Small Mersenne Prime Factors (page 4904/5445)

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
31295925517	187775553103	12	~2014
31296005399	62592010799	11	~2013
31297148999	62594297999	11	~2013
31297669211	62595338423	11	~2013
31298725751	62597451503	11	~2013
31300332599	62600665199	11	~2013
31303324511	62606649023	11	~2013
31304925803	62609851607	11	~2013
31305590411	62611180823	11	~2013
31306269697	187837618183	12	~2014
31308011879	62616023759	11	~2013
31308818771	62617637543	11	~2013
31310266931	62620533863	11	~2013
31310723491	313107234911	12	~2015
31310890223	62621780447	11	~2013
31311012731	250488101849	12	~2014
31311265943	3481...728617	14	2024
31314173603	814168513679	12	~2016
31315437073	187892622439	12	~2014
31316866103	62633732207	11	~2013
31318373123	62636746247	11	~2013
31319010301	187914061807	12	~2014
31319050991	62638101983	11	~2013
31319159093	187914954559	12	~2014
31319544731	62639089463	11	~2013

Exponent	Prime Factor	Dig.	Year
31325465351	62650930703	11	~2013
31325736773	187954420639	12	~2014
31326088511	250608708089	12	~2014
31327875539	62655751079	11	~2013
31328123819	62656247639	11	~2013
31329338951	62658677903	11	~2013
31337043719	250696349753	12	~2014
31337108843	62674217687	11	~2013
31337813677	188026882063	12	~2014
31338182783	62676365567	11	~2013
31338352379	62676704759	11	~2013
31338583307	250708666457	12	~2014
31339185743	62678371487	11	~2013
31339922401	188039534407	12	~2014
31342129277	188052775663	12	~2014
31342165499	62684330999	11	~2013
31343233703	62686467407	11	~2013
31343745683	62687491367	11	~2013
31343791439	62687582879	11	~2013
31345564403	62691128807	11	~2013
31350572339	62701144679	11	~2013
31352508371	62705016743	11	~2013
31352776811	62705553623	11	~2013
31355448287	250843586297	12	~2014
31358724563	62717449127	11	~2013

Exponent	Prime Factor	Dig.	Year
31361690999	62723381999	11	~2013
31361909951	62723819903	11	~2013
31363960799	564551294383	12	~2015
31364499307	564560987527	12	~2015
31365505739	62731011479	11	~2013
31366365671	62732731343	11	~2013
31366690451	62733380903	11	~2013
31367205179	62734410359	11	~2013
31368085631	62736171263	11	~2013
31368321251	62736642503	11	~2013
31368766739	62737533479	11	~2013
31369773857	188218643143	12	~2014
31369929683	62739859367	11	~2013
31370261921	250962095369	12	~2014
31370775251	62741550503	11	~2013
31371105167	250968841337	12	~2014
31374383731	313743837311	12	~2015
31375519271	62751038543	11	~2013
31375859783	62751719567	11	~2013
31379406323	62758812647	11	~2013
31380344057	2786...522617	14	2023
31383371879	62766743759	11	~2013
31383412477	188300474863	12	~2014
31386127919	62772255839	11	~2013
31387520287	753300486889	12	~2016

Exponent	Prime Factor	Dig.	Year
31388264639	62776529279	11	~2013
31389298463	62778596927	11	~2013
31389471331	1280...303049	14	2023
31390690031	62781380063	11	~2013
31391753831	62783507663	11	~2013
31392296737	3384...882487	14	2023
31395042121	188370252727	12	~2014
31395716813	188374300879	12	~2014
31397221991	62794443983	11	~2013
31399819211	62799638423	11	~2013
31402287071	62804574143	11	~2013
31403693663	62807387327	11	~2013
31405013377	188430080263	12	~2014
31411252259	62822504519	11	~2013
31411725361	502587605777	12	~2015
31412911919	62825823839	11	~2013
31413281321	188479687927	12	~2014
31416100141	188496600847	12	~2014
31417130443	502674087089	12	~2015
31419669023	62839338047	11	~2013
31420469813	188522818879	12	~2014
31421977651	314219776511	12	~2015
31422129659	62844259319	11	~2013
31422521797	188535130783	12	~2014
31424640011	62849280023	11	~2013

5.142.307 digits

25-10-26