Small Mersenne Prime Factors (page 5064/5670)

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
28638919877	229111359017	12	~2014
28640400983	57280801967	11	~2013
28640700503	57281401007	11	~2013
28641152051	229129216409	12	~2014
28641990941	171851945647	12	~2014
28642982413	687431577913	12	~2015
28649479679	57298959359	11	~2013
28649546111	57299092223	11	~2013
28651143359	57302286719	11	~2013
28651379489	229211035913	12	~2014
28652979331	515753627959	12	~2015
28653208669	1015...522937	15	2025
28653518903	57307037807	11	~2013
28653620761	171921724567	12	~2014
28653638603	57307277207	11	~2013
28654262711	57308525423	11	~2013
28654397939	57308795879	11	~2013
28654497419	57308994839	11	~2013
28656360731	57312721463	11	~2013
28657455989	401204383847	12	~2015
28658386439	57316772879	11	~2013
28659145439	57318290879	11	~2013
28659727619	57319455239	11	~2013
28659881483	57319762967	11	~2013
28659987071	57319974143	11	~2013

Exponent	Prime Factor	Dig.	Year
28660616297	229284930377	12	~2014
28663064603	57326129207	11	~2013
28663413377	859902401311	12	~2016
28663529551	458616472817	12	~2015
28663932257	171983593543	12	~2014
28665946697	171995680183	12	~2014
28668542453	172011254719	12	~2014
28669003619	57338007239	11	~2013
28669378097	172016268583	12	~2014
28669457737	172016746423	12	~2014
28671245173	630767393807	12	~2015
28672793603	57345587207	11	~2013
28673336063	57346672127	11	~2013
28673811443	57347622887	11	~2013
28675187111	229401496889	12	~2014
28675625519	57351251039	11	~2013
28682611301	229460890409	12	~2014
28683050939	57366101879	11	~2013
28686835277	229494682217	12	~2014
28687006163	57374012327	11	~2013
28687223111	57374446223	11	~2013
28690220063	57380440127	11	~2013
28690351379	57380702759	11	~2013
28691600969	229532807753	12	~2014
28692264959	57384529919	11	~2013

Exponent	Prime Factor	Dig.	Year
28693524551	57387049103	11	~2013
28693655099	57387310199	11	~2013
28694728031	57389456063	11	~2013
28696491427	459143862833	12	~2015
28697162771	57394325543	11	~2013
28700324291	57400648583	11	~2013
28700869523	57401739047	11	~2013
28703620031	57407240063	11	~2013
28704423179	57408846359	11	~2013
28704691019	57409382039	11	~2013
28705763533	172234581199	12	~2014
28706187299	57412374599	11	~2013
28706533697	229652269577	12	~2014
28707339359	57414678719	11	~2013
28707698111	57415396223	11	~2013
28709081227	287090812271	12	~2014
28709193179	57418386359	11	~2013
28710630743	57421261487	11	~2013
28713151163	57426302327	11	~2013
28716782291	57433564583	11	~2013
28718092037	229744736297	12	~2014
28719788843	57439577687	11	~2013
28720303441	172321820647	12	~2014
28721046001	172326276007	12	~2014
28721509931	57443019863	11	~2013

Exponent	Prime Factor	Dig.	Year
28721598221	7605...089209	14	2025
28724414197	172346485183	12	~2014
28724690231	57449380463	11	~2013
28725867257	172355203543	12	~2014
28726656071	57453312143	11	~2013
28727629043	57455258087	11	~2013
28728254953	172369529719	12	~2014
28729292831	57458585663	11	~2013
28729413683	57458827367	11	~2013
28729977377	172379864263	12	~2014
28732123811	57464247623	11	~2013
28732623611	57465247223	11	~2013
28735483391	57470966783	11	~2013
28735489801	632180775623	12	~2015
28737118339	287371183391	12	~2014
28737224723	57474449447	11	~2013
28738339193	172430035159	12	~2014
28738502063	57477004127	11	~2013
28739721293	689753311033	12	~2015
28740210491	57480420983	11	~2013
28740362279	57480724559	11	~2013
28740402191	57480804383	11	~2013
28741132261	172446793567	12	~2014
28742363339	57484726679	11	~2013
28743176999	57486353999	11	~2013

5.366.787 digits

26-02-08