Small Mersenne Prime Factors (page 4845/5235)

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
49456084961	395648679689	12	~2016
49458612389	395668899113	12	~2016
49460440583	98920881167	11	~2015
49462790537	296776743223	12	~2016
49466098751	98932197503	11	~2015
49467603959	98935207919	11	~2015
49469607851	98939215703	11	~2015
49474804331	98949608663	11	~2015
49476327779	98952655559	11	~2015
49476441251	98952882503	11	~2015
49477557203	98955114407	11	~2015
49478372291	98956744583	11	~2015
49481935319	98963870639	11	~2015
49483089011	98966178023	11	~2015
49484770403	98969540807	11	~2015
49486437719	98972875439	11	~2015
49491725183	98983450367	11	~2015
49496266643	98992533287	11	~2015
49497467039	98994934079	11	~2015
49500781283	99001562567	11	~2015
49501953497	396015627977	12	~2016
49502905097	297017430583	12	~2016
49503387491	99006774983	11	~2015
49504065791	99008131583	11	~2015
49507776427	792124422833	12	~2017

Exponent	Prime Factor	Dig.	Year
49509820319	99019640639	11	~2015
49510896503	99021793007	11	~2015
49516370879	2733...725209	14	2024
49518579283	3733...779383	14	2024
49524084059	99048168119	11	~2015
49526681219	99053362439	11	~2015
49527459911	99054919823	11	~2015
49527995123	99055990247	11	~2015
49528527959	99057055919	11	~2015
49530031151	99060062303	11	~2015
49530751799	99061503599	11	~2015
49532708591	99065417183	11	~2015
49532832539	99065665079	11	~2015
49534257599	99068515199	11	~2015
49535137331	99070274663	11	~2015
49535948183	99071896367	11	~2015
49536632597	396293060777	12	~2016
49537539659	99075079319	11	~2015
49537575683	99075151367	11	~2015
49540952819	99081905639	11	~2015
49543461251	99086922503	11	~2015
49545133691	99090267383	11	~2015
49547775191	99095550383	11	~2015
49550326577	297301959463	12	~2016
49550766851	99101533703	11	~2015

Exponent	Prime Factor	Dig.	Year
49552484279	99104968559	11	~2015
49555744151	99111488303	11	~2015
49555967459	99111934919	11	~2015
49557062111	99114124223	11	~2015
49558314671	99116629343	11	~2015
49559941643	99119883287	11	~2015
49561155719	99122311439	11	~2015
49562574827	396500598617	12	~2016
49562598191	99125196383	11	~2015
49564629173	297387775039	12	~2016
49566483103	495664831031	12	~2016
49568031743	99136063487	11	~2015
49569283691	99138567383	11	~2015
49575936533	694063111463	12	~2017
49577639543	99155279087	11	~2015
49577774843	99155549687	11	~2015
49580245859	99160491719	11	~2015
49580403011	99160806023	11	~2015
49582668719	396661349753	12	~2016
49583033497	297498200983	12	~2016
49584321623	99168643247	11	~2015
49584328991	99168657983	11	~2015
49589754479	99179508959	11	~2015
49590460061	297542760367	12	~2016
49594112363	99188224727	11	~2015

Exponent	Prime Factor	Dig.	Year
49597133699	99194267399	11	~2015
49599291359	99198582719	11	~2015
49599703451	99199406903	11	~2015
49602826139	99205652279	11	~2015
49604700611	99209401223	11	~2015
49604858903	99209717807	11	~2015
49604977607	396839820857	12	~2016
49606422269	8452...546377	14	2023
49612014097	297672084583	12	~2016
49613157491	99226314983	11	~2015
49615414031	99230828063	11	~2015
49615608989	396924871913	12	~2016
49618560143	99237120287	11	~2015
49622834231	99245668463	11	~2015
49624283833	297745702999	12	~2016
49625945903	99251891807	11	~2015
49629721051	496297210511	12	~2016
49629795863	99259591727	11	~2015
49630277563	794084441009	12	~2017
49635823619	99271647239	11	~2015
49639690267	496396902671	12	~2016
49641278399	99282556799	11	~2015
49641581243	99283162487	11	~2015
49642288499	99284576999	11	~2015
49643054399	99286108799	11	~2015

4.933.056 digits

25-07-20