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ICÀ
Ê•©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 ýè
Æð/¨’¥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@<u %Ü6ÓtIÌpÓr»söfeÁ0O…­´Kƒ&ñ™\©<+,~)‹
ºHÐ*×µ&†ž‘Æ÷ÚŸ
1ßjC5Oh´‡›

Ø×ë æâ“Þà

ÒT]§n{ºöB³ ¦ ̹Â8Êï¦MÉ<„¨s¹¶ì7Ì”æR$Ncà! /éþäRM÷Gƒ¿É$
¦oà>%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$Š0…Ææ¥TØ.5­¾gn´ “ÂÖ\:hœ89G)J@„}œ:’Ò{/Š"¦_Æ×7Æ3VÇŠÊa]ÚŒÙ€Ä–=®uÁßâACZƒ§§£Qnâ:«,×{tyø¬iÛcœÜÄ€H½ÄÍCk´÷šß
.W'b¤Íåh]÷€=,Žv×cÚEÚHXJX¶îo¨FÒtèöŸ>ªª6[J®Fµ£sGÁeqõfe\íjÒÐïÄÐGˆe1Ø‹.Ø”‘Ëuø
Y­ˆÜŽG|zùªüMpDnQWÄ”%JŠ™)â*p@Örš«ÕT2Ð%ˆG#ª„
·¤!°ŸOTÂT¸aÚ%4&h™LµšØüÐ.F¿²ÐÞ_Ç‚¾ÅÃaÜ÷09Æ 
q€öy˜v‡85õN÷]¬äѼóS{°_MŽ¬úÔ#°Ç¸0åÞè2ëôPcvÆw9®ií1Ä8F™˜à‰´+‰Ik1òÝ7“Ñ×ÒsÝ\x‚h`ÞÑ`ó"|µEcý£n˜h`}GÞ  !±ù²Ápü²
ß6
0ïi󜵩SÈÇ7˜-ÕURO˜¦´f$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$1££`“Õ>„—·ž)ß
ð
³ñ#Ï Ô$¶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 É<mÆÈJoúáõóQâØòÙaÙt:  ·=|Ôaz]a1cÉŸ1
4˜à3΍}GFøí7/B«vεŕL=Ðr1ÕšnwH›óÞ¢ºö{)´4€æZç^ÿ yÑ:_([¿ipqQÊ^âÆe;»½“¦º|¢ÀTçèrú1”óTÃ’u¦CG¤ ¡
Š­7ë

·i“¿z»n
ö¼±ù^ö<‹çu7¸ÈlvZðÛAUXje•
dLÞH ÚosÇr`È™‡pÊeÇ4@x7´)ö†Ótœ~i‘Ï[x@äUÃæ­m·e´x
°t¸·²5'žªža   =ÖÌåzϘ'-´ˆpž3§ò‡k  Ý'‰ýÑï¦3ºdè“{eiÔõNkîšECEΠ¥ÃT9ãqÃâŸîɐ8z \?€    >JX` 
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*|–ø<K\%¦cÏÄ#N,Úú‘¤òÒÛõ ’¶§‰Ì
ú•dçb31Ð\7‡ëÚw82
‰KÝkÚñ'¢Ž…[&¼ÌAÔzHàP *اoßreÁY¥Ñ¾ãE|&QbKg]ã„þê*b;R³Öi‹  ±î$£ÈTm¶k÷ˆ
¦»Ù¹i¦¨6 h%Á'Ú
J   \F±â+‹b/Å9ñå5Àë­nˆRv«¯#„&î„$º’@:‘Ôrø+,àq‘秬*Úg´>µFa\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$Ÿ!×T
3Mýמ
žìٍàÌü‘8÷€àæØ8æ©6‰©L´«…oãpð„~Çk‰!ñ;‹”ÛžÍ àž±z Ÿôû øŸÝužÏ;ÿ #|u6™Þ¬ÚˆÐõA4¶â|ôl|Ê2ŽÇ¤ÝÅÇY.<#Aí.k§hóF‚”Y;
M½Ö4hŸ4&›­¿tès´%FìL¥£Ãk‰ÇT¤haÁ¤ÚxfÉ`ÑìË›>i 3t‚:,–+^÷´–{Û–Nxi"x‘Ûg
î¨>¥Õ܁ùZH,2Û“:8xÊ¢Çí9.É-Ìâã-=çjwµS˜dütžçwýGòú®®ûº_ˆýx$–¡ãøO
EÚÛÏ÷R„×w+3£Á£öUMyR²¹âŒ°š›¸Ñãò9§Ó_Dl+Ùßc›úšGÅÌc†Ž!Ko=¶.‘Îÿ c²(2®V mª.ÿ ¹B›¹å ù„öŸSV>™ü¯$y:G¢Z×àøúdî¹û­·ýÇ´:•c LÍõi_‹ö+ÎæGÊè>OŠ•äž´§Þ{X}¨1ÚTc›»Qþ•êô°t¿OP?eæ~É{5]•ÙR£r5†nZ\ã@
&îJõ ¾àC°þV>fé¥/ü5ñÊIº_é5;e­h<@
Ä&æÃëE%;X,ÒãÆÞ`Oò¦kŸm#˜!ÀyÄ¢|
óLšò¥Ä`
¶R=|ÈCâh5ò3DˆïF†ðÒ#ÅìÛœ?¸yhBãœí
ZxßÎÄhºRK„`Þödvײ™ÀÈÑÒgŒuYw³%†ƒÓzõ ÖÏp‚dH®¦A´ù§»ÓÇMæ~)ˆð‡û:ù&Ä •vGD´À 
n
Ý
‡¼Ö8Fö   óáà£~Ë¥x`oK|Ä?fxiØü%pìR>éò+Û±éÎ>núlFŤ'tq8LZÏvÃ?„¡ß±È⽆¯³íü@x|PöUäèØã¡ð‚ŒAìÏ"vÍwóŸÍ{ ý0.z    È•Ö{,N¡£¡ŸKÕÙž>Ýœþ ÍÀ<n^Àïe€Þgn¹”ÜiQê
9Ú±‡„è]ËA¿‚MJìiÓxŒn-ÄS6!ÓæÑû*jÎWøìšÇ뙦gj~+?\,Ö7ÁÕÊ”G™q6TF)óCç<ÓšÂUé†gW=àà“hóR³ÊQì<!÷ÇpR1¯u„De,è­vvâDß~žHå‰ú£Kìní¢ÐçÅÄÅ¥Ü÷
±ÃìÇžûƒz\þÞ¨-•‹
€

¸+¶n¿^
?†[ÖWóÒX¸,0Ø:l?‰Âý«ÿ ·Dc+fÔ[ƒ›ûªšx«kæž1KI…<#'nž¶\±íÎ8¤ìK@’@J¥v)º[Ž±Æå´¼
½Ý¡ç¯ÐO¥ø®è•Óȱ߿wša©“œt‡4îyªœ&+1ÏØ:‚æƒ=/ꎔ`hm
“=©‹]°g}ì€DgUƒ8¤qCˆãáÅ,‡Ô¬ñ10HÑDÂbáÂÿ Œ»v·:uòB6»áp‰>°<×EA!Å‚D™IúOÍ
¡>ôG}Â`ÍßkÜL™Ž  Þð™
{IøF²
¹òQ3&!ÃÂÞz.d&Ï-sH¸,Ôõ˜ŽP€
77ˆÝ¼ÊëÜw   =cÕ
Ú,ØÐ5ÎYÐ)ì´öœgŒ[¤
ßv㙑8心>h]§µháYš£²ºÑ.{Ï7Sð•?´~×SÃKýJÛ˜
™Íäiúu<µX¶1õ^kâçIÑ£sZ4h>j*ÔšD:4­¿_ ÷¸
Õxæÿ ¸?Mù _•­ÊÐ ä ÷ý ÑwL
œ­ïnTkÛUÍN©ë:¦fV ¶ÜÔÜMªÅâA½–¿R×TXš-%iTÊT•‡Ù‚JôϐZxWÑè‰f‰òG º
×Õû2aZ7OU3[“×AT–ÞŒ…-‘¤”Ì 
ì&(ˆ¿­•ƒkï’:ðY¦W‘Å)“†‘˜³Åtcø˜ñTÂwÚÇ4
|üLÇªí–v-
qˆèU
qPE.†â‘˜µ Æ,ÐÅs]8¾„oúÑ i>ÜxxÈó)ƒ ´æÁâØ$À‰vžŸf$Ž|ãw;ÀÁIJ»b`
{¦Ó¤Ú$©YÀ‘n@Óïž«9J¼êG   m¤
ܯ¹ÌW4€ÐÒÅÛ‡#褕Ÿn-?í|с¥÷Ú¹¬'´ÞÜ9ÓK`hê£SÄSà?7—Wí_´…óB›»:=Ãïq`<8ñÓŒÑlú2d¬ê³£hÖ[l|$vÝro~'R®‰§°ñmY ͧäP
|PUª¹·:3Œ[Û{Xÿ ºâ@‚W–Äé u‚ ¯´*=íή.pûÒdt @
G‰¬ s¸    ëÉücr ÞæѨÊ@>¤¢Ö±.Þ'¯°ÌME[YéïĵÂCå½
Ué©Áû'Ê9%eÔðNU”ë‘ÌsD3/®+UI˜9h.WC”
빓$#:pz:YÓ ¿xž* ³$Í +$kñAŠ‹†¢
Uê>¸)_š¬÷©ßAÂÔb9ÇU ¯¾
á•9¯ÏÏ÷O÷¼¼Fähal1‰3Ì[Ïr•´UCksNÐ]R‘¸¥H+§Šé†c©vÖÞ0iÓ76s†î!§=ß
¼~Ô'°Ãmäoäš³ªøi1úÉ)³yV8CLÄØÁ‘WYïi€H6ÖÑiámø^ÈY´°Ñ7¥Û*—Ñ©L«Qƒï—Ùrÿ ›£Ð*š¸ˆL©ˆ$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$#‰SÞ’H
ë¬ï;Á$¡t$’`<(ñÇt)$‡Ð.Êf¢X’Kt=Éé$‚ˆªè¢oÝëòI%Rgcª÷ŠyI%¡‰ÿ !ñ)´õ $¤ Ô’IIGÿÙ------------------------------------------------------------------------
-- ddMultiply.decTest -- decDouble multiplication                     --
-- Copyright (c) IBM Corporation, 1981, 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 are for decDoubles only; all arguments are
-- representable in a decDouble
precision:   16
maxExponent: 384
minExponent: -383
extended:    1
clamp:       1
rounding:    half_even

-- sanity checks
ddmul000 multiply 2      2 -> 4
ddmul001 multiply 2      3 -> 6
ddmul002 multiply 5      1 -> 5
ddmul003 multiply 5      2 -> 10
ddmul004 multiply 1.20   2 -> 2.40
ddmul005 multiply 1.20   0 -> 0.00
ddmul006 multiply 1.20  -2 -> -2.40
ddmul007 multiply -1.20  2 -> -2.40
ddmul008 multiply -1.20  0 -> -0.00
ddmul009 multiply -1.20 -2 -> 2.40
ddmul010 multiply 5.09 7.1 -> 36.139
ddmul011 multiply 2.5    4 -> 10.0
ddmul012 multiply 2.50   4 -> 10.00
ddmul013 multiply 1.23456789 1.00000000 -> 1.234567890000000 Rounded
ddmul015 multiply 2.50   4 -> 10.00
ddmul016 multiply  9.999999999  9.999999999 ->  99.99999998000000 Inexact Rounded
ddmul017 multiply  9.999999999 -9.999999999 -> -99.99999998000000 Inexact Rounded
ddmul018 multiply -9.999999999  9.999999999 -> -99.99999998000000 Inexact Rounded
ddmul019 multiply -9.999999999 -9.999999999 ->  99.99999998000000 Inexact Rounded

-- zeros, etc.
ddmul021 multiply  0      0     ->  0
ddmul022 multiply  0     -0     -> -0
ddmul023 multiply -0      0     -> -0
ddmul024 multiply -0     -0     ->  0
ddmul025 multiply -0.0   -0.0   ->  0.00
ddmul026 multiply -0.0   -0.0   ->  0.00
ddmul027 multiply -0.0   -0.0   ->  0.00
ddmul028 multiply -0.0   -0.0   ->  0.00
ddmul030 multiply  5.00   1E-3  ->  0.00500
ddmul031 multiply  00.00  0.000 ->  0.00000
ddmul032 multiply  00.00  0E-3  ->  0.00000     -- rhs is 0
ddmul033 multiply  0E-3   00.00 ->  0.00000     -- lhs is 0
ddmul034 multiply -5.00   1E-3  -> -0.00500
ddmul035 multiply -00.00  0.000 -> -0.00000
ddmul036 multiply -00.00  0E-3  -> -0.00000     -- rhs is 0
ddmul037 multiply -0E-3   00.00 -> -0.00000     -- lhs is 0
ddmul038 multiply  5.00  -1E-3  -> -0.00500
ddmul039 multiply  00.00 -0.000 -> -0.00000
ddmul040 multiply  00.00 -0E-3  -> -0.00000     -- rhs is 0
ddmul041 multiply  0E-3  -00.00 -> -0.00000     -- lhs is 0
ddmul042 multiply -5.00  -1E-3  ->  0.00500
ddmul043 multiply -00.00 -0.000 ->  0.00000
ddmul044 multiply -00.00 -0E-3  ->  0.00000     -- rhs is 0
ddmul045 multiply -0E-3  -00.00 ->  0.00000     -- lhs is 0

-- examples from decarith
ddmul050 multiply 1.20 3        -> 3.60
ddmul051 multiply 7    3        -> 21
ddmul052 multiply 0.9  0.8      -> 0.72
ddmul053 multiply 0.9  -0       -> -0.0
ddmul054 multiply 654321 654321 -> 428135971041

ddmul060 multiply 123.45 1e7  ->  1.2345E+9
ddmul061 multiply 123.45 1e8  ->  1.2345E+10
ddmul062 multiply 123.45 1e+9 ->  1.2345E+11
ddmul063 multiply 123.45 1e10 ->  1.2345E+12
ddmul064 multiply 123.45 1e11 ->  1.2345E+13
ddmul065 multiply 123.45 1e12 ->  1.2345E+14
ddmul066 multiply 123.45 1e13 ->  1.2345E+15


-- test some intermediate lengths
--                    1234567890123456
ddmul080 multiply 0.1 1230123456456789     -> 123012345645678.9
ddmul084 multiply 0.1 1230123456456789     -> 123012345645678.9
ddmul090 multiply 1230123456456789     0.1 -> 123012345645678.9
ddmul094 multiply 1230123456456789     0.1 -> 123012345645678.9

-- test some more edge cases and carries
ddmul101 multiply 9 9   -> 81
ddmul102 multiply 9 90   -> 810
ddmul103 multiply 9 900   -> 8100
ddmul104 multiply 9 9000   -> 81000
ddmul105 multiply 9 90000   -> 810000
ddmul106 multiply 9 900000   -> 8100000
ddmul107 multiply 9 9000000   -> 81000000
ddmul108 multiply 9 90000000   -> 810000000
ddmul109 multiply 9 900000000   -> 8100000000
ddmul110 multiply 9 9000000000   -> 81000000000
ddmul111 multiply 9 90000000000   -> 810000000000
ddmul112 multiply 9 900000000000   -> 8100000000000
ddmul113 multiply 9 9000000000000   -> 81000000000000
ddmul114 multiply 9 90000000000000   -> 810000000000000
ddmul115 multiply 9 900000000000000   -> 8100000000000000
--ddmul116 multiply 9 9000000000000000   -> 81000000000000000
--ddmul117 multiply 9 90000000000000000   -> 810000000000000000
--ddmul118 multiply 9 900000000000000000   -> 8100000000000000000
--ddmul119 multiply 9 9000000000000000000   -> 81000000000000000000
--ddmul120 multiply 9 90000000000000000000   -> 810000000000000000000
--ddmul121 multiply 9 900000000000000000000   -> 8100000000000000000000
--ddmul122 multiply 9 9000000000000000000000   -> 81000000000000000000000
--ddmul123 multiply 9 90000000000000000000000   -> 810000000000000000000000
-- test some more edge cases without carries
ddmul131 multiply 3 3   -> 9
ddmul132 multiply 3 30   -> 90
ddmul133 multiply 3 300   -> 900
ddmul134 multiply 3 3000   -> 9000
ddmul135 multiply 3 30000   -> 90000
ddmul136 multiply 3 300000   -> 900000
ddmul137 multiply 3 3000000   -> 9000000
ddmul138 multiply 3 30000000   -> 90000000
ddmul139 multiply 3 300000000   -> 900000000
ddmul140 multiply 3 3000000000   -> 9000000000
ddmul141 multiply 3 30000000000   -> 90000000000
ddmul142 multiply 3 300000000000   -> 900000000000
ddmul143 multiply 3 3000000000000   -> 9000000000000
ddmul144 multiply 3 30000000000000   -> 90000000000000
ddmul145 multiply 3 300000000000000   -> 900000000000000

-- test some edge cases with exact rounding
ddmul301 multiply 9 9   -> 81
ddmul302 multiply 9 90   -> 810
ddmul303 multiply 9 900   -> 8100
ddmul304 multiply 9 9000   -> 81000
ddmul305 multiply 9 90000   -> 810000
ddmul306 multiply 9 900000   -> 8100000
ddmul307 multiply 9 9000000   -> 81000000
ddmul308 multiply 9 90000000   -> 810000000
ddmul309 multiply 9 900000000   -> 8100000000
ddmul310 multiply 9 9000000000   -> 81000000000
ddmul311 multiply 9 90000000000   -> 810000000000
ddmul312 multiply 9 900000000000   -> 8100000000000
ddmul313 multiply 9 9000000000000   -> 81000000000000
ddmul314 multiply 9 90000000000000   -> 810000000000000
ddmul315 multiply 9 900000000000000   -> 8100000000000000
ddmul316 multiply 9 9000000000000000   -> 8.100000000000000E+16  Rounded
ddmul317 multiply 90 9000000000000000   -> 8.100000000000000E+17  Rounded
ddmul318 multiply 900 9000000000000000   -> 8.100000000000000E+18  Rounded
ddmul319 multiply 9000 9000000000000000   -> 8.100000000000000E+19  Rounded
ddmul320 multiply 90000 9000000000000000   -> 8.100000000000000E+20  Rounded
ddmul321 multiply 900000 9000000000000000   -> 8.100000000000000E+21  Rounded
ddmul322 multiply 9000000 9000000000000000   -> 8.100000000000000E+22  Rounded
ddmul323 multiply 90000000 9000000000000000   -> 8.100000000000000E+23  Rounded

-- tryzeros cases
ddmul504  multiply  0E-260 1000E-260  -> 0E-398 Clamped
ddmul505  multiply  100E+260 0E+260   -> 0E+369 Clamped
-- 65K-1 case
ddmul506 multiply 77.1 850 -> 65535.0

-- mixed with zeros
ddmul541 multiply  0    -1     -> -0
ddmul542 multiply -0    -1     ->  0
ddmul543 multiply  0     1     ->  0
ddmul544 multiply -0     1     -> -0
ddmul545 multiply -1     0     -> -0
ddmul546 multiply -1    -0     ->  0
ddmul547 multiply  1     0     ->  0
ddmul548 multiply  1    -0     -> -0

ddmul551 multiply  0.0  -1     -> -0.0
ddmul552 multiply -0.0  -1     ->  0.0
ddmul553 multiply  0.0   1     ->  0.0
ddmul554 multiply -0.0   1     -> -0.0
ddmul555 multiply -1.0   0     -> -0.0
ddmul556 multiply -1.0  -0     ->  0.0
ddmul557 multiply  1.0   0     ->  0.0
ddmul558 multiply  1.0  -0     -> -0.0

ddmul561 multiply  0    -1.0   -> -0.0
ddmul562 multiply -0    -1.0   ->  0.0
ddmul563 multiply  0     1.0   ->  0.0
ddmul564 multiply -0     1.0   -> -0.0
ddmul565 multiply -1     0.0   -> -0.0
ddmul566 multiply -1    -0.0   ->  0.0
ddmul567 multiply  1     0.0   ->  0.0
ddmul568 multiply  1    -0.0   -> -0.0

ddmul571 multiply  0.0  -1.0   -> -0.00
ddmul572 multiply -0.0  -1.0   ->  0.00
ddmul573 multiply  0.0   1.0   ->  0.00
ddmul574 multiply -0.0   1.0   -> -0.00
ddmul575 multiply -1.0   0.0   -> -0.00
ddmul576 multiply -1.0  -0.0   ->  0.00
ddmul577 multiply  1.0   0.0   ->  0.00
ddmul578 multiply  1.0  -0.0   -> -0.00


-- Specials
ddmul580 multiply  Inf  -Inf   -> -Infinity
ddmul581 multiply  Inf  -1000  -> -Infinity
ddmul582 multiply  Inf  -1     -> -Infinity
ddmul583 multiply  Inf  -0     ->  NaN  Invalid_operation
ddmul584 multiply  Inf   0     ->  NaN  Invalid_operation
ddmul585 multiply  Inf   1     ->  Infinity
ddmul586 multiply  Inf   1000  ->  Infinity
ddmul587 multiply  Inf   Inf   ->  Infinity
ddmul588 multiply -1000  Inf   -> -Infinity
ddmul589 multiply -Inf   Inf   -> -Infinity
ddmul590 multiply -1     Inf   -> -Infinity
ddmul591 multiply -0     Inf   ->  NaN  Invalid_operation
ddmul592 multiply  0     Inf   ->  NaN  Invalid_operation
ddmul593 multiply  1     Inf   ->  Infinity
ddmul594 multiply  1000  Inf   ->  Infinity
ddmul595 multiply  Inf   Inf   ->  Infinity

ddmul600 multiply -Inf  -Inf   ->  Infinity
ddmul601 multiply -Inf  -1000  ->  Infinity
ddmul602 multiply -Inf  -1     ->  Infinity
ddmul603 multiply -Inf  -0     ->  NaN  Invalid_operation
ddmul604 multiply -Inf   0     ->  NaN  Invalid_operation
ddmul605 multiply -Inf   1     -> -Infinity
ddmul606 multiply -Inf   1000  -> -Infinity
ddmul607 multiply -Inf   Inf   -> -Infinity
ddmul608 multiply -1000  Inf   -> -Infinity
ddmul609 multiply -Inf  -Inf   ->  Infinity
ddmul610 multiply -1    -Inf   ->  Infinity
ddmul611 multiply -0    -Inf   ->  NaN  Invalid_operation
ddmul612 multiply  0    -Inf   ->  NaN  Invalid_operation
ddmul613 multiply  1    -Inf   -> -Infinity
ddmul614 multiply  1000 -Inf   -> -Infinity
ddmul615 multiply  Inf  -Inf   -> -Infinity

ddmul621 multiply  NaN -Inf    ->  NaN
ddmul622 multiply  NaN -1000   ->  NaN
ddmul623 multiply  NaN -1      ->  NaN
ddmul624 multiply  NaN -0      ->  NaN
ddmul625 multiply  NaN  0      ->  NaN
ddmul626 multiply  NaN  1      ->  NaN
ddmul627 multiply  NaN  1000   ->  NaN
ddmul628 multiply  NaN  Inf    ->  NaN
ddmul629 multiply  NaN  NaN    ->  NaN
ddmul630 multiply -Inf  NaN    ->  NaN
ddmul631 multiply -1000 NaN    ->  NaN
ddmul632 multiply -1    NaN    ->  NaN
ddmul633 multiply -0    NaN    ->  NaN
ddmul634 multiply  0    NaN    ->  NaN
ddmul635 multiply  1    NaN    ->  NaN
ddmul636 multiply  1000 NaN    ->  NaN
ddmul637 multiply  Inf  NaN    ->  NaN

ddmul641 multiply  sNaN -Inf   ->  NaN  Invalid_operation
ddmul642 multiply  sNaN -1000  ->  NaN  Invalid_operation
ddmul643 multiply  sNaN -1     ->  NaN  Invalid_operation
ddmul644 multiply  sNaN -0     ->  NaN  Invalid_operation
ddmul645 multiply  sNaN  0     ->  NaN  Invalid_operation
ddmul646 multiply  sNaN  1     ->  NaN  Invalid_operation
ddmul647 multiply  sNaN  1000  ->  NaN  Invalid_operation
ddmul648 multiply  sNaN  NaN   ->  NaN  Invalid_operation
ddmul649 multiply  sNaN sNaN   ->  NaN  Invalid_operation
ddmul650 multiply  NaN  sNaN   ->  NaN  Invalid_operation
ddmul651 multiply -Inf  sNaN   ->  NaN  Invalid_operation
ddmul652 multiply -1000 sNaN   ->  NaN  Invalid_operation
ddmul653 multiply -1    sNaN   ->  NaN  Invalid_operation
ddmul654 multiply -0    sNaN   ->  NaN  Invalid_operation
ddmul655 multiply  0    sNaN   ->  NaN  Invalid_operation
ddmul656 multiply  1    sNaN   ->  NaN  Invalid_operation
ddmul657 multiply  1000 sNaN   ->  NaN  Invalid_operation
ddmul658 multiply  Inf  sNaN   ->  NaN  Invalid_operation
ddmul659 multiply  NaN  sNaN   ->  NaN  Invalid_operation

-- propagating NaNs
ddmul661 multiply  NaN9 -Inf   ->  NaN9
ddmul662 multiply  NaN8  999   ->  NaN8
ddmul663 multiply  NaN71 Inf   ->  NaN71
ddmul664 multiply  NaN6  NaN5  ->  NaN6
ddmul665 multiply -Inf   NaN4  ->  NaN4
ddmul666 multiply -999   NaN33 ->  NaN33
ddmul667 multiply  Inf   NaN2  ->  NaN2

ddmul671 multiply  sNaN99 -Inf    ->  NaN99 Invalid_operation
ddmul672 multiply  sNaN98 -11     ->  NaN98 Invalid_operation
ddmul673 multiply  sNaN97  NaN    ->  NaN97 Invalid_operation
ddmul674 multiply  sNaN16 sNaN94  ->  NaN16 Invalid_operation
ddmul675 multiply  NaN95  sNaN93  ->  NaN93 Invalid_operation
ddmul676 multiply -Inf    sNaN92  ->  NaN92 Invalid_operation
ddmul677 multiply  088    sNaN91  ->  NaN91 Invalid_operation
ddmul678 multiply  Inf    sNaN90  ->  NaN90 Invalid_operation
ddmul679 multiply  NaN    sNaN89  ->  NaN89 Invalid_operation

ddmul681 multiply -NaN9 -Inf   -> -NaN9
ddmul682 multiply -NaN8  999   -> -NaN8
ddmul683 multiply -NaN71 Inf   -> -NaN71
ddmul684 multiply -NaN6 -NaN5  -> -NaN6
ddmul685 multiply -Inf  -NaN4  -> -NaN4
ddmul686 multiply -999  -NaN33 -> -NaN33
ddmul687 multiply  Inf  -NaN2  -> -NaN2

ddmul691 multiply -sNaN99 -Inf    -> -NaN99 Invalid_operation
ddmul692 multiply -sNaN98 -11     -> -NaN98 Invalid_operation
ddmul693 multiply -sNaN97  NaN    -> -NaN97 Invalid_operation
ddmul694 multiply -sNaN16 -sNaN94 -> -NaN16 Invalid_operation
ddmul695 multiply -NaN95  -sNaN93 -> -NaN93 Invalid_operation
ddmul696 multiply -Inf    -sNaN92 -> -NaN92 Invalid_operation
ddmul697 multiply  088    -sNaN91 -> -NaN91 Invalid_operation
ddmul698 multiply  Inf    -sNaN90 -> -NaN90 Invalid_operation
ddmul699 multiply -NaN    -sNaN89 -> -NaN89 Invalid_operation

ddmul701 multiply -NaN  -Inf   -> -NaN
ddmul702 multiply -NaN   999   -> -NaN
ddmul703 multiply -NaN   Inf   -> -NaN
ddmul704 multiply -NaN  -NaN   -> -NaN
ddmul705 multiply -Inf  -NaN0  -> -NaN
ddmul706 multiply -999  -NaN   -> -NaN
ddmul707 multiply  Inf  -NaN   -> -NaN

ddmul711 multiply -sNaN   -Inf    -> -NaN Invalid_operation
ddmul712 multiply -sNaN   -11     -> -NaN Invalid_operation
ddmul713 multiply -sNaN00  NaN    -> -NaN Invalid_operation
ddmul714 multiply -sNaN   -sNaN   -> -NaN Invalid_operation
ddmul715 multiply -NaN    -sNaN   -> -NaN Invalid_operation
ddmul716 multiply -Inf    -sNaN   -> -NaN Invalid_operation
ddmul717 multiply  088    -sNaN   -> -NaN Invalid_operation
ddmul718 multiply  Inf    -sNaN   -> -NaN Invalid_operation
ddmul719 multiply -NaN    -sNaN   -> -NaN Invalid_operation

-- overflow and underflow tests .. note subnormal results
-- signs
ddmul751 multiply  1e+277  1e+311 ->  Infinity Overflow Inexact Rounded
ddmul752 multiply  1e+277 -1e+311 -> -Infinity Overflow Inexact Rounded
ddmul753 multiply -1e+277  1e+311 -> -Infinity Overflow Inexact Rounded
ddmul754 multiply -1e+277 -1e+311 ->  Infinity Overflow Inexact Rounded
ddmul755 multiply  1e-277  1e-311 ->  0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul756 multiply  1e-277 -1e-311 -> -0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul757 multiply -1e-277  1e-311 -> -0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul758 multiply -1e-277 -1e-311 ->  0E-398 Underflow Subnormal Inexact Rounded Clamped

-- 'subnormal' boundary (all hard underflow or overflow in base arithmetic)
ddmul760 multiply 1e-291 1e-101 -> 1E-392 Subnormal
ddmul761 multiply 1e-291 1e-102 -> 1E-393 Subnormal
ddmul762 multiply 1e-291 1e-103 -> 1E-394 Subnormal
ddmul763 multiply 1e-291 1e-104 -> 1E-395 Subnormal
ddmul764 multiply 1e-291 1e-105 -> 1E-396 Subnormal
ddmul765 multiply 1e-291 1e-106 -> 1E-397 Subnormal
ddmul766 multiply 1e-291 1e-107 -> 1E-398 Subnormal
ddmul767 multiply 1e-291 1e-108 -> 0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul768 multiply 1e-291 1e-109 -> 0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul769 multiply 1e-291 1e-110 -> 0E-398 Underflow Subnormal Inexact Rounded Clamped
-- [no equivalent of 'subnormal' for overflow]
ddmul770 multiply 1e+60 1e+321 -> 1.000000000000E+381  Clamped
ddmul771 multiply 1e+60 1e+322 -> 1.0000000000000E+382  Clamped
ddmul772 multiply 1e+60 1e+323 -> 1.00000000000000E+383  Clamped
ddmul773 multiply 1e+60 1e+324 -> 1.000000000000000E+384  Clamped
ddmul774 multiply 1e+60 1e+325 -> Infinity Overflow Inexact Rounded
ddmul775 multiply 1e+60 1e+326 -> Infinity Overflow Inexact Rounded
ddmul776 multiply 1e+60 1e+327 -> Infinity Overflow Inexact Rounded
ddmul777 multiply 1e+60 1e+328 -> Infinity Overflow Inexact Rounded
ddmul778 multiply 1e+60 1e+329 -> Infinity Overflow Inexact Rounded
ddmul779 multiply 1e+60 1e+330 -> Infinity Overflow Inexact Rounded

ddmul801 multiply  1.0000E-394  1     -> 1.0000E-394 Subnormal
ddmul802 multiply  1.000E-394   1e-1  -> 1.000E-395  Subnormal
ddmul803 multiply  1.00E-394    1e-2  -> 1.00E-396   Subnormal
ddmul804 multiply  1.0E-394     1e-3  -> 1.0E-397    Subnormal
ddmul805 multiply  1.0E-394     1e-4  -> 1E-398     Subnormal Rounded
ddmul806 multiply  1.3E-394     1e-4  -> 1E-398     Underflow Subnormal Inexact Rounded
ddmul807 multiply  1.5E-394     1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul808 multiply  1.7E-394     1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul809 multiply  2.3E-394     1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul810 multiply  2.5E-394     1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul811 multiply  2.7E-394     1e-4  -> 3E-398     Underflow Subnormal Inexact Rounded
ddmul812 multiply  1.49E-394    1e-4  -> 1E-398     Underflow Subnormal Inexact Rounded
ddmul813 multiply  1.50E-394    1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul814 multiply  1.51E-394    1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul815 multiply  2.49E-394    1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul816 multiply  2.50E-394    1e-4  -> 2E-398     Underflow Subnormal Inexact Rounded
ddmul817 multiply  2.51E-394    1e-4  -> 3E-398     Underflow Subnormal Inexact Rounded

ddmul818 multiply  1E-394       1e-4  -> 1E-398     Subnormal
ddmul819 multiply  3E-394       1e-5  -> 0E-398     Underflow Subnormal Inexact Rounded Clamped
ddmul820 multiply  5E-394       1e-5  -> 0E-398     Underflow Subnormal Inexact Rounded Clamped
ddmul821 multiply  7E-394       1e-5  -> 1E-398     Underflow Subnormal Inexact Rounded
ddmul822 multiply  9E-394       1e-5  -> 1E-398     Underflow Subnormal Inexact Rounded
ddmul823 multiply  9.9E-394     1e-5  -> 1E-398     Underflow Subnormal Inexact Rounded

ddmul824 multiply  1E-394      -1e-4  -> -1E-398    Subnormal
ddmul825 multiply  3E-394      -1e-5  -> -0E-398    Underflow Subnormal Inexact Rounded Clamped
ddmul826 multiply -5E-394       1e-5  -> -0E-398    Underflow Subnormal Inexact Rounded Clamped
ddmul827 multiply  7E-394      -1e-5  -> -1E-398    Underflow Subnormal Inexact Rounded
ddmul828 multiply -9E-394       1e-5  -> -1E-398    Underflow Subnormal Inexact Rounded
ddmul829 multiply  9.9E-394    -1e-5  -> -1E-398    Underflow Subnormal Inexact Rounded
ddmul830 multiply  3.0E-394    -1e-5  -> -0E-398    Underflow Subnormal Inexact Rounded Clamped

ddmul831 multiply  1.0E-199     1e-200 -> 0E-398 Underflow Subnormal Inexact Rounded Clamped
ddmul832 multiply  1.0E-199     1e-199 -> 1E-398    Subnormal Rounded
ddmul833 multiply  1.0E-199     1e-198 -> 1.0E-397    Subnormal
ddmul834 multiply  2.0E-199     2e-198 -> 4.0E-397    Subnormal
ddmul835 multiply  4.0E-199     4e-198 -> 1.60E-396   Subnormal
ddmul836 multiply 10.0E-199    10e-198 -> 1.000E-395  Subnormal
ddmul837 multiply 30.0E-199    30e-198 -> 9.000E-395  Subnormal
ddmul838 multiply 40.0E-199    40e-188 -> 1.6000E-384 Subnormal
ddmul839 multiply 40.0E-199    40e-187 -> 1.6000E-383
ddmul840 multiply 40.0E-199    40e-186 -> 1.6000E-382

-- Long operand overflow may be a different path
ddmul870 multiply 100  9.999E+383         ->  Infinity Inexact Overflow Rounded
ddmul871 multiply 100 -9.999E+383     -> -Infinity Inexact Overflow Rounded
ddmul872 multiply      9.999E+383 100 ->  Infinity Inexact Overflow Rounded
ddmul873 multiply     -9.999E+383 100 -> -Infinity Inexact Overflow Rounded

-- check for double-rounded subnormals
ddmul881 multiply  1.2347E-355 1.2347E-40  ->  1.524E-395 Inexact Rounded Subnormal Underflow
ddmul882 multiply  1.234E-355 1.234E-40    ->  1.523E-395 Inexact Rounded Subnormal Underflow
ddmul883 multiply  1.23E-355  1.23E-40     ->  1.513E-395 Inexact Rounded Subnormal Underflow
ddmul884 multiply  1.2E-355   1.2E-40      ->  1.44E-395  Subnormal
ddmul885 multiply  1.2E-355   1.2E-41      ->  1.44E-396  Subnormal
ddmul886 multiply  1.2E-355   1.2E-42      ->  1.4E-397   Subnormal Inexact Rounded Underflow
ddmul887 multiply  1.2E-355   1.3E-42      ->  1.6E-397   Subnormal Inexact Rounded Underflow
ddmul888 multiply  1.3E-355   1.3E-42      ->  1.7E-397   Subnormal Inexact Rounded Underflow
ddmul889 multiply  1.3E-355   1.3E-43      ->    2E-398   Subnormal Inexact Rounded Underflow
ddmul890 multiply  1.3E-356   1.3E-43      ->    0E-398   Clamped Subnormal Inexact Rounded Underflow

ddmul891 multiply  1.2345E-39   1.234E-355 ->  1.5234E-394 Inexact Rounded Subnormal Underflow
ddmul892 multiply  1.23456E-39  1.234E-355 ->  1.5234E-394 Inexact Rounded Subnormal Underflow
ddmul893 multiply  1.2345E-40   1.234E-355 ->  1.523E-395  Inexact Rounded Subnormal Underflow
ddmul894 multiply  1.23456E-40  1.234E-355 ->  1.523E-395  Inexact Rounded Subnormal Underflow
ddmul895 multiply  1.2345E-41   1.234E-355 ->  1.52E-396   Inexact Rounded Subnormal Underflow
ddmul896 multiply  1.23456E-41  1.234E-355 ->  1.52E-396   Inexact Rounded Subnormal Underflow

-- Now explore the case where we get a normal result with Underflow
--                                                        1 234567890123456
ddmul900 multiply  0.3000000000E-191 0.3000000000E-191 -> 9.00000000000000E-384 Subnormal Rounded
ddmul901 multiply  0.3000000001E-191 0.3000000001E-191 -> 9.00000000600000E-384 Underflow Inexact Subnormal Rounded
ddmul902 multiply  9.999999999999999E-383  0.0999999999999    -> 9.99999999999000E-384 Underflow Inexact Subnormal Rounded
ddmul903 multiply  9.999999999999999E-383  0.09999999999999   -> 9.99999999999900E-384 Underflow Inexact Subnormal Rounded
ddmul904 multiply  9.999999999999999E-383  0.099999999999999  -> 9.99999999999990E-384 Underflow Inexact Subnormal Rounded
ddmul905 multiply  9.999999999999999E-383  0.0999999999999999 -> 9.99999999999999E-384 Underflow Inexact Subnormal Rounded
-- The next rounds to Nmin (b**emin); this is the distinguishing case
-- for detecting tininess (before or after rounding) -- if after
-- rounding then the result would be the same, but the Underflow flag
-- would not be set
ddmul906 multiply  9.999999999999999E-383  0.09999999999999999     -> 1.000000000000000E-383 Underflow Inexact Subnormal Rounded
-- prove those operands were exact
ddmul907 multiply  9.999999999999999E-383  1                       -> 9.999999999999999E-383
ddmul908 multiply                       1  0.09999999999999999     -> 0.09999999999999999

-- reducing tiniest
ddmul910 multiply 1e-398 0.99 -> 1E-398 Subnormal Inexact Rounded Underflow
ddmul911 multiply 1e-398 0.75 -> 1E-398 Subnormal Inexact Rounded Underflow
ddmul912 multiply 1e-398 0.5  -> 0E-398 Subnormal Inexact Rounded Underflow Clamped
ddmul913 multiply 1e-398 0.25 -> 0E-398 Subnormal Inexact Rounded Underflow Clamped
ddmul914 multiply 1e-398 0.01 -> 0E-398 Subnormal Inexact Rounded Underflow Clamped

-- hugest
ddmul920 multiply  9999999999999999 9999999999999999 -> 9.999999999999998E+31 Inexact Rounded

-- power-of-ten edge cases
ddmul1001 multiply  1      10               -> 10
ddmul1002 multiply  1      100              -> 100
ddmul1003 multiply  1      1000             -> 1000
ddmul1004 multiply  1      10000            -> 10000
ddmul1005 multiply  1      100000           -> 100000
ddmul1006 multiply  1      1000000          -> 1000000
ddmul1007 multiply  1      10000000         -> 10000000
ddmul1008 multiply  1      100000000        -> 100000000
ddmul1009 multiply  1      1000000000       -> 1000000000
ddmul1010 multiply  1      10000000000      -> 10000000000
ddmul1011 multiply  1      100000000000     -> 100000000000
ddmul1012 multiply  1      1000000000000    -> 1000000000000
ddmul1013 multiply  1      10000000000000   -> 10000000000000
ddmul1014 multiply  1      100000000000000  -> 100000000000000
ddmul1015 multiply  1      1000000000000000 -> 1000000000000000
ddmul1021 multiply  10     1                -> 10
ddmul1022 multiply  10     10               -> 100
ddmul1023 multiply  10     100              -> 1000
ddmul1024 multiply  10     1000             -> 10000
ddmul1025 multiply  10     10000            -> 100000
ddmul1026 multiply  10     100000           -> 1000000
ddmul1027 multiply  10     1000000          -> 10000000
ddmul1028 multiply  10     10000000         -> 100000000
ddmul1029 multiply  10     100000000        -> 1000000000
ddmul1030 multiply  10     1000000000       -> 10000000000
ddmul1031 multiply  10     10000000000      -> 100000000000
ddmul1032 multiply  10     100000000000     -> 1000000000000
ddmul1033 multiply  10     1000000000000    -> 10000000000000
ddmul1034 multiply  10     10000000000000   -> 100000000000000
ddmul1035 multiply  10     100000000000000  -> 1000000000000000
ddmul1041 multiply  100    0.1              -> 10.0
ddmul1042 multiply  100    1                -> 100
ddmul1043 multiply  100    10               -> 1000
ddmul1044 multiply  100    100              -> 10000
ddmul1045 multiply  100    1000             -> 100000
ddmul1046 multiply  100    10000            -> 1000000
ddmul1047 multiply  100    100000           -> 10000000
ddmul1048 multiply  100    1000000          -> 100000000
ddmul1049 multiply  100    10000000         -> 1000000000
ddmul1050 multiply  100    100000000        -> 10000000000
ddmul1051 multiply  100    1000000000       -> 100000000000
ddmul1052 multiply  100    10000000000      -> 1000000000000
ddmul1053 multiply  100    100000000000     -> 10000000000000
ddmul1054 multiply  100    1000000000000    -> 100000000000000
ddmul1055 multiply  100    10000000000000   -> 1000000000000000
ddmul1061 multiply  1000   0.01             -> 10.00
ddmul1062 multiply  1000   0.1              -> 100.0
ddmul1063 multiply  1000   1                -> 1000
ddmul1064 multiply  1000   10               -> 10000
ddmul1065 multiply  1000   100              -> 100000
ddmul1066 multiply  1000   1000             -> 1000000
ddmul1067 multiply  1000   10000            -> 10000000
ddmul1068 multiply  1000   100000           -> 100000000
ddmul1069 multiply  1000   1000000          -> 1000000000
ddmul1070 multiply  1000   10000000         -> 10000000000
ddmul1071 multiply  1000   100000000        -> 100000000000
ddmul1072 multiply  1000   1000000000       -> 1000000000000
ddmul1073 multiply  1000   10000000000      -> 10000000000000
ddmul1074 multiply  1000   100000000000     -> 100000000000000
ddmul1075 multiply  1000   1000000000000    -> 1000000000000000
ddmul1081 multiply  10000  0.001            -> 10.000
ddmul1082 multiply  10000  0.01             -> 100.00
ddmul1083 multiply  10000  0.1              -> 1000.0
ddmul1084 multiply  10000  1                -> 10000
ddmul1085 multiply  10000  10               -> 100000
ddmul1086 multiply  10000  100              -> 1000000
ddmul1087 multiply  10000  1000             -> 10000000
ddmul1088 multiply  10000  10000            -> 100000000
ddmul1089 multiply  10000  100000           -> 1000000000
ddmul1090 multiply  10000  1000000          -> 10000000000
ddmul1091 multiply  10000  10000000         -> 100000000000
ddmul1092 multiply  10000  100000000        -> 1000000000000
ddmul1093 multiply  10000  1000000000       -> 10000000000000
ddmul1094 multiply  10000  10000000000      -> 100000000000000
ddmul1095 multiply  10000  100000000000     -> 1000000000000000

ddmul1097 multiply  10000   99999999999     ->  999999999990000
ddmul1098 multiply  10000   99999999999     ->  999999999990000


-- Null tests
ddmul9990 multiply 10  # -> NaN Invalid_operation
ddmul9991 multiply  # 10 -> NaN Invalid_operation