Small Mersenne Prime Factors (page 4583/5130)

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
24836749391	49673498783	11	~2012
24838312883	49676625767	11	~2012
24838746671	49677493343	11	~2012
24840680171	49681360343	11	~2012
24840721943	49681443887	11	~2012
24842503583	49685007167	11	~2012
24843328871	49686657743	11	~2012
24843458999	49686917999	11	~2012
24843542303	49687084607	11	~2012
24844436483	49688872967	11	~2012
24844632971	49689265943	11	~2012
24846252611	49692505223	11	~2012
24847274099	49694548199	11	~2012
24848310127	596359443049	12	~2015
24848812991	49697625983	11	~2012
24848915593	149093493559	12	~2013
24848983403	49697966807	11	~2012
24850577519	49701155039	11	~2012
24850704503	49701409007	11	~2012
24851097839	49702195679	11	~2012
24854169001	149125014007	12	~2013
24854686561	149128119367	12	~2013
24854739359	49709478719	11	~2012
24855529403	49711058807	11	~2012
24856552403	49713104807	11	~2012

Exponent	Prime Factor	Dig.	Year
24858412141	149150472847	12	~2013
24858908939	49717817879	11	~2012
24860629511	198885036089	12	~2014
24861548219	49723096439	11	~2012
24863414171	49726828343	11	~2012
24863703803	49727407607	11	~2012
24864602459	49729204919	11	~2012
24865730843	49731461687	11	~2012
24865883543	49731767087	11	~2012
24866246183	49732492367	11	~2012
24867260063	49734520127	11	~2012
24868871459	49737742919	11	~2012
24871788983	49743577967	11	~2012
24872248931	49744497863	11	~2012
24872890277	348220463879	12	~2014
24874731383	49749462767	11	~2012
24875969099	49751938199	11	~2012
24876352199	49752704399	11	~2012
24877361129	199018889033	12	~2014
24878605943	49757211887	11	~2012
24878656871	49757313743	11	~2012
24879875117	348318251639	12	~2014
24880001819	49760003639	11	~2012
24880421681	149282530087	12	~2013
24880744571	49761489143	11	~2012

Exponent	Prime Factor	Dig.	Year
24881099591	49762199183	11	~2012
24881296991	49762593983	11	~2012
24881650649	199053205193	12	~2014
24882359291	49764718583	11	~2012
24885455999	49770911999	11	~2012
24887220419	49774440839	11	~2012
24887591819	49775183639	11	~2012
24888496343	49776992687	11	~2012
24888507359	49777014719	11	~2012
24888708847	447996759247	12	~2015
24888765719	49777531439	11	~2012
24888943199	49777886399	11	~2012
24889083913	398225342609	12	~2014
24889308011	49778616023	11	~2012
24890193431	49780386863	11	~2012
24890318357	348464456999	12	~2014
24890477453	149342864719	12	~2013
24891485039	199131880313	12	~2014
24891962939	49783925879	11	~2012
24892214129	597413139097	12	~2015
24892282991	49784565983	11	~2012
24892756331	49785512663	11	~2012
24893504123	49787008247	11	~2012
24893831639	49787663279	11	~2012
24894318983	49788637967	11	~2012

Exponent	Prime Factor	Dig.	Year
24894484787	199155878297	12	~2014
24895192417	149371154503	12	~2013
24895261957	149371571743	12	~2013
24895443539	49790887079	11	~2012
24895958963	49791917927	11	~2012
24896589491	49793178983	11	~2012
24897016483	248970164831	12	~2014
24897066893	149382401359	12	~2013
24897644641	398362314257	12	~2014
24898337231	49796674463	11	~2012
24899582651	49799165303	11	~2012
24899884001	149399304007	12	~2013
24902338319	49804676639	11	~2012
24905202659	49810405319	11	~2012
24905630303	49811260607	11	~2012
24905976713	149435860279	12	~2013
24906644167	398506306673	12	~2014
24907182743	49814365487	11	~2012
24907559051	49815118103	11	~2012
24910873103	49821746207	11	~2012
24911049253	149466295519	12	~2013
24912503881	398600062097	12	~2014
24913671899	49827343799	11	~2012
24914159411	49828318823	11	~2012
24914274023	49828548047	11	~2012

4.828.532 digits

25-06-01