Small Mersenne Prime Factors (page 4630/5130)

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
29701603271	59403206543	11	~2013
29701739279	59403478559	11	~2013
29703836999	59407673999	11	~2013
29706707903	59413415807	11	~2013
29707896377	178247378263	12	~2014
29709047783	59418095567	11	~2013
29709658103	59419316207	11	~2013
29711060243	59422120487	11	~2013
29711331257	178267987543	12	~2014
29712903179	59425806359	11	~2013
29713637963	59427275927	11	~2013
29713760123	59427520247	11	~2013
29714432687	534859788367	12	~2015
29716105703	59432211407	11	~2013
29716777619	59433555239	11	~2013
29717015411	59434030823	11	~2013
29717079971	59434159943	11	~2013
29717363099	59434726199	11	~2013
29717496911	59434993823	11	~2013
29717664719	59435329439	11	~2013
29719120523	59438241047	11	~2013
29721654551	59443309103	11	~2013
29723285159	59446570319	11	~2013
29723603951	59447207903	11	~2013
29724521363	59449042727	11	~2013

Exponent	Prime Factor	Dig.	Year
29726079203	59452158407	11	~2013
29726147497	178356884983	12	~2014
29726193661	178357161967	12	~2014
29731123787	237848990297	12	~2014
29731278683	59462557367	11	~2013
29731344683	59462689367	11	~2013
29731776421	178390658527	12	~2014
29731898279	59463796559	11	~2013
29733035069	416262490967	12	~2015
29736218723	59472437447	11	~2013
29736899651	237895197209	12	~2014
29737161131	59474322263	11	~2013
29737544579	59475089159	11	~2013
29738011463	59476022927	11	~2013
29738358431	59476716863	11	~2013
29739001093	178434006559	12	~2014
29740282619	59480565239	11	~2013
29740439843	59480879687	11	~2013
29742537719	59485075439	11	~2013
29743953137	713854875289	12	~2015
29744393059	297443930591	12	~2015
29746174273	178477045639	12	~2014
29747310011	59494620023	11	~2013
29748034387	297480343871	12	~2015
29750246411	59500492823	11	~2013

Exponent	Prime Factor	Dig.	Year
29753140243	297531402431	12	~2015
29753166431	59506332863	11	~2013
29754821051	59509642103	11	~2013
29756806571	59513613143	11	~2013
29757187919	59514375839	11	~2013
29757643631	59515287263	11	~2013
29757924613	178547547679	12	~2014
29758004999	59516009999	11	~2013
29759052131	59518104263	11	~2013
29763977291	59527954583	11	~2013
29765036183	59530072367	11	~2013
29766480899	59532961799	11	~2013
29767179551	59534359103	11	~2013
29768698139	59537396279	11	~2013
29771504417	178629026503	12	~2014
29773623611	59547247223	11	~2013
29774342579	59548685159	11	~2013
29775295211	59550590423	11	~2013
29778620777	2828...738151	14	2023
29779467821	178676806927	12	~2014
29779590041	178677540247	12	~2014
29781487163	59562974327	11	~2013
29783991719	59567983439	11	~2013
29784172763	59568345527	11	~2013
29785468259	59570936519	11	~2013

Exponent	Prime Factor	Dig.	Year
29786718917	178720313503	12	~2014
29787767363	59575534727	11	~2013
29788661939	59577323879	11	~2013
29788933631	59577867263	11	~2013
29789117159	238312937273	12	~2014
29790340199	59580680399	11	~2013
29792747339	59585494679	11	~2013
29794376291	59588752583	11	~2013
29795187167	715084492009	12	~2015
29795217971	59590435943	11	~2013
29795302547	238362420377	12	~2014
29795972399	59591944799	11	~2013
29796156913	178776941479	12	~2014
29798791739	238390333913	12	~2014
29801496563	59602993127	11	~2013
29803303897	178819823383	12	~2014
29808900479	59617800959	11	~2013
29810297663	59620595327	11	~2013
29810425643	59620851287	11	~2013
29810691731	59621383463	11	~2013
29812464167	238499713337	12	~2014
29813976299	59627952599	11	~2013
29815086071	59630172143	11	~2013
29815586891	59631173783	11	~2013
29816248811	59632497623	11	~2013

4.828.532 digits

25-06-01