Small Mersenne Prime Factors (page 5542/5745)

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
144674162257	6597...989193	14	2023
144695068379	289390136759	12	~2018
144695724983	289391449967	12	~2018
144696435503	289392871007	12	~2018
144697732199	289395464399	12	~2018
144704062199	289408124399	12	~2018
144710397263	289420794527	12	~2018
144717547031	289435094063	12	~2018
144717760619	289435521239	12	~2018
144735510539	289471021079	12	~2018
144739748711	289479497423	12	~2018
144759355343	289518710687	12	~2018
144764361473	868586168839	12	~2019
144765178331	289530356663	12	~2018
144787534823	289575069647	12	~2018
144791408351	289582816703	12	~2018
144801689243	289603378487	12	~2018
144805786379	289611572759	12	~2018
144807739859	289615479719	12	~2018
144808336223	289616672447	12	~2018
144820828931	289641657863	12	~2018
144830576003	289661152007	12	~2018
144841564033	9038...956593	14	2023
144844181483	289688362967	12	~2018
144846575579	289693151159	12	~2018

Exponent	Prime Factor	Dig.	Year
144860625491	289721250983	12	~2018
144866983031	289733966063	12	~2018
144867996743	289735993487	12	~2018
144872828063	289745656127	12	~2018
144888882317	4259...401199	14	2023
144892157363	289784314727	12	~2018
144914503619	289829007239	12	~2018
144925489391	289850978783	12	~2018
144928879373	869573276239	12	~2019
144942298661	869653791967	12	~2019
144949869923	289899739847	12	~2018
144956902703	289913805407	12	~2018
144957354623	289914709247	12	~2018
144972807299	289945614599	12	~2018
144984048971	289968097943	12	~2018
144986834519	289973669039	12	~2018
144992403323	289984806647	12	~2018
145009730221	870058381327	12	~2019
145016712359	290033424719	12	~2018
145028847251	290057694503	12	~2018
145033878299	290067756599	12	~2018
145036881631	1624...742673	14	2025
145052424773	870314548639	12	~2019
145055393699	290110787399	12	~2018
145061049383	290122098767	12	~2018

Exponent	Prime Factor	Dig.	Year
145061710019	290123420039	12	~2018
145065913859	290131827719	12	~2018
145080326401	5647...485327	16	2025
145093135619	290186271239	12	~2018
145094027843	290188055687	12	~2018
145097302079	290194604159	12	~2018
145101680291	290203360583	12	~2018
145111468301	870668809807	12	~2019
145112391191	290224782383	12	~2018
145122317477	870733904863	12	~2019
145124076593	1030...381031	15	2026
145125367901	870752207407	12	~2019
145143441983	3738...548209	15	2024
145146475871	290292951743	12	~2018
145147147499	290294294999	12	~2018
145158870397	870953222383	12	~2019
145160195483	290320390967	12	~2018
145167052403	290334104807	12	~2018
145172645951	290345291903	12	~2018
145176216359	290352432719	12	~2018
145196300519	290392601039	12	~2018
145203685043	290407370087	12	~2018
145209741503	290419483007	12	~2018
145210642103	290421284207	12	~2018
145250140577	871500843463	12	~2019

Exponent	Prime Factor	Dig.	Year
145252190459	290504380919	12	~2018
145253236763	290506473527	12	~2018
145263021383	290526042767	12	~2018
145263969899	290527939799	12	~2018
145268004901	871608029407	12	~2019
145293899843	290587799687	12	~2018
145308566653	871851399919	12	~2019
145310206373	871861238239	12	~2019
145310336651	290620673303	12	~2018
145317149111	4301...136857	14	2023
145348102391	290696204783	12	~2018
145349230679	290698461359	12	~2018
145353538751	290707077503	12	~2018
145356000011	290712000023	12	~2018
145365139631	290730279263	12	~2018
145370953859	290741907719	12	~2018
145371672731	290743345463	12	~2018
145374151277	872244907663	12	~2019
145379773943	290759547887	12	~2018
145379885771	290759771543	12	~2018
145396317817	4177...153679	16	2023
145400787923	290801575847	12	~2018
145402105463	290804210927	12	~2018
145408686491	290817372983	12	~2018
145410661223	290821322447	12	~2018

5.441.361 digits

26-03-15