Small Mersenne Prime Factors (page 4466/5130)

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
16195994519	32391989039	11	~2011
16197407879	32394815759	11	~2011
16197765443	32395530887	11	~2011
16198116059	32396232119	11	~2011
16198516001	97191096007	11	~2012
16199052431	32398104863	11	~2011
16199058203	32398116407	11	~2011
16199241083	32398482167	11	~2011
16199353739	32398707479	11	~2011
16199924771	32399849543	11	~2011
16200039917	388800958009	12	~2013
16200132023	32400264047	11	~2011
16200787637	97204725823	11	~2012
16201409291	32402818583	11	~2011
16201944137	129615553097	12	~2012
16202560799	32405121599	11	~2011
16204221833	97225330999	11	~2012
16204257917	388902190009	12	~2013
16205760023	32411520047	11	~2011
16206134363	32412268727	11	~2011
16206447839	32412895679	11	~2011
16207267523	32414535047	11	~2011
16209137531	32418275063	11	~2011
16209532271	32419064543	11	~2011
16214050103	32428100207	11	~2011

Exponent	Prime Factor	Dig.	Year
16214248439	32428496879	11	~2011
16214562913	97287377479	11	~2012
16214894681	97289368087	11	~2012
16215000143	32430000287	11	~2011
16215015959	32430031919	11	~2011
16216049867	129728398937	12	~2012
16216885739	32433771479	11	~2011
16217491259	32434982519	11	~2011
16218299759	32436599519	11	~2011
16219626629	129757013033	12	~2012
16220317073	97321902439	11	~2012
16220935931	129767487449	12	~2012
16221015803	32442031607	11	~2011
16222359067	162223590671	12	~2012
16222754651	32445509303	11	~2011
16223239223	32446478447	11	~2011
16223293343	32446586687	11	~2011
16223335963	259573375409	12	~2013
16223771783	32447543567	11	~2011
16223820731	32447641463	11	~2011
16224486067	8475...214009	14	2025
16224513131	32449026263	11	~2011
16224834011	32449668023	11	~2011
16226481779	32452963559	11	~2011
16227922523	32455845047	11	~2011

Exponent	Prime Factor	Dig.	Year
16229692943	32459385887	11	~2011
16229895029	129839160233	12	~2012
16230010261	97380061567	11	~2012
16230420443	32460840887	11	~2011
16230824497	97384946983	11	~2012
16231227503	32462455007	11	~2011
16232504903	32465009807	11	~2011
16232823839	32465647679	11	~2011
16233874739	129870997913	12	~2012
16234914523	259758632369	12	~2013
16235366723	32470733447	11	~2011
16235752583	32471505167	11	~2011
16236303059	32472606119	11	~2011
16236793343	32473586687	11	~2011
16237194791	32474389583	11	~2011
16237821619	162378216191	12	~2012
16238499601	97430997607	11	~2012
16239511763	32479023527	11	~2011
16239584759	32479169519	11	~2011
16239960419	32479920839	11	~2011
16241005673	227374079423	12	~2013
16243805573	227413278023	12	~2013
16243891211	32487782423	11	~2011
16244458019	32488916039	11	~2011
16244727931	162447279311	12	~2012

Exponent	Prime Factor	Dig.	Year
16245860699	32491721399	11	~2011
16246803959	32493607919	11	~2011
16246876981	97481261887	11	~2012
16247033219	32494066439	11	~2011
16247040731	32494081463	11	~2011
16247612411	32495224823	11	~2011
16248197411	32496394823	11	~2011
16249721837	227496105719	12	~2013
16250267771	130002142169	12	~2012
16252215071	32504430143	11	~2011
16252291373	390054992953	12	~2013
16252871051	32505742103	11	~2011
16254413951	32508827903	11	~2011
16254617699	32509235399	11	~2011
16255152187	292592739367	12	~2013
16255878011	32511756023	11	~2011
16256195213	227586732983	12	~2013
16256342831	32512685663	11	~2011
16257169403	32514338807	11	~2011
16257245099	130057960793	12	~2012
16257876191	32515752383	11	~2011
16257985817	617803461047	12	~2014
16258258343	32516516687	11	~2011
16258511287	260136180593	12	~2013
16259934029	130079472233	12	~2012

4.828.532 digits

25-06-01