Small Mersenne Prime Factors (page 4098/5025)

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
6080668721	48645349769	11	~2009
6080684947	97290959153	11	~2010
6080721431	12161442863	11	~2007
6080786819	12161573639	11	~2007
6080804843	12161609687	11	~2007
6080851151	12161702303	11	~2007
6081105133	36486630799	11	~2009
6081218477	85137058679	11	~2009
6081421331	12162842663	11	~2007
6081938183	12163876367	11	~2007
6082491011	12164982023	11	~2007
6082879823	12165759647	11	~2007
6082886723	12165773447	11	~2007
6082918091	12165836183	11	~2007
6083283971	12166567943	11	~2007
6083432423	12166864847	11	~2007
6083479229	48667833833	11	~2009
6083498303	12166996607	11	~2007
6083752943	12167505887	11	~2007
6084248297	48673986377	11	~2009
6084280931	12168561863	11	~2007
6084806513	36508839079	11	~2009
6084950987	48679607897	11	~2009
6085136003	12170272007	11	~2007
6085201163	12170402327	11	~2007

Exponent	Prime Factor	Dig.	Year
6085217123	12170434247	11	~2007
6085299797	36511798783	11	~2009
6085382183	12170764367	11	~2007
6085441421	36512648527	11	~2009
6085494983	12170989967	11	~2007
6085626719	12171253439	11	~2007
6085775537	48686204297	11	~2009
6086113093	36516678559	11	~2009
6086169179	12172338359	11	~2007
6086196491	12172392983	11	~2007
6086452397	48691619177	11	~2009
6086600489	182598014671	12	~2010
6086726111	12173452223	11	~2007
6086867183	12173734367	11	~2007
6087322313	36523933879	11	~2009
6087397271	12174794543	11	~2007
6087463331	12174926663	11	~2007
6087754721	36526528327	11	~2009
6087809309	48702474473	11	~2009
6088013579	12176027159	11	~2007
6088061099	12176122199	11	~2007
6089137031	12178274063	11	~2007
6089324771	12178649543	11	~2007
6089536393	36537218359	11	~2009
6089769227	48718153817	11	~2009

Exponent	Prime Factor	Dig.	Year
6089945891	12179891783	11	~2007
6090530051	12181060103	11	~2007
6090838223	12181676447	11	~2007
6090993149	48727945193	11	~2009
6091535399	12183070799	11	~2007
6092508221	36555049327	11	~2009
6092572769	48740582153	11	~2009
6092867699	12185735399	11	~2007
6093261679	60932616791	11	~2009
6093692399	12187384799	11	~2007
6094070819	12188141639	11	~2007
6094507339	60945073391	11	~2009
6094651091	12189302183	11	~2007
6094722299	12189444599	11	~2007
6095239583	12190479167	11	~2007
6095555351	48764442809	11	~2009
6095609843	12191219687	11	~2007
6095693321	48765546569	11	~2009
6095863583	12191727167	11	~2007
6095896151	12191792303	11	~2007
6096085871	12192171743	11	~2007
6096335929	292624124593	12	~2011
6096386123	12192772247	11	~2007
6096570839	12193141679	11	~2007
6096757883	12193515767	11	~2007

Exponent	Prime Factor	Dig.	Year
6097117139	12194234279	11	~2007
6097330259	12194660519	11	~2007
6097494719	12194989439	11	~2007
6097955183	12195910367	11	~2007
6098129291	12196258583	11	~2007
6098188979	12196377959	11	~2007
6098218799	12196437599	11	~2007
6098487359	12196974719	11	~2007
6098642603	12197285207	11	~2007
6098731763	12197463527	11	~2007
6098803213	36592819279	11	~2009
6099020831	12198041663	11	~2007
6099191797	36595150783	11	~2009
6099547681	36597286087	11	~2009
6099557921	48796463369	11	~2009
6100015739	12200031479	11	~2007
6100216211	12200432423	11	~2007
6100235641	36601413847	11	~2009
6100330241	36601981447	11	~2009
6100618709	48804949673	11	~2009
6100726637	36604359823	11	~2009
6100872311	12201744623	11	~2007
6100897031	12201794063	11	~2007
6100935419	12201870839	11	~2007
6100941503	12201883007	11	~2007

4.724.182 digits

25-04-13