ÿØÿà JFIF    ÿÛ „ !.%+&8&+/1555$;@;4?.451 4,$,44444444444414444444444444444444444444444444444444ÿÀ  á á" ÿÄ     ÿÄ ?    !1AQaq"2‘¡±ÁðBRbrÑá#‚’¢²3S CñÿÄ   ÿÄ !    !1QAa‘2ÿÚ   ? 5˜Z¯V¦cø)›t/? z¨±>Õ5€¶‹Á¤·¼z¼Ü¬+ñ®v¤¨_ˆR­BFn©—˜ý®ç̝P8gýt·ÉSTŦˆìät?þé¼íìN/Þa)ì–í6ô… Ï¿øÃj´¿KÇü]ÿ ªô¹-eKànëÕHTx}ýSÜ›ÿ ”7Ø×&µ<¦  ¥ÑO¶[Ù¯ä¨ÞÃÿ PZ-¬;#õ|•oaÿ ©CìÞz3˜öː/¤­ñTûIØ}š^ mÓ%ªxˆ¥ÉŸu=Z+ISe¿45™¼u;ú&WØ÷€æßQ™®{|íx*TC“#ZŠìZ§²‹ 6pv…³¿¡äª*áZÐ%ÒOáˆo"x«OHk w±æ+¬V(kMúŸ5Vö«$ ÁrÏbàb57/luR ¸ÑÛj Òµì`Ðœq­û žICÀÊ•©4€Âcà¨Ï€O´<èÐ:›ù(Ë^L8þ‘ÍÌ#¸Ð_Ì©ÙK(Öz 4¬û+¸;ü’V’84‘¬ÃŽ:[â‡ÔÌáõp¢~§ªlæ£ö{®G>J¼"°‡7¯ÆÉèßû ‹É‹§ÁòÃýâßî ^ƾÙõ‹×óH#«LP½ïX=xÑÍ$|W?•~• îëÔ©ª‹ {ÝT…Kÿ ”hûâá)J*ö˜–ÔU;iÇ€/ ÆþjóZ\ýwØ=Ìm ºèËL9 ýèÆð/¨’¥öo=nË.%Îì ŽÕ¯È|{Oj²ƒE6e/ßdÄõ²Ìâ1O®ò×TsəԸhOMýíMˆ¿¼H˜l²,7Â¥#MF/Úf°Ö½± ¸–dr‹NýÊ íjqx{œÉ ä-È ¦ øÄër¨q°ð †nцýÑÄÆ’mä…n<0È™;ÁÝá¯ÁZƒ7FÀmì­ É&9ˆîéi¶ùN§Y• ÃZãAâ?•‡©‰ , ó¾IŸŠc1 4â&y­&pŠ­6;M À 0¹qç»p.á …ŸÅáK@%6·y6ƒ‰3?”úºŽ‰éX5ªPT §µ!=Mž«Ú½‹ÅgÂSâÉaþÓoö–¯ÁÔìR>5éÿ üs¶ÆUcÌ kÇR ]ÿ ù¬¼«VŽ;Â|‡~¢¦”ÏÅ°æ {L™Õ°Óv¹ò¸írŽ¡×¢CÃ!íVÕ {¶»sŒNPg/ "uÕbkm²“$ďå¿é¹§°½æz¯6 †s¿!s–wÚÝ“™Œ °.ûj>·+™Òa…©Œ&rÝÎtÛë긪Ît’LAVp%c Úý[ÄzJ¾ÇàXXç@˜ó<êL]·T˜¾¥1Ó©V‡g´æ½¦Ý@¹óø!_@´ÞâSÁ —S3™•& ]@JHÚý©ZŽ €×æÔr»Áf!‡yÞ4Mv*èÓã_{‘åóUuљØ«Oïé*®EvÑ Œ÷‡U \"㪒ÍK+À 4“M¡ï:0¥5í!'<@î´”>Ç»&Z–ïCCV˜Ì5Šo&îhè.žû |ÓK©h$s6KìŒëã)¹hI¦GïOåóI;ììü#É$Š0…Ææ¥TØ.5­¾gn´ “ÂÖ\:hœ89G)J@„}œ:’Ò{/Š"¦_Æ×7Æ3VÇŠÊa]ÚŒÙ€Ä–=®uÁßâACZƒ§§£ Qnâ:«,×{tyø¬iÛcœÜÄ€H½ÄÍCk´÷šß .W'b¤Íåh]÷€=,Žv×cÚEÚHXJX¶îo¨FÒtèöŸ>ªª6[J®Fµ£sGÁeqõfe\íjÒÐïÄÐGˆe1Ø‹.Ø”‘Ëuø Y­ˆÜ ŽG|zùªüMpDnQWÄ”%JŠ™)â*p@Örš«ÕT2Ð%ˆG#ª„ ·¤!°ŸOTÂT¸aÚ%4&h™LµšØüÐ.F¿²ÐÞ_Ç‚¾ÅÃaÜ÷09Æ q€öy˜v‡85õN÷]¬äѼóS{°_MŽ¬úÔ#°Ç¸0åÞè2ëôPcvÆw9®ií1Ä8F™˜à‰´+‰Ik1òÝ7“Ñ×ÒsÝ\x‚h`ÞÑ`ó"|µEcý£n˜h`}GÞ !±ù²Ápü²ß6 0ïi󜵩SÈÇ7˜-ÕURO˜¦´f$ªž-Í6(œ}<„ éc øs]ŽŽ„*—¾ ìdŽ„)méª\¿êÎIg¾ØÞ~I#C/¼¼´EÁÈŽi8“©õådô·>euä ƒ'Ê×लR1ÉJE1ÐAát`t;ÇР%Ý<‡¥„ÍÆ`×Oyó)õiI€ñQaŸ4Ûù\áàaÃÔ¹HÃu¹*k€¦<„e S‡&õÏ B!ŽhüÞ`yj}mªf×\¿ Ç~æ­9‡û\՞Ǖg²1Žû5V7 !àöšm° c`ܬøÇìµÒ'P"?…´Ö,"§^•õŽ¨sÔ)6˜sæéÍR¼ ò|Sl”‹7 nPW Gòú÷½§O¯‡„l¡kSÞŒr½PÊ@æ¢pŽ-mÿ #Ÿ˜Àº¶Áä¦;ïÔæ$1££`“Õ>„—·ž)ßð³ñ#Ï Ô$¶œ‰ÊE‹À;÷º ¯«P:Ñ”8–IÊtpÞ3ª“>ê“þës4ò2OÏÕ­±zô†Õ§‰.÷ä¸;¿˜“'œ›žª}«Œ{ª±Ì 9ÔóÞÕ‡0 $íWV3Üì¬ —@kÝ4@¿r¼±½¬™›?øØæ´'Áé®CË3-g$˜ö‡×auÚi´Žp/êÛ æF›Ú2v‹ã¿¿,nB1̨ƃqÞa5͝@&Æû“él÷ \C²½UÍc ¯k×¢U ÖéQå™—-r wô ÞÏ<Ò=&=ÿ Ôê Òêˈt,i—;LîÜ á¸*ÚÃ1$êL•LÍ <É)ýÐà’ ;F™{ƒ™˜€&'}‚ãÄK`¡ÞT@I;®žZóè‚s’7®°›+§O­Åq©é»²9<Ô J ¼9O’HL»Ùïì¸rk¼Ž_ý‘TŸu[²ßÚŒ·ü÷B%¯E ŸÔX5êO´ Ç•€’I0 ÉJX` ñ¹õ%;µŸD‘«´€àwÒ™U ûئžÖö\×®×´8 ½‡ºÐÆÓ§?Àkmœ=;d5*@-ì0F Rªýš[Ü6âö̃ڸr*KA9· u*µæ£?U¸Âêí†8@¦X4 e-ò„0s{ HâUpU?¼mñRa°®a%Ð'tÉ×’\¾ÊÉ]t›h>·(Ë@R¼¡Ãt h}’O÷au<+nT…Ö…MӐ??Óe95 q>í/;&JSû °¯ÊéÞ øƒ*Ã2½Ài&:nôUl=¾¿5eˆ3”ñc|Ú2V”>„»&eE;«ÚäC p¢Û úy 9š[ŒÌx¼擼A&DåÒ¯ˆ¤ÀÌ;"˜ ÏQä¸åhÊ}Ûq«Û0WžÒ|»€ø®öCm5•\ÇÀ§Pe3£]0ÃàLDÉ‰1øªxjgwT‚÷¿LΨK‹›ùs—xˆÜ±µ kæ¸f‰‰ÜGk/LÛØ6d9ò¶ùA{ƒA3š/¬D¬khÓk‰`˜"㯒r¿±Óã jx‡°e}<Ñø\3y:'À•/h½Í€Ç4~g ?Û(¼]v‘ªlKÎâ~?O‚W%{Ì:“'©úNq¾›úo(X’¥¯ˆ nFê{Ç€ü?º'ë ø‹ì Þ09ŒÌç9Æ —ËC`j@ÓÄ(+a‹un¸#ÂꟋ{K`‘ÑÍÍ'à´»/Û,KW;Þ4²þð ï Nm|~fGÏ(…³Ã)«1ö­Õ ¥‡¨©ƒÃ™ü-s=à=U66Ï«Ýc蓦W¹íž®›nÔ%êÇìŒ<#Ü×84ån®Ð ÒåOC` ñânÑs‡¢ç 1õ%Îhì½Ã½® e:ݼUZo™`  ÅZŸŒÊ«ê1ÏÄo$q¹Þ€©ˆhÐÉä¯ñ[!…Ú˜àJ:x2$Íß&PåT£6ç— ‡Í*4Ýšçjÿ ‰É nófÐ ó(L5C•åÆ\rMÒ@ò }y-W}™üýVù—ú¢=Ù”c®‘< M ž ´Phr ¦©TD ‘ù.$´÷O‡‘V2Æò.=IUŒ=ž‡â¬i™aþÓåÙ?òUø'ØÖ•.~* šTŒ!•-×áºTâ®ä#õü'´ eýlYÅÓeÕKÂrT"CÚ@u!Óxƒ{š3€}1¿(r}%«nËamjÑ%ÑNEò v ˜à  σöK³,*º.àzù¨™Ó ÚçâU¦*¿ 9{%Ö¹ njûdaXöb) kÛƱûÓ\°M7ˆÂ=û›ç¿Ã‚­V»Cg–8ÙêE- j)k$º`Ã-ùEýeBÆÇ]c¡°ñty&Òd0nõ'¡W+ƒ*|–øµFa\GQªEAÔp5\Ǽ·¼Ç8·õ -â§Ú[ ‡ uZeÖ 3}×d'+¹:ð+K†Û®s!Ï$úe€<Û”x)1»a­¡LC]¸µík…ÚàA»AYº{†ªS[¦5HÒ7ù --,ísòDØ€èk ÞÀîÜ ò@â( ËNˆë›4ô½•/¦o‡€Û7 ê•ÆêòðÜy'Án½µ á˜ݦ ndeo…[ì¶Ê,¥R³Ä=À±—–ß;£™´ñSâ*g§”ïaið‘Jå~™ÓÞ ß³Õ¢»8x埒²52>AÊb&-÷\7´éÄù€T˜,w;3{ï˜k…à¹ÄqÀ«œ{€\ ˆ¾[´¨јr &Úé„Ívˆ±8†¿]|¬ņ4I×pÞS1ÈÖz‰#Ìv‡G!YNògñ:màTz¢Ý1ô©^O=~ë|5Bã™ç•¼µõ•bÆ@úÕS¬ÈŒ#¬zünrŸ û” Z²•ï›èðV"ÁHÚý©wÝ €7¼Ìu1hÑa3Éä û f$o¿É ™Ú›ÝçnpÒ3äÌ3†Í§,Äï]$‰/pê †«À¼¸e9­Æê_C]žƒ·ý·frÁN«, E=›Çq -‰öŒ:aÏ¿±í&£Í:-} 84‘ÿ eƒQÑeëSsuiA ³g㟥ú£?ÿ ʼn*”“÷aühe:ÊWa@ÒÞk±eØ] F Ô—r.åä˜ @ö¥ªZoÐýYL·¥S²G/‡ñ <~*ZÆ´è>JlòàÛƽÿ 窘ìGN¢:I®KšJp/`íIÁÀõ#Ä-€ö­šµŒoF4|ÆQØÆ@Ì|£Ô…¢À{9˜è½Üó›€ôYÒÎYsið;ís¤€à²ˆ‚4qÉVŒI$ ‰"° æµ8cXGjœˏ¡Aâý•ËÜ¢ûï e·çLx']á"oÅÎê3¯Ç—¹”ó0nå‚âg{Œñ> S´˜îè°g238‚ãköÝfÚd´6Ò€;ò÷±¢™¼›º ¢Æ'¥Ðx'e¬ç ]bÈÆV¢ó‹kýBO ðÊâ$Ÿ!×T 3Mýמ žìٍàÌü‘8÷€àæØ8æ©6‰©L´«…oãpð„~Çk‰!ñ;‹”ÛžÍ àž±z Ÿôû øŸÝužÏ;ÿ #|u6™Þ¬ÚˆÐõA4¶â|ôl|Ê2ŽÇ¤ÝÅÇY.<#Aí.k§hóF‚”Y; 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Þ'¯°ÌME[YéïĵÂCå½ Ué©Áû'Ê9%eÔðNU”ë‘ÌsD3/®+UI˜9h.WC”빓$#:pz:YÓ ¿xž* ³$Í +$kñAŠ‹†¢ Uê>¸)_š¬÷©ßAÂÔb9ÇU ¯¾á•9¯ÏÏ÷O÷¼¼Fähal1‰3Ì[Ïr•´UCksNÐ] R‘¸¥H+§Šé†c©vÖÞ0iÓ76s†î!§=ß ¼~Ô'°Ãmäoäš³ªøi1úÉ)³yV8 CLÄØÁ‘WYïi€H6ÖÑiámø^ÈY´°Ñ7¥Û*—Ñ©L«Qƒï—Ùrÿ ›£Ð*š¸ˆL©ˆ$ˆ ÷¾D§9È®«qbqC)–ˆïv´çñsÑVT­Ø, <àïºÀO«Jý·õ àfPìð .wFšir´þ’2_Y *Æ€x\« ì€9š@ Ž|F⇥ˆkZ@hÖÄ0t¿-<“‹qµ¾*ZL¤Ú)&BJpÓF5=$„at*Zš$’ÑtdûÝRI1 2Ž‰$€$I$#‰SÞ’Hë¬ï;Á$¡t$’`<(ñÇt)$‡Ð.Êf¢X’Kt=Éé$‚ˆªè¢oÝëòI%Rgcª÷ŠyI%¡‰ÿ !ñ)´õ $¤ Ô’IIGÿÙ------------------------------------------------------------------------ -- tointegralx.decTest -- round decimal to integral value, exact -- -- Copyright (c) IBM Corporation, 2001, 2008. All rights reserved. -- ------------------------------------------------------------------------ -- Please see the document "General Decimal Arithmetic Testcases" -- -- at http://www2.hursley.ibm.com/decimal for the description of -- -- these testcases. -- -- -- -- These testcases are experimental ('beta' versions), and they -- -- may contain errors. They are offered on an as-is basis. In -- -- particular, achieving the same results as the tests here is not -- -- a guarantee that an implementation complies with any Standard -- -- or specification. The tests are not exhaustive. -- -- -- -- Please send comments, suggestions, and corrections to the author: -- -- Mike Cowlishaw, IBM Fellow -- -- IBM UK, PO Box 31, Birmingham Road, Warwick CV34 5JL, UK -- -- mfc@uk.ibm.com -- ------------------------------------------------------------------------ version: 2.59 -- This set of tests tests the extended specification 'round-to-integral -- value' operation (from IEEE 854, later modified in 754r). -- All non-zero results are defined as being those from either copy or -- quantize, so those are assumed to have been tested. -- This tests toIntegraExact, which may set Inexact extended: 1 precision: 9 rounding: half_up maxExponent: 999 minExponent: -999 intxx001 tointegralx 0 -> 0 intxx002 tointegralx 0.0 -> 0 intxx003 tointegralx 0.1 -> 0 Inexact Rounded intxx004 tointegralx 0.2 -> 0 Inexact Rounded intxx005 tointegralx 0.3 -> 0 Inexact Rounded intxx006 tointegralx 0.4 -> 0 Inexact Rounded intxx007 tointegralx 0.5 -> 1 Inexact Rounded intxx008 tointegralx 0.6 -> 1 Inexact Rounded intxx009 tointegralx 0.7 -> 1 Inexact Rounded intxx010 tointegralx 0.8 -> 1 Inexact Rounded intxx011 tointegralx 0.9 -> 1 Inexact Rounded intxx012 tointegralx 1 -> 1 intxx013 tointegralx 1.0 -> 1 Rounded intxx014 tointegralx 1.1 -> 1 Inexact Rounded intxx015 tointegralx 1.2 -> 1 Inexact Rounded intxx016 tointegralx 1.3 -> 1 Inexact Rounded intxx017 tointegralx 1.4 -> 1 Inexact Rounded intxx018 tointegralx 1.5 -> 2 Inexact Rounded intxx019 tointegralx 1.6 -> 2 Inexact Rounded intxx020 tointegralx 1.7 -> 2 Inexact Rounded intxx021 tointegralx 1.8 -> 2 Inexact Rounded intxx022 tointegralx 1.9 -> 2 Inexact Rounded -- negatives intxx031 tointegralx -0 -> -0 intxx032 tointegralx -0.0 -> -0 intxx033 tointegralx -0.1 -> -0 Inexact Rounded intxx034 tointegralx -0.2 -> -0 Inexact Rounded intxx035 tointegralx -0.3 -> -0 Inexact Rounded intxx036 tointegralx -0.4 -> -0 Inexact Rounded intxx037 tointegralx -0.5 -> -1 Inexact Rounded intxx038 tointegralx -0.6 -> -1 Inexact Rounded intxx039 tointegralx -0.7 -> -1 Inexact Rounded intxx040 tointegralx -0.8 -> -1 Inexact Rounded intxx041 tointegralx -0.9 -> -1 Inexact Rounded intxx042 tointegralx -1 -> -1 intxx043 tointegralx -1.0 -> -1 Rounded intxx044 tointegralx -1.1 -> -1 Inexact Rounded intxx045 tointegralx -1.2 -> -1 Inexact Rounded intxx046 tointegralx -1.3 -> -1 Inexact Rounded intxx047 tointegralx -1.4 -> -1 Inexact Rounded intxx048 tointegralx -1.5 -> -2 Inexact Rounded intxx049 tointegralx -1.6 -> -2 Inexact Rounded intxx050 tointegralx -1.7 -> -2 Inexact Rounded intxx051 tointegralx -1.8 -> -2 Inexact Rounded intxx052 tointegralx -1.9 -> -2 Inexact Rounded -- next two would be NaN using quantize(x, 0) intxx053 tointegralx 10E+30 -> 1.0E+31 intxx054 tointegralx -10E+30 -> -1.0E+31 -- numbers around precision precision: 9 intxx060 tointegralx '56267E-10' -> '0' Inexact Rounded intxx061 tointegralx '56267E-5' -> '1' Inexact Rounded intxx062 tointegralx '56267E-2' -> '563' Inexact Rounded intxx063 tointegralx '56267E-1' -> '5627' Inexact Rounded intxx065 tointegralx '56267E-0' -> '56267' intxx066 tointegralx '56267E+0' -> '56267' intxx067 tointegralx '56267E+1' -> '5.6267E+5' intxx068 tointegralx '56267E+2' -> '5.6267E+6' intxx069 tointegralx '56267E+3' -> '5.6267E+7' intxx070 tointegralx '56267E+4' -> '5.6267E+8' intxx071 tointegralx '56267E+5' -> '5.6267E+9' intxx072 tointegralx '56267E+6' -> '5.6267E+10' intxx073 tointegralx '1.23E+96' -> '1.23E+96' intxx074 tointegralx '1.23E+384' -> '1.23E+384' intxx075 tointegralx '1.23E+999' -> '1.23E+999' intxx080 tointegralx '-56267E-10' -> '-0' Inexact Rounded intxx081 tointegralx '-56267E-5' -> '-1' Inexact Rounded intxx082 tointegralx '-56267E-2' -> '-563' Inexact Rounded intxx083 tointegralx '-56267E-1' -> '-5627' Inexact Rounded intxx085 tointegralx '-56267E-0' -> '-56267' intxx086 tointegralx '-56267E+0' -> '-56267' intxx087 tointegralx '-56267E+1' -> '-5.6267E+5' intxx088 tointegralx '-56267E+2' -> '-5.6267E+6' intxx089 tointegralx '-56267E+3' -> '-5.6267E+7' intxx090 tointegralx '-56267E+4' -> '-5.6267E+8' intxx091 tointegralx '-56267E+5' -> '-5.6267E+9' intxx092 tointegralx '-56267E+6' -> '-5.6267E+10' intxx093 tointegralx '-1.23E+96' -> '-1.23E+96' intxx094 tointegralx '-1.23E+384' -> '-1.23E+384' intxx095 tointegralx '-1.23E+999' -> '-1.23E+999' -- subnormal inputs intxx100 tointegralx 1E-999 -> 0 Inexact Rounded intxx101 tointegralx 0.1E-999 -> 0 Inexact Rounded intxx102 tointegralx 0.01E-999 -> 0 Inexact Rounded intxx103 tointegralx 0E-999 -> 0 -- specials and zeros intxx120 tointegralx 'Inf' -> Infinity intxx121 tointegralx '-Inf' -> -Infinity intxx122 tointegralx NaN -> NaN intxx123 tointegralx sNaN -> NaN Invalid_operation intxx124 tointegralx 0 -> 0 intxx125 tointegralx -0 -> -0 intxx126 tointegralx 0.000 -> 0 intxx127 tointegralx 0.00 -> 0 intxx128 tointegralx 0.0 -> 0 intxx129 tointegralx 0 -> 0 intxx130 tointegralx 0E-3 -> 0 intxx131 tointegralx 0E-2 -> 0 intxx132 tointegralx 0E-1 -> 0 intxx133 tointegralx 0E-0 -> 0 intxx134 tointegralx 0E+1 -> 0E+1 intxx135 tointegralx 0E+2 -> 0E+2 intxx136 tointegralx 0E+3 -> 0E+3 intxx137 tointegralx 0E+4 -> 0E+4 intxx138 tointegralx 0E+5 -> 0E+5 intxx139 tointegralx -0.000 -> -0 intxx140 tointegralx -0.00 -> -0 intxx141 tointegralx -0.0 -> -0 intxx142 tointegralx -0 -> -0 intxx143 tointegralx -0E-3 -> -0 intxx144 tointegralx -0E-2 -> -0 intxx145 tointegralx -0E-1 -> -0 intxx146 tointegralx -0E-0 -> -0 intxx147 tointegralx -0E+1 -> -0E+1 intxx148 tointegralx -0E+2 -> -0E+2 intxx149 tointegralx -0E+3 -> -0E+3 intxx150 tointegralx -0E+4 -> -0E+4 intxx151 tointegralx -0E+5 -> -0E+5 -- propagating NaNs intxx152 tointegralx NaN808 -> NaN808 intxx153 tointegralx sNaN080 -> NaN80 Invalid_operation intxx154 tointegralx -NaN808 -> -NaN808 intxx155 tointegralx -sNaN080 -> -NaN80 Invalid_operation intxx156 tointegralx -NaN -> -NaN intxx157 tointegralx -sNaN -> -NaN Invalid_operation -- examples rounding: half_up precision: 9 intxx200 tointegralx 2.1 -> 2 Inexact Rounded intxx201 tointegralx 100 -> 100 intxx202 tointegralx 100.0 -> 100 Rounded intxx203 tointegralx 101.5 -> 102 Inexact Rounded intxx204 tointegralx -101.5 -> -102 Inexact Rounded intxx205 tointegralx 10E+5 -> 1.0E+6 intxx206 tointegralx 7.89E+77 -> 7.89E+77 intxx207 tointegralx -Inf -> -Infinity -- all rounding modes rounding: half_even intxx210 tointegralx 55.5 -> 56 Inexact Rounded intxx211 tointegralx 56.5 -> 56 Inexact Rounded intxx212 tointegralx 57.5 -> 58 Inexact Rounded intxx213 tointegralx -55.5 -> -56 Inexact Rounded intxx214 tointegralx -56.5 -> -56 Inexact Rounded intxx215 tointegralx -57.5 -> -58 Inexact Rounded rounding: half_up intxx220 tointegralx 55.5 -> 56 Inexact Rounded intxx221 tointegralx 56.5 -> 57 Inexact Rounded intxx222 tointegralx 57.5 -> 58 Inexact Rounded intxx223 tointegralx -55.5 -> -56 Inexact Rounded intxx224 tointegralx -56.5 -> -57 Inexact Rounded intxx225 tointegralx -57.5 -> -58 Inexact Rounded rounding: half_down intxx230 tointegralx 55.5 -> 55 Inexact Rounded intxx231 tointegralx 56.5 -> 56 Inexact Rounded intxx232 tointegralx 57.5 -> 57 Inexact Rounded intxx233 tointegralx -55.5 -> -55 Inexact Rounded intxx234 tointegralx -56.5 -> -56 Inexact Rounded intxx235 tointegralx -57.5 -> -57 Inexact Rounded rounding: up intxx240 tointegralx 55.3 -> 56 Inexact Rounded intxx241 tointegralx 56.3 -> 57 Inexact Rounded intxx242 tointegralx 57.3 -> 58 Inexact Rounded intxx243 tointegralx -55.3 -> -56 Inexact Rounded intxx244 tointegralx -56.3 -> -57 Inexact Rounded intxx245 tointegralx -57.3 -> -58 Inexact Rounded rounding: down intxx250 tointegralx 55.7 -> 55 Inexact Rounded intxx251 tointegralx 56.7 -> 56 Inexact Rounded intxx252 tointegralx 57.7 -> 57 Inexact Rounded intxx253 tointegralx -55.7 -> -55 Inexact Rounded intxx254 tointegralx -56.7 -> -56 Inexact Rounded intxx255 tointegralx -57.7 -> -57 Inexact Rounded rounding: ceiling intxx260 tointegralx 55.3 -> 56 Inexact Rounded intxx261 tointegralx 56.3 -> 57 Inexact Rounded intxx262 tointegralx 57.3 -> 58 Inexact Rounded intxx263 tointegralx -55.3 -> -55 Inexact Rounded intxx264 tointegralx -56.3 -> -56 Inexact Rounded intxx265 tointegralx -57.3 -> -57 Inexact Rounded rounding: floor intxx270 tointegralx 55.7 -> 55 Inexact Rounded intxx271 tointegralx 56.7 -> 56 Inexact Rounded intxx272 tointegralx 57.7 -> 57 Inexact Rounded intxx273 tointegralx -55.7 -> -56 Inexact Rounded intxx274 tointegralx -56.7 -> -57 Inexact Rounded intxx275 tointegralx -57.7 -> -58 Inexact Rounded -- Int and uInt32 edge values for testing conversions precision: 16 intxx300 tointegralx -2147483646 -> -2147483646 intxx301 tointegralx -2147483647 -> -2147483647 intxx302 tointegralx -2147483648 -> -2147483648 intxx303 tointegralx -2147483649 -> -2147483649 intxx304 tointegralx 2147483646 -> 2147483646 intxx305 tointegralx 2147483647 -> 2147483647 intxx306 tointegralx 2147483648 -> 2147483648 intxx307 tointegralx 2147483649 -> 2147483649 intxx308 tointegralx 4294967294 -> 4294967294 intxx309 tointegralx 4294967295 -> 4294967295 intxx310 tointegralx 4294967296 -> 4294967296 intxx311 tointegralx 4294967297 -> 4294967297