Small Mersenne Prime Factors (page 4975/5190)

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
106464389639	212928779279	12	~2017
106484641331	212969282663	12	~2017
106497033491	212994066983	12	~2017
106530281783	213060563567	12	~2017
106531689839	213063379679	12	~2017
106537807643	2039...828703	15	2023
106547249531	213094499063	12	~2017
106557343439	213114686879	12	~2017
106558270319	213116540639	12	~2017
106562093003	213124186007	12	~2017
106577900171	213155800343	12	~2017
106588210199	213176420399	12	~2017
106589520593	639537123559	12	~2018
106589945639	213179891279	12	~2017
106595230523	213190461047	12	~2017
106599863159	213199726319	12	~2017
106603036019	213206072039	12	~2017
106608297371	213216594743	12	~2017
106609657991	213219315983	12	~2017
106610032513	639660195079	12	~2018
106635891731	213271783463	12	~2017
106639635779	213279271559	12	~2017
106640221091	213280442183	12	~2017
106640730773	639844384639	12	~2018
106640939291	213281878583	12	~2017

Exponent	Prime Factor	Dig.	Year
106654916161	639929496967	12	~2018
106657328171	7359...437991	14	2024
106662824399	213325648799	12	~2017
106664622611	213329245223	12	~2017
106664875319	213329750639	12	~2017
106666720313	640000321879	12	~2018
106690902517	640145415103	12	~2018
106692009251	213384018503	12	~2017
106693404241	640160425447	12	~2018
106698800723	213397601447	12	~2017
106703026511	213406053023	12	~2017
106704434423	213408868847	12	~2017
106713228263	213426456527	12	~2017
106713417539	213426835079	12	~2017
106719202697	640315216183	12	~2018
106721011393	640326068359	12	~2018
106740573239	213481146479	12	~2017
106753349831	213506699663	12	~2017
106755465779	3330...323049	14	2024
106767436151	213534872303	12	~2017
106778016473	640668098839	12	~2018
106781405693	640688434159	12	~2018
106782682271	213565364543	12	~2017
106785404639	213570809279	12	~2017
106789180271	213578360543	12	~2017

Exponent	Prime Factor	Dig.	Year
106790318231	213580636463	12	~2017
106794652259	213589304519	12	~2017
106796530091	213593060183	12	~2017
106797161291	213594322583	12	~2017
106807882799	213615765599	12	~2017
106815767231	213631534463	12	~2017
106825808711	213651617423	12	~2017
106838776211	213677552423	12	~2017
106847454713	641084728279	12	~2018
106860566531	213721133063	12	~2017
106861707983	213723415967	12	~2017
106865478191	2586...722223	14	2024
106871869763	213743739527	12	~2017
106875537731	213751075463	12	~2017
106885911311	213771822623	12	~2017
106892146583	213784293167	12	~2017
106898195483	213796390967	12	~2017
106900051631	213800103263	12	~2017
106901051063	213802102127	12	~2017
106901332523	213802665047	12	~2017
106911665351	213823330703	12	~2017
106927086911	213854173823	12	~2017
106940244263	213880488527	12	~2017
106942357631	1206...407769	15	2025
106950778943	213901557887	12	~2017

Exponent	Prime Factor	Dig.	Year
106960294643	213920589287	12	~2017
106965686771	213931373543	12	~2017
106986536759	213973073519	12	~2017
106991574311	213983148623	12	~2017
106998179521	641989077127	12	~2018
107010619403	214021238807	12	~2017
107017397423	214034794847	12	~2017
107021392763	214042785527	12	~2017
107023089839	214046179679	12	~2017
107028242063	214056484127	12	~2017
107029561057	642177366343	12	~2018
107029896119	214059792239	12	~2017
107030250143	214060500287	12	~2017
107047781977	642286691863	12	~2018
107048856757	642293140543	12	~2018
107050647239	214101294479	12	~2017
107052234389	2397...503137	14	2024
107069136533	642414819199	12	~2018
107069556239	214139112479	12	~2017
107073884843	214147769687	12	~2017
107074671709	1520...382679	14	2024
107078312843	214156625687	12	~2017
107080794851	214161589703	12	~2017
107081128751	214162257503	12	~2017
107083983179	214167966359	12	~2017

4.888.230 digits

25-06-29