Small Mersenne Prime Factors (page 4903/5025)

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
169643637743	339287275487	12	~2019
169645625711	339291251423	12	~2019
169662140111	339324280223	12	~2019
169663936031	339327872063	12	~2019
169682566331	339365132663	12	~2019
169711083803	339422167607	12	~2019
169717950023	339435900047	12	~2019
169749106931	339498213863	12	~2019
169763714363	339527428727	12	~2019
169770849959	339541699919	12	~2019
169790077559	339580155119	12	~2019
169798025339	339596050679	12	~2019
169805033423	339610066847	12	~2019
169817107571	339634215143	12	~2019
169824833939	339649667879	12	~2019
169836979079	339673958159	12	~2019
169839026471	339678052943	12	~2019
169840896143	339681792287	12	~2019
169850082371	339700164743	12	~2019
169863804983	339727609967	12	~2019
169875640859	339751281719	12	~2019
169888117979	339776235959	12	~2019
169893871883	339787743767	12	~2019
169901767811	339803535623	12	~2019
169904812331	339809624663	12	~2019

Exponent	Prime Factor	Dig.	Year
169909474661	3398...932201	14	2024
169911286763	339822573527	12	~2019
169911526703	339823053407	12	~2019
169913328251	339826656503	12	~2019
169915702571	339831405143	12	~2019
169928291783	339856583567	12	~2019
169956071111	339912142223	12	~2019
169957659779	339915319559	12	~2019
169966672691	339933345383	12	~2019
169968339683	339936679367	12	~2019
169970300999	339940601999	12	~2019
169971569051	339943138103	12	~2019
170004019799	340008039599	12	~2019
170014616819	340029233639	12	~2019
170028515333	4998...507903	14	2025
170040205451	340080410903	12	~2019
170046372299	340092744599	12	~2019
170048325119	340096650239	12	~2019
170093671271	2891...116071	14	2024
170104263419	340208526839	12	~2019
170107797011	340215594023	12	~2019
170129472983	340258945967	12	~2019
170141514671	340283029343	12	~2019
170155784531	340311569063	12	~2019
170158980287	6534...430209	14	2023

Exponent	Prime Factor	Dig.	Year
170186938979	340373877959	12	~2019
170195972099	340391944199	12	~2019
170202736043	340405472087	12	~2019
170209323083	340418646167	12	~2019
170222919131	340445838263	12	~2019
170234855291	340469710583	12	~2019
170235522851	340471045703	12	~2019
170242601183	340485202367	12	~2019
170250667043	340501334087	12	~2019
170272643819	340545287639	12	~2019
170285321159	340570642319	12	~2019
170288108339	340576216679	12	~2019
170291183221	2857...444839	15	2025
170302739471	340605478943	12	~2019
170304758531	340609517063	12	~2019
170305418219	340610836439	12	~2019
170333403899	340666807799	12	~2019
170341802903	340683605807	12	~2019
170344615079	340689230159	12	~2019
170350805783	340701611567	12	~2019
170362660739	340725321479	12	~2019
170389365551	340778731103	12	~2019
170401626371	340803252743	12	~2019
170407488539	340814977079	12	~2019
170410966283	340821932567	12	~2019

Exponent	Prime Factor	Dig.	Year
170412363983	340824727967	12	~2019
170430155459	340860310919	12	~2019
170456704343	340913408687	12	~2019
170488296479	340976592959	12	~2019
170513191619	341026383239	12	~2019
170548946663	341097893327	12	~2019
170568255503	341136511007	12	~2019
170593769639	341187539279	12	~2019
170620016603	341240033207	12	~2019
170631503291	341263006583	12	~2019
170637670403	341275340807	12	~2019
170642236703	341284473407	12	~2019
170654677691	341309355383	12	~2019
170664700883	341329401767	12	~2019
170667104903	341334209807	12	~2019
170670325739	341340651479	12	~2019
170684515643	341369031287	12	~2019
170722397591	341444795183	12	~2019
170729918483	341459836967	12	~2019
170737206179	341474412359	12	~2019
170740681019	341481362039	12	~2019
170771119891	3176...299727	14	2024
170781733211	341563466423	12	~2019
170789765879	8095...026647	14	2023
170792832157	3552...088657	14	2024

4.724.182 digits

25-04-13