Small Mersenne Prime Factors (page 5241/5490)

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
104670429431	209340858863	12	~2017
104672370851	209344741703	12	~2017
104673843899	209347687799	12	~2017
104679330779	209358661559	12	~2017
104688545653	628131273919	12	~2018
104698080059	209396160119	12	~2017
104704226311	3518...040497	14	2024
104711463719	837691709753	12	~2019
104711707739	209423415479	12	~2017
104714281739	5466...067759	14	2024
104722602863	209445205727	12	~2017
104733647471	209467294943	12	~2017
104735618321	628413709927	12	~2018
104742895727	837943165817	12	~2019
104754997751	209509995503	12	~2017
104765180837	838121446697	12	~2019
104769438443	209538876887	12	~2017
104769984971	209539969943	12	~2017
104779123019	209558246039	12	~2017
104782204679	209564409359	12	~2017
104788755059	209577510119	12	~2017
104789315231	209578630463	12	~2017
104792336437	628754018623	12	~2018
104796168563	209592337127	12	~2017
104796623663	209593247327	12	~2017

Exponent	Prime Factor	Dig.	Year
104807715877	628846295263	12	~2018
104809244429	838473955433	12	~2019
104819450639	209638901279	12	~2017
104825189291	209650378583	12	~2017
104828303819	209656607639	12	~2017
104829927793	628979566759	12	~2018
104833284119	209666568239	12	~2017
104839775279	209679550559	12	~2017
104848523771	209697047543	12	~2017
104855415011	209710830023	12	~2017
104863894921	629183369527	12	~2018
104864005199	209728010399	12	~2017
104865141959	838921135673	12	~2019
104865904133	629195424799	12	~2018
104871637859	209743275719	12	~2017
104873078291	209746156583	12	~2017
104880292943	209760585887	12	~2017
104889631571	209779263143	12	~2017
104893160111	209786320223	12	~2017
104893396739	209786793479	12	~2017
104893404311	839147234489	12	~2019
104896920923	209793841847	12	~2017
104906224211	209812448423	12	~2017
104914032803	209828065607	12	~2017
104920891169	839367129353	12	~2019

Exponent	Prime Factor	Dig.	Year
104937844499	209875688999	12	~2017
104963454371	209926908743	12	~2017
104968168523	209936337047	12	~2017
104972701331	209945402663	12	~2017
104975183543	209950367087	12	~2017
104980749899	209961499799	12	~2017
104981069639	209962139279	12	~2017
104981591111	839852728889	12	~2019
104985132299	209970264599	12	~2017
104993178551	209986357103	12	~2017
104993503621	2183...753169	14	2024
104997682043	209995364087	12	~2017
105000424649	840003397193	12	~2019
105003123311	210006246623	12	~2017
105005139059	210010278119	12	~2017
105008353187	840066825497	12	~2019
105009851363	210019702727	12	~2017
105012154223	210024308447	12	~2017
105022429619	210044859239	12	~2017
105024849383	210049698767	12	~2017
105028380179	210056760359	12	~2017
105030671771	210061343543	12	~2017
105030676031	210061352063	12	~2017
105041717999	840333743993	12	~2019
105042987083	210085974167	12	~2017

Exponent	Prime Factor	Dig.	Year
105051351659	210102703319	12	~2017
105054634523	210109269047	12	~2017
105055077557	840440620457	12	~2019
105060522551	210121045103	12	~2017
105060662807	840485302457	12	~2019
105062257799	210124515599	12	~2017
105067017079	2565...706919	15	2025
105071412779	210142825559	12	~2017
105085536299	210171072599	12	~2017
105089227163	210178454327	12	~2017
105097943513	630587661079	12	~2018
105100107383	210200214767	12	~2017
105100499737	630602998423	12	~2018
105103263203	210206526407	12	~2017
105104471579	210208943159	12	~2017
105116751851	210233503703	12	~2017
105117320993	630703925959	12	~2018
105131596529	841052772233	12	~2019
105137565371	210275130743	12	~2017
105138109697	841104877577	12	~2019
105139839251	210279678503	12	~2017
105141883117	5852...429223	15	2023
105147612617	630885675703	12	~2018
105157511171	210315022343	12	~2017
105163690979	210327381959	12	~2017

5.187.277 digits

25-11-17