Small Mersenne Prime Factors (page 5118/5445)

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
72681608963	145363217927	12	~2016
72682067099	145364134199	12	~2016
72683836619	145367673239	12	~2016
72686049731	145372099463	12	~2016
72691074611	145382149223	12	~2016
72701652503	145403305007	12	~2016
72702704729	581621637833	12	~2017
72704226433	436225358599	12	~2017
72705463619	145410927239	12	~2016
72705981791	145411963583	12	~2016
72706876439	145413752879	12	~2016
72708016301	436248097807	12	~2017
72709021061	581672168489	12	~2017
72709806671	145419613343	12	~2016
72710187779	145420375559	12	~2016
72721520233	436329121399	12	~2017
72724769471	145449538943	12	~2016
72725356751	145450713503	12	~2016
72727874963	145455749927	12	~2016
72728660639	145457321279	12	~2016
72731973719	145463947439	12	~2016
72734603099	145469206199	12	~2016
72737412827	3375...551729	14	2023
72738075131	145476150263	12	~2016
72739299517	436435797103	12	~2017

Exponent	Prime Factor	Dig.	Year
72741320831	145482641663	12	~2016
72742283483	145484566967	12	~2016
72747504191	145495008383	12	~2016
72749601971	145499203943	12	~2016
72750636923	145501273847	12	~2016
72751566359	5543...565559	14	2023
72752181791	145504363583	12	~2016
72753751331	145507502663	12	~2016
72763187351	145526374703	12	~2016
72768875999	145537751999	12	~2016
72776225303	145552450607	12	~2016
72779390891	145558781783	12	~2016
72779994713	2794...969793	14	2024
72781421123	145562842247	12	~2016
72781750523	145563501047	12	~2016
72782811551	145565623103	12	~2016
72783217981	436699307887	12	~2017
72784154939	145568309879	12	~2016
72785985071	145571970143	12	~2016
72786984059	145573968119	12	~2016
72793892651	145587785303	12	~2016
72794635031	145589270063	12	~2016
72801055919	145602111839	12	~2016
72804784583	145609569167	12	~2016
72806791439	145613582879	12	~2016

Exponent	Prime Factor	Dig.	Year
72823863251	145647726503	12	~2016
72826505261	436959031567	12	~2017
72827493083	145654986167	12	~2016
72828888107	582631104857	12	~2017
72831492311	582651938489	12	~2017
72831658811	145663317623	12	~2016
72832112939	145664225879	12	~2016
72833229431	145666458863	12	~2016
72834757031	145669514063	12	~2016
72840287647	728402876471	12	~2018
72842047337	437052284023	12	~2017
72844531913	437067191479	12	~2017
72846816683	145693633367	12	~2016
72852257183	145704514367	12	~2016
72854859323	145709718647	12	~2016
72862531991	145725063983	12	~2016
72863008901	437178053407	12	~2017
72864688619	145729377239	12	~2016
72866576197	437199457183	12	~2017
72882128339	145764256679	12	~2016
72882906191	583063249529	12	~2017
72886432447	728864324471	12	~2018
72890943623	145781887247	12	~2016
72891734471	583133875769	12	~2017
72895007351	145790014703	12	~2016

Exponent	Prime Factor	Dig.	Year
72896415407	583171323257	12	~2017
72898373771	145796747543	12	~2016
72909104459	145818208919	12	~2016
72913718257	437482309543	12	~2017
72914045003	145828090007	12	~2016
72917445539	145834891079	12	~2016
72918779597	437512677583	12	~2017
72922090379	145844180759	12	~2016
72925916291	145851832583	12	~2016
72928446581	437570679487	12	~2017
72928830133	437572980799	12	~2017
72931152071	145862304143	12	~2016
72932558261	583460466089	12	~2017
72945703619	145891407239	12	~2016
72951178343	145902356687	12	~2016
72953914031	145907828063	12	~2016
72956428469	583651427753	12	~2017
72958494341	583667954729	12	~2017
72959872103	145919744207	12	~2016
72962308103	145924616207	12	~2016
72965162051	145930324103	12	~2016
72967634951	145935269903	12	~2016
72968804231	145937608463	12	~2016
72971366791	729713667911	12	~2018
72972024899	145944049799	12	~2016

5.142.307 digits

25-10-26