Small Mersenne Prime Factors (page 5231/5790)

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
36125450051	72250900103	11	~2013
36125501063	72251002127	11	~2013
36129847511	72259695023	11	~2013
36131808263	72263616527	11	~2013
36132185893	578114974289	12	~2016
36133016963	72266033927	11	~2013
36135013199	72270026399	11	~2013
36136300283	72272600567	11	~2013
36137152861	216822917167	12	~2015
36138448823	72276897647	11	~2013
36139733099	72279466199	11	~2013
36140274503	72280549007	11	~2013
36145203959	72290407919	11	~2014
36146783303	72293566607	11	~2014
36150543371	72301086743	11	~2014
36151343411	72302686823	11	~2014
36153154391	72306308783	11	~2014
36154152719	72308305439	11	~2014
36154496051	72308992103	11	~2014
36156661763	72313323527	11	~2014
36158188883	72316377767	11	~2014
36158600459	72317200919	11	~2014
36160077599	289280620793	12	~2015
36160739837	216964439023	12	~2015
36162029413	216972176479	12	~2015

Exponent	Prime Factor	Dig.	Year
36162357839	72324715679	11	~2014
36163781639	72327563279	11	~2014
36164510981	216987065887	12	~2015
36166243193	506327404703	12	~2016
36166412279	72332824559	11	~2014
36166796909	289334375273	12	~2015
36169491623	72338983247	11	~2014
36171392951	72342785903	11	~2014
36173904953	217043429719	12	~2015
36176338867	868232132809	12	~2016
36177033257	289416266057	12	~2015
36178603451	72357206903	11	~2014
36178972859	72357945719	11	~2014
36179442407	289435539257	12	~2015
36180974579	72361949159	11	~2014
36181703711	72363407423	11	~2014
36183002543	72366005087	11	~2014
36183605021	217101630127	12	~2015
36185070563	72370141127	11	~2014
36185850517	217115103103	12	~2015
36188098571	72376197143	11	~2014
36190174259	72380348519	11	~2014
36191345783	72382691567	11	~2014
36191644331	289533154649	12	~2015
36192369179	72384738359	11	~2014

Exponent	Prime Factor	Dig.	Year
36193272233	217159633399	12	~2015
36194662499	72389324999	11	~2014
36196207451	72392414903	11	~2014
36197694307	579163108913	12	~2016
36198294911	72396589823	11	~2014
36198818399	72397636799	11	~2014
36199371059	289594968473	12	~2015
36199729763	72399459527	11	~2014
36200312891	72400625783	11	~2014
36203523581	1672...894423	14	2023
36205256663	72410513327	11	~2014
36209084333	217254505999	12	~2015
36209114833	217254688999	12	~2015
36214437191	72428874383	11	~2014
36215905703	72431811407	11	~2014
36223793363	72447586727	11	~2014
36225398711	72450797423	11	~2014
36227267123	72454534247	11	~2014
36227637683	72455275367	11	~2014
36230249633	507223494863	12	~2016
36231758201	289854065609	12	~2015
36232436951	72464873903	11	~2014
36234375431	289875003449	12	~2015
36234507899	72469015799	11	~2014
36234811937	217408871623	12	~2015

Exponent	Prime Factor	Dig.	Year
36235341113	217412046679	12	~2015
36236176331	72472352663	11	~2014
36237260141	289898081129	12	~2015
36238190699	72476381399	11	~2014
36240335783	72480671567	11	~2014
36240502631	72481005263	11	~2014
36240689957	217444139743	12	~2015
36240743711	72481487423	11	~2014
36241897691	72483795383	11	~2014
36242004443	72484008887	11	~2014
36244948547	289959588377	12	~2015
36246372971	72492745943	11	~2014
36247139273	217482835639	12	~2015
36249403691	72498807383	11	~2014
36250195031	72500390063	11	~2014
36251120219	72502240439	11	~2014
36251148133	797525258927	12	~2016
36252409703	72504819407	11	~2014
36257225003	72514450007	11	~2014
36257827643	72515655287	11	~2014
36259008119	72518016239	11	~2014
36259145017	217554870103	12	~2015
36259670827	652674074887	12	~2016
36263404139	72526808279	11	~2014
36263513003	72527026007	11	~2014

5.486.313 digits

26-04-05