Small Mersenne Prime Factors (page 4453/5025)

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
20945937559	209459375591	12	~2013
20946118943	670275806177	12	~2015
20946241993	125677451959	12	~2013
20948375531	41896751063	11	~2012
20949138253	628474147591	12	~2014
20949206891	41898413783	11	~2012
20949730541	167597844329	12	~2013
20949817631	41899635263	11	~2012
20951096891	41902193783	11	~2012
20951356409	293318989727	12	~2014
20951378579	41902757159	11	~2012
20952189623	41904379247	11	~2012
20953861477	125723168863	12	~2013
20954183339	41908366679	11	~2012
20954837627	544825778303	12	~2014
20956068239	41912136479	11	~2012
20956203461	125737220767	12	~2013
20956622579	41913245159	11	~2012
20956664819	41913329639	11	~2012
20957413993	125744483959	12	~2013
20957670131	41915340263	11	~2012
20958188039	41916376079	11	~2012
20958428063	41916856127	11	~2012
20958945179	41917890359	11	~2012
20960338211	41920676423	11	~2012

Exponent	Prime Factor	Dig.	Year
20963727143	41927454287	11	~2012
20963824577	125782947463	12	~2013
20964061961	167712495689	12	~2013
20964254579	41928509159	11	~2012
20964675239	41929350479	11	~2012
20965898819	41931797639	11	~2012
20966681581	125800089487	12	~2013
20966801783	41933603567	11	~2012
20966861407	335469782513	12	~2014
20967353117	125804118703	12	~2013
20968271339	41936542679	11	~2012
20969129123	41938258247	11	~2012
20970082531	377461485559	12	~2014
20970224959	209702249591	12	~2013
20970619451	41941238903	11	~2012
20970946499	41941892999	11	~2012
20971277363	41942554727	11	~2012
20971538639	41943077279	11	~2012
20971735223	41943470447	11	~2012
20972077211	41944154423	11	~2012
20972383979	41944767959	11	~2012
20973485969	167787887753	12	~2013
20974031003	41948062007	11	~2012
20974289579	41948579159	11	~2012
20975435101	125852610607	12	~2013

Exponent	Prime Factor	Dig.	Year
20975645591	41951291183	11	~2012
20977290419	41954580839	11	~2012
20977629577	125865777463	12	~2013
20979502499	41959004999	11	~2012
20979636241	125877817447	12	~2013
20979793403	41959586807	11	~2012
20981261141	671400356513	12	~2015
20982005549	167856044393	12	~2013
20984028563	41968057127	11	~2012
20985537803	41971075607	11	~2012
20985751343	41971502687	11	~2012
20987293319	41974586639	11	~2012
20987390843	41974781687	11	~2012
20987493899	41974987799	11	~2012
20988216911	41976433823	11	~2012
20988417761	125930506567	12	~2013
20988537659	41977075319	11	~2012
20989190699	41978381399	11	~2012
20989544621	125937267727	12	~2013
20991179059	209911790591	12	~2013
20991444119	41982888239	11	~2012
20991726073	125950356439	12	~2013
20993215343	41986430687	11	~2012
20995217423	41990434847	11	~2012
20996004481	125976026887	12	~2013

Exponent	Prime Factor	Dig.	Year
20996142239	41992284479	11	~2012
20996751371	41993502743	11	~2012
20998748161	125992488967	12	~2013
21000655523	42001311047	11	~2012
21000710323	210007103231	12	~2013
21001333739	42002667479	11	~2012
21002018927	168016151417	12	~2013
21002840219	42005680439	11	~2012
21003476759	42006953519	11	~2012
21003633193	126021799159	12	~2013
21006859283	42013718567	11	~2012
21007063951	378127151119	12	~2014
21007174043	42014348087	11	~2012
21009830063	42019660127	11	~2012
21011165639	42022331279	11	~2012
21012153479	42024306959	11	~2012
21014315081	168114520649	12	~2013
21014659931	42029319863	11	~2012
21015230063	42030460127	11	~2012
21016639277	126099835663	12	~2013
21016979831	42033959663	11	~2012
21018963037	126113778223	12	~2013
21019237139	42038474279	11	~2012
21020389417	126122336503	12	~2013
21023401463	42046802927	11	~2012

4.724.182 digits

25-04-13