Small Mersenne Prime Factors (page 4732/5025)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Dig.	Year
67223623763	134447247527	12	~2016
67232865697	403397194183	12	~2017
67248393323	134496786647	12	~2016
67249751363	134499502727	12	~2016
67249938719	134499877439	12	~2016
67252824011	134505648023	12	~2016
67256075459	134512150919	12	~2016
67258686923	134517373847	12	~2016
67261197071	134522394143	12	~2016
67268174783	134536349567	12	~2016
67268597771	538148782169	12	~2017
67268860031	134537720063	12	~2016
67273686443	134547372887	12	~2016
67274012777	403644076663	12	~2017
67274300111	134548600223	12	~2016
67282188023	134564376047	12	~2016
67284092087	538272736697	12	~2017
67293261179	134586522359	12	~2016
67296968041	403781808247	12	~2017
67297246391	134594492783	12	~2016
67298093939	134596187879	12	~2016
67305150239	134610300479	12	~2016
67307056139	134614112279	12	~2016
67307831159	134615662319	12	~2016
67307856911	134615713823	12	~2016

Exponent	Prime Factor	Dig.	Year
67316982983	134633965967	12	~2016
67320199643	134640399287	12	~2016
67322697731	134645395463	12	~2016
67326201247	673262012471	12	~2017
67327484519	134654969039	12	~2016
67327558643	134655117287	12	~2016
67328179099	673281790991	12	~2017
67331892583	673318925831	12	~2017
67334401859	134668803719	12	~2016
67336914383	7878...828111	14	2023
67340033279	134680066559	12	~2016
67340723231	134681446463	12	~2016
67352175263	134704350527	12	~2016
67355994551	134711989103	12	~2016
67356226403	134712452807	12	~2016
67363073243	134726146487	12	~2016
67365989701	404195938207	12	~2017
67368902063	134737804127	12	~2016
67372989839	134745979679	12	~2016
67373122247	538984977977	12	~2017
67375408843	673754088431	12	~2017
67376033317	404256199903	12	~2017
67378344643	6212...760847	14	2024
67381577831	134763155663	12	~2016
67383375001	404300250007	12	~2017

Exponent	Prime Factor	Dig.	Year
67389672299	134779344599	12	~2016
67391937971	134783875943	12	~2016
67392294899	134784589799	12	~2016
67393085999	134786171999	12	~2016
67393922699	134787845399	12	~2016
67395345917	2143...001607	14	2023
67399323503	134798647007	12	~2016
67400092283	134800184567	12	~2016
67401586753	404409520519	12	~2017
67408390739	134816781479	12	~2016
67408985411	134817970823	12	~2016
67411271177	404467627063	12	~2017
67412536991	134825073983	12	~2016
67413755699	3842...748431	14	2023
67415487199	674154871991	12	~2017
67417806719	134835613439	12	~2016
67421697191	539373577529	12	~2017
67422131219	134844262439	12	~2016
67430352719	134860705439	12	~2016
67435927679	134871855359	12	~2016
67442283179	134884566359	12	~2016
67443987119	134887974239	12	~2016
67454389283	134908778567	12	~2016
67455776231	134911552463	12	~2016
67461993671	134923987343	12	~2016

Exponent	Prime Factor	Dig.	Year
67462762511	134925525023	12	~2016
67463954843	134927909687	12	~2016
67466424479	134932848959	12	~2016
67466919251	134933838503	12	~2016
67469905931	134939811863	12	~2016
67477062293	404862373759	12	~2017
67478199599	134956399199	12	~2016
67482736877	404896421263	12	~2017
67491142403	134982284807	12	~2016
67491348131	539930785049	12	~2017
67493924819	134987849639	12	~2016
67497029543	134994059087	12	~2016
67497102901	404982617407	12	~2017
67501230257	405007381543	12	~2017
67501861103	135003722207	12	~2016
67502098511	135004197023	12	~2016
67502467223	135004934447	12	~2016
67504642199	540037137593	12	~2017
67506822611	540054580889	12	~2017
67509005363	135018010727	12	~2016
67510730291	135021460583	12	~2016
67511064251	135022128503	12	~2016
67513334363	135026668727	12	~2016
67524353497	405146120983	12	~2017
67535286719	135070573439	12	~2016

4.724.182 digits

25-04-13