Small Mersenne Prime Factors (page 5077/5085)

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
372837585539	745675171079	12	~2021
372839340421	3579...680417	14	2024
372850996799	745701993599	12	~2021
372881962223	745763924447	12	~2021
372937992851	745875985703	12	~2021
372940656251	745881312503	12	~2021
372942922139	745885844279	12	~2021
373014556559	746029113119	12	~2021
373027306871	746054613743	12	~2021
373035386819	746070773639	12	~2021
373041248219	1790...914513	14	2024
373070082503	746140165007	12	~2021
373070290031	746140580063	12	~2021
373086639923	746173279847	12	~2021
373099864079	746199728159	12	~2021
373127803943	746255607887	12	~2021
373129330823	746258661647	12	~2021
373175091911	746350183823	12	~2021
373180855139	746361710279	12	~2021
373234721159	746469442319	12	~2021
373324497719	746648995439	12	~2021
373352818739	746705637479	12	~2021
373431720323	746863440647	12	~2021
373478303111	746956606223	12	~2021
373542009779	747084019559	12	~2021

Exponent	Prime Factor	Dig.	Year
373676887943	747353775887	12	~2021
373696660979	747393321959	12	~2021
373697920811	747395841623	12	~2021
373701320009	1275...510727	16	2025
373748922383	747497844767	12	~2021
373756899143	747513798287	12	~2021
373764252391	2466...657807	14	2025
373776455639	747552911279	12	~2021
373793050919	747586101839	12	~2021
373802247431	747604494863	12	~2021
373841049611	747682099223	12	~2021
373883391803	747766783607	12	~2021
373912066271	747824132543	12	~2021
373915203671	747830407343	12	~2021
373916589383	747833178767	12	~2021
373927022123	747854044247	12	~2021
373935380183	747870760367	12	~2021
374021297423	748042594847	12	~2021
374063214719	748126429439	12	~2021
374071606211	748143212423	12	~2021
374091431183	748182862367	12	~2021
374110449983	748220899967	12	~2021
374125764251	748251528503	12	~2021
374142042971	748284085943	12	~2021
374147006411	1795...307729	14	2024

Exponent	Prime Factor	Dig.	Year
374251060259	748502120519	12	~2021
374261525279	748523050559	12	~2021
374278379407	1077...269217	15	2025
374284488971	748568977943	12	~2021
374352699551	748705399103	12	~2021
374363321159	748726642319	12	~2021
374368973509	3024...595273	15	2025
374404034281	2358...597031	15	2025
374445175739	748890351479	12	~2021
374457277451	748914554903	12	~2021
374465229791	748930459583	12	~2021
374511168719	749022337439	12	~2021
374569033991	749138067983	12	~2021
374575370699	749150741399	12	~2021
374639206811	749278413623	12	~2021
374647968671	749295937343	12	~2021
374654771531	749309543063	12	~2021
374676776231	749353552463	12	~2021
374777397347	3897...324089	14	2024
374830440923	749660881847	12	~2021
374834348579	749668697159	12	~2021
374841801683	749683603367	12	~2021
374859155603	749718311207	12	~2021
374881891619	749763783239	12	~2021
374985061943	749970123887	12	~2021

Exponent	Prime Factor	Dig.	Year
374994607811	749989215623	12	~2021
375012364703	750024729407	12	~2021
375014004119	750028008239	12	~2021
375074516471	750149032943	12	~2021
375081013199	750162026399	12	~2021
375083499179	750166998359	12	~2021
375086274011	750172548023	12	~2021
375144393677	3001...494161	14	2024
375181963763	750363927527	12	~2021
375184518011	750369036023	12	~2021
375195966191	750391932383	12	~2021
375262627331	750525254663	12	~2021
375269474903	750538949807	12	~2021
375270219539	750540439079	12	~2021
375290315579	750580631159	12	~2021
375337416791	750674833583	12	~2021
375349101191	750698202383	12	~2021
375386570401	1501...816041	14	2024
375396985343	750793970687	12	~2021
375402015623	750804031247	12	~2021
375410677931	750821355863	12	~2021
375430619099	750861238199	12	~2021
375454605179	1877...258951	14	2024
375454837139	750909674279	12	~2021
375465946283	750931892567	12	~2021

4.783.821 digits

25-05-11