Small Mersenne Prime Factors (page 3835/5025)

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	Digits	Year
2706695417	16240172503	11	~2006
2706717179	5413434359	10	~2005
2706780371	21654242969	11	~2006
2706828983	5413657967	10	~2005
2706971783	5413943567	10	~2005
2706977639	5413955279	10	~2005
2707098143	5414196287	10	~2005
2707137431	5414274863	10	~2005
2707164599	48728962783	11	~2007
2707230719	5414461439	10	~2005
2707237583	5414475167	10	~2005
2707336679	590199396023	12	~2010
2707386179	5414772359	10	~2005
2707467017	16244802103	11	~2006
2707572359	5415144719	10	~2005
2707579631	5415159263	10	~2005
2707692359	5415384719	10	~2005
2707772603	5415545207	10	~2005
2707927199	5415854399	10	~2005
2707935359	113733285079	12	~2008
2707997639	5415995279	10	~2005
2708080799	5416161599	10	~2005
2708194523	70413057599	11	~2007
2708228591	5416457183	10	~2005
2708458601	21667668809	11	~2006

Exponent	Prime Factor	Digits	Year
2708512441	16251074647	11	~2006
2708532791	5417065583	10	~2005
2708540281	16251241687	11	~2006
2708586623	5417173247	10	~2005
2708675303	5417350607	10	~2005
2708676197	16252057183	11	~2006
2708680343	5417360687	10	~2005
2708700803	5417401607	10	~2005
2708772959	5417545919	10	~2005
2708834819	5417669639	10	~2005
2709017543	5418035087	10	~2005
2709112097	16254672583	11	~2006
2709135839	5418271679	10	~2005
2709137159	5418274319	10	~2005
2709165071	5418330143	10	~2005
2709221171	5418442343	10	~2005
2709349091	5418698183	10	~2005
2709483779	5418967559	10	~2005
2709746939	5419493879	10	~2005
2709858407	21678867257	11	~2006
2709918689	37938861647	11	~2007
2710069031	5420138063	10	~2005
2710167959	5420335919	10	~2005
2710215371	21681722969	11	~2006
2710228019	5420456039	10	~2005

Exponent	Prime Factor	Digits	Year
2710350679	27103506791	11	~2006
2710515323	5421030647	10	~2005
2710594391	5421188783	10	~2005
2710595819	5421191639	10	~2005
2710805393	16264832359	11	~2006
2710809197	16264855183	11	~2006
2710833491	70481670767	11	~2007
2710892291	5421784583	10	~2005
2710929503	5421859007	10	~2005
2711302523	5422605047	10	~2005
2711310521	16267863127	11	~2006
2711376541	43382024657	11	~2007
2711393351	21691146809	11	~2006
2711421899	5422843799	10	~2005
2711474963	5422949927	10	~2005
2711529097	16269174583	11	~2006
2711536403	5423072807	10	~2005
2711567933	86770173857	11	~2008
2711800523	178978834519	12	~2008
2711836271	5423672543	10	~2005
2711957711	5423915423	10	~2005
2712127751	5424255503	10	~2005
2712205631	21697645049	11	~2006
2712210881	16273265287	11	~2006
2712289319	5424578639	10	~2005

Exponent	Prime Factor	Digits	Year
2712299651	5424599303	10	~2005
2712399611	5424799223	10	~2005
2712408277	16274449663	11	~2006
2712426851	5424853703	10	~2005
2712446699	5424893399	10	~2005
2712499943	244124994871	12	~2009
2712524921	21700199369	11	~2006
2712851807	21702814457	11	~2006
2712931541	16277589247	11	~2006
2712936179	5425872359	10	~2005
2712949691	5425899383	10	~2005
2713132979	5426265959	10	~2005
2713168571	5426337143	10	~2005
2713191119	5426382239	10	~2005
2713278539	5426557079	10	~2005
2713361699	48840510583	11	~2007
2713400191	43414403057	11	~2007
2713449779	5426899559	10	~2005
2713503503	5427007007	10	~2005
2713586951	21708695609	11	~2006
2713690151	5427380303	10	~2005
2713715951	5427431903	10	~2005
2713846643	5427693287	10	~2005
2713872257	16283233543	11	~2006
2713895707	27138957071	11	~2006

4.724.182 digits

25-04-13