Small Mersenne Prime Factors (page 4519/5070)

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
23433802823	46867605647	11	~2012
23433933851	46867867703	11	~2012
23435049719	46870099439	11	~2012
23435074499	46870148999	11	~2012
23435669759	46871339519	11	~2012
23437885631	46875771263	11	~2012
23438164273	140628985639	12	~2013
23438727419	46877454839	11	~2012
23440089779	46880179559	11	~2012
23440477451	46880954903	11	~2012
23440760279	46881520559	11	~2012
23440851937	140645111623	12	~2013
23440935923	46881871847	11	~2012
23442143951	46884287903	11	~2012
23442867923	46885735847	11	~2012
23444287931	46888575863	11	~2012
23445052601	140670315607	12	~2013
23447489407	422054809327	12	~2014
23447566529	187580532233	12	~2013
23448226801	140689360807	12	~2013
23448691837	140692151023	12	~2013
23450783669	187606269353	12	~2013
23450821679	187606573433	12	~2013
23451607583	46903215167	11	~2012
23451609479	46903218959	11	~2012

Exponent	Prime Factor	Dig.	Year
23452287401	140713724407	12	~2013
23452571273	140715427639	12	~2013
23454085439	46908170879	11	~2012
23456703749	2228...561551	14	2024
23458693943	46917387887	11	~2012
23464209911	46928419823	11	~2012
23464253063	46928506127	11	~2012
23464841429	563156194297	12	~2015
23464917491	46929834983	11	~2012
23465860991	46931721983	11	~2012
23465895559	234658955591	12	~2014
23466126419	46932252839	11	~2012
23466694763	46933389527	11	~2012
23467518491	46935036983	11	~2012
23468374739	46936749479	11	~2012
23469164903	46938329807	11	~2012
23469936883	563278485193	12	~2015
23471327003	46942654007	11	~2012
23473112699	46946225399	11	~2012
23473248377	187785987017	12	~2013
23474148083	46948296167	11	~2012
23474373731	46948747463	11	~2012
23474686901	751189980833	12	~2015
23475460511	46950921023	11	~2012
23475825599	46951651199	11	~2012

Exponent	Prime Factor	Dig.	Year
23477204039	46954408079	11	~2012
23478234943	375651759089	12	~2014
23479046639	46958093279	11	~2012
23480712863	46961425727	11	~2012
23481527963	46963055927	11	~2012
23482585523	46965171047	11	~2012
23482702301	140896213807	12	~2013
23482946897	187863575177	12	~2013
23483002859	46966005719	11	~2012
23483364059	46966728119	11	~2012
23486285203	234862852031	12	~2014
23487888821	140927332927	12	~2013
23487931319	46975862639	11	~2012
23491033679	46982067359	11	~2012
23491577783	46983155567	11	~2012
23492746883	46985493767	11	~2012
23492966053	140957796319	12	~2013
23493204809	187945638473	12	~2013
23493448697	563842768729	12	~2015
23494272779	46988545559	11	~2012
23494529483	46989058967	11	~2012
23495289347	187962314777	12	~2013
23495513351	46991026703	11	~2012
23495944931	46991889863	11	~2012
23496159257	140976955543	12	~2013

Exponent	Prime Factor	Dig.	Year
23496162797	187969302377	12	~2013
23499927791	46999855583	11	~2012
23500241939	47000483879	11	~2012
23500768139	47001536279	11	~2012
23500783259	47001566519	11	~2012
23500983059	47001966119	11	~2012
23501969531	188015756249	12	~2013
23503194191	47006388383	11	~2012
23503722659	47007445319	11	~2012
23504230657	141025383943	12	~2013
23505404579	47010809159	11	~2012
23506073099	47012146199	11	~2012
23506227119	47012454239	11	~2012
23507443259	47014886519	11	~2012
23507561459	47015122919	11	~2012
23508137903	47016275807	11	~2012
23508842099	47017684199	11	~2012
23508853031	47017706063	11	~2012
23509665797	141057994783	12	~2013
23509925051	47019850103	11	~2012
23510337503	47020675007	11	~2012
23511996083	47023992167	11	~2012
23512301341	141073808047	12	~2013
23512510211	47025020423	11	~2012
23512880459	47025760919	11	~2012

4.768.925 digits

25-05-04