Small Mersenne Prime Factors (page 4671/5070)

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
43073652731	86147305463	11	~2014
43075886261	258455317567	12	~2015
43076017643	86152035287	11	~2014
43080121853	2645...817743	14	2024
43080890711	86161781423	11	~2014
43081280939	86162561879	11	~2014
43083441509	344667532073	12	~2016
43090111943	86180223887	11	~2014
43091626139	86183252279	11	~2014
43098376703	86196753407	11	~2014
43100765069	344806120553	12	~2016
43102142339	86204284679	11	~2014
43102202051	86204404103	11	~2014
43102228361	344817826889	12	~2016
43107564959	86215129919	11	~2014
43107811303	431078113031	12	~2016
43111289917	258667739503	12	~2015
43111706723	86223413447	11	~2014
43113292031	86226584063	11	~2014
43113687371	86227374743	11	~2014
43114801139	86229602279	11	~2014
43116023053	258696138319	12	~2015
43117921571	86235843143	11	~2014
43119234971	86238469943	11	~2014
43121743001	344973944009	12	~2016

Exponent	Prime Factor	Dig.	Year
43122190823	86244381647	11	~2014
43126217891	86252435783	11	~2014
43130843297	258785059783	12	~2015
43131862223	86263724447	11	~2014
43132250351	86264500703	11	~2014
43133077859	86266155719	11	~2014
43133482811	86266965623	11	~2014
43133980943	86267961887	11	~2014
43134510449	345076083593	12	~2016
43135596599	776440738783	12	~2016
43135810981	258814865887	12	~2015
43136401403	86272802807	11	~2014
43136759903	86273519807	11	~2014
43137383651	86274767303	11	~2014
43140570059	86281140119	11	~2014
43141479371	86282958743	11	~2014
43142897711	86285795423	11	~2014
43144361219	86288722439	11	~2014
43148364341	258890186047	12	~2015
43151956583	86303913167	11	~2014
43156971551	86313943103	11	~2014
43159293379	776867280823	12	~2016
43164615023	86329230047	11	~2014
43168105537	1890...225207	14	2023
43170175043	86340350087	11	~2014

Exponent	Prime Factor	Dig.	Year
43171369693	259028218159	12	~2015
43176122617	8186...481833	14	2025
43178677631	86357355263	11	~2014
43179110479	431791104791	12	~2016
43181182259	86362364519	11	~2014
43181321041	259087926247	12	~2015
43183504621	259101027727	12	~2015
43184006309	604576088327	12	~2016
43185538987	431855389871	12	~2016
43186316531	86372633063	11	~2014
43187869871	86375739743	11	~2014
43189705211	86379410423	11	~2014
43191669431	86383338863	11	~2014
43193817911	86387635823	11	~2014
43193887211	86387774423	11	~2014
43193969519	86387939039	11	~2014
43194176183	86388352367	11	~2014
43198058639	86396117279	11	~2014
43199857703	86399715407	11	~2014
43201280159	86402560319	11	~2014
43203972323	86407944647	11	~2014
43204387139	86408774279	11	~2014
43205010659	86410021319	11	~2014
43206015277	259236091663	12	~2015
43206394229	345651153833	12	~2016

Exponent	Prime Factor	Dig.	Year
43212863891	86425727783	11	~2014
43213246327	9748...713713	14	2024
43214529791	86429059583	11	~2014
43215128071	432151280711	12	~2016
43216577399	86433154799	11	~2014
43217223359	86434446719	11	~2014
43217284931	86434569863	11	~2014
43217518343	86435036687	11	~2014
43218603611	86437207223	11	~2014
43219341421	259316048527	12	~2015
43219692839	86439385679	11	~2014
43221051299	86442102599	11	~2014
43223584031	86447168063	11	~2014
43229337971	86458675943	11	~2014
43232597957	259395587743	12	~2015
43233187703	86466375407	11	~2014
43233585383	86467170767	11	~2014
43234185251	86468370503	11	~2014
43236225863	86472451727	11	~2014
43239625199	86479250399	11	~2014
43241447297	259448683783	12	~2015
43242545707	432425457071	12	~2016
43245750419	345966003353	12	~2016
43246020791	86492041583	11	~2014
43251861347	346014890777	12	~2016

4.768.925 digits

25-05-04