Small Mersenne Prime Factors (page 5046/5340)

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
79450973711	158901947423	12	~2016
79455239377	476731436263	12	~2017
79467124091	158934248183	12	~2016
79467852071	158935704143	12	~2016
79475779337	635806234697	12	~2018
79481053699	794810536991	12	~2018
79487286191	1907...685841	14	2024
79488734879	158977469759	12	~2016
79498866431	158997732863	12	~2016
79500034199	159000068399	12	~2016
79513404671	159026809343	12	~2016
79513551671	159027103343	12	~2016
79513721171	636109769369	12	~2018
79514358479	636114867833	12	~2018
79523666363	159047332727	12	~2016
79524892417	477149354503	12	~2017
79528707851	159057415703	12	~2016
79532356583	159064713167	12	~2016
79539078191	159078156383	12	~2016
79539506243	159079012487	12	~2016
79540024199	159080048399	12	~2016
79544774759	159089549519	12	~2016
79548391999	795483919991	12	~2018
79548433337	636387466697	12	~2018
79553455957	477320735743	12	~2017

Exponent	Prime Factor	Dig.	Year
79557559703	159115119407	12	~2016
79559047811	159118095623	12	~2016
79566249941	636529999529	12	~2018
79570590791	159141181583	12	~2016
79571047553	477426285319	12	~2017
79579837763	159159675527	12	~2016
79581901163	159163802327	12	~2016
79581926051	159163852103	12	~2016
79583340491	159166680983	12	~2016
79584866759	159169733519	12	~2016
79585331531	159170663063	12	~2016
79592380823	159184761647	12	~2016
79597464059	159194928119	12	~2016
79598562601	477591375607	12	~2017
79601974631	159203949263	12	~2016
79602104287	796021042871	12	~2018
79604259239	159208518479	12	~2016
79606100603	159212201207	12	~2016
79606638179	159213276359	12	~2016
79613461079	636907688633	12	~2018
79625664383	159251328767	12	~2016
79629264023	159258528047	12	~2016
79632920579	159265841159	12	~2016
79633614719	159267229439	12	~2016
79634004503	159268009007	12	~2016

Exponent	Prime Factor	Dig.	Year
79634446091	159268892183	12	~2016
79639204031	159278408063	12	~2016
79653300137	477919800823	12	~2017
79664965091	159329930183	12	~2016
79669614179	159339228359	12	~2016
79673618663	159347237327	12	~2016
79681575637	478089453823	12	~2017
79682718539	159365437079	12	~2016
79682835839	637462686713	12	~2018
79683049811	159366099623	12	~2016
79685030543	159370061087	12	~2016
79687191383	159374382767	12	~2016
79689490589	5402...619343	14	2023
79689930623	159379861247	12	~2016
79690853647	796908536471	12	~2018
79699033699	796990336991	12	~2018
79703655817	478221934903	12	~2017
79714846583	159429693167	12	~2016
79717250113	478303500679	12	~2017
79717698721	478306192327	12	~2017
79730315939	637842527513	12	~2018
79730928611	159461857223	12	~2016
79732040639	159464081279	12	~2016
79733831363	159467662727	12	~2016
79733975039	159467950079	12	~2016

Exponent	Prime Factor	Dig.	Year
79735776221	478414657327	12	~2017
79736710643	159473421287	12	~2016
79738296191	159476592383	12	~2016
79738502741	637908021929	12	~2018
79741890257	637935122057	12	~2018
79742833613	478457001679	12	~2017
79756689191	159513378383	12	~2016
79757377559	159514755119	12	~2016
79759268957	638074151657	12	~2018
79759631131	797596311311	12	~2018
79763225351	159526450703	12	~2016
79764230363	159528460727	12	~2016
79765321057	478591926343	12	~2017
79768959923	159537919847	12	~2016
79773131351	159546262703	12	~2016
79773162083	159546324167	12	~2016
79775778899	159551557799	12	~2016
79776634523	159553269047	12	~2016
79783180241	478699081447	12	~2017
79783381177	478700287063	12	~2017
79784278823	159568557647	12	~2016
79784602091	159569204183	12	~2016
79786538411	159573076823	12	~2016
79792946951	159585893903	12	~2016
79793146799	159586293599	12	~2016

5.037.460 digits

25-09-07