Small Mersenne Prime Factors (page 4721/5025)

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
63977133491	127954266983	12	~2015
63977964023	127955928047	12	~2015
63978273859	639782738591	12	~2017
63983658239	127967316479	12	~2015
63984010439	127968020879	12	~2015
63984581879	127969163759	12	~2015
63986253059	127972506119	12	~2015
63987425897	383924555383	12	~2017
63995557033	383973342199	12	~2017
63997023731	127994047463	12	~2015
64005396011	128010792023	12	~2015
64011019379	128022038759	12	~2015
64017538391	128035076783	12	~2015
64018616423	128037232847	12	~2015
64022381639	128044763279	12	~2015
64027959071	128055918143	12	~2015
64030025831	128060051663	12	~2015
64034333339	512274666713	12	~2017
64041711311	9081...638999	14	2025
64043361611	128086723223	12	~2015
64044432059	128088864119	12	~2015
64044639803	128089279607	12	~2015
64046561951	128093123903	12	~2015
64053169907	4727...391367	14	2023
64056958811	128113917623	12	~2015

Exponent	Prime Factor	Dig.	Year
64060885151	128121770303	12	~2015
64061606363	128123212727	12	~2015
64062881411	128125762823	12	~2015
64066678139	128133356279	12	~2015
64067792909	512542343273	12	~2017
64072924403	128145848807	12	~2015
64074207689	512593661513	12	~2017
64076473991	128152947983	12	~2015
64082916563	128165833127	12	~2015
64083939463	640839394631	12	~2017
64084404941	384506429647	12	~2017
64084906937	384509441623	12	~2017
64086095399	128172190799	12	~2015
64087664423	128175328847	12	~2015
64087782179	128175564359	12	~2015
64088650991	128177301983	12	~2015
64091723411	128183446823	12	~2015
64091795759	128183591519	12	~2015
64093317419	128186634839	12	~2015
64098708451	640987084511	12	~2017
64100263603	641002636031	12	~2017
64100756339	128201512679	12	~2015
64106724323	128213448647	12	~2015
64108343683	641083436831	12	~2017
64108912079	128217824159	12	~2015

Exponent	Prime Factor	Dig.	Year
64110061871	128220123743	12	~2015
64112325143	128224650287	12	~2015
64114512131	128229024263	12	~2015
64121708381	384730250287	12	~2017
64125418417	384752510503	12	~2017
64129419023	128258838047	12	~2015
64130206367	513041650937	12	~2017
64132034243	128264068487	12	~2015
64135148557	384810891343	12	~2017
64141881647	513135053177	12	~2017
64142159651	513137277209	12	~2017
64144052587	641440525871	12	~2017
64145560883	128291121767	12	~2015
64146365399	513170923193	12	~2017
64149675959	128299351919	12	~2015
64151620499	128303240999	12	~2015
64158511093	384951066559	12	~2017
64160384111	128320768223	12	~2015
64161887677	1835...875623	14	2023
64168467899	128336935799	12	~2015
64169170979	128338341959	12	~2015
64170041231	128340082463	12	~2015
64170087599	128340175199	12	~2015
64171375799	128342751599	12	~2015
64177125359	128354250719	12	~2015

Exponent	Prime Factor	Dig.	Year
64178283313	385069699879	12	~2017
64180561223	128361122447	12	~2015
64182533483	128365066967	12	~2015
64183236001	2875...728449	14	2024
64190505497	385143032983	12	~2017
64194251111	128388502223	12	~2015
64197970631	128395941263	12	~2015
64197982571	128395965143	12	~2015
64198019279	128396038559	12	~2015
64202238491	128404476983	12	~2015
64202719391	128405438783	12	~2015
64208703959	128417407919	12	~2015
64212691271	513701530169	12	~2017
64217703059	128435406119	12	~2015
64218495059	128436990119	12	~2015
64219198343	128438396687	12	~2015
64220654243	128441308487	12	~2015
64224728651	128449457303	12	~2015
64225344503	128450689007	12	~2015
64227095843	128454191687	12	~2015
64227777643	642277776431	12	~2017
64231374479	128462748959	12	~2015
64235287619	128470575239	12	~2015
64236072359	128472144719	12	~2015
64238646539	513909172313	12	~2017

4.724.182 digits

25-04-13