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Commit | Line | Data |
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4f2689f4 | 1 | /* Test compilation of tgmath macros. |
bfff8b1b | 2 | Copyright (C) 2001-2017 Free Software Foundation, Inc. |
4f2689f4 UD |
3 | This file is part of the GNU C Library. |
4 | Contributed by Jakub Jelinek <jakub@redhat.com> and | |
5 | Ulrich Drepper <drepper@redhat.com>, 2001. | |
6 | ||
7 | The GNU C Library is free software; you can redistribute it and/or | |
41bdb6e2 AJ |
8 | modify it under the terms of the GNU Lesser General Public |
9 | License as published by the Free Software Foundation; either | |
10 | version 2.1 of the License, or (at your option) any later version. | |
4f2689f4 UD |
11 | |
12 | The GNU C Library is distributed in the hope that it will be useful, | |
13 | but WITHOUT ANY WARRANTY; without even the implied warranty of | |
14 | MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU | |
41bdb6e2 | 15 | Lesser General Public License for more details. |
4f2689f4 | 16 | |
41bdb6e2 | 17 | You should have received a copy of the GNU Lesser General Public |
59ba27a6 PE |
18 | License along with the GNU C Library; if not, see |
19 | <http://www.gnu.org/licenses/>. */ | |
4f2689f4 UD |
20 | |
21 | #ifndef HAVE_MAIN | |
22 | #undef __NO_MATH_INLINES | |
23 | #define __NO_MATH_INLINES 1 | |
51737193 | 24 | #include <float.h> |
4f2689f4 | 25 | #include <math.h> |
423c2b9d | 26 | #include <stdint.h> |
4f2689f4 UD |
27 | #include <stdio.h> |
28 | #include <tgmath.h> | |
29 | ||
deea1b29 | 30 | //#define DEBUG |
4f2689f4 UD |
31 | |
32 | static void compile_test (void); | |
33 | static void compile_testf (void); | |
51737193 | 34 | #if LDBL_MANT_DIG > DBL_MANT_DIG |
4f2689f4 | 35 | static void compile_testl (void); |
53de11ad | 36 | #endif |
4f2689f4 UD |
37 | |
38 | float fx; | |
39 | double dx; | |
40 | long double lx; | |
1c298d08 UD |
41 | const float fy = 1.25; |
42 | const double dy = 1.25; | |
43 | const long double ly = 1.25; | |
44 | complex float fz; | |
45 | complex double dz; | |
46 | complex long double lz; | |
4f2689f4 UD |
47 | |
48 | int count_double; | |
49 | int count_float; | |
50 | int count_ldouble; | |
1c298d08 UD |
51 | int count_cdouble; |
52 | int count_cfloat; | |
53 | int count_cldouble; | |
4f2689f4 | 54 | |
d12a22c5 | 55 | #define NCALLS 134 |
304d7abf | 56 | #define NCALLS_INT 4 |
1c298d08 | 57 | #define NCCALLS 47 |
4f2689f4 | 58 | |
0035851c AS |
59 | static int |
60 | do_test (void) | |
4f2689f4 UD |
61 | { |
62 | int result = 0; | |
63 | ||
64 | count_float = count_double = count_ldouble = 0; | |
1c298d08 | 65 | count_cfloat = count_cdouble = count_cldouble = 0; |
4f2689f4 | 66 | compile_test (); |
1c298d08 | 67 | if (count_float != 0 || count_cfloat != 0) |
4f2689f4 UD |
68 | { |
69 | puts ("float function called for double test"); | |
70 | result = 1; | |
71 | } | |
1c298d08 | 72 | if (count_ldouble != 0 || count_cldouble != 0) |
4f2689f4 UD |
73 | { |
74 | puts ("long double function called for double test"); | |
75 | result = 1; | |
76 | } | |
304d7abf | 77 | if (count_double < NCALLS + NCALLS_INT) |
4f2689f4 UD |
78 | { |
79 | printf ("double functions not called often enough (%d)\n", | |
80 | count_double); | |
81 | result = 1; | |
82 | } | |
304d7abf | 83 | else if (count_double > NCALLS + NCALLS_INT) |
4f2689f4 UD |
84 | { |
85 | printf ("double functions called too often (%d)\n", | |
86 | count_double); | |
87 | result = 1; | |
88 | } | |
1c298d08 UD |
89 | if (count_cdouble < NCCALLS) |
90 | { | |
91 | printf ("double complex functions not called often enough (%d)\n", | |
92 | count_cdouble); | |
93 | result = 1; | |
94 | } | |
95 | else if (count_cdouble > NCCALLS) | |
96 | { | |
97 | printf ("double complex functions called too often (%d)\n", | |
98 | count_cdouble); | |
99 | result = 1; | |
100 | } | |
4f2689f4 UD |
101 | |
102 | count_float = count_double = count_ldouble = 0; | |
1c298d08 | 103 | count_cfloat = count_cdouble = count_cldouble = 0; |
4f2689f4 | 104 | compile_testf (); |
1c298d08 | 105 | if (count_double != 0 || count_cdouble != 0) |
4f2689f4 UD |
106 | { |
107 | puts ("double function called for float test"); | |
108 | result = 1; | |
109 | } | |
1c298d08 | 110 | if (count_ldouble != 0 || count_cldouble != 0) |
4f2689f4 UD |
111 | { |
112 | puts ("long double function called for float test"); | |
113 | result = 1; | |
114 | } | |
115 | if (count_float < NCALLS) | |
116 | { | |
117 | printf ("float functions not called often enough (%d)\n", count_float); | |
118 | result = 1; | |
119 | } | |
120 | else if (count_float > NCALLS) | |
121 | { | |
122 | printf ("float functions called too often (%d)\n", | |
123 | count_double); | |
124 | result = 1; | |
125 | } | |
1c298d08 UD |
126 | if (count_cfloat < NCCALLS) |
127 | { | |
128 | printf ("float complex functions not called often enough (%d)\n", | |
129 | count_cfloat); | |
130 | result = 1; | |
131 | } | |
132 | else if (count_cfloat > NCCALLS) | |
133 | { | |
134 | printf ("float complex functions called too often (%d)\n", | |
135 | count_cfloat); | |
136 | result = 1; | |
137 | } | |
4f2689f4 | 138 | |
51737193 | 139 | #if LDBL_MANT_DIG > DBL_MANT_DIG |
4f2689f4 | 140 | count_float = count_double = count_ldouble = 0; |
1c298d08 | 141 | count_cfloat = count_cdouble = count_cldouble = 0; |
4f2689f4 | 142 | compile_testl (); |
1c298d08 | 143 | if (count_float != 0 || count_cfloat != 0) |
4f2689f4 UD |
144 | { |
145 | puts ("float function called for long double test"); | |
146 | result = 1; | |
147 | } | |
1c298d08 | 148 | if (count_double != 0 || count_cdouble != 0) |
4f2689f4 UD |
149 | { |
150 | puts ("double function called for long double test"); | |
151 | result = 1; | |
152 | } | |
153 | if (count_ldouble < NCALLS) | |
154 | { | |
155 | printf ("long double functions not called often enough (%d)\n", | |
156 | count_ldouble); | |
157 | result = 1; | |
158 | } | |
159 | else if (count_ldouble > NCALLS) | |
160 | { | |
161 | printf ("long double functions called too often (%d)\n", | |
162 | count_double); | |
163 | result = 1; | |
164 | } | |
1c298d08 UD |
165 | if (count_cldouble < NCCALLS) |
166 | { | |
167 | printf ("long double complex functions not called often enough (%d)\n", | |
168 | count_cldouble); | |
169 | result = 1; | |
170 | } | |
171 | else if (count_cldouble > NCCALLS) | |
172 | { | |
173 | printf ("long double complex functions called too often (%d)\n", | |
174 | count_cldouble); | |
175 | result = 1; | |
176 | } | |
4f2689f4 UD |
177 | #endif |
178 | ||
179 | return result; | |
180 | } | |
181 | ||
182 | /* Now generate the three functions. */ | |
183 | #define HAVE_MAIN | |
184 | ||
185 | #define F(name) name | |
186 | #define TYPE double | |
304d7abf | 187 | #define TEST_INT 1 |
4f2689f4 | 188 | #define x dx |
1c298d08 UD |
189 | #define y dy |
190 | #define z dz | |
4f2689f4 | 191 | #define count count_double |
1c298d08 | 192 | #define ccount count_cdouble |
4f2689f4 UD |
193 | #include "test-tgmath.c" |
194 | ||
195 | #define F(name) name##f | |
196 | #define TYPE float | |
197 | #define x fx | |
1c298d08 UD |
198 | #define y fy |
199 | #define z fz | |
4f2689f4 | 200 | #define count count_float |
1c298d08 | 201 | #define ccount count_cfloat |
4f2689f4 UD |
202 | #include "test-tgmath.c" |
203 | ||
51737193 | 204 | #if LDBL_MANT_DIG > DBL_MANT_DIG |
4f2689f4 UD |
205 | #define F(name) name##l |
206 | #define TYPE long double | |
207 | #define x lx | |
1c298d08 UD |
208 | #define y ly |
209 | #define z lz | |
4f2689f4 | 210 | #define count count_ldouble |
1c298d08 | 211 | #define ccount count_cldouble |
4f2689f4 UD |
212 | #include "test-tgmath.c" |
213 | #endif | |
214 | ||
0035851c AS |
215 | #define TEST_FUNCTION do_test () |
216 | #include "../test-skeleton.c" | |
217 | ||
4f2689f4 UD |
218 | #else |
219 | ||
220 | #ifdef DEBUG | |
221 | #define P() puts (__FUNCTION__) | |
222 | #else | |
223 | #define P() | |
224 | #endif | |
225 | ||
226 | static void | |
227 | F(compile_test) (void) | |
228 | { | |
ee6bf14d | 229 | TYPE a, b, c = 1.0; |
1c298d08 | 230 | complex TYPE d; |
423c2b9d | 231 | int i = 2; |
1c298d08 | 232 | int saved_count; |
4f2689f4 UD |
233 | long int j; |
234 | long long int k; | |
423c2b9d JM |
235 | intmax_t m; |
236 | uintmax_t um; | |
4f2689f4 UD |
237 | |
238 | a = cos (cos (x)); | |
239 | b = acos (acos (a)); | |
240 | a = sin (sin (x)); | |
241 | b = asin (asin (a)); | |
242 | a = tan (tan (x)); | |
243 | b = atan (atan (a)); | |
244 | c = atan2 (atan2 (a, c), atan2 (b, x)); | |
245 | a = cosh (cosh (x)); | |
246 | b = acosh (acosh (a)); | |
247 | a = sinh (sinh (x)); | |
248 | b = asinh (asinh (a)); | |
249 | a = tanh (tanh (x)); | |
250 | b = atanh (atanh (a)); | |
251 | a = exp (exp (x)); | |
252 | b = log (log (a)); | |
253 | a = log10 (log10 (x)); | |
254 | b = ldexp (ldexp (a, 1), 5); | |
255 | a = frexp (frexp (x, &i), &i); | |
256 | b = expm1 (expm1 (a)); | |
257 | a = log1p (log1p (x)); | |
258 | b = logb (logb (a)); | |
259 | a = exp2 (exp2 (x)); | |
260 | b = log2 (log2 (a)); | |
261 | a = pow (pow (x, a), pow (c, b)); | |
262 | b = sqrt (sqrt (a)); | |
263 | a = hypot (hypot (x, b), hypot (c, a)); | |
264 | b = cbrt (cbrt (a)); | |
265 | a = ceil (ceil (x)); | |
266 | b = fabs (fabs (a)); | |
267 | a = floor (floor (x)); | |
268 | b = fmod (fmod (a, b), fmod (c, x)); | |
269 | a = nearbyint (nearbyint (x)); | |
270 | b = round (round (a)); | |
41c67149 | 271 | c = roundeven (roundeven (a)); |
4f2689f4 UD |
272 | a = trunc (trunc (x)); |
273 | b = remquo (remquo (a, b, &i), remquo (c, x, &i), &i); | |
274 | j = lrint (x) + lround (a); | |
275 | k = llrint (b) + llround (c); | |
423c2b9d JM |
276 | m = fromfp (a, FP_INT_UPWARD, 2) + fromfpx (b, FP_INT_DOWNWARD, 3); |
277 | um = ufromfp (c, FP_INT_TONEAREST, 4) + ufromfpx (a, FP_INT_TOWARDZERO, 5); | |
4f2689f4 UD |
278 | a = erf (erf (x)); |
279 | b = erfc (erfc (a)); | |
280 | a = tgamma (tgamma (x)); | |
281 | b = lgamma (lgamma (a)); | |
282 | a = rint (rint (x)); | |
283 | b = nextafter (nextafter (a, b), nextafter (c, x)); | |
41a359e2 RS |
284 | a = nextdown (nextdown (a)); |
285 | b = nexttoward (nexttoward (x, a), c); | |
286 | a = nextup (nextup (a)); | |
4f2689f4 UD |
287 | b = remainder (remainder (a, b), remainder (c, x)); |
288 | a = scalb (scalb (x, a), (TYPE) (6)); | |
289 | k = scalbn (a, 7) + scalbln (c, 10l); | |
290 | i = ilogb (x); | |
55a38f82 | 291 | j = llogb (x); |
4f2689f4 UD |
292 | a = fdim (fdim (x, a), fdim (c, b)); |
293 | b = fmax (fmax (a, x), fmax (c, b)); | |
294 | a = fmin (fmin (x, a), fmin (c, b)); | |
525f8039 JM |
295 | b = fmaxmag (fmaxmag (a, x), fmaxmag (c, b)); |
296 | a = fminmag (fminmag (x, a), fminmag (c, b)); | |
4f2689f4 | 297 | b = fma (sin (a), sin (x), sin (c)); |
d12a22c5 JM |
298 | a = totalorder (x, b); |
299 | b = totalordermag (x, a); | |
304d7abf UD |
300 | |
301 | #ifdef TEST_INT | |
302 | a = atan2 (i, b); | |
303 | b = remquo (i, a, &i); | |
304 | c = fma (i, b, i); | |
305 | a = pow (i, c); | |
306 | #endif | |
423c2b9d | 307 | x = a + b + c + i + j + k + m + um; |
1c298d08 UD |
308 | |
309 | saved_count = count; | |
310 | if (ccount != 0) | |
311 | ccount = -10000; | |
312 | ||
313 | d = cos (cos (z)); | |
314 | z = acos (acos (d)); | |
315 | d = sin (sin (z)); | |
316 | z = asin (asin (d)); | |
317 | d = tan (tan (z)); | |
318 | z = atan (atan (d)); | |
319 | d = cosh (cosh (z)); | |
320 | z = acosh (acosh (d)); | |
321 | d = sinh (sinh (z)); | |
322 | z = asinh (asinh (d)); | |
323 | d = tanh (tanh (z)); | |
324 | z = atanh (atanh (d)); | |
325 | d = exp (exp (z)); | |
326 | z = log (log (d)); | |
327 | d = sqrt (sqrt (z)); | |
328 | z = conj (conj (d)); | |
329 | d = fabs (conj (a)); | |
330 | z = pow (pow (a, d), pow (b, z)); | |
331 | d = cproj (cproj (z)); | |
332 | z += fabs (cproj (a)); | |
333 | a = carg (carg (z)); | |
334 | b = creal (creal (d)); | |
335 | c = cimag (cimag (z)); | |
336 | x += a + b + c + i + j + k; | |
337 | z += d; | |
338 | ||
339 | if (saved_count != count) | |
340 | count = -10000; | |
341 | ||
342 | if (0) | |
343 | { | |
344 | a = cos (y); | |
345 | a = acos (y); | |
346 | a = sin (y); | |
347 | a = asin (y); | |
348 | a = tan (y); | |
349 | a = atan (y); | |
350 | a = atan2 (y, y); | |
351 | a = cosh (y); | |
352 | a = acosh (y); | |
353 | a = sinh (y); | |
354 | a = asinh (y); | |
355 | a = tanh (y); | |
356 | a = atanh (y); | |
357 | a = exp (y); | |
358 | a = log (y); | |
359 | a = log10 (y); | |
360 | a = ldexp (y, 5); | |
361 | a = frexp (y, &i); | |
362 | a = expm1 (y); | |
363 | a = log1p (y); | |
364 | a = logb (y); | |
365 | a = exp2 (y); | |
366 | a = log2 (y); | |
367 | a = pow (y, y); | |
368 | a = sqrt (y); | |
369 | a = hypot (y, y); | |
370 | a = cbrt (y); | |
371 | a = ceil (y); | |
372 | a = fabs (y); | |
373 | a = floor (y); | |
374 | a = fmod (y, y); | |
375 | a = nearbyint (y); | |
376 | a = round (y); | |
41c67149 | 377 | a = roundeven (y); |
1c298d08 UD |
378 | a = trunc (y); |
379 | a = remquo (y, y, &i); | |
380 | j = lrint (y) + lround (y); | |
381 | k = llrint (y) + llround (y); | |
423c2b9d JM |
382 | m = fromfp (y, FP_INT_UPWARD, 6) + fromfpx (y, FP_INT_DOWNWARD, 7); |
383 | um = (ufromfp (y, FP_INT_TONEAREST, 8) | |
384 | + ufromfpx (y, FP_INT_TOWARDZERO, 9)); | |
1c298d08 UD |
385 | a = erf (y); |
386 | a = erfc (y); | |
387 | a = tgamma (y); | |
388 | a = lgamma (y); | |
389 | a = rint (y); | |
390 | a = nextafter (y, y); | |
391 | a = nexttoward (y, y); | |
392 | a = remainder (y, y); | |
393 | a = scalb (y, (const TYPE) (6)); | |
394 | k = scalbn (y, 7) + scalbln (y, 10l); | |
395 | i = ilogb (y); | |
55a38f82 | 396 | j = llogb (y); |
1c298d08 UD |
397 | a = fdim (y, y); |
398 | a = fmax (y, y); | |
399 | a = fmin (y, y); | |
525f8039 JM |
400 | a = fmaxmag (y, y); |
401 | a = fminmag (y, y); | |
1c298d08 | 402 | a = fma (y, y, y); |
5e9d98a3 | 403 | a = totalorder (y, y); |
cc6a8d74 | 404 | a = totalordermag (y, y); |
1c298d08 UD |
405 | |
406 | #ifdef TEST_INT | |
407 | a = atan2 (i, y); | |
408 | a = remquo (i, y, &i); | |
409 | a = fma (i, y, i); | |
410 | a = pow (i, y); | |
411 | #endif | |
412 | ||
413 | d = cos ((const complex TYPE) z); | |
414 | d = acos ((const complex TYPE) z); | |
415 | d = sin ((const complex TYPE) z); | |
416 | d = asin ((const complex TYPE) z); | |
417 | d = tan ((const complex TYPE) z); | |
418 | d = atan ((const complex TYPE) z); | |
419 | d = cosh ((const complex TYPE) z); | |
420 | d = acosh ((const complex TYPE) z); | |
421 | d = sinh ((const complex TYPE) z); | |
422 | d = asinh ((const complex TYPE) z); | |
423 | d = tanh ((const complex TYPE) z); | |
424 | d = atanh ((const complex TYPE) z); | |
425 | d = exp ((const complex TYPE) z); | |
426 | d = log ((const complex TYPE) z); | |
427 | d = sqrt ((const complex TYPE) z); | |
428 | d = pow ((const complex TYPE) z, (const complex TYPE) z); | |
429 | d = fabs ((const complex TYPE) z); | |
430 | d = carg ((const complex TYPE) z); | |
431 | d = creal ((const complex TYPE) z); | |
432 | d = cimag ((const complex TYPE) z); | |
433 | d = conj ((const complex TYPE) z); | |
434 | d = cproj ((const complex TYPE) z); | |
435 | } | |
4f2689f4 UD |
436 | } |
437 | #undef x | |
1c298d08 UD |
438 | #undef y |
439 | #undef z | |
4f2689f4 UD |
440 | |
441 | ||
442 | TYPE | |
443 | (F(cos)) (TYPE x) | |
444 | { | |
445 | ++count; | |
1c298d08 | 446 | P (); |
4f2689f4 UD |
447 | return x; |
448 | } | |
449 | ||
450 | TYPE | |
451 | (F(acos)) (TYPE x) | |
452 | { | |
453 | ++count; | |
1c298d08 | 454 | P (); |
4f2689f4 UD |
455 | return x; |
456 | } | |
457 | ||
458 | TYPE | |
459 | (F(sin)) (TYPE x) | |
460 | { | |
461 | ++count; | |
1c298d08 | 462 | P (); |
4f2689f4 UD |
463 | return x; |
464 | } | |
465 | ||
466 | TYPE | |
467 | (F(asin)) (TYPE x) | |
468 | { | |
469 | ++count; | |
1c298d08 | 470 | P (); |
4f2689f4 UD |
471 | return x; |
472 | } | |
473 | ||
474 | TYPE | |
475 | (F(tan)) (TYPE x) | |
476 | { | |
477 | ++count; | |
1c298d08 | 478 | P (); |
4f2689f4 UD |
479 | return x; |
480 | } | |
481 | ||
482 | TYPE | |
483 | (F(atan)) (TYPE x) | |
484 | { | |
485 | ++count; | |
1c298d08 | 486 | P (); |
4f2689f4 UD |
487 | return x; |
488 | } | |
489 | ||
490 | TYPE | |
491 | (F(atan2)) (TYPE x, TYPE y) | |
492 | { | |
493 | ++count; | |
1c298d08 | 494 | P (); |
4f2689f4 UD |
495 | return x + y; |
496 | } | |
497 | ||
498 | TYPE | |
499 | (F(cosh)) (TYPE x) | |
500 | { | |
501 | ++count; | |
1c298d08 | 502 | P (); |
4f2689f4 UD |
503 | return x; |
504 | } | |
505 | ||
506 | TYPE | |
507 | (F(acosh)) (TYPE x) | |
508 | { | |
509 | ++count; | |
1c298d08 | 510 | P (); |
4f2689f4 UD |
511 | return x; |
512 | } | |
513 | ||
514 | TYPE | |
515 | (F(sinh)) (TYPE x) | |
516 | { | |
517 | ++count; | |
1c298d08 | 518 | P (); |
4f2689f4 UD |
519 | return x; |
520 | } | |
521 | ||
522 | TYPE | |
523 | (F(asinh)) (TYPE x) | |
524 | { | |
525 | ++count; | |
1c298d08 | 526 | P (); |
4f2689f4 UD |
527 | return x; |
528 | } | |
529 | ||
530 | TYPE | |
531 | (F(tanh)) (TYPE x) | |
532 | { | |
533 | ++count; | |
1c298d08 | 534 | P (); |
4f2689f4 UD |
535 | return x; |
536 | } | |
537 | ||
538 | TYPE | |
539 | (F(atanh)) (TYPE x) | |
540 | { | |
541 | ++count; | |
1c298d08 | 542 | P (); |
4f2689f4 UD |
543 | return x; |
544 | } | |
545 | ||
546 | TYPE | |
547 | (F(exp)) (TYPE x) | |
548 | { | |
549 | ++count; | |
1c298d08 | 550 | P (); |
4f2689f4 UD |
551 | return x; |
552 | } | |
553 | ||
554 | TYPE | |
555 | (F(log)) (TYPE x) | |
556 | { | |
557 | ++count; | |
1c298d08 | 558 | P (); |
4f2689f4 UD |
559 | return x; |
560 | } | |
561 | ||
562 | TYPE | |
563 | (F(log10)) (TYPE x) | |
564 | { | |
565 | ++count; | |
1c298d08 | 566 | P (); |
4f2689f4 UD |
567 | return x; |
568 | } | |
569 | ||
570 | TYPE | |
571 | (F(ldexp)) (TYPE x, int y) | |
572 | { | |
573 | ++count; | |
1c298d08 UD |
574 | P (); |
575 | return x + y; | |
4f2689f4 UD |
576 | } |
577 | ||
578 | TYPE | |
579 | (F(frexp)) (TYPE x, int *y) | |
580 | { | |
581 | ++count; | |
1c298d08 UD |
582 | P (); |
583 | return x + *y; | |
4f2689f4 UD |
584 | } |
585 | ||
586 | TYPE | |
587 | (F(expm1)) (TYPE x) | |
588 | { | |
589 | ++count; | |
1c298d08 | 590 | P (); |
4f2689f4 UD |
591 | return x; |
592 | } | |
593 | ||
594 | TYPE | |
595 | (F(log1p)) (TYPE x) | |
596 | { | |
597 | ++count; | |
1c298d08 | 598 | P (); |
4f2689f4 UD |
599 | return x; |
600 | } | |
601 | ||
602 | TYPE | |
603 | (F(logb)) (TYPE x) | |
604 | { | |
605 | ++count; | |
1c298d08 | 606 | P (); |
4f2689f4 UD |
607 | return x; |
608 | } | |
609 | ||
610 | TYPE | |
611 | (F(exp2)) (TYPE x) | |
612 | { | |
613 | ++count; | |
1c298d08 | 614 | P (); |
4f2689f4 UD |
615 | return x; |
616 | } | |
617 | ||
618 | TYPE | |
619 | (F(log2)) (TYPE x) | |
620 | { | |
621 | ++count; | |
1c298d08 | 622 | P (); |
4f2689f4 UD |
623 | return x; |
624 | } | |
625 | ||
626 | TYPE | |
627 | (F(pow)) (TYPE x, TYPE y) | |
628 | { | |
629 | ++count; | |
1c298d08 | 630 | P (); |
4f2689f4 UD |
631 | return x + y; |
632 | } | |
633 | ||
634 | TYPE | |
635 | (F(sqrt)) (TYPE x) | |
636 | { | |
637 | ++count; | |
1c298d08 | 638 | P (); |
4f2689f4 UD |
639 | return x; |
640 | } | |
641 | ||
642 | TYPE | |
643 | (F(hypot)) (TYPE x, TYPE y) | |
644 | { | |
645 | ++count; | |
1c298d08 | 646 | P (); |
4f2689f4 UD |
647 | return x + y; |
648 | } | |
649 | ||
650 | TYPE | |
651 | (F(cbrt)) (TYPE x) | |
652 | { | |
653 | ++count; | |
1c298d08 | 654 | P (); |
4f2689f4 UD |
655 | return x; |
656 | } | |
657 | ||
658 | TYPE | |
659 | (F(ceil)) (TYPE x) | |
660 | { | |
661 | ++count; | |
1c298d08 | 662 | P (); |
4f2689f4 UD |
663 | return x; |
664 | } | |
665 | ||
666 | TYPE | |
667 | (F(fabs)) (TYPE x) | |
668 | { | |
669 | ++count; | |
1c298d08 | 670 | P (); |
4f2689f4 UD |
671 | return x; |
672 | } | |
673 | ||
674 | TYPE | |
675 | (F(floor)) (TYPE x) | |
676 | { | |
677 | ++count; | |
1c298d08 | 678 | P (); |
4f2689f4 UD |
679 | return x; |
680 | } | |
681 | ||
682 | TYPE | |
683 | (F(fmod)) (TYPE x, TYPE y) | |
684 | { | |
685 | ++count; | |
1c298d08 | 686 | P (); |
4f2689f4 UD |
687 | return x + y; |
688 | } | |
689 | ||
690 | TYPE | |
691 | (F(nearbyint)) (TYPE x) | |
692 | { | |
693 | ++count; | |
1c298d08 | 694 | P (); |
4f2689f4 UD |
695 | return x; |
696 | } | |
697 | ||
698 | TYPE | |
699 | (F(round)) (TYPE x) | |
700 | { | |
701 | ++count; | |
1c298d08 | 702 | P (); |
4f2689f4 UD |
703 | return x; |
704 | } | |
705 | ||
41c67149 JM |
706 | TYPE |
707 | (F(roundeven)) (TYPE x) | |
708 | { | |
709 | ++count; | |
710 | P (); | |
711 | return x; | |
712 | } | |
713 | ||
4f2689f4 UD |
714 | TYPE |
715 | (F(trunc)) (TYPE x) | |
716 | { | |
717 | ++count; | |
1c298d08 | 718 | P (); |
4f2689f4 UD |
719 | return x; |
720 | } | |
721 | ||
722 | TYPE | |
723 | (F(remquo)) (TYPE x, TYPE y, int *i) | |
724 | { | |
725 | ++count; | |
1c298d08 UD |
726 | P (); |
727 | return x + y + *i; | |
4f2689f4 UD |
728 | } |
729 | ||
730 | long int | |
731 | (F(lrint)) (TYPE x) | |
732 | { | |
733 | ++count; | |
1c298d08 | 734 | P (); |
4f2689f4 UD |
735 | return x; |
736 | } | |
737 | ||
738 | long int | |
739 | (F(lround)) (TYPE x) | |
740 | { | |
741 | ++count; | |
1c298d08 | 742 | P (); |
4f2689f4 UD |
743 | return x; |
744 | } | |
745 | ||
746 | long long int | |
747 | (F(llrint)) (TYPE x) | |
748 | { | |
749 | ++count; | |
1c298d08 | 750 | P (); |
4f2689f4 UD |
751 | return x; |
752 | } | |
753 | ||
754 | long long int | |
755 | (F(llround)) (TYPE x) | |
756 | { | |
757 | ++count; | |
1c298d08 | 758 | P (); |
4f2689f4 UD |
759 | return x; |
760 | } | |
761 | ||
423c2b9d JM |
762 | intmax_t |
763 | (F(fromfp)) (TYPE x, int round, unsigned int width) | |
764 | { | |
765 | ++count; | |
766 | P (); | |
767 | return x; | |
768 | } | |
769 | ||
770 | intmax_t | |
771 | (F(fromfpx)) (TYPE x, int round, unsigned int width) | |
772 | { | |
773 | ++count; | |
774 | P (); | |
775 | return x; | |
776 | } | |
777 | ||
778 | uintmax_t | |
779 | (F(ufromfp)) (TYPE x, int round, unsigned int width) | |
780 | { | |
781 | ++count; | |
782 | P (); | |
783 | return x; | |
784 | } | |
785 | ||
786 | uintmax_t | |
787 | (F(ufromfpx)) (TYPE x, int round, unsigned int width) | |
788 | { | |
789 | ++count; | |
790 | P (); | |
791 | return x; | |
792 | } | |
793 | ||
4f2689f4 UD |
794 | TYPE |
795 | (F(erf)) (TYPE x) | |
796 | { | |
797 | ++count; | |
1c298d08 | 798 | P (); |
4f2689f4 UD |
799 | return x; |
800 | } | |
801 | ||
802 | TYPE | |
803 | (F(erfc)) (TYPE x) | |
804 | { | |
805 | ++count; | |
1c298d08 | 806 | P (); |
4f2689f4 UD |
807 | return x; |
808 | } | |
809 | ||
810 | TYPE | |
811 | (F(tgamma)) (TYPE x) | |
812 | { | |
813 | ++count; | |
1c298d08 | 814 | P (); |
4f2689f4 UD |
815 | return x; |
816 | } | |
817 | ||
818 | TYPE | |
819 | (F(lgamma)) (TYPE x) | |
820 | { | |
821 | ++count; | |
1c298d08 | 822 | P (); |
4f2689f4 UD |
823 | return x; |
824 | } | |
825 | ||
826 | TYPE | |
827 | (F(rint)) (TYPE x) | |
828 | { | |
829 | ++count; | |
1c298d08 | 830 | P (); |
4f2689f4 UD |
831 | return x; |
832 | } | |
833 | ||
834 | TYPE | |
835 | (F(nextafter)) (TYPE x, TYPE y) | |
836 | { | |
837 | ++count; | |
1c298d08 | 838 | P (); |
4f2689f4 UD |
839 | return x + y; |
840 | } | |
841 | ||
41a359e2 RS |
842 | TYPE |
843 | (F(nextdown)) (TYPE x) | |
844 | { | |
845 | ++count; | |
846 | P (); | |
847 | return x; | |
848 | } | |
849 | ||
4f2689f4 UD |
850 | TYPE |
851 | (F(nexttoward)) (TYPE x, long double y) | |
852 | { | |
853 | ++count; | |
1c298d08 UD |
854 | P (); |
855 | return x + y; | |
4f2689f4 UD |
856 | } |
857 | ||
41a359e2 RS |
858 | TYPE |
859 | (F(nextup)) (TYPE x) | |
860 | { | |
861 | ++count; | |
862 | P (); | |
863 | return x; | |
864 | } | |
865 | ||
4f2689f4 UD |
866 | TYPE |
867 | (F(remainder)) (TYPE x, TYPE y) | |
868 | { | |
869 | ++count; | |
1c298d08 | 870 | P (); |
4f2689f4 UD |
871 | return x + y; |
872 | } | |
873 | ||
874 | TYPE | |
875 | (F(scalb)) (TYPE x, TYPE y) | |
876 | { | |
877 | ++count; | |
1c298d08 | 878 | P (); |
4f2689f4 UD |
879 | return x + y; |
880 | } | |
881 | ||
882 | TYPE | |
883 | (F(scalbn)) (TYPE x, int y) | |
884 | { | |
885 | ++count; | |
1c298d08 UD |
886 | P (); |
887 | return x + y; | |
4f2689f4 UD |
888 | } |
889 | ||
890 | TYPE | |
891 | (F(scalbln)) (TYPE x, long int y) | |
892 | { | |
893 | ++count; | |
1c298d08 UD |
894 | P (); |
895 | return x + y; | |
4f2689f4 UD |
896 | } |
897 | ||
898 | int | |
899 | (F(ilogb)) (TYPE x) | |
900 | { | |
901 | ++count; | |
1c298d08 | 902 | P (); |
4f2689f4 UD |
903 | return x; |
904 | } | |
905 | ||
55a38f82 JM |
906 | long int |
907 | (F(llogb)) (TYPE x) | |
908 | { | |
909 | ++count; | |
910 | P (); | |
911 | return x; | |
912 | } | |
913 | ||
4f2689f4 UD |
914 | TYPE |
915 | (F(fdim)) (TYPE x, TYPE y) | |
916 | { | |
917 | ++count; | |
1c298d08 | 918 | P (); |
4f2689f4 UD |
919 | return x + y; |
920 | } | |
921 | ||
922 | TYPE | |
923 | (F(fmin)) (TYPE x, TYPE y) | |
924 | { | |
925 | ++count; | |
1c298d08 | 926 | P (); |
4f2689f4 UD |
927 | return x + y; |
928 | } | |
929 | ||
930 | TYPE | |
931 | (F(fmax)) (TYPE x, TYPE y) | |
525f8039 JM |
932 | { |
933 | ++count; | |
934 | P (); | |
935 | return x + y; | |
936 | } | |
937 | ||
938 | TYPE | |
939 | (F(fminmag)) (TYPE x, TYPE y) | |
940 | { | |
941 | ++count; | |
942 | P (); | |
943 | return x + y; | |
944 | } | |
945 | ||
946 | TYPE | |
947 | (F(fmaxmag)) (TYPE x, TYPE y) | |
4f2689f4 UD |
948 | { |
949 | ++count; | |
1c298d08 | 950 | P (); |
4f2689f4 UD |
951 | return x + y; |
952 | } | |
953 | ||
954 | TYPE | |
955 | (F(fma)) (TYPE x, TYPE y, TYPE z) | |
956 | { | |
957 | ++count; | |
1c298d08 | 958 | P (); |
4f2689f4 UD |
959 | return x + y + z; |
960 | } | |
961 | ||
5e9d98a3 JM |
962 | int |
963 | (F(totalorder)) (TYPE x, TYPE y) | |
964 | { | |
965 | ++count; | |
966 | P (); | |
967 | return x + y; | |
968 | } | |
969 | ||
cc6a8d74 JM |
970 | int |
971 | (F(totalordermag)) (TYPE x, TYPE y) | |
972 | { | |
973 | ++count; | |
974 | P (); | |
975 | return x + y; | |
976 | } | |
977 | ||
1c298d08 UD |
978 | complex TYPE |
979 | (F(cacos)) (complex TYPE x) | |
980 | { | |
981 | ++ccount; | |
982 | P (); | |
983 | return x; | |
984 | } | |
985 | ||
986 | complex TYPE | |
987 | (F(casin)) (complex TYPE x) | |
988 | { | |
989 | ++ccount; | |
990 | P (); | |
991 | return x; | |
992 | } | |
993 | ||
994 | complex TYPE | |
995 | (F(catan)) (complex TYPE x) | |
996 | { | |
997 | ++ccount; | |
998 | P (); | |
999 | return x; | |
1000 | } | |
1001 | ||
1002 | complex TYPE | |
1003 | (F(ccos)) (complex TYPE x) | |
1004 | { | |
1005 | ++ccount; | |
1006 | P (); | |
1007 | return x; | |
1008 | } | |
1009 | ||
1010 | complex TYPE | |
1011 | (F(csin)) (complex TYPE x) | |
1012 | { | |
1013 | ++ccount; | |
1014 | P (); | |
1015 | return x; | |
1016 | } | |
1017 | ||
1018 | complex TYPE | |
1019 | (F(ctan)) (complex TYPE x) | |
1020 | { | |
1021 | ++ccount; | |
1022 | P (); | |
1023 | return x; | |
1024 | } | |
1025 | ||
1026 | complex TYPE | |
1027 | (F(cacosh)) (complex TYPE x) | |
1028 | { | |
1029 | ++ccount; | |
1030 | P (); | |
1031 | return x; | |
1032 | } | |
1033 | ||
1034 | complex TYPE | |
1035 | (F(casinh)) (complex TYPE x) | |
1036 | { | |
1037 | ++ccount; | |
1038 | P (); | |
1039 | return x; | |
1040 | } | |
1041 | ||
1042 | complex TYPE | |
1043 | (F(catanh)) (complex TYPE x) | |
1044 | { | |
1045 | ++ccount; | |
1046 | P (); | |
1047 | return x; | |
1048 | } | |
1049 | ||
1050 | complex TYPE | |
1051 | (F(ccosh)) (complex TYPE x) | |
1052 | { | |
1053 | ++ccount; | |
1054 | P (); | |
1055 | return x; | |
1056 | } | |
1057 | ||
1058 | complex TYPE | |
1059 | (F(csinh)) (complex TYPE x) | |
1060 | { | |
1061 | ++ccount; | |
1062 | P (); | |
1063 | return x; | |
1064 | } | |
1065 | ||
1066 | complex TYPE | |
1067 | (F(ctanh)) (complex TYPE x) | |
1068 | { | |
1069 | ++ccount; | |
1070 | P (); | |
1071 | return x; | |
1072 | } | |
1073 | ||
1074 | complex TYPE | |
1075 | (F(cexp)) (complex TYPE x) | |
1076 | { | |
1077 | ++ccount; | |
1078 | P (); | |
1079 | return x; | |
1080 | } | |
1081 | ||
1082 | complex TYPE | |
1083 | (F(clog)) (complex TYPE x) | |
1084 | { | |
1085 | ++ccount; | |
1086 | P (); | |
1087 | return x; | |
1088 | } | |
1089 | ||
1090 | complex TYPE | |
1091 | (F(csqrt)) (complex TYPE x) | |
1092 | { | |
1093 | ++ccount; | |
1094 | P (); | |
1095 | return x; | |
1096 | } | |
1097 | ||
1098 | complex TYPE | |
1099 | (F(cpow)) (complex TYPE x, complex TYPE y) | |
1100 | { | |
1101 | ++ccount; | |
1102 | P (); | |
1103 | return x + y; | |
1104 | } | |
1105 | ||
1106 | TYPE | |
1107 | (F(cabs)) (complex TYPE x) | |
1108 | { | |
1109 | ++ccount; | |
1110 | P (); | |
1111 | return x; | |
1112 | } | |
1113 | ||
1114 | TYPE | |
1115 | (F(carg)) (complex TYPE x) | |
1116 | { | |
1117 | ++ccount; | |
1118 | P (); | |
1119 | return x; | |
1120 | } | |
1121 | ||
1122 | TYPE | |
1123 | (F(creal)) (complex TYPE x) | |
1124 | { | |
1125 | ++ccount; | |
1126 | P (); | |
1127 | return __real__ x; | |
1128 | } | |
1129 | ||
1130 | TYPE | |
1131 | (F(cimag)) (complex TYPE x) | |
1132 | { | |
1133 | ++ccount; | |
1134 | P (); | |
1135 | return __imag__ x; | |
1136 | } | |
1137 | ||
1138 | complex TYPE | |
1139 | (F(conj)) (complex TYPE x) | |
1140 | { | |
1141 | ++ccount; | |
1142 | P (); | |
1143 | return x; | |
1144 | } | |
1145 | ||
1146 | complex TYPE | |
1147 | (F(cproj)) (complex TYPE x) | |
1148 | { | |
1149 | ++ccount; | |
1150 | P (); | |
1151 | return x; | |
1152 | } | |
1153 | ||
4f2689f4 UD |
1154 | #undef F |
1155 | #undef TYPE | |
1156 | #undef count | |
1c298d08 | 1157 | #undef ccount |
304d7abf | 1158 | #undef TEST_INT |
4f2689f4 | 1159 | #endif |