Small Mersenne Prime Factors (page 4870/5010)

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
149973580079	299947160159	12	~2018
149974475351	299948950703	12	~2018
149975165771	299950331543	12	~2018
149979826823	299959653647	12	~2018
149994196199	299988392399	12	~2018
149996763431	299993526863	12	~2018
149999393039	299998786079	12	~2018
150017267437	3840...463873	14	2023
150026280983	300052561967	12	~2018
150032733611	300065467223	12	~2018
150037381883	300074763767	12	~2018
150069125159	300138250319	12	~2018
150109636031	300219272063	12	~2018
150120823631	300241647263	12	~2018
150124753871	300249507743	12	~2018
150129266939	300258533879	12	~2018
150162845411	300325690823	12	~2018
150180098231	300360196463	12	~2018
150194792411	300389584823	12	~2018
150197568959	300395137919	12	~2018
150200248343	300400496687	12	~2018
150207649583	300415299167	12	~2018
150220223711	300440447423	12	~2018
150223450439	300446900879	12	~2018
150227591219	300455182439	12	~2018

Exponent	Prime Factor	Dig.	Year
150277838663	300555677327	12	~2018
150282232511	300564465023	12	~2018
150298153079	300596306159	12	~2018
150299182079	300598364159	12	~2018
150306297539	300612595079	12	~2018
150310749731	300621499463	12	~2018
150323935799	300647871599	12	~2018
150334013171	300668026343	12	~2018
150358183741	1894...151367	14	2024
150361125203	300722250407	12	~2018
150362170463	300724340927	12	~2018
150365643299	300731286599	12	~2018
150376507871	300753015743	12	~2018
150383781323	300767562647	12	~2018
150389535311	300779070623	12	~2018
150393414779	300786829559	12	~2018
150396241811	300792483623	12	~2018
150424232099	300848464199	12	~2018
150436240859	300872481719	12	~2018
150442528139	300885056279	12	~2018
150449933519	300899867039	12	~2018
150455347799	300910695599	12	~2018
150459556391	300919112783	12	~2018
150476643731	300953287463	12	~2018
150498411191	300996822383	12	~2018

Exponent	Prime Factor	Dig.	Year
150510977423	301021954847	12	~2018
150529205399	301058410799	12	~2018
150536947091	301073894183	12	~2018
150537217643	301074435287	12	~2018
150565110659	301130221319	12	~2018
150579147287	2529...744217	14	2024
150579365099	301158730199	12	~2018
150581017511	301162035023	12	~2018
150586816823	301173633647	12	~2018
150617687723	301235375447	12	~2018
150618152039	3283...144503	14	2024
150662507399	301325014799	12	~2018
150673655437	2531...113417	14	2024
150680705099	301361410199	12	~2018
150681187883	301362375767	12	~2018
150683869991	301367739983	12	~2018
150695873123	301391746247	12	~2018
150697785323	301395570647	12	~2018
150702358199	301404716399	12	~2018
150727689659	301455379319	12	~2018
150738195071	301476390143	12	~2018
150744368501	1266...540841	15	2025
150747019931	301494039863	12	~2018
150764384759	301528769519	12	~2018
150768534359	301537068719	12	~2018

Exponent	Prime Factor	Dig.	Year
150805335431	301610670863	12	~2018
150809738099	301619476199	12	~2018
150812320979	301624641959	12	~2018
150852253709	1279...145233	15	2025
150854522963	301709045927	12	~2018
150854683943	301709367887	12	~2018
150854823011	301709646023	12	~2018
150861886919	301723773839	12	~2018
150869027579	301738055159	12	~2018
150900120671	301800241343	12	~2018
150903881039	301807762079	12	~2018
150930597479	301861194959	12	~2018
150939831611	301879663223	12	~2018
150962058983	301924117967	12	~2018
150966170557	7608...960729	14	2024
150971063123	301942126247	12	~2018
151000243957	2416...033121	14	2024
151001469071	302002938143	12	~2018
151005422339	302010844679	12	~2018
151005500759	302011001519	12	~2018
151008804539	302017609079	12	~2018
151022160983	302044321967	12	~2018
151031240819	302062481639	12	~2018
151036388963	302072777927	12	~2018
151038367619	302076735239	12	~2018

4.709.457 digits

25-04-06