823 tgamma -0xb7.00000000000001p0
1824 tgamma -0xb7.ffffffffffffffp0
1825 tgamma -0xb8.00000000000001p0
1826 tgamma -0xbb.ffffffffffffffp0
1827 tgamma -0xbc.00000000000001p0
1828 tgamma -0xbc.ffffffffffffffp0
1829 tgamma -0xbd.00000000000001p0
1830 tgamma -0xbd.ffffffffffffffp0
1831 tgamma -0xbe.00000000000001p0
1832 tgamma -0xbe.ffffffffffffffp0
1833 tgamma -0xbf.00000000000001p0
1834 tgamma -0xf9.ffffffffffffffp0
1835 tgamma -0xfa.00000000000001p0
1836 tgamma -0x1f3.fffffffffffffep0
1837 tgamma -0x1f4.00000000000002p0
1838 tgamma -0x2ed.fffffffffffffcp0
1839 tgamma -0x2ee.00000000000004p0
1840 tgamma -0x3e7.fffffffffffffcp0
1841 tgamma -0x3e8.00000000000004p0
1842 tgamma -0x4e1.fffffffffffff8p0
1843 tgamma -0x4e2.00000000000008p0
1844 tgamma -0x5db.fffffffffffff8p0
1845 tgamma -0x5dc.00000000000008p0
1846 tgamma -0x6d5.fffffffffffff8p0
1847 tgamma -0x6d6.00000000000008p0
1848 tgamma -0x6e2.fffffffffffff8p0
1849 tgamma -0x6e3.00000000000008p0
1850 tgamma -0x6e3.fffffffffffff8p0
1851 tgamma -0x6e4.00000000000008p0
1852 tgamma -0x6e4.fffffffffffff8p0
1853 tgamma -0x6e5.00000000000008p0
1854 tgamma -0x6e5.fffffffffffff8p0
1855 tgamma -0x6e6.00000000000008p0
1856 tgamma 0x8.0000000000000000000000000008p0
1857 tgamma 0x7.fffffffffffffffffffffffffffcp0
1858 tgamma 0x7.0000000000000000000000000004p0
1859 tgamma 0x6.fffffffffffffffffffffffffffcp0
1860 tgamma 0x6.0000000000000000000000000004p0
1861 tgamma 0x5.fffffffffffffffffffffffffffcp0
1862 tgamma 0x5.0000000000000000000000000004p0
1863 tgamma 0x4.fffffffffffffffffffffffffffcp0
1864 tgamma 0x4.0000000000000000000000000004p0
1865 tgamma 0x3.fffffffffffffffffffffffffffep0
1866 tgamma 0x3.0000000000000000000000000002p0
1867 tgamma 0x2.fffffffffffffffffffffffffffep0
1868 tgamma 0x2.0000000000000000000000000002p0
1869 tgamma 0x1.ffffffffffffffffffffffffffffp0
1870 tgamma 0x1.0000000000000000000000000001p0
1871 tgamma 0x0.ffffffffffffffffffffffffffff8p0
1872 tgamma -0x0.ffffffffffffffffffffffffffff8p0
1873 tgamma -0x1.0000000000000000000000000001p0
1874 tgamma -0x1.ffffffffffffffffffffffffffffp0
1875 tgamma -0x2.0000000000000000000000000002p0
1876 tgamma -0x2.fffffffffffffffffffffffffffep0
1877 tgamma -0x3.0000000000000000000000000002p0
1878 tgamma -0x3.fffffffffffffffffffffffffffep0
1879 tgamma -0x4.0000000000000000000000000004p0
1880 tgamma -0x4.fffffffffffffffffffffffffffcp0
1881 tgamma -0x5.0000000000000000000000000004p0
1882 tgamma -0x5.fffffffffffffffffffffffffffcp0
1883 tgamma -0x6.0000000000000000000000000004p0
1884 tgamma -0x6.fffffffffffffffffffffffffffcp0
1885 tgamma -0x7.0000000000000000000000000004p0
1886 tgamma -0x7.fffffffffffffffffffffffffffcp0
1887 tgamma -0x8.0000000000000000000000000008p0
1888 tgamma -0x9.fffffffffffffffffffffffffff8p0
1889 tgamma -0xa.0000000000000000000000000008p0
1890 tgamma -0x13.fffffffffffffffffffffffffffp0
1891 tgamma -0x14.000000000000000000000000001p0
1892 tgamma -0x1d.fffffffffffffffffffffffffffp0
1893 tgamma -0x1e.000000000000000000000000001p0
1894 tgamma -0x27.ffffffffffffffffffffffffffep0
1895 tgamma -0x28.000000000000000000000000002p0
1896 tgamma -0x28.ffffffffffffffffffffffffffep0
1897 tgamma -0x29.000000000000000000000000002p0
1898 tgamma -0x29.ffffffffffffffffffffffffffep0
1899 tgamma -0x2a.000000000000000000000000002p0
1900 tgamma -0x31.ffffffffffffffffffffffffffep0
1901 tgamma -0x32.000000000000000000000000002p0
1902 tgamma -0x63.ffffffffffffffffffffffffffcp0
1903 tgamma -0x64.000000000000000000000000004p0
1904 tgamma -0x95.ffffffffffffffffffffffffff8p0
1905 tgamma -0x96.000000000000000000000000008p0
1906 tgamma -0xb4.ffffffffffffffffffffffffff8p0
1907 tgamma -0xb5.000000000000000000000000008p0
1908 tgamma -0xb5.ffffffffffffffffffffffffff8p0
1909 tgamma -0xb6.000000000000000000000000008p0
1910 tgamma -0xb6.ffffffffffffffffffffffffff8p0
1911 tgamma -0xb7.000000000000000000000000008p0
1912 tgamma -0xb7.ffffffffffffffffffffffffff8p0
1913 tgamma -0xb8.000000000000000000000000008p0
1914 tgamma -0xbb.ffffffffffffffffffffffffff8p0
1915 tgamma -0xbc.000000000000000000000000008p0
1916 tgamma -0xbc.ffffffffffffffffffffffffff8p0
1917 tgamma -0xbd.000000000000000000000000008p0
1918 tgamma -0xbd.ffffffffffffffffffffffffff8p0
1919 tgamma -0xbe.000000000000000000000000008p0
1920 tgamma -0xbe.ffffffffffffffffffffffffff8p0
1921 tgamma -0xbf.000000000000000000000000008p0
1922 tgamma -0xf9.ffffffffffffffffffffffffff8p0
1923 tgamma -0xfa.000000000000000000000000008p0
1924 tgamma -0x1f3.ffffffffffffffffffffffffffp0
1925 tgamma -0x1f4.00000000000000000000000001p0
1926 tgamma -0x2ed.fffffffffffffffffffffffffep0
1927 tgamma -0x2ee.00000000000000000000000002p0
1928 tgamma -0x3e7.fffffffffffffffffffffffffep0
1929 tgamma -0x3e8.00000000000000000000000002p0
1930 tgamma -0x4e1.fffffffffffffffffffffffffcp0
1931 tgamma -0x4e2.00000000000000000000000004p0
1932 tgamma -0x5db.fffffffffffffffffffffffffcp0
1933 tgamma -0x5dc.00000000000000000000000004p0
1934 tgamma -0x6d5.fffffffffffffffffffffffffcp0
1935 tgamma -0x6d6.00000000000000000000000004p0
1936 tgamma -0x6e2.fffffffffffffffffffffffffcp0
1937 tgamma -0x6e3.00000000000000000000000004p0
1938 tgamma -0x6e3.fffffffffffffffffffffffffcp0
1939 tgamma -0x6e4.00000000000000000000000004p0
1940 tgamma -0x6e4.fffffffffffffffffffffffffcp0
1941 tgamma -0x6e5.00000000000000000000000004p0
1942 tgamma -0x6e5.fffffffffffffffffffffffffcp0
1943 tgamma -0x6e6.00000000000000000000000004p0
1944 tgamma -0x6eb.fffffffffffffffffffffffffcp0
1945 tgamma -0x6ec.00000000000000000000000004p0
1946 tgamma -0x6ec.fffffffffffffffffffffffffcp0
1947 tgamma -0x6ed.00000000000000000000000004p0
1948 tgamma -0x6ed.fffffffffffffffffffffffffcp0
1949 tgamma -0x6ee.00000000000000000000000004p0
1950 tgamma -0x6ee.fffffffffffffffffffffffffcp0
1951 tgamma -0x6ef.00000000000000000000000004p0
1952 tgamma -0x1.0a32a2p+5
1953 tgamma -0x1.5800000080001p+7
1963 tgamma 0x2.30a43cp+4
1965 tgamma 0xa.b9fd72b0fb238p+4
1966 tgamma 0xa.b9fd72b0fb24p+4
1967 tgamma 0xa.b9fd72b0fb23a9ddbf0d3804f4p+4
1968 tgamma 0xa.b9fd72b0fb23a9ddbf0d3804f8p+4
1969 tgamma 0x6.db8c603359a97108p+8
1970 tgamma 0x6.db8c603359a9711p+8
1971 tgamma 0x6.db8c603359a971081bc4a2e9dfdp+8
1972 tgamma 0x6.db8c603359a971081bc4a2e9dfd4p+8
1984 y0 0x1.ff00000000002p+840
2008 y1 0x1.001000001p+593
2024 # yn (0, x) == y0 (x).
2033 # yn (1, x) == y1 (x).
2042 # yn (-1, x) == -y1 (x).