Small Mersenne Prime Factors (page 5489/5670)

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
157917249911	315834499823	12	~2019
157917971759	315835943519	12	~2019
157990164119	315980328239	12	~2019
157997993963	315995987927	12	~2019
158026385603	316052771207	12	~2019
158036944931	316073889863	12	~2019
158047841639	316095683279	12	~2019
158063602199	316127204399	12	~2019
158070024323	316140048647	12	~2019
158072158031	316144316063	12	~2019
158072575103	316145150207	12	~2019
158073671303	316147342607	12	~2019
158089308743	316178617487	12	~2019
158097019103	316194038207	12	~2019
158102510651	316205021303	12	~2019
158116760999	316233521999	12	~2019
158121087419	316242174839	12	~2019
158122807691	316245615383	12	~2019
158123180399	316246360799	12	~2019
158127942779	316255885559	12	~2019
158137316423	316274632847	12	~2019
158144587871	316289175743	12	~2019
158155237391	316310474783	12	~2019
158159491643	316318983287	12	~2019
158159607323	316319214647	12	~2019

Exponent	Prime Factor	Dig.	Year
158176563431	316353126863	12	~2019
158177580131	316355160263	12	~2019
158178859511	316357719023	12	~2019
158187309239	316374618479	12	~2019
158187762371	316375524743	12	~2019
158198510831	316397021663	12	~2019
158206919303	316413838607	12	~2019
158234444243	316468888487	12	~2019
158245336283	316490672567	12	~2019
158257189967	6456...506537	14	2024
158274496631	316548993263	12	~2019
158307729731	316615459463	12	~2019
158311332299	316622664599	12	~2019
158320009091	316640018183	12	~2019
158326598351	316653196703	12	~2019
158327126759	316654253519	12	~2019
158361386303	316722772607	12	~2019
158367066551	316734133103	12	~2019
158369696651	316739393303	12	~2019
158372010323	316744020647	12	~2019
158387107603	2914...798953	14	2024
158391011099	316782022199	12	~2019
158393319083	316786638167	12	~2019
158400636743	316801273487	12	~2019
158405028191	316810056383	12	~2019

Exponent	Prime Factor	Dig.	Year
158408941631	1752...443887	15	2023
158411848811	316823697623	12	~2019
158416172471	316832344943	12	~2019
158425238819	316850477639	12	~2019
158426732771	316853465543	12	~2019
158431972619	316863945239	12	~2019
158439371171	316878742343	12	~2019
158448191651	316896383303	12	~2019
158448494003	316896988007	12	~2019
158463189743	316926379487	12	~2019
158464826251	3042...640193	14	2024
158500303211	317000606423	12	~2019
158522887403	317045774807	12	~2019
158528647031	317057294063	12	~2019
158538867671	317077735343	12	~2019
158539522931	317079045863	12	~2019
158540854517	1087...198663	15	2023
158552439119	317104878239	12	~2019
158569798619	317139597239	12	~2019
158577286391	317154572783	12	~2019
158578599251	317157198503	12	~2019
158582420291	317164840583	12	~2019
158588431931	317176863863	12	~2019
158595527159	317191054319	12	~2019
158598240719	317196481439	12	~2019

Exponent	Prime Factor	Dig.	Year
158605224443	317210448887	12	~2019
158608937159	2664...442713	14	2024
158611999691	317223999383	12	~2019
158638672163	317277344327	12	~2019
158651050403	317302100807	12	~2019
158652993409	8249...572681	14	2025
158661329999	317322659999	12	~2019
158662146109	4823...417137	14	2024
158667643331	317335286663	12	~2019
158678595599	317357191199	12	~2019
158679474659	317358949319	12	~2019
158679813979	2161...639399	15	2024
158694398783	317388797567	12	~2019
158705235131	317410470263	12	~2019
158712149231	317424298463	12	~2019
158713794983	317427589967	12	~2019
158714988011	317429976023	12	~2019
158720139899	317440279799	12	~2019
158731108979	317462217959	12	~2019
158733516971	317467033943	12	~2019
158745122411	317490244823	12	~2019
158749414139	317498828279	12	~2019
158773546871	1247...840607	15	2023
158774447543	317548895087	12	~2019
158781755771	317563511543	12	~2019

5.366.787 digits

26-02-08