Small Mersenne Prime Factors (page 4432/5025)

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
19363660163	38727320327	11	~2011
19364153771	38728307543	11	~2011
19364514847	309832237553	12	~2014
19364539637	154916317097	12	~2013
19364783723	38729567447	11	~2011
19365777547	348583995847	12	~2014
19365801503	38731603007	11	~2011
19366683851	38733367703	11	~2011
19368766273	116212597639	12	~2013
19368822359	38737644719	11	~2011
19368909359	38737818719	11	~2011
19369400579	38738801159	11	~2011
19369512083	38739024167	11	~2011
19369616951	38739233903	11	~2011
19370348099	38740696199	11	~2011
19371897031	193718970311	12	~2013
19372020023	38744040047	11	~2011
19372450763	38744901527	11	~2011
19372630703	38745261407	11	~2011
19373496179	38746992359	11	~2011
19373939951	38747879903	11	~2011
19373948003	38747896007	11	~2011
19374934841	154999478729	12	~2013
19375112723	38750225447	11	~2011
19376309551	348773571919	12	~2014

Exponent	Prime Factor	Dig.	Year
19378386593	116270319559	12	~2013
19380559403	38761118807	11	~2011
19380572423	38761144847	11	~2011
19380928813	465142291513	12	~2014
19381304363	38762608727	11	~2011
19381667939	38763335879	11	~2011
19381781819	38763563639	11	~2011
19382939561	116297637367	12	~2013
19385320511	38770641023	11	~2011
19385385731	38770771463	11	~2011
19385878859	38771757719	11	~2011
19387498463	38774996927	11	~2011
19387539023	38775078047	11	~2011
19388423297	116330539783	12	~2013
19388819123	38777638247	11	~2011
19388831069	271443634967	12	~2013
19389030959	38778061919	11	~2011
19389565439	7771...279513	14	2025
19390134857	155121078857	12	~2013
19391708419	193917084191	12	~2013
19392564199	193925641991	12	~2013
19393172219	38786344439	11	~2011
19393946459	38787892919	11	~2011
19393984811	155151878489	12	~2013
19394096153	116364576919	12	~2013

Exponent	Prime Factor	Dig.	Year
19396440611	38792881223	11	~2011
19399143251	38798286503	11	~2011
19399327583	38798655167	11	~2011
19401206267	155209650137	12	~2013
19403792483	38807584967	11	~2011
19407863411	38815726823	11	~2011
19409880911	38819761823	11	~2011
19410030511	194100305111	12	~2013
19410254651	38820509303	11	~2011
19412366003	38824732007	11	~2011
19412412731	38824825463	11	~2011
19412643277	116475859663	12	~2013
19412808641	155302469129	12	~2013
19414318439	38828636879	11	~2011
19415305919	38830611839	11	~2011
19415525579	38831051159	11	~2011
19416173459	38832346919	11	~2011
19416631933	310666110929	12	~2014
19416880811	621340185953	12	~2014
19417093571	38834187143	11	~2011
19417253123	38834506247	11	~2011
19418563919	38837127839	11	~2011
19419833263	194198332631	12	~2013
19420032311	38840064623	11	~2011
19422390959	38844781919	11	~2011

Exponent	Prime Factor	Dig.	Year
19423448339	38846896679	11	~2011
19424236211	38848472423	11	~2011
19424528771	155396230169	12	~2013
19424604547	310793672753	12	~2014
19424863823	38849727647	11	~2011
19425465457	116552792743	12	~2013
19425811877	116554871263	12	~2013
19426244381	116557466287	12	~2013
19427573833	116565442999	12	~2013
19428545639	38857091279	11	~2011
19429137263	38858274527	11	~2011
19429535063	38859070127	11	~2011
19429909991	155439279929	12	~2013
19430249257	116581495543	12	~2013
19431574829	155452598633	12	~2013
19432410083	38864820167	11	~2011
19432574807	155460598457	12	~2013
19434014651	38868029303	11	~2011
19435477121	116612862727	12	~2013
19435865171	38871730343	11	~2011
19436783833	116620702999	12	~2013
19436956691	38873913383	11	~2011
19437287351	38874574703	11	~2011
19437306737	116623840423	12	~2013
19437724913	116626349479	12	~2013

4.724.182 digits

25-04-13