Small Mersenne Prime Factors (page 4774/5025)

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
81971941151	163943882303	12	~2016
81972307561	491833845367	12	~2017
81973602563	163947205127	12	~2016
81973677431	163947354863	12	~2016
81978936649	2164...275337	14	2023
81986215691	163972431383	12	~2016
81989241923	163978483847	12	~2016
81989526719	163979053439	12	~2016
81994692599	163989385199	12	~2016
81998076311	163996152623	12	~2016
82001621363	164003242727	12	~2016
82002763163	164005526327	12	~2016
82004869679	656038957433	12	~2018
82008099163	1508...245993	14	2024
82014432167	656115457337	12	~2018
82014650603	164029301207	12	~2016
82020084323	164040168647	12	~2016
82021722851	164043445703	12	~2016
82023750383	164047500767	12	~2016
82034131481	656273051849	12	~2018
82035120731	164070241463	12	~2016
82035304679	164070609359	12	~2016
82040259083	164080518167	12	~2016
82041907019	164083814039	12	~2016
82045144211	164090288423	12	~2016

Exponent	Prime Factor	Dig.	Year
82045980251	164091960503	12	~2016
82050653879	164101307759	12	~2016
82052056739	164104113479	12	~2016
82058077043	164116154087	12	~2016
82058403191	656467225529	12	~2018
82059998051	656479984409	12	~2018
82071490031	164142980063	12	~2016
82071574043	164143148087	12	~2016
82074584159	164149168319	12	~2016
82077016751	164154033503	12	~2016
82078331399	164156662799	12	~2016
82080202079	164160404159	12	~2016
82087100171	164174200343	12	~2016
82088941463	164177882927	12	~2016
82097946121	492587676727	12	~2017
82107337619	164214675239	12	~2016
82109932559	164219865119	12	~2016
82113454679	164226909359	12	~2016
82120431023	164240862047	12	~2016
82121466197	656971729577	12	~2018
82121937217	492731623303	12	~2017
82128408961	492770453767	12	~2017
82129497503	164258995007	12	~2016
82132048967	657056391737	12	~2018
82135977383	164271954767	12	~2016

Exponent	Prime Factor	Dig.	Year
82146168959	164292337919	12	~2016
82148751299	164297502599	12	~2016
82155939059	164311878119	12	~2016
82163009303	164326018607	12	~2016
82164858299	164329716599	12	~2016
82180791793	493084750759	12	~2017
82180929731	164361859463	12	~2016
82182282131	164364564263	12	~2016
82183972433	493103834599	12	~2017
82184139239	164368278479	12	~2016
82186550723	164373101447	12	~2016
82187286383	164374572767	12	~2016
82189845299	164379690599	12	~2016
82198464839	164396929679	12	~2016
82202633759	164405267519	12	~2016
82210406651	164420813303	12	~2016
82212349033	493274094199	12	~2017
82230182759	164460365519	12	~2016
82245546983	164491093967	12	~2016
82248744359	164497488719	12	~2016
82251371159	164502742319	12	~2016
82259801381	658078411049	12	~2018
82263215123	164526430247	12	~2016
82266365543	164532731087	12	~2016
82271770681	493630624087	12	~2017

Exponent	Prime Factor	Dig.	Year
82284356521	493706139127	12	~2017
82286479199	164572958399	12	~2016
82289418311	164578836623	12	~2016
82289549411	164579098823	12	~2016
82295001731	164590003463	12	~2016
82297365131	164594730263	12	~2016
82299548843	164599097687	12	~2016
82315864333	493895185999	12	~2017
82316281199	164632562399	12	~2016
82320856619	164641713239	12	~2016
82321682939	164643365879	12	~2016
82322202701	658577621609	12	~2018
82324304663	164648609327	12	~2016
82332188651	164664377303	12	~2016
82335011399	164670022799	12	~2016
82336781459	164673562919	12	~2016
82341396779	164682793559	12	~2016
82349834573	494099007439	12	~2017
82350617339	164701234679	12	~2016
82356552731	164713105463	12	~2016
82359918413	494159510479	12	~2017
82360314713	494161888279	12	~2017
82362103619	164724207239	12	~2016
82362354509	658898836073	12	~2018
82369680671	164739361343	12	~2016

4.724.182 digits

25-04-13