Small Mersenne Prime Factors (page 4777/5850)

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
7743392879	15486785759	11	~2008
7743633083	15487266167	11	~2008
7743804251	15487608503	11	~2008
7743818279	15487636559	11	~2008
7743824591	15487649183	11	~2008
7743923111	325244770663	12	~2012
7744049303	15488098607	11	~2008
7744948499	15489896999	11	~2008
7744959851	15489919703	11	~2008
7745008619	15490017239	11	~2008
7745562659	15491125319	11	~2008
7745576231	15491152463	11	~2008
7745739791	15491479583	11	~2008
7746176411	15492352823	11	~2008
7746328349	61970626793	11	~2010
7746500903	15493001807	11	~2008
7747502219	15495004439	11	~2008
7747842437	46487054623	11	~2009
7747870271	15495740543	11	~2008
7748016701	46488100207	11	~2009
7748457179	15496914359	11	~2008
7748532277	46491193663	11	~2009
7748787131	15497574263	11	~2008
7748828831	15497657663	11	~2008
7748936339	15497872679	11	~2008

Exponent	Prime Factor	Dig.	Year
7749058511	15498117023	11	~2008
7749142057	46494852343	11	~2009
7749639587	61997116697	11	~2010
7749869947	139497659047	12	~2011
7750084943	15500169887	11	~2008
7750195763	15500391527	11	~2008
7750295183	15500590367	11	~2008
7750301711	15500603423	11	~2008
7750319713	46501918279	11	~2009
7750356683	15500713367	11	~2008
7750484039	15500968079	11	~2008
7750509719	15501019439	11	~2008
7750781099	15501562199	11	~2008
7750879709	108512315927	12	~2010
7750919999	15501839999	11	~2008
7751058383	15502116767	11	~2008
7751132171	15502264343	11	~2008
7751181947	62009455577	11	~2010
7751308583	15502617167	11	~2008
7751320931	15502641863	11	~2008
7751406599	15502813199	11	~2008
7752618277	46515709663	11	~2009
7752694517	62021556137	11	~2010
7752757091	15505514183	11	~2008
7752758771	15505517543	11	~2008

Exponent	Prime Factor	Dig.	Year
7752798239	15505596479	11	~2008
7752818231	15505636463	11	~2008
7752951359	15505902719	11	~2008
7753600103	15507200207	11	~2008
7754133691	77541336911	11	~2010
7754335811	15508671623	11	~2008
7755057179	15510114359	11	~2008
7755224189	186125380537	12	~2011
7755340643	15510681287	11	~2008
7755553997	108577755959	12	~2010
7755655679	15511311359	11	~2008
7756122839	62048982713	11	~2010
7756364303	15512728607	11	~2008
7756863337	124109813393	12	~2010
7756998911	15513997823	11	~2008
7757298007	77572980071	11	~2010
7757577937	46545467623	11	~2009
7757956831	124127309297	12	~2010
7758259297	46549555783	11	~2009
7758489493	46550936959	11	~2009
7758641897	186207405529	12	~2011
7758870323	15517740647	11	~2008
7758990611	15517981223	11	~2008
7759591793	46557550759	11	~2009
7759689911	15519379823	11	~2008

Exponent	Prime Factor	Dig.	Year
7759731491	15519462983	11	~2008
7759737457	46558424743	11	~2009
7759839863	15519679727	11	~2008
7760250671	15520501343	11	~2008
7760305967	62082447737	11	~2010
7760793731	15521587463	11	~2008
7760838479	15521676959	11	~2008
7761238571	15522477143	11	~2008
7761525917	62092207337	11	~2010
7762129157	46572774943	11	~2009
7762204763	201817323839	12	~2011
7762402391	15524804783	11	~2008
7762441523	15524883047	11	~2008
7762701923	15525403847	11	~2008
7762728299	15525456599	11	~2008
7762825919	15525651839	11	~2008
7763048879	15526097759	11	~2008
7763049823	558939587257	12	~2012
7763246759	15526493519	11	~2008
7763637611	15527275223	11	~2008
7763967863	15527935727	11	~2008
7763990081	62111920649	11	~2010
7764327101	295044429839	12	~2011
7764398177	62115185417	11	~2010
7764539603	15529079207	11	~2008

5.546.121 digits

26-05-03