Small Mersenne Prime Factors (page 4934/4995)

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
253379564939	506759129879	12	~2020
253392224003	506784448007	12	~2020
253417796903	506835593807	12	~2020
253423393523	506846787047	12	~2020
253473607031	506947214063	12	~2020
253476976559	506953953119	12	~2020
253500250271	507000500543	12	~2020
253533165239	507066330479	12	~2020
253536193199	507072386399	12	~2020
253552830491	507105660983	12	~2020
253586550131	507173100263	12	~2020
253592961179	507185922359	12	~2020
253595038883	507190077767	12	~2020
253633363019	507266726039	12	~2020
253638049237	3652...090129	14	2024
253672540799	507345081599	12	~2020
253682230387	6088...292881	14	2024
253716595211	507433190423	12	~2020
253747575899	507495151799	12	~2020
253765947359	507531894719	12	~2020
253768028771	507536057543	12	~2020
253775030819	507550061639	12	~2020
253808275439	507616550879	12	~2020
253889126411	507778252823	12	~2020
253895688803	507791377607	12	~2020

Exponent	Prime Factor	Dig.	Year
253898257631	507796515263	12	~2020
253906806203	507813612407	12	~2020
253913737463	507827474927	12	~2020
253921640039	507843280079	12	~2020
253925017883	507850035767	12	~2020
253929417551	507858835103	12	~2020
253945744043	507891488087	12	~2020
253948329851	507896659703	12	~2020
253953602641	1980...005999	14	2024
253957798019	507915596039	12	~2020
253974617471	507949234943	12	~2020
253979734903	5485...739049	14	2024
253982375051	507964750103	12	~2020
254030223731	508060447463	12	~2020
254083014491	508166028983	12	~2020
254093023091	508186046183	12	~2020
254126904659	508253809319	12	~2020
254130634559	508261269119	12	~2020
254140209503	508280419007	12	~2020
254156557799	508313115599	12	~2020
254172184223	508344368447	12	~2020
254202419591	508404839183	12	~2020
254260901711	508521803423	12	~2020
254266263239	508532526479	12	~2020
254273499659	508546999319	12	~2020

Exponent	Prime Factor	Dig.	Year
254288829383	508577658767	12	~2020
254326749191	5544...323639	14	2024
254327357423	508654714847	12	~2020
254329297331	508658594663	12	~2020
254340093083	508680186167	12	~2020
254344727999	508689455999	12	~2020
254347974323	508695948647	12	~2020
254375520803	508751041607	12	~2020
254432494031	508864988063	12	~2020
254465897963	508931795927	12	~2020
254485746299	508971492599	12	~2020
254503875023	509007750047	12	~2020
254509501139	509019002279	12	~2020
254510132231	509020264463	12	~2020
254580258599	509160517199	12	~2020
254616799069	2393...112487	14	2024
254621436383	509242872767	12	~2020
254635704839	509271409679	12	~2020
254686421603	509372843207	12	~2020
254688891071	509377782143	12	~2020
254703851183	509407702367	12	~2020
254703977579	509407955159	12	~2020
254704063391	509408126783	12	~2020
254713631411	509427262823	12	~2020
254746529171	509493058343	12	~2020

Exponent	Prime Factor	Dig.	Year
254753323151	509506646303	12	~2020
254765939531	509531879063	12	~2020
254782043003	509564086007	12	~2020
254825005511	509650011023	12	~2020
254845010891	509690021783	12	~2020
254871403883	509742807767	12	~2020
254892356531	509784713063	12	~2020
254902428299	509804856599	12	~2020
254929547003	509859094007	12	~2020
254929792267	3670...086449	14	2024
254932441871	509864883743	12	~2020
254936689811	509873379623	12	~2020
254960431343	509920862687	12	~2020
254960981111	509921962223	12	~2020
254975263451	2294...710591	14	2025
254985399899	509970799799	12	~2020
255006982523	510013965047	12	~2020
255009970223	510019940447	12	~2020
255012593519	510025187039	12	~2020
255049833119	510099666239	12	~2020
255068714903	510137429807	12	~2020
255080497739	510160995479	12	~2020
255087085703	510174171407	12	~2020
255087913403	510175826807	12	~2020
255101384171	5561...749279	14	2023

4.694.480 digits

25-03-30