Small Mersenne Prime Factors (page 5443/5445)

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
422415281819	844830563639	12	~2022
422431644983	844863289967	12	~2022
422457052991	844914105983	12	~2022
422466071099	844932142199	12	~2022
422518722971	845037445943	12	~2022
422531210831	845062421663	12	~2022
422538853043	6169...544279	14	2025
422549115239	845098230479	12	~2022
422589589043	845179178087	12	~2022
422597561783	845195123567	12	~2022
422606975699	845213951399	12	~2022
422617251971	845234503943	12	~2022
422617482383	845234964767	12	~2022
422626345451	845252690903	12	~2022
422655619943	845311239887	12	~2022
422699297183	845398594367	12	~2022
422730999539	845461999079	12	~2022
422774927423	845549854847	12	~2022
422796563939	845593127879	12	~2022
422845384823	845690769647	12	~2022
422865284591	845730569183	12	~2022
422868856643	845737713287	12	~2022
422909825363	845819650727	12	~2022
422922835151	845845670303	12	~2022
422941783031	7190...115271	14	2025

Exponent	Prime Factor	Dig.	Year
422942287931	845884575863	12	~2022
422973214231	8882...988511	14	2025
422995416059	845990832119	12	~2022
423086392139	846172784279	12	~2022
423104181323	846208362647	12	~2022
423156662699	846313325399	12	~2022
423183700319	846367400639	12	~2022
423244457423	846488914847	12	~2022
423246801221	6687...592919	14	2025
423250841939	846501683879	12	~2022
423282549659	846565099319	12	~2022
423326017823	6857...887327	14	2025
423341120231	846682240463	12	~2022
423363517441	1515...243879	15	2025
423378008939	846756017879	12	~2022
423382725263	846765450527	12	~2022
423395075731	8129...540353	14	2025
423405783799	9823...841369	14	2025
423443441363	846886882727	12	~2022
423526836443	847053672887	12	~2022
423561103811	847122207623	12	~2022
423589008743	847178017487	12	~2022
423598545983	847197091967	12	~2022
423599402183	847198804367	12	~2022
423622322171	847244644343	12	~2022

Exponent	Prime Factor	Dig.	Year
423624049559	847248099119	12	~2022
423625256533	7032...584479	14	2025
423628025069	1558...225393	15	2025
423637620683	847275241367	12	~2022
423650655143	847301310287	12	~2022
423711943559	847423887119	12	~2022
423722539763	847445079527	12	~2022
423723467911	1694...164401	15	2025
423754776779	847509553559	12	~2022
423760174031	847520348063	12	~2022
423761313383	847522626767	12	~2022
423806420291	847612840583	12	~2022
423822903299	847645806599	12	~2022
423825930323	847651860647	12	~2022
423834793103	847669586207	12	~2022
423899706239	847799412479	12	~2022
423903419783	847806839567	12	~2022
423935572139	847871144279	12	~2022
423935620019	847871240039	12	~2022
423946251779	847892503559	12	~2022
423993991511	847987983023	12	~2022
423997570019	847995140039	12	~2022
424015936621	1899...606209	15	2025
424086345311	848172690623	12	~2022
424126049777	5683...670119	14	2025

Exponent	Prime Factor	Dig.	Year
424130009783	848260019567	12	~2022
424187552339	848375104679	12	~2022
424259443451	848518886903	12	~2022
424264588931	848529177863	12	~2022
424268254139	848536508279	12	~2022
424276494683	848552989367	12	~2022
424303269961	3869...204433	15	2025
424304305499	848608610999	12	~2022
424310191751	848620383503	12	~2022
424370690879	848741381759	12	~2022
424379982011	848759964023	12	~2022
424396906991	848793813983	12	~2022
424437985199	848875970399	12	~2022
424446620209	6791...233441	14	2025
424465939871	848931879743	12	~2022
424470391799	848940783599	12	~2022
424482531251	848965062503	12	~2022
424526692873	1621...677487	15	2025
424532932679	849065865359	12	~2022
424619501497	7023...476039	15	2025
424621293203	849242586407	12	~2022
424642411643	849284823287	12	~2022
424645176239	849290352479	12	~2022
424645672823	849291345647	12	~2022
424696225319	849392450639	12	~2022

5.142.307 digits

25-10-26