Small Mersenne Prime Factors (page 4576/5610)

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
7209378947	57675031577	11	~2009
7209583301	43257499807	11	~2009
7209885973	43259315839	11	~2009
7210877593	43265265559	11	~2009
7210882801	43265296807	11	~2009
7211169923	14422339847	11	~2008
7211301551	14422603103	11	~2008
7211323979	14422647959	11	~2008
7211830079	14423660159	11	~2008
7212556801	43275340807	11	~2009
7212578963	230802526817	12	~2011
7212923129	230813540129	12	~2011
7213653803	14427307607	11	~2008
7214034623	14428069247	11	~2008
7214118599	14428237199	11	~2008
7214179463	14428358927	11	~2008
7214520493	115432327889	12	~2010
7215371843	14430743687	11	~2008
7215514981	43293089887	11	~2009
7215562391	14431124783	11	~2008
7215641819	14431283639	11	~2008
7215889319	14431778639	11	~2008
7216321811	14432643623	11	~2008
7216831343	14433662687	11	~2008
7216998281	57735986249	11	~2009

Exponent	Prime Factor	Dig.	Year
7217107559	14434215119	11	~2008
7217403239	14434806479	11	~2008
7217426113	505219827911	12	~2012
7217784719	14435569439	11	~2008
7218033799	129924608383	12	~2010
7218230759	14436461519	11	~2008
7218304823	14436609647	11	~2008
7218473543	14436947087	11	~2008
7218576377	346491666097	12	~2011
7218826259	14437652519	11	~2008
7219252679	14438505359	11	~2008
7219656007	72196560071	11	~2010
7220027777	173280666649	12	~2011
7220357393	173288577433	12	~2011
7220438317	115527013073	12	~2010
7220504519	14441009039	11	~2008
7220560283	14441120567	11	~2008
7220682277	43324093663	11	~2009
7221110093	101095541303	12	~2010
7221320891	14442641783	11	~2008
7221760097	43330560583	11	~2009
7221774949	462193596737	12	~2012
7221901091	14443802183	11	~2008
7222294619	14444589239	11	~2008
7223080439	14446160879	11	~2008

Exponent	Prime Factor	Dig.	Year
7223104271	57784834169	11	~2009
7223240513	404501468729	12	~2012
7223610671	14447221343	11	~2008
7223861573	43343169439	11	~2009
7224022723	72240227231	11	~2010
7224064021	115585024337	12	~2010
7224390863	14448781727	11	~2008
7224600661	43347603967	11	~2009
7224866399	14449732799	11	~2008
7224911951	14449823903	11	~2008
7225646251	867077550121	12	~2012
7225777679	14451555359	11	~2008
7225948979	14451897959	11	~2008
7226114963	14452229927	11	~2008
7226223503	14452447007	11	~2008
7226229119	14452458239	11	~2008
7226648459	14453296919	11	~2008
7227008543	14454017087	11	~2008
7227034151	57816273209	11	~2009
7227138791	14454277583	11	~2008
7227182881	43363097287	11	~2009
7227341351	14454682703	11	~2008
7227680051	14455360103	11	~2008
7227853153	43367118919	11	~2009
7228256753	43369540519	11	~2009

Exponent	Prime Factor	Dig.	Year
7228257791	14456515583	11	~2008
7228285271	14456570543	11	~2008
7228456633	43370739799	11	~2009
7228739879	14457479759	11	~2008
7229003003	14458006007	11	~2008
7229134727	130124425087	12	~2010
7229580311	14459160623	11	~2008
7229769731	14459539463	11	~2008
7230067781	43380406687	11	~2009
7230292343	14460584687	11	~2008
7230698099	14461396199	11	~2008
7231019699	14462039399	11	~2008
7231233851	14462467703	11	~2008
7231463003	14462926007	11	~2008
7231617779	14463235559	11	~2008
7232036771	14464073543	11	~2008
7232364071	14464728143	11	~2008
7232713739	14465427479	11	~2008
7233058463	14466116927	11	~2008
7233314219	14466628439	11	~2008
7233377051	14466754103	11	~2008
7233781739	14467563479	11	~2008
7233809003	14467618007	11	~2008
7233843299	14467686599	11	~2008
7233937517	43403625103	11	~2009

5.307.017 digits

26-01-11