Small Mersenne Prime Factors (page 4441/5550)

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
5544255011	11088510023	11	~2007
5544379871	11088759743	11	~2007
5544549443	11089098887	11	~2007
5544550463	11089100927	11	~2007
5544741659	11089483319	11	~2007
5544958823	11089917647	11	~2007
5545046219	11090092439	11	~2007
5545054019	11090108039	11	~2007
5545085759	277254287951	12	~2011
5545326511	88725224177	11	~2009
5545407997	33272447983	11	~2008
5545449191	11090898383	11	~2007
5545502219	11091004439	11	~2007
5545533443	11091066887	11	~2007
5545984343	11091968687	11	~2007
5546196983	11092393967	11	~2007
5546256643	55462566431	11	~2009
5546298311	11092596623	11	~2007
5546311499	11092622999	11	~2007
5546359969	432616077583	12	~2011
5546364643	88741834289	11	~2009
5546429363	11092858727	11	~2007
5546597099	11093194199	11	~2007
5546609951	11093219903	11	~2007
5546784371	11093568743	11	~2007

Exponent	Prime Factor	Dig.	Year
5546867857	88749885713	11	~2009
5546910983	11093821967	11	~2007
5546915459	44375323673	11	~2009
5546971823	11093943647	11	~2007
5547098411	11094196823	11	~2007
5547140821	33282844927	11	~2008
5547440243	11094880487	11	~2007
5547560099	11095120199	11	~2007
5547599381	44380795049	11	~2009
5548208843	11096417687	11	~2007
5548439579	11096879159	11	~2007
5548486211	11096972423	11	~2007
5549317177	33295903063	11	~2008
5549535319	55495353191	11	~2009
5549542811	11099085623	11	~2007
5550122159	399608795449	12	~2011
5550143939	44401151513	11	~2009
5550213497	33301280983	11	~2008
5550430169	77706022367	11	~2009
5550457103	11100914207	11	~2007
5550587491	55505874911	11	~2009
5550646403	399646541017	12	~2011
5550884711	11101769423	11	~2007
5550938423	11101876847	11	~2007
5551016221	33306097327	11	~2008

Exponent	Prime Factor	Dig.	Year
5551121099	11102242199	11	~2007
5551192763	11102385527	11	~2007
5551374443	11102748887	11	~2007
5551733303	11103466607	11	~2007
5551781303	11103562607	11	~2007
5552347319	11104694639	11	~2007
5552438159	11104876319	11	~2007
5552536919	11105073839	11	~2007
5552746379	11105492759	11	~2007
5552998897	33317993383	11	~2008
5553079943	11106159887	11	~2007
5553168301	33319009807	11	~2008
5553406973	33320441839	11	~2008
5553863171	44430905369	11	~2009
5554099151	11108198303	11	~2007
5554144507	222165780281	12	~2010
5554191491	11108382983	11	~2007
5554454579	11108909159	11	~2007
5554601099	11109202199	11	~2007
5554636319	11109272639	11	~2007
5554769153	33328614919	11	~2008
5554807421	44438459369	11	~2009
5555202641	33331215847	11	~2008
5555353871	11110707743	11	~2007
5555367143	11110734287	11	~2007

Exponent	Prime Factor	Dig.	Year
5555408711	11110817423	11	~2007
5555572489	166667174671	12	~2010
5555808311	11111616623	11	~2007
5556091811	11112183623	11	~2007
5556194977	33337169863	11	~2008
5556380461	122240370143	12	~2010
5556517139	133356411337	12	~2010
5556677771	11113355543	11	~2007
5556718103	11113436207	11	~2007
5556734951	44453879609	11	~2009
5556816119	11113632239	11	~2007
5556834779	11113669559	11	~2007
5557173959	11114347919	11	~2007
5557415543	11114831087	11	~2007
5557546817	44460374537	11	~2009
5557721159	11115442319	11	~2007
5558429693	33350578159	11	~2008
5558434811	11116869623	11	~2007
5558638583	11117277167	11	~2007
5558785091	11117570183	11	~2007
5559246431	11118492863	11	~2007
5559251051	11118502103	11	~2007
5559472871	11118945743	11	~2007
5559684239	11119368479	11	~2007
5560105511	11120211023	11	~2007

5.247.179 digits

25-12-14