Small Mersenne Prime Factors (page 4518/5070)

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
23340782393	140044694359	12	~2013
23341352999	46682705999	11	~2012
23341399583	46682799167	11	~2012
23342884111	233428841111	12	~2014
23343212531	46686425063	11	~2012
23344244809	560261875417	12	~2015
23346876659	46693753319	11	~2012
23348689079	46697378159	11	~2012
23352332357	140113994143	12	~2013
23353260263	46706520527	11	~2012
23353484471	186827875769	12	~2013
23353842923	46707685847	11	~2012
23353994291	46707988583	11	~2012
23355151277	140130907663	12	~2013
23356015583	46712031167	11	~2012
23357195591	46714391183	11	~2012
23357523131	46715046263	11	~2012
23357944271	46715888543	11	~2012
23358649883	46717299767	11	~2012
23359221071	46718442143	11	~2012
23359869671	46719739343	11	~2012
23360968583	46721937167	11	~2012
23361674951	46723349903	11	~2012
23363072339	46726144679	11	~2012
23363427599	46726855199	11	~2012

Exponent	Prime Factor	Dig.	Year
23364652931	46729305863	11	~2012
23365717163	46731434327	11	~2012
23365719431	46731438863	11	~2012
23366382797	186931062377	12	~2013
23367229751	46734459503	11	~2012
23367302303	46734604607	11	~2012
23370358751	46740717503	11	~2012
23370537089	186964296713	12	~2013
23372509067	186980072537	12	~2013
23372740103	46745480207	11	~2012
23372887883	46745775767	11	~2012
23373314233	140239885399	12	~2013
23374274471	46748548943	11	~2012
23374533551	186996268409	12	~2013
23375819557	140254917343	12	~2013
23376217853	140257307119	12	~2013
23377629809	187021038473	12	~2013
23379361619	46758723239	11	~2012
23380174943	46760349887	11	~2012
23382686279	46765372559	11	~2012
23383397957	140300387743	12	~2013
23384004383	46768008767	11	~2012
23384560019	46769120039	11	~2012
23384732597	187077860777	12	~2013
23385419411	46770838823	11	~2012

Exponent	Prime Factor	Dig.	Year
23387202623	46774405247	11	~2012
23387766599	46775533199	11	~2012
23387882579	46775765159	11	~2012
23388782707	233887827071	12	~2014
23389636079	46779272159	11	~2012
23390581223	46781162447	11	~2012
23391212219	46782424439	11	~2012
23392076159	46784152319	11	~2012
23392847171	46785694343	11	~2012
23395182821	187161462569	12	~2013
23395980791	46791961583	11	~2012
23396089043	46792178087	11	~2012
23398155563	46796311127	11	~2012
23398418413	140390510479	12	~2013
23400569653	140403417919	12	~2013
23403377579	46806755159	11	~2012
23403666959	46807333919	11	~2012
23405590679	421300632223	12	~2014
23405697173	140434183039	12	~2013
23406251833	140437510999	12	~2013
23407969499	46815938999	11	~2012
23407969801	140447818807	12	~2013
23408139857	140448839143	12	~2013
23408202491	46816404983	11	~2012
23408678159	46817356319	11	~2012

Exponent	Prime Factor	Dig.	Year
23409862043	46819724087	11	~2012
23410325699	46820651399	11	~2012
23410339259	46820678519	11	~2012
23411125691	46822251383	11	~2012
23411410019	46822820039	11	~2012
23411583197	187292665577	12	~2013
23411821523	46823643047	11	~2012
23413323683	46826647367	11	~2012
23413435117	140480610703	12	~2013
23413797041	140482782247	12	~2013
23414797753	140488786519	12	~2013
23415116099	46830232199	11	~2012
23416770599	187334164793	12	~2013
23417454503	46834909007	11	~2012
23418427379	46836854759	11	~2012
23420760479	46841520959	11	~2012
23421760391	46843520783	11	~2012
23422067699	46844135399	11	~2012
23425128011	46850256023	11	~2012
23425635371	46851270743	11	~2012
23426155451	46852310903	11	~2012
23426898983	46853797967	11	~2012
23428927217	328004981039	12	~2014
23432716823	46865433647	11	~2012
23432895779	46865791559	11	~2012

4.768.925 digits

25-05-04