Small Mersenne Prime Factors (page 4608/5025)

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
38818964117	232913784703	12	~2015
38821090559	77642181119	11	~2014
38821622641	232929735847	12	~2015
38822755297	232936531783	12	~2015
38825717459	77651434919	11	~2014
38825868239	77651736479	11	~2014
38827769243	77655538487	11	~2014
38831816591	77663633183	11	~2014
38833371299	77666742599	11	~2014
38833641839	77667283679	11	~2014
38835509411	77671018823	11	~2014
38835578003	77671156007	11	~2014
38836094663	77672189327	11	~2014
38837446331	77674892663	11	~2014
38840111903	77680223807	11	~2014
38840888843	77681777687	11	~2014
38843871323	77687742647	11	~2014
38844098801	233064592807	12	~2015
38846330321	310770642569	12	~2015
38848367891	77696735783	11	~2014
38850490447	388504904471	12	~2015
38853395363	77706790727	11	~2014
38854972223	77709944447	11	~2014
38855678591	77711357183	11	~2014
38857002817	233142016903	12	~2015

Exponent	Prime Factor	Dig.	Year
38857414943	77714829887	11	~2014
38859271343	77718542687	11	~2014
38865712643	77731425287	11	~2014
38867949299	77735898599	11	~2014
38868317843	77736635687	11	~2014
38869325839	388693258391	12	~2015
38869365659	77738731319	11	~2014
38869677911	77739355823	11	~2014
38872089779	77744179559	11	~2014
38872909561	233237457367	12	~2015
38873170211	77746340423	11	~2014
38874935381	310999483049	12	~2015
38874965533	621999448529	12	~2016
38875836107	311006688857	12	~2015
38876918819	77753837639	11	~2014
38876975531	77753951063	11	~2014
38877453401	233264720407	12	~2015
38877875083	388778750831	12	~2015
38879822951	77759645903	11	~2014
38880309763	622084956209	12	~2016
38882143493	233292860959	12	~2015
38883152771	77766305543	11	~2014
38883497201	311067977609	12	~2015
38888576123	77777152247	11	~2014
38894905397	311159243177	12	~2015

Exponent	Prime Factor	Dig.	Year
38896419251	77792838503	11	~2014
38896873811	77793747623	11	~2014
38899713071	77799426143	11	~2014
38901293393	233407760359	12	~2015
38902847363	77805694727	11	~2014
38907806051	77815612103	11	~2014
38907847031	77815694063	11	~2014
38909488897	233456933383	12	~2015
38910164603	77820329207	11	~2014
38911508591	77823017183	11	~2014
38911770791	77823541583	11	~2014
38912668271	77825336543	11	~2014
38913601271	77827202543	11	~2014
38919297353	233515784119	12	~2015
38920550183	77841100367	11	~2014
38924181311	77848362623	11	~2014
38925120433	233550722599	12	~2015
38927317279	389273172791	12	~2015
38929081951	622865311217	12	~2016
38929522859	311436182873	12	~2015
38929993439	77859986879	11	~2014
38933849291	77867698583	11	~2014
38933872459	389338724591	12	~2015
38936025911	77872051823	11	~2014
38936480543	77872961087	11	~2014

Exponent	Prime Factor	Dig.	Year
38939821391	77879642783	11	~2014
38944426379	77888852759	11	~2014
38944547039	77889094079	11	~2014
38946911207	311575289657	12	~2015
38951469701	233708818207	12	~2015
38951526791	77903053583	11	~2014
38953369919	77906739839	11	~2014
38958823259	77917646519	11	~2014
38959069739	77918139479	11	~2014
38962135741	233772814447	12	~2015
38965347191	77930694383	11	~2014
38965436353	233792618119	12	~2015
38965871363	77931742727	11	~2014
38966114617	233796687703	12	~2015
38966769239	77933538479	11	~2014
38969876531	77939753063	11	~2014
38970079277	233820475663	12	~2015
38973004331	77946008663	11	~2014
38973069683	77946139367	11	~2014
38973885323	77947770647	11	~2014
38979913859	77959827719	11	~2014
38980560427	389805604271	12	~2015
38982566213	233895397279	12	~2015
38983683961	233902103767	12	~2015
38986138991	77972277983	11	~2014

4.724.182 digits

25-04-13