Small Mersenne Prime Factors (page 4587/5235)

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
18520273091	37040546183	11	~2011
18521320943	37042641887	11	~2011
18522068219	37044136439	11	~2011
18522499739	37044999479	11	~2011
18525964883	37051929767	11	~2011
18528537299	37057074599	11	~2011
18528737303	37057474607	11	~2011
18529182383	37058364767	11	~2011
18530225771	37060451543	11	~2011
18531540457	444756970969	12	~2014
18532294751	37064589503	11	~2011
18532530959	37065061919	11	~2011
18534743939	37069487879	11	~2011
18535516739	37071033479	11	~2011
18535952597	148287620777	12	~2013
18536715559	185367155591	12	~2013
18536780081	148294240649	12	~2013
18537145031	37074290063	11	~2011
18537234557	111223407343	12	~2012
18540326459	37080652919	11	~2011
18540534179	37081068359	11	~2011
18540895847	148327166777	12	~2013
18540921491	37081842983	11	~2011
18541075043	37082150087	11	~2011
18541192793	111247156759	12	~2012

Exponent	Prime Factor	Dig.	Year
18541811759	37083623519	11	~2011
18545156951	37090313903	11	~2011
18545430157	296726882513	12	~2013
18546011303	37092022607	11	~2011
18546267893	111277607359	12	~2012
18546721631	37093443263	11	~2011
18547462919	37094925839	11	~2011
18548133473	111288800839	12	~2012
18550234253	445205622073	12	~2014
18550481813	111302890879	12	~2012
18550622477	111303734863	12	~2012
18550781783	37101563567	11	~2011
18551491667	148411933337	12	~2013
18552134947	185521349471	12	~2013
18552262931	37104525863	11	~2011
18554113751	37108227503	11	~2011
18554784737	111328708423	12	~2012
18555316883	37110633767	11	~2011
18555541441	111333248647	12	~2012
18555821951	148446575609	12	~2013
18556356011	37112712023	11	~2011
18558068467	296929095473	12	~2013
18558788663	37117577327	11	~2011
18559345583	37118691167	11	~2011
18559363391	37118726783	11	~2011

Exponent	Prime Factor	Dig.	Year
18559508777	111357052663	12	~2012
18560806177	111364837063	12	~2012
18562696571	37125393143	11	~2011
18563217203	37126434407	11	~2011
18565558463	37131116927	11	~2011
18566088791	37132177583	11	~2011
18566606129	148532849033	12	~2013
18566685251	37133370503	11	~2011
18567796369	445627112857	12	~2014
18568057121	148544456969	12	~2013
18568313279	37136626559	11	~2011
18568675991	37137351983	11	~2011
18570219539	37140439079	11	~2011
18571131127	185711311271	12	~2013
18571199519	37142399039	11	~2011
18572084711	37144169423	11	~2011
18573362303	37146724607	11	~2011
18573977693	111443866159	12	~2012
18574003733	111444022399	12	~2012
18575038333	111450229999	12	~2012
18575420723	37150841447	11	~2011
18575589671	37151179343	11	~2011
18576454163	37152908327	11	~2011
18576991001	111461946007	12	~2012
18579251231	37158502463	11	~2011

Exponent	Prime Factor	Dig.	Year
18579645671	37159291343	11	~2011
18580230419	37160460839	11	~2011
18581604017	148652832137	12	~2013
18581776861	111490661167	12	~2012
18583663991	148669311929	12	~2013
18584197451	37168394903	11	~2011
18584587223	37169174447	11	~2011
18586211219	37172422439	11	~2011
18587639039	37175278079	11	~2011
18587931671	37175863343	11	~2011
18588048683	37176097367	11	~2011
18588386939	148707095513	12	~2013
18589534511	37179069023	11	~2011
18590005117	111540030703	12	~2012
18590076671	37180153343	11	~2011
18591517979	37183035959	11	~2011
18591952391	37183904783	11	~2011
18592976999	37185953999	11	~2011
18593080657	111558483943	12	~2012
18593568923	37187137847	11	~2011
18594797237	148758377897	12	~2013
18595970171	37191940343	11	~2011
18596234087	148769872697	12	~2013
18596416439	37192832879	11	~2011
18597070223	37194140447	11	~2011

4.933.056 digits

25-07-20