Small Mersenne Prime Factors (page 5549/5745)

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
149480932619	298961865239	12	~2018
149481076379	298962152759	12	~2018
149481193789	1408...549239	15	2025
149482133459	298964266919	12	~2018
149490208151	298980416303	12	~2018
149499937799	298999875599	12	~2018
149512633103	299025266207	12	~2018
149516537171	299033074343	12	~2018
149529488099	299058976199	12	~2018
149532507083	299065014167	12	~2018
149538468743	299076937487	12	~2018
149546375039	299092750079	12	~2018
149575515863	299151031727	12	~2018
149576107643	299152215287	12	~2018
149583258659	299166517319	12	~2018
149598180971	299196361943	12	~2018
149609184503	299218369007	12	~2018
149626275857	897757655143	12	~2019
149626717679	299253435359	12	~2018
149626845317	897761071903	12	~2019
149631029759	299262059519	12	~2018
149640270683	299280541367	12	~2018
149640817691	299281635383	12	~2018
149650554551	299301109103	12	~2018
149652263857	897913583143	12	~2019

Exponent	Prime Factor	Dig.	Year
149685487517	898112925103	12	~2019
149687565719	299375131439	12	~2018
149693387339	299386774679	12	~2018
149694480263	299388960527	12	~2018
149706832841	898240997047	12	~2019
149707452683	299414905367	12	~2018
149715396197	898292377183	12	~2019
149726263163	299452526327	12	~2018
149729225771	299458451543	12	~2018
149731710677	898390264063	12	~2019
149731770143	299463540287	12	~2018
149734330871	299468661743	12	~2018
149734794323	299469588647	12	~2018
149738801477	898432808863	12	~2019
149748697883	299497395767	12	~2018
149749951811	299499903623	12	~2018
149759666939	299519333879	12	~2018
149778306011	299556612023	12	~2018
149778370883	299556741767	12	~2018
149788393037	2606...388439	14	2024
149792519939	299585039879	12	~2018
149802735983	299605471967	12	~2018
149803571843	299607143687	12	~2018
149803926263	299607852527	12	~2018
149811492773	898868956639	12	~2019

Exponent	Prime Factor	Dig.	Year
149837222291	299674444583	12	~2018
149839592183	299679184367	12	~2018
149848880099	299697760199	12	~2018
149876716079	299753432159	12	~2018
149879121911	299758243823	12	~2018
149883147959	299766295919	12	~2018
149884995721	2518...281129	14	2024
149892682739	299785365479	12	~2018
149900024903	299800049807	12	~2018
149901756503	299803513007	12	~2018
149923674539	299847349079	12	~2018
149924595257	899547571543	12	~2019
149935174391	299870348783	12	~2018
149936685011	299873370023	12	~2018
149944624223	299889248447	12	~2018
149955531623	299911063247	12	~2018
149957992753	899747956519	12	~2019
149972297459	299944594919	12	~2018
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

Exponent	Prime Factor	Dig.	Year
150007014413	900042086479	12	~2019
150017267437	3840...463873	14	2023
150026280983	300052561967	12	~2018
150032733611	300065467223	12	~2018
150037381883	300074763767	12	~2018
150047720099	300095440199	12	~2018
150061273717	900367642303	12	~2019
150063317801	900379906807	12	~2019
150069125159	300138250319	12	~2018
150109636031	300219272063	12	~2018
150119142191	300238284383	12	~2018
150120823631	300241647263	12	~2018
150124753871	300249507743	12	~2018
150129266939	300258533879	12	~2018
150129656531	300259313063	12	~2018
150141449177	900848695063	12	~2019
150162845411	300325690823	12	~2018
150167977343	300335954687	12	~2018
150171195061	901027170367	12	~2020
150180098231	300360196463	12	~2018
150194792411	300389584823	12	~2018
150197568959	300395137919	12	~2018
150200248343	300400496687	12	~2018
150207649583	300415299167	12	~2018
150213260293	901279561759	12	~2020

5.441.361 digits

26-03-15