Number Info
| ID | 57393 |
| Size | 1420 digits / 4717 bits |
| Value | 7549091028846685480284764806062896171393177709465180617050366145371337270338421710641605384153978142814213877016361133913180407705557412390784393108771794771008880581889431716423632546865764599383239619624441629867534789457744408953850782192868715468824120848577824697746608033539963789018740845888376121648395811462473170750831559652798280538197477103072677768582534813181239682973342122986892351011434362215578862187658601887501782535434622219291890883570653885956273917136872157390175573660019260259979177016333587338464577313214680272051124368821842362793910485811788445550574640586621175844564041014324137344663553688872914678318145100735251559190226257891938593941900813511144046371051469339852822967915174859342826745957384281989214491490530908783938784207277255686767442732442087011064286432882898132508095461676972436069021292821534942426075130245804943432598158654012303559065500276996296658866225545268152919289297402458708869697257464809417220527361485978784707389524849380152107389538720168187518707148257590077332400157355012429689383023061713905253426042615913052996027433601982941858034928502040046226765354234630983930334736363391719412737801090177103010726377356311178869332683165980047666979241374667601368832643516998726189055999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999 |
| Progress | 1.54% |
| Completed | no |
| Small factors | 67232375741<11> × 128461344383<12> |
| Large cofactor | 874065023006108543549062829088166011058342109630069146517429059640106273884061106551218928658177696193890294610516356450476810251795537040133742330881711058129247673337596220554917201212133856574426028438523760866293105851471485647153281950244561446562264201801801488321944929857680898466892185937315878717299577180447327393420402112606699288221780638591193055766111296658690348670058390973455708256560217723943215587775233634156998129320932535976497986462560096603814424383608249480237458793701387978962933431568499763188196278141110329909521329066227950591330623880450544763202341442279829936703058215649470100032668170404550927518817365593016435502828807827526557115516631893169834129183287675920258693220280535419820739150070174032001965026296253054507036407188171177270092144317090012443493678103439457971075513295211160716684984726319900054388389466438838122483190497145365775886139634382912851432245696481841127796705644120289688949758529217185131799078239439308178740588384630033638255651269877021014470216683721181808229337660080610837635189260876545624261624554362330676145464556660286582717547160630581140144111730744432407564380446537955771602037321464524410097526305434428161369627265802886472006717284566275562696299280571222505075222640091263140804387697787972965482890349259516494582646109745977725636814578370243394751673071304854130144318104709663624012149420032334938733811392533 (composite) |
Factorization
Format: number = small prime × proven prime<size> × (probable prime)<size> × [composite]<size> × {unknown}<size>
7549091028846685480284764806062896171393177709465180617050366145371337270338421710641605384153978142814213877016361133913180407705557412390784393108771794771008880581889431716423632546865764599383239619624441629867534789457744408953850782192868715468824120848577824697746608033539963789018740845888376121648395811462473170750831559652798280538197477103072677768582534813181239682973342122986892351011434362215578862187658601887501782535434622219291890883570653885956273917136872157390175573660019260259979177016333587338464577313214680272051124368821842362793910485811788445550574640586621175844564041014324137344663553688872914678318145100735251559190226257891938593941900813511144046371051469339852822967915174859342826745957384281989214491490530908783938784207277255686767442732442087011064286432882898132508095461676972436069021292821534942426075130245804943432598158654012303559065500276996296658866225545268152919289297402458708869697257464809417220527361485978784707389524849380152107389538720168187518707148257590077332400157355012429689383023061713905253426042615913052996027433601982941858034928502040046226765354234630983930334736363391719412737801090177103010726377356311178869332683165980047666979241374667601368832643516998726189055999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999 = 67232375741<11> × 128461344383<12> × [874065023006108543549062829088166011058342109630069146517429059640106273884061106551218928658177696193890294610516356450476810251795537040133742330881711058129247673337596220554917201212133856574426028438523760866293105851471485647153281950244561446562264201801801488321944929857680898466892185937315878717299577180447327393420402112606699288221780638591193055766111296658690348670058390973455708256560217723943215587775233634156998129320932535976497986462560096603814424383608249480237458793701387978962933431568499763188196278141110329909521329066227950591330623880450544763202341442279829936703058215649470100032668170404550927518817365593016435502828807827526557115516631893169834129183287675920258693220280535419820739150070174032001965026296253054507036407188171177270092144317090012443493678103439457971075513295211160716684984726319900054388389466438838122483190497145365775886139634382912851432245696481841127796705644120289688949758529217185131799078239439308178740588384630033638255651269877021014470216683721181808229337660080610837635189260876545624261624554362330676145464556660286582717547160630581140144111730744432407564380446537955771602037321464524410097526305434428161369627265802886472006717284566275562696299280571222505075222640091263140804387697787972965482890349259516494582646109745977725636814578370243394751673071304854130144318104709663624012149420032334938733811392533<1398>]
Categories
- n!/n# - 1 (index 581)