Small Mersenne Prime Factors (page 4919/4980)

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
252101760731	504203521463	12	~2020
252126573719	504253147439	12	~2020
252129290579	504258581159	12	~2020
252153346019	504306692039	12	~2020
252161297519	504322595039	12	~2020
252189614531	504379229063	12	~2020
252210648971	504421297943	12	~2020
252228352979	504456705959	12	~2020
252229121411	504458242823	12	~2020
252251062307	1664...112263	14	2024
252265776551	504531553103	12	~2020
252310449551	504620899103	12	~2020
252333324539	504666649079	12	~2020
252335764451	504671528903	12	~2020
252369001799	504738003599	12	~2020
252380225711	504760451423	12	~2020
252419533643	504839067287	12	~2020
252420614111	504841228223	12	~2020
252426019679	504852039359	12	~2020
252465516431	504931032863	12	~2020
252472698851	504945397703	12	~2020
252481564451	504963128903	12	~2020
252491602403	504983204807	12	~2020
252506012063	1868...892663	14	2024
252522292343	505044584687	12	~2020

Exponent	Prime Factor	Dig.	Year
252611745623	505223491247	12	~2020
252665065043	505330130087	12	~2020
252665716049	1490...468911	15	2025
252681189779	505362379559	12	~2020
252686650103	505373300207	12	~2020
252740401079	505480802159	12	~2020
252746327831	505492655663	12	~2020
252752677763	505505355527	12	~2020
252778877999	505557755999	12	~2020
252788591351	505577182703	12	~2020
252801276671	505602553343	12	~2020
252841120043	505682240087	12	~2020
252851086919	505702173839	12	~2020
252855887351	505711774703	12	~2020
252859372379	505718744759	12	~2020
252861411191	505722822383	12	~2020
252870053963	505740107927	12	~2020
252894076751	505788153503	12	~2020
252907749431	505815498863	12	~2020
252917634311	505835268623	12	~2020
252938396099	505876792199	12	~2020
252955249139	505910498279	12	~2020
252965372171	505930744343	12	~2020
253003602563	506007205127	12	~2020
253021148903	506042297807	12	~2020

Exponent	Prime Factor	Dig.	Year
253038655871	506077311743	12	~2020
253044563279	506089126559	12	~2020
253055705999	506111411999	12	~2020
253100933699	506201867399	12	~2020
253115402003	506230804007	12	~2020
253117374743	506234749487	12	~2020
253149030899	506298061799	12	~2020
253155355031	506310710063	12	~2020
253264085363	506528170727	12	~2020
253267863059	506535726119	12	~2020
253269292093	2583...793487	14	2024
253275705593	2786...615231	14	2024
253321413083	506642826167	12	~2020
253333204739	506666409479	12	~2020
253335446603	506670893207	12	~2020
253352951963	506705903927	12	~2020
253369615607	2483...329487	14	2024
253373444543	506746889087	12	~2020
253379564939	506759129879	12	~2020
253392224003	506784448007	12	~2020
253417796903	506835593807	12	~2020
253423393523	506846787047	12	~2020
253473607031	506947214063	12	~2020
253476976559	506953953119	12	~2020
253500250271	507000500543	12	~2020

Exponent	Prime Factor	Dig.	Year
253533165239	507066330479	12	~2020
253536193199	507072386399	12	~2020
253552830491	507105660983	12	~2020
253586550131	507173100263	12	~2020
253592961179	507185922359	12	~2020
253595038883	507190077767	12	~2020
253633363019	507266726039	12	~2020
253638049237	3652...090129	14	2024
253672540799	507345081599	12	~2020
253682230387	6088...292881	14	2024
253716595211	507433190423	12	~2020
253747575899	507495151799	12	~2020
253765947359	507531894719	12	~2020
253768028771	507536057543	12	~2020
253775030819	507550061639	12	~2020
253808275439	507616550879	12	~2020
253889126411	507778252823	12	~2020
253895688803	507791377607	12	~2020
253898257631	507796515263	12	~2020
253906806203	507813612407	12	~2020
253913737463	507827474927	12	~2020
253921640039	507843280079	12	~2020
253925017883	507850035767	12	~2020
253929417551	507858835103	12	~2020
253945744043	507891488087	12	~2020

4.679.597 digits

25-03-23