Small Mersenne Prime Factors (page 4751/5025)

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
73249862219	146499724439	12	~2016
73253356139	146506712279	12	~2016
73257380411	146514760823	12	~2016
73261018403	146522036807	12	~2016
73261645343	146523290687	12	~2016
73261839179	146523678359	12	~2016
73267791637	439606749823	12	~2017
73272359533	439634157199	12	~2017
73272853471	732728534711	12	~2018
73278955391	2066...420263	14	2024
73282988819	146565977639	12	~2016
73290240431	146580480863	12	~2016
73292011487	586336091897	12	~2017
73296926831	146593853663	12	~2016
73297073621	439782441727	12	~2017
73297878299	146595756599	12	~2016
73300029839	146600059679	12	~2016
73300784831	146601569663	12	~2016
73302308603	146604617207	12	~2016
73302690011	146605380023	12	~2016
73304095021	439824570127	12	~2017
73306298171	146612596343	12	~2016
73309923899	146619847799	12	~2016
73311111347	586488890777	12	~2017
73313380223	146626760447	12	~2016

Exponent	Prime Factor	Dig.	Year
73313939411	146627878823	12	~2016
73321427279	146642854559	12	~2016
73322585081	586580680649	12	~2017
73327440359	146654880719	12	~2016
73331433839	146662867679	12	~2016
73332037979	146664075959	12	~2016
73332400919	146664801839	12	~2016
73341365033	440048190199	12	~2017
73345428199	733454281991	12	~2018
73346148569	586769188553	12	~2017
73348031363	146696062727	12	~2016
73367067479	146734134959	12	~2016
73370147843	146740295687	12	~2016
73370290859	146740581719	12	~2016
73372806659	146745613319	12	~2016
73373331743	146746663487	12	~2016
73376820149	587014561193	12	~2017
73377015083	146754030167	12	~2016
73379221193	440275327159	12	~2017
73379321843	146758643687	12	~2016
73387571897	587100575177	12	~2017
73389803771	146779607543	12	~2016
73396926923	146793853847	12	~2016
73399909421	440399456527	12	~2017
73400775011	146801550023	12	~2016

Exponent	Prime Factor	Dig.	Year
73407950543	146815901087	12	~2016
73408194143	146816388287	12	~2016
73413215339	146826430679	12	~2016
73415535131	146831070263	12	~2016
73418463773	440510782639	12	~2017
73424415563	146848831127	12	~2016
73435380113	440612280679	12	~2017
73435964051	146871928103	12	~2016
73448167319	146896334639	12	~2016
73448657699	146897315399	12	~2016
73448684087	587589472697	12	~2017
73450898879	146901797759	12	~2016
73453294199	146906588399	12	~2016
73453778291	146907556583	12	~2016
73459596137	440757576823	12	~2017
73459818671	146919637343	12	~2016
73463360819	146926721639	12	~2016
73466674937	440800049623	12	~2017
73466779103	146933558207	12	~2016
73469699903	146939399807	12	~2016
73473974401	440843846407	12	~2017
73477737143	146955474287	12	~2016
73478571203	146957142407	12	~2016
73478621519	146957243039	12	~2016
73479611531	146959223063	12	~2016

Exponent	Prime Factor	Dig.	Year
73484745203	146969490407	12	~2016
73485219061	440911314367	12	~2017
73490968823	146981937647	12	~2016
73493077631	146986155263	12	~2016
73497488639	146994977279	12	~2016
73497921383	146995842767	12	~2016
73502419871	147004839743	12	~2016
73503112031	147006224063	12	~2016
73506102521	588048820169	12	~2017
73515526961	588124215689	12	~2017
73520790821	441124744927	12	~2017
73523730613	441142383679	12	~2017
73523749571	147047499143	12	~2016
73525023779	147050047559	12	~2016
73529760659	147059521319	12	~2016
73535731091	147071462183	12	~2016
73539116663	147078233327	12	~2016
73545509039	147091018079	12	~2016
73547321339	147094642679	12	~2016
73547656043	147095312087	12	~2016
73549036199	588392289593	12	~2017
73549177343	147098354687	12	~2016
73557065473	441342392839	12	~2017
73559931551	147119863103	12	~2016
73572157259	147144314519	12	~2016

4.724.182 digits

25-04-13