Small Mersenne Prime Factors (page 4537/5070)

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
25097606771	50195213543	11	~2012
25098010631	50196021263	11	~2012
25100345999	50200691999	11	~2012
25100488799	50200977599	11	~2012
25104649499	50209298999	11	~2012
25104770981	150628625887	12	~2013
25106260199	50212520399	11	~2012
25106324891	50212649783	11	~2012
25107047519	602569140457	12	~2015
25107141971	50214283943	11	~2012
25107545483	50215090967	11	~2012
25107979271	50215958543	11	~2012
25110960779	50221921559	11	~2012
25111179719	200889437753	12	~2014
25111361519	50222723039	11	~2012
25113524309	7810...600991	14	2023
25114817951	50229635903	11	~2012
25118242043	50236484087	11	~2012
25119545041	150717270247	12	~2013
25122454223	50244908447	11	~2012
25122468491	50244936983	11	~2012
25123084277	150738505663	12	~2013
25123675079	50247350159	11	~2012
25124531567	200996252537	12	~2014
25125100103	50250200207	11	~2012

Exponent	Prime Factor	Dig.	Year
25125357671	50250715343	11	~2012
25125518063	50251036127	11	~2012
25125592451	50251184903	11	~2012
25126758203	50253516407	11	~2012
25127295983	3196...490377	14	2023
25127415239	201019321913	12	~2014
25127565959	50255131919	11	~2012
25127579723	50255159447	11	~2012
25128048119	50256096239	11	~2012
25128712151	50257424303	11	~2012
25130397599	50260795199	11	~2012
25131307511	201050460089	12	~2014
25131831757	150790990543	12	~2013
25131935723	50263871447	11	~2012
25135437263	50270874527	11	~2012
25137584159	50275168319	11	~2012
25137864391	452481559039	12	~2015
25139787649	603354903577	12	~2015
25141501799	50283003599	11	~2012
25141572419	50283144839	11	~2012
25144589761	754337692831	12	~2015
25145921699	201167373593	12	~2014
25146861923	50293723847	11	~2012
25148402711	50296805423	11	~2012
25149751799	50299503599	11	~2012

Exponent	Prime Factor	Dig.	Year
25149926423	50299852847	11	~2012
25150340903	50300681807	11	~2012
25153187243	50306374487	11	~2012
25153306481	150919838887	12	~2013
25156525193	150939151159	12	~2013
25156605011	50313210023	11	~2012
25156811843	50313623687	11	~2012
25158113159	50316226319	11	~2012
25158278177	150949669063	12	~2013
25159136819	50318273639	11	~2012
25159234739	50318469479	11	~2012
25159646411	50319292823	11	~2012
25159760123	3386...125559	14	2023
25160053283	50320106567	11	~2012
25160516327	201284130617	12	~2014
25165217663	50330435327	11	~2012
25167476963	50334953927	11	~2012
25167611939	50335223879	11	~2012
25168178219	50336356439	11	~2012
25168335041	201346680329	12	~2014
25170592669	604094224057	12	~2015
25172978339	50345956679	11	~2012
25173222083	50346444167	11	~2012
25173442403	50346884807	11	~2012
25173715139	50347430279	11	~2012

Exponent	Prime Factor	Dig.	Year
25174289051	50348578103	11	~2012
25175849339	50351698679	11	~2012
25177611419	50355222839	11	~2012
25179464413	151076786479	12	~2013
25182447359	50364894719	11	~2012
25183066037	151098396223	12	~2013
25183230473	151099382839	12	~2013
25183734923	3087...015599	14	2023
25183929383	50367858767	11	~2012
25183943977	151103663863	12	~2013
25188885563	50377771127	11	~2012
25189786361	201518290889	12	~2014
25189810619	50379621239	11	~2012
25189852151	50379704303	11	~2012
25190284439	50380568879	11	~2012
25190702279	50381404559	11	~2012
25191566759	50383133519	11	~2012
25196175863	50392351727	11	~2012
25197270607	403156329713	12	~2014
25197849851	50395699703	11	~2012
25198292437	151189754623	12	~2013
25199049719	50398099439	11	~2012
25199468711	50398937423	11	~2012
25199822047	251998220471	12	~2014
25200495923	50400991847	11	~2012

4.768.925 digits

25-05-04