Small Mersenne Prime Factors (page 5804/5850)

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
350024668891	1470...093423	14	2024
350062559939	700125119879	12	~2021
350063617811	700127235623	12	~2021
350063760719	700127521439	12	~2021
350070665771	700141331543	12	~2021
350095956839	700191913679	12	~2021
350098954151	700197908303	12	~2021
350111689919	700223379839	12	~2021
350129948963	700259897927	12	~2021
350148069443	700296138887	12	~2021
350160661841	2170...034143	14	2024
350165741459	700331482919	12	~2021
350179391123	700358782247	12	~2021
350182055771	700364111543	12	~2021
350197601339	700395202679	12	~2021
350238074783	700476149567	12	~2021
350243208251	700486416503	12	~2021
350247717383	700495434767	12	~2021
350258959123	3712...667039	14	2024
350275412639	700550825279	12	~2021
350324140403	700648280807	12	~2021
350328267323	700656534647	12	~2021
350335996163	700671992327	12	~2021
350345567171	700691134343	12	~2021
350353576907	9249...303449	14	2025

Exponent	Prime Factor	Dig.	Year
350368454257	1401...170281	14	2024
350369593919	700739187839	12	~2021
350371703483	700743406967	12	~2021
350385184379	700770368759	12	~2021
350396024903	700792049807	12	~2021
350406414443	700812828887	12	~2021
350416544363	700833088727	12	~2021
350435067659	700870135319	12	~2021
350450432231	700900864463	12	~2021
350456183219	700912366439	12	~2021
350457757283	700915514567	12	~2021
350476712303	700953424607	12	~2021
350489971319	700979942639	12	~2021
350490371507	1682...832337	14	2024
350544515411	701089030823	12	~2021
350579810809	4136...675463	14	2024
350596062877	2454...401391	14	2024
350619000779	701238001559	12	~2021
350625917819	701251835639	12	~2021
350630638331	701261276663	12	~2021
350650364123	4207...694761	14	2024
350653896539	701307793079	12	~2021
350656509179	701313018359	12	~2021
350685880199	701371760399	12	~2021
350690916683	701381833367	12	~2021

Exponent	Prime Factor	Dig.	Year
350700075191	701400150383	12	~2021
350739602651	701479205303	12	~2021
350746032289	1402...291561	14	2024
350751237443	701502474887	12	~2021
350792428463	701584856927	12	~2021
350809821503	701619643007	12	~2021
350817132023	701634264047	12	~2021
350832211511	701664423023	12	~2021
350835081659	701670163319	12	~2021
350851922471	701703844943	12	~2021
350883008131	3368...780577	14	2024
350893594559	701787189119	12	~2021
350917987019	701835974039	12	~2021
350981341979	701962683959	12	~2021
350985789131	701971578263	12	~2021
351025287779	702050575559	12	~2021
351027404099	702054808199	12	~2021
351090649271	702181298543	12	~2021
351120488951	702240977903	12	~2021
351136047023	702272094047	12	~2021
351138532103	2598...375623	14	2024
351140760959	702281521919	12	~2021
351210361681	1151...631369	15	2025
351217645319	702435290639	12	~2021
351266608019	702533216039	12	~2021

Exponent	Prime Factor	Dig.	Year
351274113611	702548227223	12	~2021
351305822459	702611644919	12	~2021
351312745631	702625491263	12	~2021
351339727499	702679454999	12	~2021
351377763983	702755527967	12	~2021
351388379663	702776759327	12	~2021
351410287439	702820574879	12	~2021
351418581179	702837162359	12	~2021
351472098959	702944197919	12	~2021
351569275223	703138550447	12	~2021
351594465671	703188931343	12	~2021
351600572399	703201144799	12	~2021
351643269599	703286539199	12	~2021
351662179867	1687...633617	14	2024
351682345463	703364690927	12	~2021
351686799983	703373599967	12	~2021
351692681843	703385363687	12	~2021
351702148019	703404296039	12	~2021
351703328833	7526...370263	14	2025
351725254343	703450508687	12	~2021
351729786143	703459572287	12	~2021
351743945519	703487891039	12	~2021
351751396237	1540...551807	15	2024
351752908751	703505817503	12	~2021
351760739651	703521479303	12	~2021

5.546.121 digits

26-05-03