Small Mersenne Prime Factors (page 4472/5025)

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
22511019953	135066119719	12	~2013
22513000667	180104005337	12	~2013
22513289803	225132898031	12	~2014
22514589143	45029178287	11	~2012
22515871043	45031742087	11	~2012
22516985279	45033970559	11	~2012
22517093171	45034186343	11	~2012
22518094451	45036188903	11	~2012
22518316091	45036632183	11	~2012
22518715679	45037431359	11	~2012
22518755537	135112533223	12	~2013
22519296671	45038593343	11	~2012
22521271931	45042543863	11	~2012
22521293687	540511048489	12	~2015
22521757151	45043514303	11	~2012
22521773399	45043546799	11	~2012
22524252083	45048504167	11	~2012
22524502607	180196020857	12	~2013
22525322663	45050645327	11	~2012
22526310959	45052621919	11	~2012
22526415859	405475485463	12	~2014
22529893643	45059787287	11	~2012
22530051611	45060103223	11	~2012
22530074783	45060149567	11	~2012
22530099479	45060198959	11	~2012

Exponent	Prime Factor	Dig.	Year
22530168299	45060336599	11	~2012
22530876133	135185256799	12	~2013
22530942839	45061885679	11	~2012
22531764323	45063528647	11	~2012
22531999859	45063999719	11	~2012
22533046859	45066093719	11	~2012
22534712411	45069424823	11	~2012
22535017391	45070034783	11	~2012
22536068903	45072137807	11	~2012
22536121219	225361212191	12	~2014
22536196379	45072392759	11	~2012
22536484277	135218905663	12	~2013
22537333519	225373335191	12	~2014
22537593677	135225562063	12	~2013
22539224651	45078449303	11	~2012
22539332573	135235995439	12	~2013
22539649193	135237895159	12	~2013
22540462871	180323702969	12	~2013
22540602323	45081204647	11	~2012
22540652411	45081304823	11	~2012
22542202379	45084404759	11	~2012
22542657337	541023776089	12	~2015
22543780799	45087561599	11	~2012
22545294371	45090588743	11	~2012
22547139623	45094279247	11	~2012

Exponent	Prime Factor	Dig.	Year
22547833883	45095667767	11	~2012
22548651623	45097303247	11	~2012
22549263911	45098527823	11	~2012
22551269759	45102539519	11	~2012
22552081199	45104162399	11	~2012
22552297583	45104595167	11	~2012
22554321299	45108642599	11	~2012
22554833417	135329000503	12	~2013
22555710731	45111421463	11	~2012
22556470199	45112940399	11	~2012
22557118019	45114236039	11	~2012
22559893319	45119786639	11	~2012
22562341391	45124682783	11	~2012
22563803831	45127607663	11	~2012
22563955871	45127911743	11	~2012
22564104971	45128209943	11	~2012
22565101849	496432240679	12	~2014
22565469989	541571279737	12	~2015
22565594021	135393564127	12	~2013
22565840639	45131681279	11	~2012
22566092057	180528736457	12	~2013
22566603929	180532831433	12	~2013
22566650461	135399902767	12	~2013
22571082071	45142164143	11	~2012
22572634043	45145268087	11	~2012

Exponent	Prime Factor	Dig.	Year
22572638531	45145277063	11	~2012
22573067981	135438407887	12	~2013
22573644419	45147288839	11	~2012
22574315579	45148631159	11	~2012
22574490623	45148981247	11	~2012
22574498819	45148997639	11	~2012
22575788519	45151577039	11	~2012
22575922223	45151844447	11	~2012
22576570739	45153141479	11	~2012
22578921731	45157843463	11	~2012
22579465697	135476794183	12	~2013
22580023811	45160047623	11	~2012
22580189783	45160379567	11	~2012
22581708263	45163416527	11	~2012
22582210877	180657687017	12	~2013
22582391003	45164782007	11	~2012
22582826267	541987830409	12	~2015
22582927883	45165855767	11	~2012
22586582339	45173164679	11	~2012
22586987177	135521923063	12	~2013
22587298199	45174596399	11	~2012
22587364703	45174729407	11	~2012
22587599819	45175199639	11	~2012
22588900151	45177800303	11	~2012
22589153459	45178306919	11	~2012

4.724.182 digits

25-04-13