Small Mersenne Prime Factors (page 4660/5775)

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
6509961257	39059767543	11	~2009
6510206663	13020413327	11	~2008
6510301387	104164822193	12	~2010
6510524711	13021049423	11	~2008
6510570293	39063421759	11	~2009
6510931139	13021862279	11	~2008
6510960119	13021920239	11	~2008
6511027811	13022055623	11	~2008
6511329479	13022658959	11	~2008
6511399709	52091197673	11	~2009
6511598783	13023197567	11	~2008
6511605563	13023211127	11	~2008
6511752781	312564133489	12	~2011
6511824499	65118244991	11	~2009
6511914443	13023828887	11	~2008
6512212541	39073275247	11	~2009
6512255831	13024511663	11	~2008
6512296799	13024593599	11	~2008
6512381231	13024762463	11	~2008
6512699111	52101592889	11	~2009
6512796599	13025593199	11	~2008
6513456263	13026912527	11	~2008
6513465239	13026930479	11	~2008
6513517403	13027034807	11	~2008
6513736913	39082421479	11	~2009

Exponent	Prime Factor	Dig.	Year
6513779003	13027558007	11	~2008
6514008443	13028016887	11	~2008
6514031669	351757710127	12	~2011
6514173553	39085041319	11	~2009
6514627799	52117022393	11	~2009
6515166191	13030332383	11	~2008
6515368571	13030737143	11	~2008
6515792771	13031585543	11	~2008
6515942171	13031884343	11	~2008
6516019283	13032038567	11	~2008
6516041183	13032082367	11	~2008
6516274397	91227841559	11	~2010
6516529823	13033059647	11	~2008
6516661031	13033322063	11	~2008
6516687059	13033374119	11	~2008
6517706957	39106241743	11	~2009
6517935191	13035870383	11	~2008
6518122519	65181225191	11	~2009
6518190083	13036380167	11	~2008
6519193463	13038386927	11	~2008
6519464603	13038929207	11	~2008
6519518557	39117111343	11	~2009
6520881959	13041763919	11	~2008
6520906547	52167252377	11	~2009
6521334293	39128005759	11	~2009

Exponent	Prime Factor	Dig.	Year
6521740499	13043480999	11	~2008
6521841803	13043683607	11	~2008
6521992709	52175941673	11	~2009
6522118979	13044237959	11	~2008
6522198827	52177590617	11	~2009
6522269471	13044538943	11	~2008
6522386771	13044773543	11	~2008
6522482207	52179857657	11	~2009
6523071601	39138429607	11	~2009
6523268099	13046536199	11	~2008
6523496519	13046993039	11	~2008
6523805941	39142835647	11	~2009
6523836131	13047672263	11	~2008
6523977437	39143864623	11	~2009
6524298191	13048596383	11	~2008
6524487731	13048975463	11	~2008
6524560631	13049121263	11	~2008
6524689019	13049378039	11	~2008
6525023599	117450424783	12	~2010
6525337163	13050674327	11	~2008
6525452963	13050905927	11	~2008
6525834481	39155006887	11	~2009
6525867983	13051735967	11	~2008
6525978191	13051956383	11	~2008
6526004483	13052008967	11	~2008

Exponent	Prime Factor	Dig.	Year
6526728401	52213827209	11	~2009
6527316083	13054632167	11	~2008
6527405821	39164434927	11	~2009
6527571443	13055142887	11	~2008
6527697809	52221582473	11	~2009
6527717099	13055434199	11	~2008
6527735369	156665648857	12	~2010
6528015899	13056031799	11	~2008
6528027497	52224219977	11	~2009
6528190871	13056381743	11	~2008
6528283523	13056567047	11	~2008
6528500651	13057001303	11	~2008
6528653003	13057306007	11	~2008
6528904691	13057809383	11	~2008
6529073459	13058146919	11	~2008
6529290191	13058580383	11	~2008
6529376857	39176261143	11	~2009
6529788659	13059577319	11	~2008
6529996691	13059993383	11	~2008
6530013923	13060027847	11	~2008
6530039773	39180238639	11	~2009
6530348843	13060697687	11	~2008
6530422439	13060844879	11	~2008
6530561783	13061123567	11	~2008
6530868083	470222501977	12	~2011

5.471.290 digits

26-03-29