Small Mersenne Prime Factors (page 4409/5460)

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
6066423001	97062768017	11	~2010
6066524063	12133048127	11	~2007
6066585319	60665853191	11	~2009
6066652379	12133304759	11	~2007
6066946913	36401681479	11	~2009
6067093787	145610250889	12	~2010
6067204679	12134409359	11	~2007
6067334219	12134668439	11	~2007
6067767071	12135534143	11	~2007
6067926503	12135853007	11	~2007
6067999523	12135999047	11	~2007
6068127239	12136254479	11	~2007
6068268553	36409611319	11	~2009
6068450183	12136900367	11	~2007
6068475107	48547800857	11	~2009
6068994623	12137989247	11	~2007
6069056597	48552452777	11	~2009
6069230831	12138461663	11	~2007
6069394421	339886087577	12	~2011
6069627617	48557020937	11	~2009
6069699479	12139398959	11	~2007
6069895691	12139791383	11	~2007
6069918623	12139837247	11	~2007
6070261943	12140523887	11	~2007
6070538291	12141076583	11	~2007

Exponent	Prime Factor	Dig.	Year
6070586111	12141172223	11	~2007
6070607351	12141214703	11	~2007
6070990631	12141981263	11	~2007
6071142359	12142284719	11	~2007
6071641703	12143283407	11	~2007
6071668103	12143336207	11	~2007
6071798339	48574386713	11	~2009
6071819471	48574555769	11	~2009
6072036611	12144073223	11	~2007
6072064763	12144129527	11	~2007
6072225119	12144450239	11	~2007
6072353711	12144707423	11	~2007
6072365471	12144730943	11	~2007
6072419621	36434517727	11	~2009
6072460139	12144920279	11	~2007
6072603011	12145206023	11	~2007
6072641843	12145283687	11	~2007
6072842939	12145685879	11	~2007
6073355153	36440130919	11	~2009
6073356551	48586852409	11	~2009
6073536881	36441221287	11	~2009
6073731563	12147463127	11	~2007
6073734743	12147469487	11	~2007
6073831033	97181296529	11	~2010
6073967771	48591742169	11	~2009

Exponent	Prime Factor	Dig.	Year
6074071631	48592573049	11	~2009
6074190719	12148381439	11	~2007
6074300339	12148600679	11	~2007
6074473817	36446842903	11	~2009
6074693363	12149386727	11	~2007
6075151543	60751515431	11	~2009
6075274559	12150549119	11	~2007
6075401407	206563647839	12	~2010
6075539243	12151078487	11	~2007
6075639803	12151279607	11	~2007
6076282921	36457697527	11	~2009
6076451741	36458710447	11	~2009
6076623383	12153246767	11	~2007
6076882853	85076359943	11	~2009
6077374403	12154748807	11	~2007
6077405533	36464433199	11	~2009
6077835857	48622686857	11	~2009
6077855111	12155710223	11	~2007
6077878151	12155756303	11	~2007
6078015731	12156031463	11	~2007
6078432383	12156864767	11	~2007
6078546791	12157093583	11	~2007
6078683393	36472100359	11	~2009
6078763871	12157527743	11	~2007
6079116301	36474697807	11	~2009

Exponent	Prime Factor	Dig.	Year
6079186079	12158372159	11	~2007
6079781849	194553019169	12	~2010
6079802929	182394087871	12	~2010
6079887623	12159775247	11	~2007
6080030051	12160060103	11	~2007
6080094947	340485317033	12	~2011
6080426591	12160853183	11	~2007
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	~2010
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

5.157.210 digits

25-11-02