Small Mersenne Prime Factors (page 5306/5670)

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
70183185263	140366370527	12	~2016
70184655787	701846557871	12	~2017
70185034697	1785...269169	15	2025
70187306159	140374612319	12	~2016
70197400523	140394801047	12	~2016
70198591439	140397182879	12	~2016
70199922203	140399844407	12	~2016
70205251469	561642011753	12	~2017
70206472097	421238832583	12	~2017
70207210259	140414420519	12	~2016
70211213951	140422427903	12	~2016
70216547543	140433095087	12	~2016
70222107017	421332642103	12	~2017
70226628971	140453257943	12	~2016
70231242839	140462485679	12	~2016
70232213279	561857706233	12	~2017
70239279611	140478559223	12	~2016
70244604263	140489208527	12	~2016
70244927411	140489854823	12	~2016
70247699471	140495398943	12	~2016
70248559141	421491354847	12	~2017
70248720023	140497440047	12	~2016
70249605857	2528...108521	14	2024
70250334527	3778...086207	15	2025
70252075259	140504150519	12	~2016

Exponent	Prime Factor	Dig.	Year
70254307709	562034461673	12	~2017
70256588459	140513176919	12	~2016
70264251527	562114012217	12	~2017
70267978213	421607869279	12	~2017
70269283823	140538567647	12	~2016
70269816359	140539632719	12	~2016
70270294799	140540589599	12	~2016
70272123191	140544246383	12	~2016
70273610051	140547220103	12	~2016
70273804631	140547609263	12	~2016
70277926919	140555853839	12	~2016
70282546751	562260374009	12	~2017
70291768643	140583537287	12	~2016
70299221963	140598443927	12	~2016
70300788419	140601576839	12	~2016
70307145059	140614290119	12	~2016
70309855919	140619711839	12	~2016
70315556357	421893338143	12	~2017
70324877723	140649755447	12	~2016
70332209099	140664418199	12	~2016
70334574599	140669149199	12	~2016
70338511871	140677023743	12	~2016
70338764597	562710116777	12	~2017
70341391187	562731129497	12	~2017
70343142071	140686284143	12	~2016

Exponent	Prime Factor	Dig.	Year
70344995243	140689990487	12	~2016
70349740319	140699480639	12	~2016
70358708099	140717416199	12	~2016
70362236051	140724472103	12	~2016
70364853719	140729707439	12	~2016
70365250877	562922007017	12	~2017
70368047219	140736094439	12	~2016
70371438899	140742877799	12	~2016
70371564533	422229387199	12	~2017
70375772039	140751544079	12	~2016
70379591837	563036734697	12	~2017
70381053461	422286320767	12	~2017
70381152791	140762305583	12	~2016
70383078599	140766157199	12	~2016
70384591681	422307550087	12	~2017
70385487611	140770975223	12	~2016
70385858111	563086864889	12	~2017
70388838313	422333029879	12	~2017
70410641219	563285129753	12	~2017
70415796911	140831593823	12	~2016
70418589863	140837179727	12	~2016
70419219257	422515315543	12	~2017
70424877179	140849754359	12	~2016
70431459821	422588758927	12	~2017
70431473291	140862946583	12	~2016

Exponent	Prime Factor	Dig.	Year
70433137003	704331370031	12	~2017
70438984717	422633908303	12	~2017
70447393031	140894786063	12	~2016
70451506679	140903013359	12	~2016
70451636999	140903273999	12	~2016
70452766159	1651...876697	15	2023
70458108179	140916216359	12	~2016
70458668383	704586683831	12	~2017
70460088719	140920177439	12	~2016
70461287111	563690296889	12	~2017
70461682691	140923365383	12	~2016
70462333217	422773999303	12	~2017
70463945399	140927890799	12	~2016
70464939647	563719517177	12	~2017
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

5.366.787 digits

26-02-08