1 # Begin of automatic generation
4 Test "acosh (7) == 2.63391579384963341725009269461593689":
9 Test "asinh (0.75) == 0.693147180559945309417232121458176568":
14 Test "atan2 (0.390625, .00029) == 1.57005392693128974780151246612928941":
17 Test "atan2 (1.390625, 0.9296875) == 0.981498387184244311516296577615519772":
22 Test "atanh (0.75) == 0.972955074527656652552676371721589865":
27 Test "Imaginary part of: cacos (+0 + 0.5 i) == pi/2 - 0.4812118250596034474977589134243684231352 i":
30 Test "Imaginary part of: cacos (+0 + 1.0 i) == pi/2 - 0.8813735870195430252326093249797923090282 i":
37 Test "Imaginary part of: cacos (+0 + 1.5 i) == pi/2 - 1.194763217287109304111930828519090523536 i":
42 Test "Imaginary part of: cacos (+0 - 0.5 i) == pi/2 + 0.4812118250596034474977589134243684231352 i":
45 Test "Imaginary part of: cacos (+0 - 1.0 i) == pi/2 + 0.8813735870195430252326093249797923090282 i":
50 Test "Imaginary part of: cacos (+0 - 1.5 i) == pi/2 + 1.194763217287109304111930828519090523536 i":
53 Test "Imaginary part of: cacos (-0 + 0.5 i) == pi/2 - 0.4812118250596034474977589134243684231352 i":
56 Test "Imaginary part of: cacos (-0 + 1.0 i) == pi/2 - 0.8813735870195430252326093249797923090282 i":
63 Test "Imaginary part of: cacos (-0 + 1.5 i) == pi/2 - 1.194763217287109304111930828519090523536 i":
68 Test "Imaginary part of: cacos (-0 - 0.5 i) == pi/2 + 0.4812118250596034474977589134243684231352 i":
71 Test "Imaginary part of: cacos (-0 - 1.0 i) == pi/2 + 0.8813735870195430252326093249797923090282 i":
76 Test "Imaginary part of: cacos (-0 - 1.5 i) == pi/2 + 1.194763217287109304111930828519090523536 i":
79 Test "Imaginary part of: cacos (-1.5 + +0 i) == pi - 0.9624236501192068949955178268487368462704 i":
84 Test "Imaginary part of: cacos (-1.5 - 0 i) == pi + 0.9624236501192068949955178268487368462704 i":
87 Test "Real part of: cacos (0.5 + +0 i) == 1.047197551196597746154214461093167628066 - 0 i":
92 Test "Real part of: cacos (0.5 - 0 i) == 1.047197551196597746154214461093167628066 + +0 i":
97 Test "Real part of: cacos (0.75 + 1.25 i) == 1.11752014915610270578240049553777969 - 1.13239363160530819522266333696834467 i":
102 Test "Imaginary part of: cacos (0.75 + 1.25 i) == 1.11752014915610270578240049553777969 - 1.13239363160530819522266333696834467 i":
107 Test "Imaginary part of: cacos (1.5 + +0 i) == +0 - 0.9624236501192068949955178268487368462704 i":
112 Test "Imaginary part of: cacos (1.5 - 0 i) == +0 + 0.9624236501192068949955178268487368462704 i":
117 Test "Real part of: cacosh (+0 + 0.5 i) == 0.4812118250596034474977589134243684231352 + pi/2 i":
120 Test "Real part of: cacosh (+0 + 1.0 i) == 0.8813735870195430252326093249797923090282 + pi/2 i":
125 Test "Real part of: cacosh (+0 + 1.5 i) == 1.194763217287109304111930828519090523536 + pi/2 i":
128 Test "Real part of: cacosh (+0 - 0.5 i) == 0.4812118250596034474977589134243684231352 - pi/2 i":
131 Test "Real part of: cacosh (+0 - 1.0 i) == 0.8813735870195430252326093249797923090282 - pi/2 i":
136 Test "Real part of: cacosh (+0 - 1.5 i) == 1.194763217287109304111930828519090523536 - pi/2 i":
139 Test "Real part of: cacosh (-0 + 0.5 i) == 0.4812118250596034474977589134243684231352 + pi/2 i":
142 Test "Real part of: cacosh (-0 + 1.0 i) == 0.8813735870195430252326093249797923090282 + pi/2 i":
147 Test "Real part of: cacosh (-0 + 1.5 i) == 1.194763217287109304111930828519090523536 + pi/2 i":
150 Test "Real part of: cacosh (-0 - 0.5 i) == 0.4812118250596034474977589134243684231352 - pi/2 i":
153 Test "Real part of: cacosh (-0 - 1.0 i) == 0.8813735870195430252326093249797923090282 - pi/2 i":
158 Test "Real part of: cacosh (-0 - 1.5 i) == 1.194763217287109304111930828519090523536 - pi/2 i":
161 Test "Imaginary part of: cacosh (-0.5 + +0 i) == +0 + 2.094395102393195492308428922186335256131 i":
166 Test "Imaginary part of: cacosh (-0.5 - 0 i) == +0 - 2.094395102393195492308428922186335256131 i":
171 Test "Real part of: cacosh (-1.5 + +0 i) == 0.9624236501192068949955178268487368462704 + pi i":
174 Test "Real part of: cacosh (-1.5 - 0 i) == 0.9624236501192068949955178268487368462704 - pi i":
177 Test "Real part of: cacosh (-2 - 3 i) == 1.9833870299165354323470769028940395 - 2.1414491111159960199416055713254211 i":
184 Test "Imaginary part of: cacosh (-2 - 3 i) == 1.9833870299165354323470769028940395 - 2.1414491111159960199416055713254211 i":
189 Test "Real part of: cacosh (0.75 + 1.25 i) == 1.13239363160530819522266333696834467 + 1.11752014915610270578240049553777969 i":
192 Test "Imaginary part of: cacosh (0.75 + 1.25 i) == 1.13239363160530819522266333696834467 + 1.11752014915610270578240049553777969 i":
195 Test "Real part of: cacosh (1.5 + +0 i) == 0.9624236501192068949955178268487368462704 + +0 i":
198 Test "Real part of: cacosh (1.5 - 0 i) == 0.9624236501192068949955178268487368462704 - 0 i":
203 Test "Imaginary part of: casin (+0 + 0.5 i) == +0 + 0.4812118250596034474977589134243684231352 i":
206 Test "Imaginary part of: casin (+0 + 1.0 i) == +0 + 0.8813735870195430252326093249797923090282 i":
213 Test "Imaginary part of: casin (+0 + 1.5 i) == +0 + 1.194763217287109304111930828519090523536 i":
218 Test "Imaginary part of: casin (+0 - 0.5 i) == +0 - 0.4812118250596034474977589134243684231352 i":
221 Test "Imaginary part of: casin (+0 - 1.0 i) == +0 - 0.8813735870195430252326093249797923090282 i":
226 Test "Imaginary part of: casin (+0 - 1.5 i) == +0 - 1.194763217287109304111930828519090523536 i":
229 Test "Imaginary part of: casin (-0 + 0.5 i) == -0 + 0.4812118250596034474977589134243684231352 i":
232 Test "Imaginary part of: casin (-0 + 1.0 i) == -0 + 0.8813735870195430252326093249797923090282 i":
239 Test "Imaginary part of: casin (-0 + 1.5 i) == -0 + 1.194763217287109304111930828519090523536 i":
244 Test "Imaginary part of: casin (-0 - 0.5 i) == -0 - 0.4812118250596034474977589134243684231352 i":
247 Test "Imaginary part of: casin (-0 - 1.0 i) == -0 - 0.8813735870195430252326093249797923090282 i":
252 Test "Imaginary part of: casin (-0 - 1.5 i) == -0 - 1.194763217287109304111930828519090523536 i":
255 Test "Imaginary part of: casin (-1.5 + +0 i) == -pi/2 + 0.9624236501192068949955178268487368462704 i":
260 Test "Imaginary part of: casin (-1.5 - 0 i) == -pi/2 - 0.9624236501192068949955178268487368462704 i":
263 Test "Real part of: casin (0.75 + 1.25 i) == 0.453276177638793913448921196101971749 + 1.13239363160530819522266333696834467 i":
270 Test "Imaginary part of: casin (0.75 + 1.25 i) == 0.453276177638793913448921196101971749 + 1.13239363160530819522266333696834467 i":
275 Test "Imaginary part of: casin (1.5 + +0 i) == pi/2 + 0.9624236501192068949955178268487368462704 i":
280 Test "Imaginary part of: casin (1.5 - 0 i) == pi/2 - 0.9624236501192068949955178268487368462704 i":
285 Test "Real part of: casinh (+0 + 1.5 i) == 0.9624236501192068949955178268487368462704 + pi/2 i":
288 Test "Real part of: casinh (+0 - 1.5 i) == 0.9624236501192068949955178268487368462704 - pi/2 i":
291 Test "Real part of: casinh (-0 + 1.5 i) == -0.9624236501192068949955178268487368462704 + pi/2 i":
296 Test "Real part of: casinh (-0 - 1.5 i) == -0.9624236501192068949955178268487368462704 - pi/2 i":
301 Test "Real part of: casinh (-0.5 + +0 i) == -0.4812118250596034474977589134243684231352 + +0 i":
304 Test "Real part of: casinh (-0.5 - 0 i) == -0.4812118250596034474977589134243684231352 - 0 i":
307 Test "Real part of: casinh (-1.0 + +0 i) == -0.8813735870195430252326093249797923090282 + +0 i":
314 Test "Real part of: casinh (-1.0 - 0 i) == -0.8813735870195430252326093249797923090282 - 0 i":
321 Test "Real part of: casinh (-1.5 + +0 i) == -1.194763217287109304111930828519090523536 + +0 i":
326 Test "Real part of: casinh (-1.5 - 0 i) == -1.194763217287109304111930828519090523536 - 0 i":
331 Test "Real part of: casinh (-2 - 3 i) == -1.9686379257930962917886650952454982 - 0.96465850440760279204541105949953237 i":
338 Test "Imaginary part of: casinh (-2 - 3 i) == -1.9686379257930962917886650952454982 - 0.96465850440760279204541105949953237 i":
345 Test "Real part of: casinh (0.5 + +0 i) == 0.4812118250596034474977589134243684231352 + +0 i":
348 Test "Real part of: casinh (0.5 - 0 i) == 0.4812118250596034474977589134243684231352 - 0 i":
351 Test "Real part of: casinh (0.75 + 1.25 i) == 1.03171853444778027336364058631006594 + 0.911738290968487636358489564316731207 i":
356 Test "Imaginary part of: casinh (0.75 + 1.25 i) == 1.03171853444778027336364058631006594 + 0.911738290968487636358489564316731207 i":
363 Test "Real part of: casinh (1.0 + +0 i) == 0.8813735870195430252326093249797923090282 + +0 i":
368 Test "Real part of: casinh (1.0 - 0 i) == 0.8813735870195430252326093249797923090282 - 0 i":
373 Test "Real part of: casinh (1.5 + +0 i) == 1.194763217287109304111930828519090523536 + +0 i":
376 Test "Real part of: casinh (1.5 - 0 i) == 1.194763217287109304111930828519090523536 - 0 i":
381 Test "Imaginary part of: catan (-2 - 3 i) == -1.4099210495965755225306193844604208 - 0.22907268296853876629588180294200276 i":
386 Test "Real part of: catan (0.75 + 1.25 i) == 1.10714871779409050301706546017853704 + 0.549306144334054845697622618461262852 i":
391 Test "Real part of: catanh (-2 - 3 i) == -0.14694666622552975204743278515471595 - 1.3389725222944935611241935759091443 i":
398 Test "cbrt (-0.001) == -0.1":
401 Test "cbrt (0.9921875) == 0.997389022060725270579075195353955217":
406 Test "Real part of: ccos (-2 - 3 i) == -4.18962569096880723013255501961597373 - 9.10922789375533659797919726277886212 i":
409 Test "Imaginary part of: ccos (-2 - 3 i) == -4.18962569096880723013255501961597373 - 9.10922789375533659797919726277886212 i":
412 Test "Real part of: ccos (0.75 + 1.25 i) == 1.38173873063425888530729933139078645 - 1.09193013555397466170919531722024128 i":
417 Test "Imaginary part of: ccos (0.75 + 1.25 i) == 1.38173873063425888530729933139078645 - 1.09193013555397466170919531722024128 i":
424 Test "Real part of: ccosh (-2 - 3 i) == -3.72454550491532256547397070325597253 + 0.511822569987384608834463849801875634 i":
427 Test "Imaginary part of: ccosh (-2 - 3 i) == -3.72454550491532256547397070325597253 + 0.511822569987384608834463849801875634 i":
432 Test "Real part of: ccosh (0.75 + 1.25 i) == 0.408242591877968807788852146397499084 + 0.780365930845853240391326216300863152 i":
435 Test "Imaginary part of: ccosh (0.75 + 1.25 i) == 0.408242591877968807788852146397499084 + 0.780365930845853240391326216300863152 i":
442 Test "Real part of: cexp (-10000 + 0x1p16383 i) == 1.045876464564882298442774542991176546722e-4343 + 4.421154026488516836023811173959413420548e-4344 i":
445 Test "Real part of: cexp (-2.0 - 3.0 i) == -0.13398091492954261346140525546115575 - 0.019098516261135196432576240858800925 i":
448 Test "Imaginary part of: cexp (-2.0 - 3.0 i) == -0.13398091492954261346140525546115575 - 0.019098516261135196432576240858800925 i":
451 Test "Real part of: cexp (0.75 + 1.25 i) == 0.667537446429131586942201977015932112 + 2.00900045494094876258347228145863909 i":
454 Test "Imaginary part of: cexp (0.75 + 1.25 i) == 0.667537446429131586942201977015932112 + 2.00900045494094876258347228145863909 i":
459 Test "Imaginary part of: cexp (50 + 0x1p127 i) == 4.053997150228616856622417636046265337193e21 + 3.232070315463388524466674772633810238819e21 i":
464 Test "Real part of: clog (0.75 + 1.25 i) == 0.376885901188190075998919126749298416 + 1.03037682652431246378774332703115153 i":
469 Test "Imaginary part of: clog (0.75 + 1.25 i) == 0.376885901188190075998919126749298416 + 1.03037682652431246378774332703115153 i":
472 Test "Real part of: clog (0x1.fp+16383 + 0x1p+16383 i) == 11356.60974243783798653123798337822335902 + 0.4764674194737066993385333770295162295856 i":
475 Test "Imaginary part of: clog (0x1.fp+16383 + 0x1p+16383 i) == 11356.60974243783798653123798337822335902 + 0.4764674194737066993385333770295162295856 i":
480 Test "Imaginary part of: clog10 (-0 + inf i) == inf + pi/2*log10(e) i":
483 Test "Imaginary part of: clog10 (-0 - inf i) == inf - pi/2*log10(e) i":
486 Test "Real part of: clog10 (-2 - 3 i) == 0.556971676153418384603252578971164214 - 0.937554462986374708541507952140189646 i":
489 Test "Imaginary part of: clog10 (-3 + inf i) == inf + pi/2*log10(e) i":
492 Test "Imaginary part of: clog10 (-3 - inf i) == inf - pi/2*log10(e) i":
495 Test "Imaginary part of: clog10 (-inf + 0 i) == inf + pi*log10(e) i":
498 Test "Imaginary part of: clog10 (-inf + 1 i) == inf + pi*log10(e) i":
501 Test "Imaginary part of: clog10 (-inf + inf i) == inf + 3/4 pi*log10(e) i":
504 Test "Imaginary part of: clog10 (-inf - 0 i) == inf - pi*log10(e) i":
507 Test "Imaginary part of: clog10 (-inf - 1 i) == inf - pi*log10(e) i":
510 Test "Imaginary part of: clog10 (0 + inf i) == inf + pi/2*log10(e) i":
513 Test "Imaginary part of: clog10 (0 - inf i) == inf - pi/2*log10(e) i":
516 Test "Real part of: clog10 (0.75 + 1.25 i) == 0.163679467193165171449476605077428975 + 0.447486970040493067069984724340855636 i":
523 Test "Imaginary part of: clog10 (0.75 + 1.25 i) == 0.163679467193165171449476605077428975 + 0.447486970040493067069984724340855636 i":
528 Test "Imaginary part of: clog10 (0x1p-16440 + 0x1p-16441 i) == -4948.884673709346821106688037612752099609 + 0.2013595981366865710389502301937289472543 i":
531 Test "Imaginary part of: clog10 (3 + inf i) == inf + pi/2*log10(e) i":
534 Test "Imaginary part of: clog10 (3 - inf i) == inf - pi/2*log10(e) i":
537 Test "Imaginary part of: clog10 (inf + inf i) == inf + pi/4*log10(e) i":
540 Test "Imaginary part of: clog10 (inf - inf i) == inf - pi/4*log10(e) i":
545 Test "cos (M_PI_6l * 2.0) == 0.5":
552 Test "cos (M_PI_6l * 4.0) == -0.5":
559 Test "cos (pi/2) == 0":
568 Test "cos_downward (1) == 0.5403023058681397174009366074429766037323":
573 Test "cos_downward (10) == -0.8390715290764524522588639478240648345199":
578 Test "cos_downward (3) == -0.9899924966004454572715727947312613023937":
581 Test "cos_downward (4) == -0.6536436208636119146391681830977503814241":
586 Test "cos_downward (5) == 0.2836621854632262644666391715135573083344":
589 Test "cos_downward (7) == 0.7539022543433046381411975217191820122183":
594 Test "cos_downward (8) == -0.1455000338086135258688413818311946826093":
597 Test "cos_downward (9) == -0.9111302618846769883682947111811653112463":
606 Test "cos_towardzero (1) == 0.5403023058681397174009366074429766037323":
611 Test "cos_towardzero (10) == -0.8390715290764524522588639478240648345199":
614 Test "cos_towardzero (2) == -0.4161468365471423869975682295007621897660":
621 Test "cos_towardzero (3) == -0.9899924966004454572715727947312613023937":
626 Test "cos_towardzero (4) == -0.6536436208636119146391681830977503814241":
629 Test "cos_towardzero (5) == 0.2836621854632262644666391715135573083344":
632 Test "cos_towardzero (7) == 0.7539022543433046381411975217191820122183":
637 Test "cos_towardzero (8) == -0.1455000338086135258688413818311946826093":
644 Test "cos_upward (1) == 0.5403023058681397174009366074429766037323":
647 Test "cos_upward (10) == -0.8390715290764524522588639478240648345199":
650 Test "cos_upward (2) == -0.4161468365471423869975682295007621897660":
657 Test "cos_upward (3) == -0.9899924966004454572715727947312613023937":
662 Test "cos_upward (4) == -0.6536436208636119146391681830977503814241":
665 Test "cos_upward (5) == 0.2836621854632262644666391715135573083344":
670 Test "cos_upward (6) == 0.9601702866503660205456522979229244054519":
677 Test "cos_upward (7) == 0.7539022543433046381411975217191820122183":
680 Test "cos_upward (8) == -0.1455000338086135258688413818311946826093":
687 Test "cosh_downward (22) == 1792456423.065795780980053377632656584997":
692 Test "cosh_downward (23) == 4872401723.124451300068625740569997090344":
699 Test "cosh_downward (24) == 13244561064.92173614708845674912733665919":
706 Test "cosh_towardzero (22) == 1792456423.065795780980053377632656584997":
711 Test "cosh_towardzero (23) == 4872401723.124451300068625740569997090344":
718 Test "cosh_towardzero (24) == 13244561064.92173614708845674912733665919":
725 Test "cosh_upward (22) == 1792456423.065795780980053377632656584997":
728 Test "cosh_upward (24) == 13244561064.92173614708845674912733665919":
733 Test "Real part of: cpow (0.75 + 1.25 i, 0.0 + 1.0 i) == 0.331825439177608832276067945276730566 + 0.131338600281188544930936345230903032 i":
736 Test "Imaginary part of: cpow (0.75 + 1.25 i, 0.0 + 1.0 i) == 0.331825439177608832276067945276730566 + 0.131338600281188544930936345230903032 i":
741 Test "Real part of: cpow (0.75 + 1.25 i, 0.75 + 1.25 i) == 0.117506293914473555420279832210420483 + 0.346552747708338676483025352060418001 i":
746 Test "Imaginary part of: cpow (0.75 + 1.25 i, 0.75 + 1.25 i) == 0.117506293914473555420279832210420483 + 0.346552747708338676483025352060418001 i":
751 Test "Real part of: cpow (0.75 + 1.25 i, 1.0 + 0.0 i) == 0.75 + 1.25 i":
756 Test "Imaginary part of: cpow (0.75 + 1.25 i, 1.0 + 0.0 i) == 0.75 + 1.25 i":
761 Test "Real part of: cpow (0.75 + 1.25 i, 1.0 + 1.0 i) == 0.0846958290317209430433805274189191353 + 0.513285749182902449043287190519090481 i":
768 Test "Imaginary part of: cpow (0.75 + 1.25 i, 1.0 + 1.0 i) == 0.0846958290317209430433805274189191353 + 0.513285749182902449043287190519090481 i":
773 Test "Real part of: cpow (2 + 0 i, 10 + 0 i) == 1024.0 + 0.0 i":
776 Test "Real part of: cpow (2 + 3 i, 4 + 0 i) == -119.0 - 120.0 i":
783 Test "Imaginary part of: cpow (2 + 3 i, 4 + 0 i) == -119.0 - 120.0 i":
788 Test "Real part of: cpow (e + 0 i, 0 + 2 * M_PIl i) == 1.0 + 0.0 i":
791 Test "Imaginary part of: cpow (e + 0 i, 0 + 2 * M_PIl i) == 1.0 + 0.0 i":
800 Test "Real part of: csin (-2 - 3 i) == -9.15449914691142957346729954460983256 + 4.16890695996656435075481305885375484 i":
803 Test "Imaginary part of: csin (-2 - 3 i) == -9.15449914691142957346729954460983256 + 4.16890695996656435075481305885375484 i":
806 Test "Real part of: csin (0.75 + 1.25 i) == 1.28722291002649188575873510790565441 + 1.17210635989270256101081285116138863 i":
811 Test "Imaginary part of: csin (0.75 + 1.25 i) == 1.28722291002649188575873510790565441 + 1.17210635989270256101081285116138863 i":
816 Test "Real part of: csinh (-2 - 3 i) == 3.59056458998577995201256544779481679 - 0.530921086248519805267040090660676560 i":
819 Test "Imaginary part of: csinh (-2 - 3 i) == 3.59056458998577995201256544779481679 - 0.530921086248519805267040090660676560 i":
822 Test "Real part of: csinh (0.75 + 1.25 i) == 0.259294854551162779153349830618433028 + 1.22863452409509552219214606515777594 i":
827 Test "Imaginary part of: csinh (0.75 + 1.25 i) == 0.259294854551162779153349830618433028 + 1.22863452409509552219214606515777594 i":
832 Test "Real part of: csqrt (0x1.fffffffffffffp+1023 + 0x1.fffffffffffffp+1023 i) == 1.473094556905565378990473658199034571917e+154 + 6.101757441282702188537080005372547713595e+153 i":
835 Test "Imaginary part of: csqrt (0x1.fffffffffffffp+1023 + 0x1.fffffffffffffp+1023 i) == 1.473094556905565378990473658199034571917e+154 + 6.101757441282702188537080005372547713595e+153 i":
838 Test "Imaginary part of: csqrt (0x1.fffffffffffffp+1023 + 0x1p+1023 i) == 1.379778091031440685006200821918878702861e+154 + 3.257214233483129514781233066898042490248e+153 i":
841 Test "Imaginary part of: csqrt (0x1.fp+16383 + 0x1.fp+16383 i) == 1.179514222452201722651836720466795901016e+2466 + 4.885707879516577666702435054303191575148e+2465 i":
844 Test "Imaginary part of: csqrt (0x1p-1073 + 0x1p-1073 i) == 3.453664695497464982856905711457966660085e-162 + 1.430554756764195530630723976279903095110e-162 i":
847 Test "Imaginary part of: csqrt (0x1p-1074 + 0x1p-1074 i) == 2.442109726130830256743814843868934877597e-162 + 1.011554969366634726113090867589031782487e-162 i":
850 Test "Imaginary part of: csqrt (0x1p-147 + 0x1p-147 i) == 8.225610928685557596194006925540350401606e-23 + 3.407159605465907500737319471202779419102e-23 i":
853 Test "Imaginary part of: csqrt (0x1p-149 + 0x1p-149 i) == 4.112805464342778798097003462770175200803e-23 + 1.703579802732953750368659735601389709551e-23 i":
858 Test "Real part of: ctan (-2 - 3 i) == 0.376402564150424829275122113032269084e-2 - 1.00323862735360980144635859782192726 i":
863 Test "Imaginary part of: ctan (-2 - 3 i) == 0.376402564150424829275122113032269084e-2 - 1.00323862735360980144635859782192726 i":
866 Test "Real part of: ctan (0.75 + 1.25 i) == 0.160807785916206426725166058173438663 + 0.975363285031235646193581759755216379 i":
869 Test "Imaginary part of: ctan (0.75 + 1.25 i) == 0.160807785916206426725166058173438663 + 0.975363285031235646193581759755216379 i":
874 Test "Real part of: ctanh (-2 - 3 i) == -0.965385879022133124278480269394560686 + 0.988437503832249372031403430350121098e-2 i":
877 Test "Imaginary part of: ctanh (-2 - 3 i) == -0.965385879022133124278480269394560686 + 0.988437503832249372031403430350121098e-2 i":
880 Test "Imaginary part of: ctanh (0 + pi/4 i) == 0.0 + 1.0 i":
883 Test "Imaginary part of: ctanh (0.75 + 1.25 i) == 1.37260757053378320258048606571226857 + 0.385795952609750664177596760720790220 i":
892 Test "erfc (0.75) == 0.288844366346484868401062165408589223":
895 Test "erfc (0x1.f7303cp+1) == 2.705500297238986897105236321218861842255e-8":
898 Test "erfc (0x1.ffa002p+2) == 1.233585992097580296336099501489175967033e-29":
903 Test "erfc (0x1.ffffc8p+2) == 1.122671365033056305522366683719541099329e-29":
906 Test "erfc (1.25) == 0.0770998717435417698634765188027188596":
909 Test "erfc (2.0) == 0.00467773498104726583793074363274707139":
912 Test "erfc (4.125) == 0.542340079956506600531223408575531062e-8":
919 Test "exp_downward (1) == e":
922 Test "exp_downward (2) == e^2":
929 Test "exp_downward (3) == e^3":
938 Test "exp_towardzero (1) == e":
941 Test "exp_towardzero (2) == e^2":
948 Test "exp_towardzero (3) == e^3":
957 Test "exp_upward (1) == e":
964 Test "expm1 (1) == M_El - 1.0":
969 Test "gamma (-0.5) == log(2*sqrt(pi))":
972 Test "gamma (0.5) == log(sqrt(pi))":
975 Test "gamma (3) == M_LN2l":
980 Test "hypot (-0.7, -12.4) == 12.419742348374220601176836866763271":
983 Test "hypot (-0.7, 12.4) == 12.419742348374220601176836866763271":
986 Test "hypot (-12.4, -0.7) == 12.419742348374220601176836866763271":
989 Test "hypot (-12.4, 0.7) == 12.419742348374220601176836866763271":
992 Test "hypot (0.7, -12.4) == 12.419742348374220601176836866763271":
995 Test "hypot (0.7, 12.4) == 12.419742348374220601176836866763271":
998 Test "hypot (12.4, -0.7) == 12.419742348374220601176836866763271":
1001 Test "hypot (12.4, 0.7) == 12.419742348374220601176836866763271":
1006 Test "j0 (-0x1.001000001p+593) == -3.927269966354206207832593635798954916263e-90":
1009 Test "j0 (-4.0) == -3.9714980986384737228659076845169804197562E-1":
1014 Test "j0 (0.75) == 0.864242275166648623555731103820923211":
1017 Test "j0 (0x1.d7ce3ap+107) == 2.775523647291230802651040996274861694514e-17":
1020 Test "j0 (1.5) == 0.511827671735918128749051744283411720":
1023 Test "j0 (10.0) == -0.245935764451348335197760862485328754":
1026 Test "j0 (4.0) == -3.9714980986384737228659076845169804197562E-1":
1031 Test "j0 (8.0) == 0.171650807137553906090869407851972001":
1036 Test "j1 (-1.0) == -0.440050585744933515959682203718914913":
1039 Test "j1 (0x1.3ffp+74) == 1.818984347516051243459364437186082741567e-12":
1044 Test "j1 (1.0) == 0.440050585744933515959682203718914913":
1047 Test "j1 (1.5) == 0.557936507910099641990121213156089400":
1050 Test "j1 (10.0) == 0.0434727461688614366697487680258592883":
1055 Test "j1 (2.0) == 0.576724807756873387202448242269137087":
1058 Test "j1 (8.0) == 0.234636346853914624381276651590454612":
1065 Test "jn (0, -4.0) == -3.9714980986384737228659076845169804197562E-1":
1070 Test "jn (0, 0.75) == 0.864242275166648623555731103820923211":
1073 Test "jn (0, 1.5) == 0.511827671735918128749051744283411720":
1076 Test "jn (0, 10.0) == -0.245935764451348335197760862485328754":
1079 Test "jn (0, 4.0) == -3.9714980986384737228659076845169804197562E-1":
1084 Test "jn (0, 8.0) == 0.171650807137553906090869407851972001":
1087 Test "jn (1, -1.0) == -0.440050585744933515959682203718914913":
1090 Test "jn (1, 1.0) == 0.440050585744933515959682203718914913":
1093 Test "jn (1, 1.5) == 0.557936507910099641990121213156089400":
1096 Test "jn (1, 10.0) == 0.0434727461688614366697487680258592883":
1101 Test "jn (1, 2.0) == 0.576724807756873387202448242269137087":
1104 Test "jn (1, 8.0) == 0.234636346853914624381276651590454612":
1109 Test "jn (10, -1.0) == 0.263061512368745320699785368779050294e-9":
1114 Test "jn (10, 0.125) == 0.250543369809369890173993791865771547e-18":
1117 Test "jn (10, 0.75) == 0.149621713117596814698712483621682835e-10":
1124 Test "jn (10, 1.0) == 0.263061512368745320699785368779050294e-9":
1129 Test "jn (10, 10.0) == 0.207486106633358857697278723518753428":
1136 Test "jn (10, 2.0) == 0.251538628271673670963516093751820639e-6":
1141 Test "jn (2, 0x1.ffff62p+99) == -4.43860668048170034334926693188979974489e-16":
1146 Test "jn (2, 2.4048255576957729) == 0.43175480701968038399746111312430703":
1151 Test "jn (3, -1.0) == -0.0195633539826684059189053216217515083":
1156 Test "jn (3, 1.0) == 0.0195633539826684059189053216217515083":
1161 Test "jn (3, 10.0) == 0.0583793793051868123429354784103409563":
1168 Test "jn (3, 2.0) == 0.128943249474402051098793332969239835":
1173 Test "jn (3, 2.4048255576957729) == 0.19899990535769083404042146764530813":
1178 Test "jn (4, 2.4048255576957729) == 0.647466661641779720084932282551219891E-1":
1183 Test "jn (5, 2.4048255576957729) == 0.163892432048058525099230549946147698E-1":
1190 Test "jn (6, 2.4048255576957729) == 0.34048184720278336646673682895929161E-2":
1195 Test "jn (7, 2.4048255576957729) == 0.60068836573295394221291569249883076E-3":
1198 Test "jn (8, 2.4048255576957729) == 0.92165786705344923232879022467054148E-4":
1203 Test "jn (9, 2.4048255576957729) == 0.12517270977961513005428966643852564E-4":
1210 Test "lgamma (-0.5) == log(2*sqrt(pi))":
1213 Test "lgamma (0.5) == log(sqrt(pi))":
1216 Test "lgamma (0.7) == 0.260867246531666514385732417016759578":
1221 Test "lgamma (1.2) == -0.853740900033158497197028392998854470e-1":
1228 Test "lgamma (3) == M_LN2l":
1233 Test "log (0.75) == -0.287682072451780927439219005993827432":
1236 Test "log (2) == M_LN2l":
1239 Test "log (e) == 1":
1244 Test "log10 (0.75) == -0.124938736608299953132449886193870744":
1247 Test "log10 (e) == log10(e)":
1254 Test "log1p (-0.25) == -0.287682072451780927439219005993827432":
1259 Test "log2 (0.75) == -.415037499278843818546261056052183492":
1264 Test "pow (0.75, 1.25) == 0.697953644326574699205914060237425566":
1267 Test "pow (0x1p64, 0.125) == 256":
1270 Test "pow (256, 8) == 0x1p64":
1277 Test "pow_downward (1.0625, 1.125) == 1.070582293028761362162622578677070098674":
1282 Test "pow_downward (1.5, 1.03125) == 1.519127098714743184071644334163037684948":
1289 Test "pow_towardzero (1.0625, 1.125) == 1.070582293028761362162622578677070098674":
1294 Test "pow_towardzero (1.5, 1.03125) == 1.519127098714743184071644334163037684948":
1301 Test "pow_upward (1.0625, 1.125) == 1.070582293028761362162622578677070098674":
1306 Test "pow_upward (1.5, 1.03125) == 1.519127098714743184071644334163037684948":
1313 Test "sin_downward (1) == 0.8414709848078965066525023216302989996226":
1316 Test "sin_downward (10) == -0.5440211108893698134047476618513772816836":
1321 Test "sin_downward (2) == 0.9092974268256816953960198659117448427023":
1324 Test "sin_downward (3) == 0.1411200080598672221007448028081102798469":
1327 Test "sin_downward (4) == -0.7568024953079282513726390945118290941359":
1332 Test "sin_downward (5) == -0.9589242746631384688931544061559939733525":
1337 Test "sin_downward (6) == -0.2794154981989258728115554466118947596280":
1344 Test "sin_downward (7) == 0.6569865987187890903969990915936351779369":
1347 Test "sin_downward (8) == 0.9893582466233817778081235982452886721164":
1352 Test "sin_downward (9) == 0.4121184852417565697562725663524351793439":
1361 Test "sin_towardzero (1) == 0.8414709848078965066525023216302989996226":
1364 Test "sin_towardzero (10) == -0.5440211108893698134047476618513772816836":
1367 Test "sin_towardzero (2) == 0.9092974268256816953960198659117448427023":
1370 Test "sin_towardzero (3) == 0.1411200080598672221007448028081102798469":
1373 Test "sin_towardzero (4) == -0.7568024953079282513726390945118290941359":
1376 Test "sin_towardzero (5) == -0.9589242746631384688931544061559939733525":
1379 Test "sin_towardzero (7) == 0.6569865987187890903969990915936351779369":
1382 Test "sin_towardzero (8) == 0.9893582466233817778081235982452886721164":
1387 Test "sin_towardzero (9) == 0.4121184852417565697562725663524351793439":
1396 Test "sin_upward (1) == 0.8414709848078965066525023216302989996226":
1401 Test "sin_upward (10) == -0.5440211108893698134047476618513772816836":
1404 Test "sin_upward (2) == 0.9092974268256816953960198659117448427023":
1409 Test "sin_upward (3) == 0.1411200080598672221007448028081102798469":
1414 Test "sin_upward (4) == -0.7568024953079282513726390945118290941359":
1417 Test "sin_upward (5) == -0.9589242746631384688931544061559939733525":
1420 Test "sin_upward (7) == 0.6569865987187890903969990915936351779369":
1425 Test "sin_upward (8) == 0.9893582466233817778081235982452886721164":
1430 Test "sincos (M_PI_6l*2.0, &sin_res, &cos_res) puts 0.5 in cos_res":
1437 Test "sincos (M_PI_6l*2.0, &sin_res, &cos_res) puts 0.86602540378443864676372317075293616 in sin_res":
1444 Test "sincos (pi/2, &sin_res, &cos_res) puts 0 in cos_res":
1453 Test "sinh (0.75) == 0.822316731935829980703661634446913849":
1458 Test "sinh_downward (22) == 1792456423.065795780701106568345764104225":
1465 Test "sinh_downward (23) == 4872401723.124451299966006944252978187305":
1472 Test "sinh_downward (24) == 13244561064.92173614705070540368454568168":
1479 Test "sinh_towardzero (22) == 1792456423.065795780701106568345764104225":
1486 Test "sinh_towardzero (23) == 4872401723.124451299966006944252978187305":
1493 Test "sinh_towardzero (24) == 13244561064.92173614705070540368454568168":
1500 Test "sinh_upward (24) == 13244561064.92173614705070540368454568168":
1505 Test "tan (0.75) == 0.931596459944072461165202756573936428":
1508 Test "tan (pi/4) == 1":
1513 Test "tan_downward (1) == 1.5574077246549022305069748074583601730873":
1518 Test "tan_downward (10) == 0.6483608274590866712591249330098086768169":
1523 Test "tan_downward (2) == -2.1850398632615189916433061023136825434320":
1528 Test "tan_downward (3) == -0.1425465430742778052956354105339134932261":
1533 Test "tan_downward (4) == 1.1578212823495775831373424182673239231198":
1538 Test "tan_downward (5) == -3.3805150062465856369827058794473439087096":
1541 Test "tan_downward (6) == -0.2910061913847491570536995888681755428312":
1546 Test "tan_downward (7) == 0.8714479827243187364564508896003135663222":
1549 Test "tan_downward (8) == -6.7997114552203786999252627596086333648814":
1552 Test "tan_downward (9) == -0.4523156594418098405903708757987855343087":
1557 Test "tan_towardzero (1) == 1.5574077246549022305069748074583601730873":
1562 Test "tan_towardzero (10) == 0.6483608274590866712591249330098086768169":
1567 Test "tan_towardzero (2) == -2.1850398632615189916433061023136825434320":
1570 Test "tan_towardzero (3) == -0.1425465430742778052956354105339134932261":
1573 Test "tan_towardzero (4) == 1.1578212823495775831373424182673239231198":
1578 Test "tan_towardzero (5) == -3.3805150062465856369827058794473439087096":
1583 Test "tan_towardzero (6) == -0.2910061913847491570536995888681755428312":
1586 Test "tan_towardzero (7) == 0.8714479827243187364564508896003135663222":
1589 Test "tan_towardzero (8) == -6.7997114552203786999252627596086333648814":
1594 Test "tan_towardzero (9) == -0.4523156594418098405903708757987855343087":
1601 Test "tan_upward (1) == 1.5574077246549022305069748074583601730873":
1604 Test "tan_upward (10) == 0.6483608274590866712591249330098086768169":
1607 Test "tan_upward (2) == -2.1850398632615189916433061023136825434320":
1610 Test "tan_upward (3) == -0.1425465430742778052956354105339134932261":
1613 Test "tan_upward (4) == 1.1578212823495775831373424182673239231198":
1616 Test "tan_upward (5) == -3.3805150062465856369827058794473439087096":
1621 Test "tan_upward (6) == -0.2910061913847491570536995888681755428312":
1624 Test "tan_upward (7) == 0.8714479827243187364564508896003135663222":
1629 Test "tan_upward (8) == -6.7997114552203786999252627596086333648814":
1634 Test "tan_upward (9) == -0.4523156594418098405903708757987855343087":
1641 Test "tgamma (-0.5) == -2 sqrt (pi)":
1648 Test "tgamma (0.5) == sqrt (pi)":
1653 Test "tgamma (0.7) == 1.29805533264755778568117117915281162":
1658 Test "tgamma (4) == 6":
1663 Test "y0 (0.125) == -1.38968062514384052915582277745018693":
1670 Test "y0 (0.75) == -0.137172769385772397522814379396581855":
1677 Test "y0 (0x1.3ffp+74) == 1.818984347516051243459467456433028748678e-12":
1682 Test "y0 (1.0) == 0.0882569642156769579829267660235151628":
1685 Test "y0 (1.5) == 0.382448923797758843955068554978089862":
1690 Test "y0 (10.0) == 0.0556711672835993914244598774101900481":
1695 Test "y0 (2.0) == 0.510375672649745119596606592727157873":
1698 Test "y0 (8.0) == 0.223521489387566220527323400498620359":
1705 Test "y1 (0.125) == -5.19993611253477499595928744876579921":
1708 Test "y1 (0x1.001000001p+593) == 3.927269966354206207832593635798954916263e-90":
1711 Test "y1 (0x1.27e204p+99) == -8.881610148467797208469612080785210013461e-16":
1718 Test "y1 (1.0) == -0.781212821300288716547150000047964821":
1721 Test "y1 (10.0) == 0.249015424206953883923283474663222803":
1724 Test "y1 (2.0) == -0.107032431540937546888370772277476637":
1729 Test "y1 (8.0) == -0.158060461731247494255555266187483550":
1736 Test "yn (0, 0.125) == -1.38968062514384052915582277745018693":
1743 Test "yn (0, 0.75) == -0.137172769385772397522814379396581855":
1750 Test "yn (0, 1.0) == 0.0882569642156769579829267660235151628":
1753 Test "yn (0, 1.5) == 0.382448923797758843955068554978089862":
1758 Test "yn (0, 10.0) == 0.0556711672835993914244598774101900481":
1763 Test "yn (0, 2.0) == 0.510375672649745119596606592727157873":
1766 Test "yn (0, 8.0) == 0.223521489387566220527323400498620359":
1771 Test "yn (1, 0.125) == -5.19993611253477499595928744876579921":
1776 Test "yn (1, 0.75) == -1.03759455076928541973767132140642198":
1779 Test "yn (1, 1.0) == -0.781212821300288716547150000047964821":
1782 Test "yn (1, 10.0) == 0.249015424206953883923283474663222803":
1785 Test "yn (1, 2.0) == -0.107032431540937546888370772277476637":
1790 Test "yn (1, 8.0) == -0.158060461731247494255555266187483550":
1795 Test "yn (10, 0.125) == -127057845771019398.252538486899753195":
1800 Test "yn (10, 0.75) == -2133501638.90573424452445412893839236":
1805 Test "yn (10, 10.0) == -0.359814152183402722051986577343560609":
1810 Test "yn (3, 0.125) == -2612.69757350066712600220955744091741":
1813 Test "yn (3, 0.75) == -12.9877176234475433186319774484809207":
1820 Test "yn (3, 2.0) == -1.12778377684042778608158395773179238":
1824 # Maximal error of functions:
1841 Function: Real part of "cacos":
1849 Function: Imaginary part of "cacos":
1857 Function: Real part of "cacosh":
1865 Function: Imaginary part of "cacosh":
1873 Function: Real part of "casin":
1881 Function: Imaginary part of "casin":
1889 Function: Real part of "casinh":
1897 Function: Imaginary part of "casinh":
1905 Function: Real part of "catan":
1909 Function: Imaginary part of "catan":
1915 Function: Real part of "catanh":
1925 Function: Real part of "ccos":
1931 Function: Imaginary part of "ccos":
1937 Function: Real part of "ccosh":
1941 Function: Imaginary part of "ccosh":
1947 Function: Real part of "cexp":
1953 Function: Imaginary part of "cexp":
1959 Function: Real part of "clog":
1965 Function: Imaginary part of "clog":
1969 Function: Real part of "clog10":
1977 Function: Imaginary part of "clog10":
1993 Function: "cos_downward":
2001 Function: "cos_towardzero":
2009 Function: "cos_upward":
2017 Function: "cosh_downward":
2025 Function: "cosh_towardzero":
2033 Function: "cosh_upward":
2039 Function: Real part of "cpow":
2047 Function: Imaginary part of "cpow":
2055 Function: Real part of "csin":
2061 Function: Imaginary part of "csin":
2065 Function: Real part of "csinh":
2071 Function: Imaginary part of "csinh":
2075 Function: Real part of "csqrt":
2079 Function: Imaginary part of "csqrt":
2085 Function: Real part of "ctan":
2091 Function: Imaginary part of "ctan":
2095 Function: Real part of "ctanh":
2099 Function: Imaginary part of "ctanh":
2113 Function: "exp_downward":
2121 Function: "exp_towardzero":
2129 Function: "exp_upward":
2203 Function: "pow_downward":
2211 Function: "pow_towardzero":
2219 Function: "pow_upward":
2227 Function: "sin_downward":
2235 Function: "sin_towardzero":
2243 Function: "sin_upward":
2263 Function: "sinh_downward":
2271 Function: "sinh_towardzero":
2279 Function: "sinh_upward":
2289 Function: "tan_downward":
2297 Function: "tan_towardzero":
2305 Function: "tan_upward":
2345 # end of automatic generation