Small Mersenne Prime Factors (page 4856/5490)

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
23224516921	139347101527	12	~2013
23225433137	185803465097	12	~2013
23226977303	46453954607	11	~2012
23227458959	46454917919	11	~2012
23230158131	46460316263	11	~2012
23230498271	603992955047	12	~2015
23231367779	46462735559	11	~2012
23231853611	46463707223	11	~2012
23231889881	139391339287	12	~2013
23232551669	185860413353	12	~2013
23233773539	46467547079	11	~2012
23234251499	46468502999	11	~2012
23234843039	46469686079	11	~2012
23236029143	46472058287	11	~2012
23236708931	46473417863	11	~2012
23237125673	139422754039	12	~2013
23238290617	139429743703	12	~2013
23238325223	46476650447	11	~2012
23238472571	46476945143	11	~2012
23240607067	232406070671	12	~2014
23241080039	46482160079	11	~2012
23241108083	46482216167	11	~2012
23245043543	46490087087	11	~2012
23246166659	46492333319	11	~2012
23249153387	185993227097	12	~2013

Exponent	Prime Factor	Dig.	Year
23249379193	139496275159	12	~2013
23249661901	139497971407	12	~2013
23250993881	139505963287	12	~2013
23251111511	46502223023	11	~2012
23251173983	46502347967	11	~2012
23251671983	46503343967	11	~2012
23251890143	46503780287	11	~2012
23252033159	46504066319	11	~2012
23252165831	46504331663	11	~2012
23252450759	46504901519	11	~2012
23253659459	46507318919	11	~2012
23253959051	46507918103	11	~2012
23255847683	46511695367	11	~2012
23256102203	46512204407	11	~2012
23256726539	46513453079	11	~2012
23257205071	372115281137	12	~2014
23257745579	46515491159	11	~2012
23260371847	232603718471	12	~2014
23260972439	46521944879	11	~2012
23263313063	46526626127	11	~2012
23264222783	46528445567	11	~2012
23264901059	46529802119	11	~2012
23264923151	46529846303	11	~2012
23265104123	46530208247	11	~2012
23265162143	46530324287	11	~2012

Exponent	Prime Factor	Dig.	Year
23266002059	46532004119	11	~2012
23268143207	186145145657	12	~2013
23268466283	46536932567	11	~2012
23270820563	46541641127	11	~2012
23273728619	46547457239	11	~2012
23273822339	186190578713	12	~2013
23275044563	46550089127	11	~2012
23276860559	46553721119	11	~2012
23278238591	46556477183	11	~2012
23279607779	46559215559	11	~2012
23279610647	419032991647	12	~2014
23279916251	46559832503	11	~2012
23281697963	46563395927	11	~2012
23283272017	139699632103	12	~2013
23283511859	46567023719	11	~2012
23284086733	372545387729	12	~2014
23284937243	46569874487	11	~2012
23285049691	419130894439	12	~2014
23286834953	139721009719	12	~2013
23287959551	605486948327	12	~2015
23288134379	46576268759	11	~2012
23289230203	372627683249	12	~2014
23289577079	46579154159	11	~2012
23289869783	46579739567	11	~2012
23291597363	46583194727	11	~2012

Exponent	Prime Factor	Dig.	Year
23292561251	46585122503	11	~2012
23292694739	46585389479	11	~2012
23293811903	46587623807	11	~2012
23294301923	46588603847	11	~2012
23294316719	46588633439	11	~2012
23295360479	46590720959	11	~2012
23295902219	46591804439	11	~2012
23296341611	46592683223	11	~2012
23297670551	46595341103	11	~2012
23298479339	46596958679	11	~2012
23298807803	46597615607	11	~2012
23299091951	46598183903	11	~2012
23300115911	46600231823	11	~2012
23301371459	46602742919	11	~2012
23302348577	139814091463	12	~2013
23302469783	46604939567	11	~2012
23302726019	46605452039	11	~2012
23302775603	46605551207	11	~2012
23302841459	46605682919	11	~2012
23304564001	139827384007	12	~2013
23305142519	46610285039	11	~2012
23305143539	46610287079	11	~2012
23305499771	46610999543	11	~2012
23306174371	233061743711	12	~2014
23306403893	139838423359	12	~2013

5.187.277 digits

25-11-17