Small Mersenne Prime Factors (page 4758/5130)

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
49994128703	99988257407	11	~2015
49995862793	299975176759	12	~2016
49999301399	99998602799	11	~2015
50004476519	100008953039	12	~2015
50005120283	1177...146183	15	2025
50005406051	100010812103	12	~2015
50008707869	400069662953	12	~2016
50016605363	100033210727	12	~2015
50021734117	300130404703	12	~2016
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

Exponent	Prime Factor	Dig.	Year
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
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

Exponent	Prime Factor	Dig.	Year
50096599331	100193198663	12	~2015
50099502419	100199004839	12	~2015
50101385303	100202770607	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
50114248823	100228497647	12	~2015
50115386099	100230772199	12	~2015
50118344231	100236688463	12	~2015
50125066697	701750933759	12	~2017
50126398571	100252797143	12	~2015
50133691249	2647...979473	14	2024
50134416803	100268833607	12	~2015
50134885583	100269771167	12	~2015
50135995463	100271990927	12	~2015
50136817139	401094537113	12	~2016
50137951049	401103608393	12	~2016
50139352859	100278705719	12	~2015
50139560519	100279121039	12	~2015
50140252321	1107...124769	15	2025
50141355437	300848132623	12	~2016

Exponent	Prime Factor	Dig.	Year
50145114961	300870689767	12	~2016
50145986591	6870...629671	14	2024
50147163359	100294326719	12	~2015
50155856693	300935140159	12	~2016
50157000917	401256007337	12	~2016
50160649589	401285196713	12	~2016
50161806203	100323612407	12	~2015
50161960991	100323921983	12	~2015
50166465803	100332931607	12	~2015
50166516161	300999096967	12	~2016
50170522823	100341045647	12	~2015
50172364751	100344729503	12	~2015
50174007239	100348014479	12	~2015
50174195579	100348391159	12	~2015
50175394019	100350788039	12	~2015
50175613391	100351226783	12	~2015
50182158443	100364316887	12	~2015
50183910011	100367820023	12	~2015
50186587103	100373174207	12	~2015
50187092531	100374185063	12	~2015
50187577019	100375154039	12	~2015
50187899759	100375799519	12	~2015
50188582307	1937...770503	14	2023
50188796641	301132779847	12	~2016
50188910531	401511284249	12	~2016

4.828.532 digits

25-06-01