Small Mersenne Prime Factors (page 5584/5850)

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
112603018823	225206037647	12	~2017
112604774039	225209548079	12	~2017
112607557481	675645344887	12	~2019
112608327323	225216654647	12	~2017
112614613439	225229226879	12	~2017
112617126497	900937011977	12	~2019
112617972073	675707832439	12	~2019
112618018043	225236036087	12	~2017
112618359697	675710158183	12	~2019
112620936611	225241873223	12	~2017
112628757179	225257514359	12	~2017
112634349563	225268699127	12	~2017
112641384301	675848305807	12	~2019
112642527779	901140222233	12	~2019
112642947551	901143580409	12	~2019
112645477319	225290954639	12	~2017
112647547561	675885285367	12	~2019
112659421463	225318842927	12	~2017
112660664111	225321328223	12	~2017
112662490043	225324980087	12	~2017
112664038583	225328077167	12	~2017
112668678359	225337356719	12	~2017
112670813159	225341626319	12	~2017
112675267163	225350534327	12	~2017
112679167217	901433337737	12	~2019

Exponent	Prime Factor	Dig.	Year
112679453423	225358906847	12	~2017
112679538479	225359076959	12	~2017
112682197583	225364395167	12	~2017
112682961371	5611...762759	14	2023
112684671839	225369343679	12	~2017
112687480319	225374960639	12	~2017
112697050007	901576400057	12	~2019
112697814059	225395628119	12	~2017
112698264863	225396529727	12	~2017
112709986223	225419972447	12	~2017
112713405197	901707241577	12	~2019
112716959339	225433918679	12	~2017
112720574783	225441149567	12	~2017
112722455519	225444911039	12	~2017
112722518399	225445036799	12	~2017
112726227791	225452455583	12	~2017
112734397943	225468795887	12	~2017
112742730697	676456384183	12	~2019
112743201743	225486403487	12	~2017
112748165771	901985326169	12	~2019
112749177839	225498355679	12	~2017
112757079131	225514158263	12	~2017
112764737831	902117902649	12	~2019
112766841311	225533682623	12	~2017
112767101939	225534203879	12	~2017

Exponent	Prime Factor	Dig.	Year
112775150051	225550300103	12	~2017
112778154371	225556308743	12	~2017
112780614833	2323...655599	14	2024
112787159777	676722958663	12	~2019
112801081031	225602162063	12	~2017
112805113873	676830683239	12	~2019
112805558471	225611116943	12	~2017
112806464399	225612928799	12	~2017
112810080371	225620160743	12	~2017
112814422859	225628845719	12	~2017
112815116399	225630232799	12	~2017
112819745039	225639490079	12	~2017
112821157451	225642314903	12	~2017
112828281959	902626255673	12	~2019
112829671403	225659342807	12	~2017
112833926819	225667853639	12	~2017
112836137411	225672274823	12	~2017
112848231719	225696463439	12	~2017
112864977671	225729955343	12	~2017
112870941563	225741883127	12	~2017
112872686099	225745372199	12	~2017
112874223743	225748447487	12	~2017
112876370111	225752740223	12	~2017
112879335203	225758670407	12	~2017
112879423271	225758846543	12	~2017

Exponent	Prime Factor	Dig.	Year
112880096663	225760193327	12	~2017
112881095753	677286574519	12	~2019
112882492871	903059942969	12	~2019
112886466683	225772933367	12	~2017
112887226019	225774452039	12	~2017
112896832679	225793665359	12	~2017
112896862721	677381176327	12	~2019
112904925431	225809850863	12	~2017
112911879491	225823758983	12	~2017
112913272163	225826544327	12	~2017
112917786887	2529...262689	14	2024
112918038011	225836076023	12	~2017
112919782033	677518692199	12	~2019
112919994059	225839988119	12	~2017
112926121661	903408973289	12	~2019
112926967883	225853935767	12	~2017
112929905339	225859810679	12	~2017
112930610519	225861221039	12	~2017
112931708497	677590250983	12	~2019
112938399659	225876799319	12	~2017
112938458579	225876917159	12	~2017
112940986391	225881972783	12	~2017
112946114219	225892228439	12	~2017
112947449291	225894898583	12	~2017
112953868919	1174...367577	14	2024

5.546.121 digits

26-05-03