Small Mersenne Prime Factors (page 5407/5550)

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
187175925323	374351850647	12	~2019
187177089899	374354179799	12	~2019
187188673019	374377346039	12	~2019
187197298997	6851...432903	14	2025
187210261631	374420523263	12	~2019
187225564343	374451128687	12	~2019
187229571329	1048...944241	15	2025
187238781253	8837...751417	14	2025
187249756223	374499512447	12	~2019
187264022279	374528044559	12	~2019
187268954303	374537908607	12	~2019
187275365111	374550730223	12	~2019
187312794659	374625589319	12	~2019
187320006371	374640012743	12	~2019
187349525171	374699050343	12	~2019
187352670671	374705341343	12	~2019
187360311563	374720623127	12	~2019
187365387983	374730775967	12	~2019
187366756823	374733513647	12	~2019
187372683731	374745367463	12	~2019
187373403551	374746807103	12	~2019
187376979563	374753959127	12	~2019
187379130143	374758260287	12	~2019
187391283083	374782566167	12	~2019
187410870683	374821741367	12	~2019

Exponent	Prime Factor	Dig.	Year
187422826931	374845653863	12	~2019
187435864799	374871729599	12	~2019
187437711683	374875423367	12	~2019
187440187139	374880374279	12	~2019
187446952271	374893904543	12	~2019
187448081759	374896163519	12	~2019
187462146083	374924292167	12	~2019
187475989979	374951979959	12	~2019
187489394171	374978788343	12	~2019
187533027611	375066055223	12	~2019
187548457919	375096915839	12	~2019
187556505239	375113010479	12	~2019
187571778143	375143556287	12	~2019
187579839659	375159679319	12	~2019
187587337571	375174675143	12	~2019
187587717059	375175434119	12	~2019
187610642699	375221285399	12	~2019
187635570119	375271140239	12	~2019
187647546731	375295093463	12	~2019
187649396419	1159...986943	15	2025
187650458483	375300916967	12	~2019
187661576603	375323153207	12	~2019
187710173411	375420346823	12	~2019
187739090543	375478181087	12	~2019
187750191203	375500382407	12	~2019

Exponent	Prime Factor	Dig.	Year
187757461943	375514923887	12	~2019
187758503459	375517006919	12	~2019
187768669391	375537338783	12	~2019
187786919471	375573838943	12	~2019
187797571259	375595142519	12	~2019
187801569419	375603138839	12	~2019
187831870931	375663741863	12	~2019
187843523291	375687046583	12	~2019
187897010641	4810...724097	14	2024
187905286463	375810572927	12	~2019
187910153603	375820307207	12	~2019
187913261339	375826522679	12	~2019
187919624293	5374...547799	14	2023
187923885959	375847771919	12	~2019
187927815203	375855630407	12	~2019
187949829383	375899658767	12	~2019
187950039671	375900079343	12	~2019
187952543699	375905087399	12	~2019
187954094099	375908188199	12	~2019
187956976583	375913953167	12	~2019
187957064423	375914128847	12	~2019
187957297019	2706...770737	14	2024
187980759829	3800...374239	15	2023
187981758803	375963517607	12	~2019
188012222999	376024445999	12	~2019

Exponent	Prime Factor	Dig.	Year
188024631719	376049263439	12	~2019
188025317471	376050634943	12	~2019
188027909651	376055819303	12	~2019
188030698903	8875...882217	14	2024
188036166179	376072332359	12	~2019
188036318611	8762...472727	14	2025
188036983763	376073967527	12	~2019
188042309111	376084618223	12	~2019
188044230623	376088461247	12	~2019
188077075469	2271...166553	15	2025
188083993379	376167986759	12	~2019
188085393263	376170786527	12	~2019
188097231551	376194463103	12	~2019
188109900239	376219800479	12	~2019
188133064391	376266128783	12	~2019
188137698923	376275397847	12	~2019
188138373191	376276746383	12	~2019
188146849679	376293699359	12	~2019
188149645583	376299291167	12	~2019
188184786203	376369572407	12	~2019
188192194979	376384389959	12	~2019
188196166451	376392332903	12	~2019
188204875499	376409750999	12	~2019
188205337499	376410674999	12	~2019
188206533023	376413066047	12	~2019

5.247.179 digits

25-12-14