Small Mersenne Prime Factors (page 4694/5460)

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
14645729099	29291458199	11	~2010
14645836871	29291673743	11	~2010
14646430811	29292861623	11	~2010
14646934931	29293869863	11	~2010
14647591151	29295182303	11	~2010
14647920361	87887522167	11	~2012
14648137859	29296275719	11	~2010
14648591521	87891549127	11	~2012
14648661557	117189292457	12	~2012
14648662643	29297325287	11	~2010
14649019223	29298038447	11	~2010
14649975779	29299951559	11	~2010
14650457099	29300914199	11	~2010
14650538951	29301077903	11	~2010
14651164511	117209316089	12	~2012
14651487491	29302974983	11	~2010
14651834243	29303668487	11	~2010
14652042323	29304084647	11	~2010
14652591179	29305182359	11	~2010
14652866297	87917197783	11	~2012
14653789823	29307579647	11	~2010
14654048771	29308097543	11	~2010
14654379191	29308758383	11	~2010
14655474677	117243797417	12	~2012
14656140001	87936840007	11	~2012

Exponent	Prime Factor	Dig.	Year
14656223977	87937343863	11	~2012
14656623073	351758953753	12	~2013
14656923899	29313847799	11	~2010
14657005799	29314011599	11	~2010
14657053091	29314106183	11	~2010
14657654311	146576543111	12	~2012
14658921503	29317843007	11	~2010
14659255313	87955531879	11	~2012
14659925723	29319851447	11	~2010
14661218459	29322436919	11	~2010
14662429051	263923722919	12	~2013
14662725613	322579963487	12	~2013
14663795819	29327591639	11	~2010
14664000311	29328000623	11	~2010
14665047119	29330094239	11	~2010
14665326323	29330652647	11	~2010
14665617311	29331234623	11	~2010
14665816937	703959212977	12	~2014
14666383717	703986418417	12	~2014
14666776603	146667766031	12	~2012
14667515711	29335031423	11	~2010
14668773599	29337547199	11	~2010
14669247779	29338495559	11	~2010
14669551619	29339103239	11	~2010
14671048631	29342097263	11	~2010

Exponent	Prime Factor	Dig.	Year
14672255963	29344511927	11	~2010
14672582531	29345165063	11	~2010
14672839691	29345679383	11	~2010
14672849963	29345699927	11	~2010
14673824213	205433538983	12	~2012
14674205099	29348410199	11	~2010
14674326263	29348652527	11	~2010
14675369183	29350738367	11	~2010
14676281579	29352563159	11	~2010
14676374579	29352749159	11	~2010
14677162403	29354324807	11	~2010
14677192679	117417541433	12	~2012
14677587971	29355175943	11	~2010
14678192471	29356384943	11	~2010
14678322163	587132886521	12	~2014
14679605141	88077630847	11	~2012
14679689039	29359378079	11	~2010
14679715763	29359431527	11	~2010
14679808817	88078852903	11	~2012
14680015643	29360031287	11	~2010
14682091271	29364182543	11	~2010
14682206879	117457655033	12	~2012
14682480517	88094883103	11	~2012
14683227791	29366455583	11	~2010
14684391187	146843911871	12	~2012

Exponent	Prime Factor	Dig.	Year
14684651483	29369302967	11	~2010
14685266171	29370532343	11	~2010
14685696071	29371392143	11	~2010
14685843239	29371686479	11	~2010
14685979751	29371959503	11	~2010
14686019303	29372038607	11	~2010
14686989259	146869892591	12	~2012
14687270651	29374541303	11	~2010
14687607659	29375215319	11	~2010
14688923981	558179111279	12	~2014
14689063387	146890633871	12	~2012
14689404311	29378808623	11	~2010
14689562399	29379124799	11	~2010
14689628231	29379256463	11	~2010
14689790257	88138741543	11	~2012
14690049419	117520395353	12	~2012
14690093359	146900933591	12	~2012
14690630819	29381261639	11	~2010
14691244019	29382488039	11	~2010
14691412811	29382825623	11	~2010
14692479671	29384959343	11	~2010
14692812047	117542496377	12	~2012
14693295983	29386591967	11	~2010
14693449451	117547595609	12	~2012
14693766359	29387532719	11	~2010

5.157.210 digits

25-11-02