Small Mersenne Prime Factors (page 4706/5070)

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
49895185211	99790370423	11	~2015
49895265011	99790530023	11	~2015
49896974339	99793948679	11	~2015
49899355619	99798711239	11	~2015
49903825619	99807651239	11	~2015
49906480619	99812961239	11	~2015
49907177597	1467...213519	14	2024
49911190379	99822380759	11	~2015
49912285877	299473715263	12	~2016
49913220503	99826441007	11	~2015
49915649999	99831299999	11	~2015
49916836979	99833673959	11	~2015
49920984923	99841969847	11	~2015
49925144681	299550868087	12	~2016
49926936071	99853872143	11	~2015
49927857181	8377...349719	14	2023
49932215891	99864431783	11	~2015
49937006051	99874012103	11	~2015
49937378453	299624270719	12	~2016
49948294499	99896588999	11	~2015
49954736467	499547364671	12	~2016
49955050861	299730305167	12	~2016
49958124343	499581243431	12	~2016
49959132073	299754792439	12	~2016
49959350459	99918700919	11	~2015

Exponent	Prime Factor	Dig.	Year
49961500271	99923000543	11	~2015
49963127843	99926255687	11	~2015
49965180781	299791084687	12	~2016
49967125739	99934251479	11	~2015
49967968619	399743748953	12	~2016
49970259431	99940518863	11	~2015
49971818537	399774548297	12	~2016
49972112219	99944224439	11	~2015
49975849151	99951698303	11	~2015
49977331057	299863986343	12	~2016
49978859039	99957718079	11	~2015
49981497197	299888983183	12	~2016
49981558777	299889352663	12	~2016
49989301871	99978603743	11	~2015
49992155519	99984311039	11	~2015
49992338603	99984677207	11	~2015
49993774841	299962649047	12	~2016
49994128703	99988257407	11	~2015
49995862793	299975176759	12	~2016
49999301399	99998602799	11	~2015
50004476519	100008953039	12	~2015
50005406051	100010812103	12	~2015
50008707869	400069662953	12	~2016
50016605363	100033210727	12	~2015
50021734117	300130404703	12	~2016

Exponent	Prime Factor	Dig.	Year
50022000911	100044001823	12	~2015
50026371539	100052743079	12	~2015
50031620761	300189724567	12	~2016
50032023869	400256190953	12	~2016
50037404051	100074808103	12	~2015
50043495371	100086990743	12	~2015
50045219969	700633079567	12	~2017
50047204283	100094408567	12	~2015
50049295511	100098591023	12	~2015
50049386363	100098772727	12	~2015
50050181399	100100362799	12	~2015
50050445933	300302675599	12	~2016
50051219483	100102438967	12	~2015
50054344583	100108689167	12	~2015
50055055163	100110110327	12	~2015
50055740291	100111480583	12	~2015
50056059719	100112119439	12	~2015
50056402079	100112804159	12	~2015
50057209703	100114419407	12	~2015
50057735099	100115470199	12	~2015
50058889471	500588894711	12	~2016
50058912089	400471296713	12	~2016
50062131491	100124262983	12	~2015
50064464111	100128928223	12	~2015
50065023923	100130047847	12	~2015

Exponent	Prime Factor	Dig.	Year
50071269959	100142539919	12	~2015
50071837583	100143675167	12	~2015
50071944599	400575556793	12	~2016
50073162791	100146325583	12	~2015
50073771563	100147543127	12	~2015
50080361459	100160722919	12	~2015
50080803203	100161606407	12	~2015
50081057363	100162114727	12	~2015
50081411879	100162823759	12	~2015
50081600047	500816000471	12	~2016
50081793071	100163586143	12	~2015
50083669283	100167338567	12	~2015
50089301819	100178603639	12	~2015
50095156511	100190313023	12	~2015
50095548179	100191096359	12	~2015
50096229923	100192459847	12	~2015
50096599331	100193198663	12	~2015
50099502419	100199004839	12	~2015
50101709831	100203419663	12	~2015
50106502163	100213004327	12	~2015
50108801471	100217602943	12	~2015
50108906723	100217813447	12	~2015
50109268151	100218536303	12	~2015
50110003283	100220006567	12	~2015
50111074043	100222148087	12	~2015

4.768.925 digits

25-05-04