d1073331-bf02-4143-9913-5698cdd35ed9 8 4 5 decimal

&[DATE] &[TIME] - &[FILENAME]

A26 100! maple : 93326215443944152681699238856266700490715968264381621468592963895217599993229915608941463976156518286253697920827223758251185210916864000000000000000000000000

B26 A26 length maple : 158

D 123456789123456789123456789 :

create 2 big numbers D 2^4 / maple D 2^4.5 / maple 21 mat 3810394695168430000000000000000000000000000000000000338701750681637301024572850690104900347169350004233821 mat

D 2^4 / maple 3810394695168430000000000000000000000000000000000000

D 2^4.5 / length maple 52

D 2^4 / length maple 57

big D 2^4.333333333333333333333333333333333333 / maple : 1524157878067370000000000000000000000000000000000000000000000000000433333333333333 /

big length maple 85

big num length maple 93

D length maple 27

4.333333333333333333333333333333 length maple 33

n 29 :

Otherwise BigNumbers ... access from page scroll right

Continued fraction from Maple x g x asin confrac x n convert maple :

x g x 1 x 2^6 - x 2^1017 / x 2^4046549 / - x 2^6028021173833 / x 2^10489081682212889271025 / - x 2^5732517140226501207527848162057 / x 2^1834977630750032253894211429260073560268145 / - x 2^3517069995288784744196196565078246061153289393883349436393 / x 2^76072737030500537807523811420405439763883612794713108551052301424990614403025 / - x 2^140174058510705863619636617991566447036585236458325085176350762460117265114290538475878617567073 / x 2^24283244860432701277487768528003823511008234178028733588033425720842183620193029548992809437204741492098682217189217429 / - x 2^910110524464650582198779297050019713164259839933026506606253802945405021822632403477499293988600622416962479150802700396031633835234915454817 / 55621631914142184273708015407131361454720710382488621194737528142355319034805357449 x 2^* 541273340610849473193208027720111195202158078866752020222592439965947484009436001446 / - / + / + / + / + / + / + / + / + / + / + / + / + /

Create/Export some BigNumber

big 55621631914142184273708015407131361454720710382488621194737528142355319034805357449541273340610849473193208027720111195202158078866752020222592439965947484009436001446 / : 0.102760708390646

big length maple 32

Length of 'Ulp'... Unit in last place

4.3333333333333333333333333333333333 length maple 33

4.333333333333 length maple 29

4.33333333 length maple 21

55621631914142184273708015407131361454720710382488621194737528142355319034805357449 length maple 83

541273340610849473193208027720111195202158078866752020222592439965947484009436001446 length maple 84

1.02 40^maple 20082003753621867852658193545979631718214445184884933971994992445200190949470177292823791503906250000000000000000000000000000000000000000 /

1.02 40^length maple 140

In computer science and numerical analysis, unit in the last place or unit of least precision (ULP) is the spacing between two consecutive floating-point numbers, i.e., the value the least significant digit (rightmost digit) represents if it is 1. It is used as a measure of accuracy in numeric calculations.

232^maple 4294967296

3 0.3333^maple 310000 nthroot 3333^

3 0.3333^length maple 16

2.123456789 sqrt maple 21234567890 sqrt 100000 /

2.123456789 sqrt length maple 32

Thiele Treasury McCabe-Padé.sm ▼

Alt 31 ▼

Evaluate Big Numbers from native Smath/Maple companions

941 x * 260000 / - 40114075408000 / + 7909057726314060800000 x 9792160046507828402925704437610475000000 / + 52366150115131818999391789957730509141858862178191492647432157139612500000000000000000000 x 2343098968909673692170246462297495415157951214626162728470486139823740785064321884626228015959157090543424618858773387500000 / - 2288869492691392783279017011280523278362648075950774178596504195346317505753796994725537385950120282645546453551924891542230020202260334083440591916609043562872565053480115048493393612500000000000000000000 x 21721862426611306803582187689379887779531007041348367919596142149806879432868112670425000000 / - (* / - (* / + (* / +

β 941260000 / 40114075408000 / 9792160046507828402925704437610475000000 / 2343098968909673692170246462297495415157951214626162728470486139823740785064321884626228015959157090543424618858773387500000 / 21721862426611306803582187689379887779531007041348367919596142149806879432868112670425000000 / 7909057726314060800000 / 52366150115131818999391789957730509141858862178191492647432157139612500000000000000000000 / 2288869492691392783279017011280523278362648075950774178596504195346317505753796994725537385950120282645546453551924891542230020202260334083440591916609043562872565053480115048493393612500000000000000000000 / 18 mat :

β 0.0036 0.7418 3.8095 0.5884 2.157 1012 -^* 5.6249 6.6972 1.1285 1015 -^* 18 mat

x λ 10 x ≤ (x 3 ≤ (& cases :

x Cf β 1 el x * - β 2 el + β 6 el x β 3 el + β 7 el x β 4 el - β 8 el x β 5 el - / - / + / + :

x Cf x λ * x Cf x diff x λ * 2 1 sys

LISTING THE PRIMES

n 1100 :

prime 1 el 2 : t 1 : i 3 : i n ≤ i i 2 + : j 1 : j t ≤ j j 1 + : i prime j el mod 0 ≡ check 1 : break 21 line check 0 : if 11 line for check 0 ≡ t t 1 + : prime t el i : 21 line continue if 21 line for 31 line

Length vector h prime length : 184

hh h sqrt trunc : 13

i 1 : j 1 : t 1 : t h ≤ t t 1 + : prime_mat i j el prime t el : j hh ≥ i i 1 + : j 1 : 21 line j j 1 + : if 21 line for 31 line

Total length matrix prime_mat length 195

prime_mat 11 mat 23571113171923293137414347535961677173798389971011031071091131271311371391491511571631671731791811911931971992112232272292332392412512572632692712772812832933073113133173313373473493533593673733793833893974014094194214314334394434494574614634674794874914995035095215235415475575635695715775875935996016076136176196316416436476536596616736776836917017097197277337397437517577617697737877978098118218238278298398538578598638778818838879079119199299379419479539679719779839919971009101310191021103110331039104910511061106310691087109110931097000000000001513 mat 11 mat

...Disabled... 5 pages length

ASPIRE ONE D257-1907 [64 bits] ... "above/below max/min for double floating point" BigNumber 6901388083493009371102278192341558410880794617677808452203063012016883293050658522000637758065814573677547408512671352939922361441495527118133849140924102994717209666481880012023467997284401402253756244189862223346400726491448394053427049923945908140791747443123028564600614617000746599419681711793582101679220919696324675270175491373952723042116595331406937404923100307117164365158212570106132146557179104403821515638686208051140438589371800910144.00369728648573268784997507938865987303569054566273145669378346688497746707688312393868278482487 365867483736353460472897282878772013939055039572035113061700344520684534837667280962156954725917369422640518269526349803158833011736294398409605338812695830167343219626656026328085633407393533684194675800263617332343707555713857635682292102173832083653870280746186425435632564580287392462874592361391119687567465091835475978195610242739308106000833836140481728467908108705462697919806814575123079032827583668182592071516171531301449774600728679728531974754309918571165160098999743886881285688994039989302685853984753480695818973501562500000000 / :