Small Mersenne Prime Factors (page 5401/5850)

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
55068536591	110137073183	12	~2015
55070704121	330424224727	12	~2016
55072099349	440576794793	12	~2016
55076967167	440615737337	12	~2016
55078374359	110156748719	12	~2015
55080511991	110161023983	12	~2015
55080644603	110161289207	12	~2015
55080709763	110161419527	12	~2015
55080779357	330484676143	12	~2016
55085144399	110170288799	12	~2015
55086688451	110173376903	12	~2015
55086862139	110173724279	12	~2015
55087571603	110175143207	12	~2015
55091677919	110183355839	12	~2015
55092729371	110185458743	12	~2015
55093461431	110186922863	12	~2015
55093873931	110187747863	12	~2015
55097552519	110195105039	12	~2015
55099784111	110199568223	12	~2015
55100883371	110201766743	12	~2015
55102659617	330615957703	12	~2016
55112688503	110225377007	12	~2015
55114047071	110228094143	12	~2015
55116164039	110232328079	12	~2015
55117586879	110235173759	12	~2015

Exponent	Prime Factor	Dig.	Year
55122765671	110245531343	12	~2015
55123179491	110246358983	12	~2015
55123969919	110247939839	12	~2015
55124154971	110248309943	12	~2015
55126144259	110252288519	12	~2015
55127111219	110254222439	12	~2015
55131369661	330788217967	12	~2016
55133321651	110266643303	12	~2015
55135690139	110271380279	12	~2015
55137853811	110275707623	12	~2015
55139383657	882230138513	12	~2017
55142139011	110284278023	12	~2015
55143265091	110286530183	12	~2015
55146257459	110292514919	12	~2015
55146944137	330881664823	12	~2016
55149750191	110299500383	12	~2015
55150014131	110300028263	12	~2015
55150206383	110300412767	12	~2015
55150971959	110301943919	12	~2015
55151440843	882423053489	12	~2017
55160002211	110320004423	12	~2015
55162068119	110324136239	12	~2015
55163320343	110326640687	12	~2015
55164033251	110328066503	12	~2015
55164065063	110328130127	12	~2015

Exponent	Prime Factor	Dig.	Year
55169606759	110339213519	12	~2015
55170022499	110340044999	12	~2015
55170183671	110340367343	12	~2015
55171185323	110342370647	12	~2015
55172307577	331033845463	12	~2016
55173619439	110347238879	12	~2015
55176484283	110352968567	12	~2015
55177803251	110355606503	12	~2015
55178436217	331070617303	12	~2016
55179224363	110358448727	12	~2015
55180036603	551800366031	12	~2017
55181246903	110362493807	12	~2015
55184163941	331104983647	12	~2016
55185147263	110370294527	12	~2015
55187405219	110374810439	12	~2015
55191284171	110382568343	12	~2015
55202148277	7179...490663	15	2024
55206537227	441652297817	12	~2016
55207050799	552070507991	12	~2017
55208495939	110416991879	12	~2015
55210971071	110421942143	12	~2015
55213768877	441710151017	12	~2016
55215100181	331290601087	12	~2016
55215268261	331291609567	12	~2016
55217655217	331305931303	12	~2016

Exponent	Prime Factor	Dig.	Year
55220554583	110441109167	12	~2015
55224313583	110448627167	12	~2015
55229981843	110459963687	12	~2015
55231534139	110463068279	12	~2015
55233007523	110466015047	12	~2015
55234496951	110468993903	12	~2015
55235911163	110471822327	12	~2015
55236433799	110472867599	12	~2015
55237881407	441903051257	12	~2016
55239337511	110478675023	12	~2015
55242764897	773398708559	12	~2017
55245758663	110491517327	12	~2015
55248137291	110496274583	12	~2015
55253485403	110506970807	12	~2015
55255377137	331532262823	12	~2016
55255840463	110511680927	12	~2015
55256101391	110512202783	12	~2015
55256797663	884108762609	12	~2017
55257828803	110515657607	12	~2015
55262231023	884195696369	12	~2017
55263602111	110527204223	12	~2015
55265458271	110530916543	12	~2015
55265784971	110531569943	12	~2015
55272560939	110545121879	12	~2015
55277793143	110555586287	12	~2015

5.546.121 digits

26-05-03