Small Mersenne Prime Factors (page 5442/5445)

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
419504476271	839008952543	12	~2022
419511124523	839022249047	12	~2022
419548004483	839096008967	12	~2022
419628128651	839256257303	12	~2022
419646277763	839292555527	12	~2022
419674622903	839349245807	12	~2022
419795607191	839591214383	12	~2022
419818155623	839636311247	12	~2022
419822688419	839645376839	12	~2022
419887981871	839775963743	12	~2022
419899046783	839798093567	12	~2022
419899863959	839799727919	12	~2022
419906391617	8314...540167	14	2025
419913649139	839827298279	12	~2022
419934097211	839868194423	12	~2022
419955628091	839911256183	12	~2022
419957426243	839914852487	12	~2022
419984457143	839968914287	12	~2022
420009985403	840019970807	12	~2022
420028957511	840057915023	12	~2022
420042889919	840085779839	12	~2022
420046685483	840093370967	12	~2022
420065060339	840130120679	12	~2022
420119225423	840238450847	12	~2022
420177309143	840354618287	12	~2022

Exponent	Prime Factor	Dig.	Year
420210979379	840421958759	12	~2022
420214887623	840429775247	12	~2022
420216443351	840432886703	12	~2022
420290019911	840580039823	12	~2022
420402236591	840804473183	12	~2022
420427682723	840855365447	12	~2022
420427799107	7735...035689	14	2025
420552385811	841104771623	12	~2022
420564608363	841129216727	12	~2022
420564760019	841129520039	12	~2022
420577353719	841154707439	12	~2022
420642995411	841285990823	12	~2022
420647785763	841295571527	12	~2022
420655490947	1556...650391	15	2025
420718649383	4510...138577	15	2025
420751147391	841502294783	12	~2022
420775776419	6395...015689	14	2025
420780083519	841560167039	12	~2022
420818673133	9089...396729	14	2025
420822899831	841645799663	12	~2022
420832717271	841665434543	12	~2022
420840429677	9679...825711	14	2025
420858477503	841716955007	12	~2022
420882581831	841765163663	12	~2022
420921323923	6061...644913	14	2025

Exponent	Prime Factor	Dig.	Year
421010979131	842021958263	12	~2022
421024863911	842049727823	12	~2022
421046429099	842092858199	12	~2022
421048031843	842096063687	12	~2022
421055638331	842111276663	12	~2022
421058389319	6400...176489	14	2025
421176946031	842353892063	12	~2022
421187407079	842374814159	12	~2022
421187487923	842374975847	12	~2022
421239167879	842478335759	12	~2022
421320743579	842641487159	12	~2022
421344721991	842689443983	12	~2022
421351620659	842703241319	12	~2022
421389880679	842779761359	12	~2022
421397799071	842795598143	12	~2022
421398691331	842797382663	12	~2022
421403526191	842807052383	12	~2022
421423597499	842847194999	12	~2022
421430306021	1373...762847	15	2025
421454307023	842908614047	12	~2022
421461358751	842922717503	12	~2022
421479649463	842959298927	12	~2022
421480680311	842961360623	12	~2022
421520760659	843041521319	12	~2022
421532731979	843065463959	12	~2022

Exponent	Prime Factor	Dig.	Year
421558471409	8346...338983	14	2025
421672659563	843345319127	12	~2022
421672665731	843345331463	12	~2022
421688760659	843377521319	12	~2022
421697188147	7843...995343	14	2025
421705875659	843411751319	12	~2022
421706884811	843413769623	12	~2022
421761903551	843523807103	12	~2022
421763622179	843527244359	12	~2022
421889390519	843778781039	12	~2022
421912698611	843825397223	12	~2022
421917470651	843834941303	12	~2022
421945814219	843891628439	12	~2022
421952331023	843904662047	12	~2022
421954224623	843908449247	12	~2022
422006610023	844013220047	12	~2022
422096342243	844192684487	12	~2022
422152044299	844304088599	12	~2022
422164120561	3976...568463	15	2025
422274827099	844549654199	12	~2022
422290217351	844580434703	12	~2022
422311588883	844623177767	12	~2022
422313219719	844626439439	12	~2022
422346060299	844692120599	12	~2022
422403433097	3674...794391	15	2025

5.142.307 digits

25-10-26