Small Mersenne Prime Factors (page 5408/5610)

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
138109124033	828654744199	12	~2019
138111278219	276222556439	12	~2018
138115505639	276231011279	12	~2018
138123034943	276246069887	12	~2018
138125605379	276251210759	12	~2018
138133751699	276267503399	12	~2018
138137313383	276274626767	12	~2018
138144255863	276288511727	12	~2018
138152917033	828917502199	12	~2019
138154414103	276308828207	12	~2018
138155155091	276310310183	12	~2018
138167800583	276335601167	12	~2018
138177496417	2956...233239	14	2024
138186010691	276372021383	12	~2018
138188797997	829132787983	12	~2019
138198182663	276396365327	12	~2018
138224267429	1006...688313	15	2025
138224991479	276449982959	12	~2018
138238567079	276477134159	12	~2018
138249238019	276498476039	12	~2018
138255578147	2682...160519	14	2024
138279812519	276559625039	12	~2018
138284852663	1496...581367	15	2025
138295072691	276590145383	12	~2018
138306662713	2627...915471	14	2024

Exponent	Prime Factor	Dig.	Year
138321176291	276642352583	12	~2018
138328959959	276657919919	12	~2018
138329178731	276658357463	12	~2018
138335834363	276671668727	12	~2018
138338949779	276677899559	12	~2018
138344873819	276689747639	12	~2018
138347215943	276694431887	12	~2018
138347443463	276694886927	12	~2018
138353367827	1753...839399	16	2023
138359926583	276719853167	12	~2018
138373039631	276746079263	12	~2018
138386952611	276773905223	12	~2018
138389678783	276779357567	12	~2018
138392438753	830354632519	12	~2019
138395414303	276790828607	12	~2018
138403307183	276806614367	12	~2018
138403596923	276807193847	12	~2018
138405824437	830434946623	12	~2019
138429586843	7198...158361	14	2025
138438325451	276876650903	12	~2018
138443971091	276887942183	12	~2018
138453991213	830723947279	12	~2019
138456243059	276912486119	12	~2018
138470573999	276941147999	12	~2018
138475599293	3655...213353	14	2023

Exponent	Prime Factor	Dig.	Year
138476290633	830857743799	12	~2019
138489445531	7561...259927	14	2025
138496705283	276993410567	12	~2018
138500640023	277001280047	12	~2018
138505063331	277010126663	12	~2018
138506074453	4626...867303	14	2023
138514674911	277029349823	12	~2018
138536192057	831217152343	12	~2019
138542936537	831257619223	12	~2019
138543493859	277086987719	12	~2018
138546072299	277092144599	12	~2018
138546890843	277093781687	12	~2018
138552034139	277104068279	12	~2018
138566444099	277132888199	12	~2018
138568342937	831410057623	12	~2019
138569017283	277138034567	12	~2018
138569895697	831419374183	12	~2019
138573979451	277147958903	12	~2018
138585502753	831513016519	12	~2019
138585682919	277171365839	12	~2018
138585897293	831515383759	12	~2019
138587670863	277175341727	12	~2018
138588756671	277177513343	12	~2018
138591397559	277182795119	12	~2018
138591531899	277183063799	12	~2018

Exponent	Prime Factor	Dig.	Year
138592189091	277184378183	12	~2018
138606723659	277213447319	12	~2018
138607193377	831643160263	12	~2019
138610043161	831660258967	12	~2019
138613628579	277227257159	12	~2018
138621713603	277243427207	12	~2018
138632091187	1122...861471	15	2025
138650537339	277301074679	12	~2018
138682751939	277365503879	12	~2018
138687652931	277375305863	12	~2018
138700814963	277401629927	12	~2018
138733653791	277467307583	12	~2018
138737571779	277475143559	12	~2018
138745879619	277491759239	12	~2018
138751805051	277503610103	12	~2018
138753322583	277506645167	12	~2018
138757335593	832544013559	12	~2019
138758384939	277516769879	12	~2018
138762977603	277525955207	12	~2018
138764822051	277529644103	12	~2018
138764972107	2470...035047	14	2024
138772728683	277545457367	12	~2018
138776901563	277553803127	12	~2018
138785530391	277571060783	12	~2018
138785935283	277571870567	12	~2018

5.307.017 digits

26-01-11