Small Mersenne Prime Factors (page 4356/5610)

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	Digits	Year
3897274919	7794549839	10	~2006
3897318827	31178550617	11	~2007
3897321671	7794643343	10	~2006
3897383771	7794767543	10	~2006
3897633119	7795266239	10	~2006
3897772469	522301510847	12	~2010
3897832019	7795664039	10	~2006
3897836939	31182695513	11	~2007
3897862571	7795725143	10	~2006
3897928823	7795857647	10	~2006
3897984901	23387909407	11	~2007
3898236241	62371779857	11	~2008
3898482277	23390893663	11	~2007
3898555103	7797110207	10	~2006
3898635317	23391811903	11	~2007
3898731071	7797462143	10	~2006
3898738271	7797476543	10	~2006
3898853821	23393122927	11	~2007
3898874767	62381996273	11	~2008
3898877693	93573064633	11	~2009
3899079731	7798159463	10	~2006
3899133233	54587865263	11	~2008
3899235383	7798470767	10	~2006
3899289391	280748836153	12	~2010
3899666999	7799333999	10	~2006

Exponent	Prime Factor	Digits	Year
3899707043	7799414087	10	~2006
3899720843	7799441687	10	~2006
3899846663	7799693327	10	~2006
3899905631	7799811263	10	~2006
3899907521	23399445127	11	~2007
3899984591	7799969183	10	~2006
3900116579	7800233159	10	~2006
3900183659	7800367319	10	~2006
3900288883	163812133087	12	~2009
3900315959	7800631919	10	~2006
3900325783	280823456377	12	~2010
3900378959	7800757919	10	~2006
3900490631	7800981263	10	~2006
3900577319	7801154639	10	~2006
3900870419	7801740839	10	~2006
3900917071	70216507279	11	~2008
3901065647	101427706823	12	~2009
3901097741	23406586447	11	~2007
3901162981	23406977887	11	~2007
3901203023	7802406047	10	~2006
3901236203	7802472407	10	~2006
3901351451	7802702903	10	~2006
3901437803	7802875607	10	~2006
3901478159	7802956319	10	~2006
3901601591	7803203183	10	~2006

Exponent	Prime Factor	Digits	Year
3901604351	7803208703	10	~2006
3901607999	7803215999	10	~2006
3901720331	7803440663	10	~2006
3901724381	23410346287	11	~2007
3901729379	7803458759	10	~2006
3901777601	31214220809	11	~2007
3902112961	23412677767	11	~2007
3902138711	7804277423	10	~2006
3902146019	7804292039	10	~2006
3902200691	7804401383	10	~2006
3902228171	7804456343	10	~2006
3902301323	7804602647	10	~2006
3902303243	7804606487	10	~2006
3902374247	31218993977	11	~2007
3902390147	31219121177	11	~2007
3902416211	7804832423	10	~2006
3902420663	7804841327	10	~2006
3902739443	7805478887	10	~2006
3902937391	187340994769	12	~2009
3903007763	7806015527	10	~2006
3903186191	7806372383	10	~2006
3903272257	23419633543	11	~2007
3903285959	7806571919	10	~2006
3903322823	7806645647	10	~2006
3903694699	281066018329	12	~2010

Exponent	Prime Factor	Digits	Year
3903812321	23422873927	11	~2007
3903819203	7807638407	10	~2006
3903877961	31231023689	11	~2007
3904028339	7808056679	10	~2006
3904121399	31232971193	11	~2007
3904350731	7808701463	10	~2006
3904352843	7808705687	10	~2006
3904380059	7808760119	10	~2006
3904428239	7808856479	10	~2006
3904631881	23427791287	11	~2007
3904693913	54665714783	11	~2008
3904703359	39047033591	11	~2008
3904710371	7809420743	10	~2006
3904802591	7809605183	10	~2006
3904936571	7809873143	10	~2006
3904951229	31239609833	11	~2007
3904982881	23429897287	11	~2007
3905005081	23430030487	11	~2007
3905055733	23430334399	11	~2007
3905132771	7810265543	10	~2006
3905320703	7810641407	10	~2006
3905346253	62485540049	11	~2008
3905422403	7810844807	10	~2006
3905460803	7810921607	10	~2006
3905475503	7810951007	10	~2006

5.307.017 digits

26-01-11