Small Mersenne Prime Factors (page 5046/5235)

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
124498342679	248996685359	12	~2018
124509028043	249018056087	12	~2018
124510890083	249021780167	12	~2018
124531931099	249063862199	12	~2018
124560115153	747360690919	12	~2019
124561672019	249123344039	12	~2018
124577176511	249154353023	12	~2018
124583676383	249167352767	12	~2018
124587160199	249174320399	12	~2018
124587834551	249175669103	12	~2018
124591434059	249182868119	12	~2018
124594099919	249188199839	12	~2018
124594187831	249188375663	12	~2018
124594589333	747567535999	12	~2019
124608711719	249217423439	12	~2018
124617253933	747703523599	12	~2019
124631971631	249263943263	12	~2018
124632793331	249265586663	12	~2018
124650439943	249300879887	12	~2018
124656619511	249313239023	12	~2018
124673966723	249347933447	12	~2018
124692606491	249385212983	12	~2018
124716745691	249433491383	12	~2018
124717877939	249435755879	12	~2018
124721211353	748327268119	12	~2019

Exponent	Prime Factor	Dig.	Year
124730404163	249460808327	12	~2018
124734546263	249469092527	12	~2018
124754885159	249509770319	12	~2018
124774050581	748644303487	12	~2019
124778022623	249556045247	12	~2018
124778245391	249556490783	12	~2018
124792250699	249584501399	12	~2018
124827303983	249654607967	12	~2018
124837658051	249675316103	12	~2018
124846299191	249692598383	12	~2018
124855622939	249711245879	12	~2018
124857114359	249714228719	12	~2018
124858178891	249716357783	12	~2018
124864711871	249729423743	12	~2018
124869949331	249739898663	12	~2018
124872403511	249744807023	12	~2018
124873742183	249747484367	12	~2018
124878744323	249757488647	12	~2018
124892108543	249784217087	12	~2018
124893569407	6819...896223	14	2025
124907203139	249814406279	12	~2018
124920238249	1146...712583	15	2025
124921726019	249843452039	12	~2018
124923034919	249846069839	12	~2018
124924484999	249848969999	12	~2018

Exponent	Prime Factor	Dig.	Year
124930476119	249860952239	12	~2018
124935382619	249870765239	12	~2018
124947885323	249895770647	12	~2018
124973152571	249946305143	12	~2018
124976905019	249953810039	12	~2018
124995904897	749975429383	12	~2019
125004207301	5075...164207	14	2023
125011613099	250023226199	12	~2018
125021963459	250043926919	12	~2018
125025870551	250051741103	12	~2018
125029311971	250058623943	12	~2018
125030086523	250060173047	12	~2018
125033523817	750201142903	12	~2019
125039643959	250079287919	12	~2018
125044556783	250089113567	12	~2018
125059864511	250119729023	12	~2018
125066855363	250133710727	12	~2018
125067764891	250135529783	12	~2018
125069115791	250138231583	12	~2018
125072032439	250144064879	12	~2018
125072626331	250145252663	12	~2018
125082167159	250164334319	12	~2018
125087072339	250174144679	12	~2018
125089767469	1100...372721	15	2024
125102678231	250205356463	12	~2018

Exponent	Prime Factor	Dig.	Year
125103514883	250207029767	12	~2018
125118324119	250236648239	12	~2018
125120107811	250240215623	12	~2018
125124066563	250248133127	12	~2018
125127827579	250255655159	12	~2018
125136252551	250272505103	12	~2018
125140973183	250281946367	12	~2018
125165758163	250331516327	12	~2018
125169256379	250338512759	12	~2018
125169975839	250339951679	12	~2018
125170426919	250340853839	12	~2018
125173490159	250346980319	12	~2018
125177193299	250354386599	12	~2018
125182143503	250364287007	12	~2018
125192414111	250384828223	12	~2018
125212095479	250424190959	12	~2018
125228380943	250456761887	12	~2018
125240760863	250481521727	12	~2018
125256812111	250513624223	12	~2018
125260583351	250521166703	12	~2018
125263674383	250527348767	12	~2018
125271280691	250542561383	12	~2018
125284343279	250568686559	12	~2018
125289810539	250579621079	12	~2018
125300012231	250600024463	12	~2018

4.933.056 digits

25-07-20