Small Mersenne Prime Factors (page 4710/5025)

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
60837700691	121675401383	12	~2015
60838946939	121677893879	12	~2015
60839950679	121679901359	12	~2015
60840106259	121680212519	12	~2015
60844049219	121688098439	12	~2015
60848382851	121696765703	12	~2015
60850476377	486803811017	12	~2017
60854093099	121708186199	12	~2015
60859459211	121718918423	12	~2015
60865351331	121730702663	12	~2015
60869873423	121739746847	12	~2015
60870529763	121741059527	12	~2015
60878031191	121756062383	12	~2015
60878141557	365268849343	12	~2016
60878708117	365272248703	12	~2016
60880988297	365285929783	12	~2016
60881315531	121762631063	12	~2015
60881380379	121762760759	12	~2015
60881859971	121763719943	12	~2015
60887091247	608870912471	12	~2017
60888606341	365331638047	12	~2016
60890464571	121780929143	12	~2015
60897959483	121795918967	12	~2015
60900020339	121800040679	12	~2015
60904227959	121808455919	12	~2015

Exponent	Prime Factor	Dig.	Year
60907499123	121814998247	12	~2015
60916388003	121832776007	12	~2015
60916399751	121832799503	12	~2015
60917767331	121835534663	12	~2015
60921668257	365530009543	12	~2016
60923583551	121847167103	12	~2015
60923748299	121847496599	12	~2015
60927060251	121854120503	12	~2015
60928619933	1758...126639	15	2024
60929723219	121859446439	12	~2015
60930804299	121861608599	12	~2015
60943815923	121887631847	12	~2015
60945424811	121890849623	12	~2015
60948787661	365692725967	12	~2016
60949273991	121898547983	12	~2015
60952335791	121904671583	12	~2015
60961592291	121923184583	12	~2015
60967449899	121934899799	12	~2015
60967502231	121935004463	12	~2015
60969063983	121938127967	12	~2015
60969290497	3017...960151	15	2023
60971080217	365826481303	12	~2016
60973540403	121947080807	12	~2015
60975442211	121950884423	12	~2015
60976078451	121952156903	12	~2015

Exponent	Prime Factor	Dig.	Year
60985936841	365915621047	12	~2016
60986043241	3646...858119	14	2023
60992054339	121984108679	12	~2015
60993423719	121986847439	12	~2015
60994041431	121988082863	12	~2015
60995885939	487967087513	12	~2017
60998123603	121996247207	12	~2015
60999443003	121998886007	12	~2015
61000374923	122000749847	12	~2015
61004355967	1525...991751	14	2024
61006550051	122013100103	12	~2015
61009959119	122019918239	12	~2015
61010768711	122021537423	12	~2015
61012628003	122025256007	12	~2015
61012870199	122025740399	12	~2015
61016129939	122032259879	12	~2015
61020995543	122041991087	12	~2015
61026062879	122052125759	12	~2015
61027203851	122054407703	12	~2015
61028048363	122056096727	12	~2015
61031248163	122062496327	12	~2015
61031764331	122063528663	12	~2015
61032647171	122065294343	12	~2015
61040416813	366242500879	12	~2016
61041905759	122083811519	12	~2015

Exponent	Prime Factor	Dig.	Year
61044146593	366264879559	12	~2016
61047457403	122094914807	12	~2015
61047816491	122095632983	12	~2015
61049777903	122099555807	12	~2015
61050990239	122101980479	12	~2015
61053174551	122106349103	12	~2015
61056311891	122112623783	12	~2015
61061465579	122122931159	12	~2015
61064026343	122128052687	12	~2015
61065091271	122130182543	12	~2015
61073197511	122146395023	12	~2015
61075045037	366450270223	12	~2016
61075071557	366450429343	12	~2016
61083702539	122167405079	12	~2015
61086379961	488691039689	12	~2017
61089211811	122178423623	12	~2015
61089685009	1871...867577	15	2023
61097790359	122195580719	12	~2015
61100091659	122200183319	12	~2015
61100639651	122201279303	12	~2015
61103753411	122207506823	12	~2015
61109205851	122218411703	12	~2015
61110091501	366660549007	12	~2016
61110509123	122221018247	12	~2015
61118612591	122237225183	12	~2015

4.724.182 digits

25-04-13