Small Mersenne Prime Factors (page 4111/5025)

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
6333491399	12666982799	11	~2008
6334170971	12668341943	11	~2008
6335000471	12670000943	11	~2008
6335039663	12670079327	11	~2008
6335092787	50680742297	11	~2009
6335653901	50685231209	11	~2009
6335858159	12671716319	11	~2008
6335891267	468855953759	12	~2011
6336996217	38021977303	11	~2009
6337161203	12674322407	11	~2008
6337391741	50699133929	11	~2009
6337933177	38027599063	11	~2009
6338374811	12676749623	11	~2008
6339299579	12678599159	11	~2008
6339443393	38036660359	11	~2009
6339477779	12678955559	11	~2008
6339497161	38036982967	11	~2009
6339522851	12679045703	11	~2008
6339729719	12679459439	11	~2008
6339811151	12679622303	11	~2008
6339910807	101438572913	12	~2010
6339965453	38039792719	11	~2009
6340088939	12680177879	11	~2008
6340117621	38040705727	11	~2009
6340164443	12680328887	11	~2008

Exponent	Prime Factor	Dig.	Year
6340222921	38041337527	11	~2009
6340359743	12680719487	11	~2008
6340711417	101451382673	12	~2010
6340823543	12681647087	11	~2008
6341099003	12682198007	11	~2008
6341221031	12682442063	11	~2008
6341628263	12683256527	11	~2008
6341759597	50734076777	11	~2009
6342027431	12684054863	11	~2008
6342072563	12684145127	11	~2008
6342101287	63421012871	11	~2009
6342127919	12684255839	11	~2008
6342384371	12684768743	11	~2008
6342423161	50739385289	11	~2009
6342726001	38056356007	11	~2009
6343149899	12686299799	11	~2008
6343470671	12686941343	11	~2008
6343716299	12687432599	11	~2008
6344261153	38065566919	11	~2009
6344280311	50754242489	11	~2009
6344289431	12688578863	11	~2008
6344360663	12688721327	11	~2008
6344392181	50755137449	11	~2009
6344398979	12688797959	11	~2008
6344445491	12688890983	11	~2008

Exponent	Prime Factor	Dig.	Year
6344504399	12689008799	11	~2008
6344511073	38067066439	11	~2009
6344939351	12689878703	11	~2008
6345128063	12690256127	11	~2008
6345233003	12690466007	11	~2008
6345663539	12691327079	11	~2008
6345819839	12691639679	11	~2008
6346307339	12692614679	11	~2008
6346466519	12692933039	11	~2008
6346639319	12693278639	11	~2008
6346724201	38080345207	11	~2009
6346893491	12693786983	11	~2008
6346998139	114245966503	12	~2010
6347062811	12694125623	11	~2008
6347345531	12694691063	11	~2008
6347383943	12694767887	11	~2008
6347479991	12694959983	11	~2008
6347903327	50783226617	11	~2009
6348111073	139658443607	12	~2010
6348349919	12696699839	11	~2008
6348488813	545970037919	12	~2012
6348501961	101576031377	12	~2010
6348516247	63485162471	11	~2009
6348653351	12697306703	11	~2008
6348777203	12697554407	11	~2008

Exponent	Prime Factor	Dig.	Year
6348832129	139674306839	12	~2010
6349804403	12699608807	11	~2008
6350015123	12700030247	11	~2008
6350027111	50800216889	11	~2009
6350072363	12700144727	11	~2008
6350119271	12700238543	11	~2008
6350446919	12700893839	11	~2008
6350591063	12701182127	11	~2008
6350887391	12701774783	11	~2008
6351018197	38106109183	11	~2009
6351204731	12702409463	11	~2008
6351590537	50812724297	11	~2009
6352178429	50817427433	11	~2009
6352280411	12704560823	11	~2008
6352457053	190573711591	12	~2010
6352508843	12705017687	11	~2008
6352544813	38115268879	11	~2009
6353083739	12706167479	11	~2008
6353277071	12706554143	11	~2008
6353889907	63538899071	11	~2009
6353913283	63539132831	11	~2009
6353998151	12707996303	11	~2008
6354171623	12708343247	11	~2008
6354248471	50833987769	11	~2009
6354276671	12708553343	11	~2008

4.724.182 digits

25-04-13