Small Mersenne Prime Factors (page 5255/5745)

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
44964419393	269786516359	12	~2015
44966295911	89932591823	11	~2014
44967123647	359736989177	12	~2016
44969918291	89939836583	11	~2014
44973395639	89946791279	11	~2014
44974304003	89948608007	11	~2014
44975150639	89950301279	11	~2014
44976955223	89953910447	11	~2014
44979295043	89958590087	11	~2014
44980932131	89961864263	11	~2014
44981734019	89963468039	11	~2014
44991507443	89983014887	11	~2014
44996504999	89993009999	11	~2014
44996555099	89993110199	11	~2014
44998044011	89996088023	11	~2014
44999159927	359993279417	12	~2016
44999325517	269995953103	12	~2015
44999547419	89999094839	11	~2014
44999828651	89999657303	11	~2014
45003064679	90006129359	11	~2014
45003555671	90007111343	11	~2014
45004793843	90009587687	11	~2014
45010170851	90020341703	11	~2014
45010228583	90020457167	11	~2014
45011155979	90022311959	11	~2014

Exponent	Prime Factor	Dig.	Year
45011483879	90022967759	11	~2014
45011544983	90023089967	11	~2014
45014834303	90029668607	11	~2014
45015814219	450158142191	12	~2016
45016630199	90033260399	11	~2014
45017278177	270103669063	12	~2015
45019987223	90039974447	11	~2014
45020065423	450200654231	12	~2016
45020516741	360164133929	12	~2016
45020831099	90041662199	11	~2014
45022247807	360177982457	12	~2016
45022817159	90045634319	11	~2014
45023624819	90047249639	11	~2014
45023693051	90047386103	11	~2014
45023699053	720379184849	12	~2016
45026144627	810470603287	12	~2017
45027032761	270162196567	12	~2015
45032310959	90064621919	11	~2014
45035553319	450355533191	12	~2016
45037789763	90075579527	11	~2014
45039355007	360314840057	12	~2016
45044727239	90089454479	11	~2014
45045985079	90091970159	11	~2014
45048011773	270288070639	12	~2015
45048406499	90096812999	11	~2014

Exponent	Prime Factor	Dig.	Year
45048413009	360387304073	12	~2016
45048529193	270291175159	12	~2015
45050007419	90100014839	11	~2014
45054108643	450541086431	12	~2016
45056583073	270339498439	12	~2015
45059212571	90118425143	11	~2014
45061345379	90122690759	11	~2014
45061785073	720988561169	12	~2016
45063828983	90127657967	11	~2014
45064941191	90129882383	11	~2014
45065737439	90131474879	11	~2014
45065738843	90131477687	11	~2014
45068864759	90137729519	11	~2014
45070066883	90140133767	11	~2014
45071632357	270429794143	12	~2015
45073765259	90147530519	11	~2014
45074240819	90148481639	11	~2014
45076456259	90152912519	11	~2014
45079084091	90158168183	11	~2014
45079192357	270475154143	12	~2015
45081821423	90163642847	11	~2014
45084268571	90168537143	11	~2014
45085155959	90170311919	11	~2014
45086216603	90172433207	11	~2014
45087374533	270524247199	12	~2015

Exponent	Prime Factor	Dig.	Year
45089786549	631257011687	12	~2016
45091923179	90183846359	11	~2014
45093163627	450931636271	12	~2016
45093813629	360750509033	12	~2016
45094590059	90189180119	11	~2014
45096519311	90193038623	11	~2014
45100060559	90200121119	11	~2014
45101214239	90202428479	11	~2014
45102006119	360816048953	12	~2016
45103137119	90206274239	11	~2014
45103508617	270621051703	12	~2015
45104041337	270624248023	12	~2015
45105400583	90210801167	11	~2014
45105881519	90211763039	11	~2014
45106216139	90212432279	11	~2014
45109231319	90218462639	11	~2014
45109302131	90218604263	11	~2014
45111543947	360892351577	12	~2016
45112343123	90224686247	11	~2014
45112493623	721799897969	12	~2016
45113010779	90226021559	11	~2014
45113526323	90227052647	11	~2014
45114848819	90229697639	11	~2014
45116302139	90232604279	11	~2014
45116921159	90233842319	11	~2014

5.441.361 digits

26-03-15