Small Mersenne Prime Factors (page 4338/5025)

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
13755175823	27510351647	11	~2010
13756521419	27513042839	11	~2010
13756669099	137566690991	12	~2012
13756969333	82541815999	11	~2011
13757714111	27515428223	11	~2010
13757818331	27515636663	11	~2010
13758282119	27516564239	11	~2010
13758636161	82551816967	11	~2011
13759411637	82556469823	11	~2011
13759425131	27518850263	11	~2010
13762035611	247716640999	12	~2013
13762132883	27524265767	11	~2010
13763186831	27526373663	11	~2010
13763530609	2014...811577	14	2024
13764640741	82587844447	11	~2011
13765228583	27530457167	11	~2010
13767492391	247814863039	12	~2013
13767778691	27535557383	11	~2010
13768136479	137681364791	12	~2012
13768691099	27537382199	11	~2010
13769516921	82617101527	11	~2011
13770477191	110163817529	12	~2012
13771097183	27542194367	11	~2010
13772041259	27544082519	11	~2010
13773078191	27546156383	11	~2010

Exponent	Prime Factor	Dig.	Year
13774465079	110195720633	12	~2012
13775060261	82650361567	11	~2011
13775557259	27551114519	11	~2010
13777036739	27554073479	11	~2010
13777979843	27555959687	11	~2010
13777994759	27555989519	11	~2010
13778029823	27556059647	11	~2010
13778395703	27556791407	11	~2010
13778531411	27557062823	11	~2010
13778708219	661377994513	12	~2014
13778732171	27557464343	11	~2010
13779142211	27558284423	11	~2010
13779343541	110234748329	12	~2012
13780017737	82680106423	11	~2011
13780299623	27560599247	11	~2010
13780960619	27561921239	11	~2010
13781117783	27562235567	11	~2010
13781739557	110253916457	12	~2012
13781756957	82690541743	11	~2011
13781860259	27563720519	11	~2010
13782395171	27564790343	11	~2010
13783417463	27566834927	11	~2010
13783464599	27566929199	11	~2010
13784055731	27568111463	11	~2010
13784063087	110272504697	12	~2012

Exponent	Prime Factor	Dig.	Year
13784623379	27569246759	11	~2010
13785035393	82710212359	11	~2011
13785352643	27570705287	11	~2010
13785562991	27571125983	11	~2010
13785969311	27571938623	11	~2010
13786257059	27572514119	11	~2010
13787430011	27574860023	11	~2010
13787646179	27575292359	11	~2010
13787704921	82726229527	11	~2011
13788272471	27576544943	11	~2010
13790445083	27580890167	11	~2010
13790792693	330979024633	12	~2013
13791148919	27582297839	11	~2010
13791545231	27583090463	11	~2010
13791752603	27583505207	11	~2010
13791916511	27583833023	11	~2010
13792120487	358595132663	12	~2013
13792190123	27584380247	11	~2010
13793030513	331032732313	12	~2013
13793136743	27586273487	11	~2010
13793280359	27586560719	11	~2010
13793419361	110347354889	12	~2012
13793876717	193114274039	12	~2012
13794242401	7272...938073	14	2025
13794278999	27588557999	11	~2010

Exponent	Prime Factor	Dig.	Year
13794659531	27589319063	11	~2010
13794973259	27589946519	11	~2010
13795880099	27591760199	11	~2010
13797776807	110382214457	12	~2012
13799107177	220785714833	12	~2012
13799131739	27598263479	11	~2010
13800092017	82800552103	11	~2011
13801446731	27602893463	11	~2010
13802171561	110417372489	12	~2012
13802705159	27605410319	11	~2010
13802774879	27605549759	11	~2010
13803328499	27606656999	11	~2010
13803403373	193247647223	12	~2012
13804585513	82827513079	11	~2011
13805240279	27610480559	11	~2010
13805376551	27610753103	11	~2010
13806221381	110449771049	12	~2012
13807055243	27614110487	11	~2010
13807582637	82845495823	11	~2011
13807833839	27615667679	11	~2010
13809431459	27618862919	11	~2010
13810769279	27621538559	11	~2010
13811551337	82869308023	11	~2011
13811750341	82870502047	11	~2011
13811814983	27623629967	11	~2010

4.724.182 digits

25-04-13