Small Mersenne Prime Factors (page 4411/5070)

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
15776230331	31552460663	11	~2011
15776506139	31553012279	11	~2011
15777150721	631086028841	12	~2014
15777404711	31554809423	11	~2011
15777749171	31555498343	11	~2011
15777833921	94667003527	11	~2012
15778700519	31557401039	11	~2011
15778772783	31557545567	11	~2011
15779145131	31558290263	11	~2011
15779368511	126234948089	12	~2012
15779536991	31559073983	11	~2011
15779567417	126236539337	12	~2012
15779645509	473389365271	12	~2014
15779703419	31559406839	11	~2011
15780208079	31560416159	11	~2011
15780987779	31561975559	11	~2011
15781179839	31562359679	11	~2011
15781527551	31563055103	11	~2011
15781611539	31563223079	11	~2011
15781720681	94690324087	11	~2012
15782159843	31564319687	11	~2011
15782796203	31565592407	11	~2011
15783019391	31566038783	11	~2011
15783232601	94699395607	11	~2012
15783758803	157837588031	12	~2012

Exponent	Prime Factor	Dig.	Year
15784150703	31568301407	11	~2011
15784700111	31569400223	11	~2011
15784989197	94709935183	11	~2012
15785467319	31570934639	11	~2011
15786394859	31572789719	11	~2011
15786775919	31573551839	11	~2011
15787140503	31574281007	11	~2011
15788254403	31576508807	11	~2011
15788381293	94730287759	11	~2012
15789278423	31578556847	11	~2011
15789493991	31578987983	11	~2011
15790714451	31581428903	11	~2011
15790863659	31581727319	11	~2011
15791320681	94747924087	11	~2012
15792622823	31585245647	11	~2011
15792656051	31585312103	11	~2011
15792733679	31585467359	11	~2011
15794149031	126353192249	12	~2012
15794187767	284295379807	12	~2013
15794361293	94766167759	11	~2012
15794767211	31589534423	11	~2011
15794783159	31589566319	11	~2011
15795249341	126361994729	12	~2012
15795395729	126363165833	12	~2012
15795739447	157957394471	12	~2012

Exponent	Prime Factor	Dig.	Year
15796243763	31592487527	11	~2011
15797232179	31594464359	11	~2011
15798072551	126384580409	12	~2012
15798561491	31597122983	11	~2011
15798904811	31597809623	11	~2011
15799201283	31598402567	11	~2011
15799202063	31598404127	11	~2011
15799866539	31599733079	11	~2011
15800161571	31600323143	11	~2011
15801445031	31602890063	11	~2011
15801445091	31602890183	11	~2011
15801462779	31602925559	11	~2011
15801547271	31603094543	11	~2011
15801781679	31603563359	11	~2011
15803976323	31607952647	11	~2011
15804156937	94824941623	11	~2012
15804225509	126433804073	12	~2012
15804633203	31609266407	11	~2011
15805291241	126442329929	12	~2012
15805362071	31610724143	11	~2011
15805399829	221275597607	12	~2013
15805757237	94834543423	11	~2012
15808315499	31616630999	11	~2011
15808661723	31617323447	11	~2011
15808880537	94853283223	11	~2012

Exponent	Prime Factor	Dig.	Year
15809960651	31619921303	11	~2011
15810490859	31620981719	11	~2011
15810491743	158104917431	12	~2012
15811280519	31622561039	11	~2011
15811357327	158113573271	12	~2012
15811461551	31622923103	11	~2011
15812673731	31625347463	11	~2011
15813216623	31626433247	11	~2011
15813481457	94880888743	11	~2012
15814082279	31628164559	11	~2011
15815333459	31630666919	11	~2011
15816320951	284693777119	12	~2013
15816592331	31633184663	11	~2011
15816878843	379605092233	12	~2013
15817506791	31635013583	11	~2011
15818067983	31636135967	11	~2011
15818738231	31637476463	11	~2011
15819139103	31638278207	11	~2011
15819253883	31638507767	11	~2011
15819509533	348029209727	12	~2013
15820220243	31640440487	11	~2011
15820226003	31640452007	11	~2011
15820582357	253129317713	12	~2013
15821360833	94928164999	11	~2012
15821448059	31642896119	11	~2011

4.768.925 digits

25-05-04