Small Mersenne Prime Factors (page 5466/5850)

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
70469896801	422819380807	12	~2017
70472943059	140945886119	12	~2016
70478505059	140957010119	12	~2016
70478895121	422873370727	12	~2017
70478935777	422873614663	12	~2017
70479193139	140958386279	12	~2016
70480219031	140960438063	12	~2016
70481415359	140962830719	12	~2016
70481446943	140962893887	12	~2016
70482341123	140964682247	12	~2016
70483113719	140966227439	12	~2016
70484478817	422906872903	12	~2017
70485020401	422910122407	12	~2017
70487157683	140974315367	12	~2016
70489084199	140978168399	12	~2016
70490214023	140980428047	12	~2016
70491863699	140983727399	12	~2016
70496182411	704961824111	12	~2017
70496476139	140992952279	12	~2016
70496658803	140993317607	12	~2016
70497199319	140994398639	12	~2016
70497342731	140994685463	12	~2016
70511294963	141022589927	12	~2016
70514855531	141029711063	12	~2016
70524987311	141049974623	12	~2016

Exponent	Prime Factor	Dig.	Year
70525327361	423151964167	12	~2017
70526598281	423159589687	12	~2017
70530531611	141061063223	12	~2016
70532169671	141064339343	12	~2016
70532331367	705323313671	12	~2017
70541806177	423250837063	12	~2017
70542621749	564340973993	12	~2017
70546588487	564372707897	12	~2017
70549352651	141098705303	12	~2016
70554761723	141109523447	12	~2016
70556618591	141113237183	12	~2016
70558728983	141117457967	12	~2016
70559941703	141119883407	12	~2016
70561234379	141122468759	12	~2016
70561767371	141123534743	12	~2016
70564223351	141128446703	12	~2016
70567023479	141134046959	12	~2016
70569072779	141138145559	12	~2016
70569192307	705691923071	12	~2017
70572784883	141145569767	12	~2016
70573616303	141147232607	12	~2016
70574481839	141148963679	12	~2016
70583092043	141166184087	12	~2016
70583799623	141167599247	12	~2016
70585294607	2724...718303	14	2024

Exponent	Prime Factor	Dig.	Year
70589387339	141178774679	12	~2016
70591974157	423551844943	12	~2017
70592217863	141184435727	12	~2016
70594399679	141188799359	12	~2016
70594443173	423566659039	12	~2017
70594967603	141189935207	12	~2016
70598304971	564786439769	12	~2017
70598616611	141197233223	12	~2016
70600856831	141201713663	12	~2016
70604736701	423628420207	12	~2017
70605838487	564846707897	12	~2017
70607459687	1581...969889	14	2025
70608570077	423651420463	12	~2017
70616673773	423700042639	12	~2017
70618665563	141237331127	12	~2016
70622912939	141245825879	12	~2016
70628630519	2746...457873	15	2025
70629877079	141259754159	12	~2016
70634880221	423809281327	12	~2017
70635049739	141270099479	12	~2016
70649319659	565194557273	12	~2017
70653497039	141306994079	12	~2016
70654796363	141309592727	12	~2016
70657948643	141315897287	12	~2016
70660417501	3886...625551	14	2025

Exponent	Prime Factor	Dig.	Year
70660700459	141321400919	12	~2016
70660728251	141321456503	12	~2016
70661412179	141322824359	12	~2016
70664144003	141328288007	12	~2016
70666735543	706667355431	12	~2017
70667590583	141335181167	12	~2016
70670395973	424022375839	12	~2017
70671897311	141343794623	12	~2016
70672690373	424036142239	12	~2017
70673176877	565385415017	12	~2017
70681451303	141362902607	12	~2016
70686528851	141373057703	12	~2016
70690184557	424141107343	12	~2017
70690756273	424144537639	12	~2017
70694092823	141388185647	12	~2016
70702201631	141404403263	12	~2016
70703177771	141406355543	12	~2016
70705591991	141411183983	12	~2016
70712716751	141425433503	12	~2016
70713053291	141426106583	12	~2016
70713603977	424281623863	12	~2017
70714234511	141428469023	12	~2016
70717091099	141434182199	12	~2016
70720582571	141441165143	12	~2016
70727617703	141455235407	12	~2016

5.546.121 digits

26-05-03