Small Mersenne Prime Factors (page 4987/5070)

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
224711223983	449422447967	12	~2020
224714180651	449428361303	12	~2020
224719232651	449438465303	12	~2020
224728469099	449456938199	12	~2020
224740277603	449480555207	12	~2020
224756399519	449512799039	12	~2020
224879061923	449758123847	12	~2020
224888172959	449776345919	12	~2020
224891807351	449783614703	12	~2020
224899906079	449799812159	12	~2020
224901003479	449802006959	12	~2020
224911460531	449822921063	12	~2020
224918444183	449836888367	12	~2020
224919261551	449838523103	12	~2020
224930591219	449861182439	12	~2020
224949494303	449898988607	12	~2020
224965587839	449931175679	12	~2020
224969399579	449938799159	12	~2020
224975455031	449950910063	12	~2020
224978272691	449956545383	12	~2020
224992359491	449984718983	12	~2020
225029745659	450059491319	12	~2020
225034774631	450069549263	12	~2020
225035554631	450071109263	12	~2020
225050698811	450101397623	12	~2020

Exponent	Prime Factor	Dig.	Year
225070588541	2322...374313	15	2025
225081358751	450162717503	12	~2020
225083354003	450166708007	12	~2020
225086248451	450172496903	12	~2020
225136791389	4322...946689	14	2023
225139163063	1404...751313	15	2025
225152478563	450304957127	12	~2020
225160893983	450321787967	12	~2020
225187677191	450375354383	12	~2020
225217044491	450434088983	12	~2020
225237476279	450474952559	12	~2020
225239402519	450478805039	12	~2020
225243752947	2702...353641	14	2024
225247184219	450494368439	12	~2020
225270572063	450541144127	12	~2020
225272087759	450544175519	12	~2020
225277387319	450554774639	12	~2020
225295760531	450591521063	12	~2020
225302830019	450605660039	12	~2020
225323972411	450647944823	12	~2020
225324410483	450648820967	12	~2020
225345277499	450690554999	12	~2020
225363866699	450727733399	12	~2020
225403865723	450807731447	12	~2020
225423186491	450846372983	12	~2020

Exponent	Prime Factor	Dig.	Year
225434236031	450868472063	12	~2020
225442271363	450884542727	12	~2020
225451410491	450902820983	12	~2020
225461000783	450922001567	12	~2020
225475955123	450951910247	12	~2020
225496394303	450992788607	12	~2020
225500100323	451000200647	12	~2020
225502723093	5908...450367	14	2023
225509483603	451018967207	12	~2020
225533657963	451067315927	12	~2020
225543202019	451086404039	12	~2020
225574569443	451149138887	12	~2020
225583574837	2707...980441	14	2024
225645508433	2843...062559	14	2024
225660857171	451321714343	12	~2020
225671637959	451343275919	12	~2020
225679219439	451358438879	12	~2020
225730995131	451461990263	12	~2020
225780704531	451561409063	12	~2020
225814084739	451628169479	12	~2020
225820277591	451640555183	12	~2020
225829492439	451658984879	12	~2020
225834538619	451669077239	12	~2020
225842433983	451684867967	12	~2020
225857555603	451715111207	12	~2020

Exponent	Prime Factor	Dig.	Year
225862128829	7046...194649	14	2024
225880392443	451760784887	12	~2020
225883395863	451766791727	12	~2020
225891389459	451782778919	12	~2020
225895720751	451791441503	12	~2020
225901749191	451803498383	12	~2020
225902893043	451805786087	12	~2020
225903676451	451807352903	12	~2020
225909562799	451819125599	12	~2020
225933041843	451866083687	12	~2020
225951885359	451903770719	12	~2020
225959013743	451918027487	12	~2020
226001369351	452002738703	12	~2020
226016990051	452033980103	12	~2020
226017151043	452034302087	12	~2020
226022848553	2712...826361	14	2024
226032750899	452065501799	12	~2020
226043432519	452086865039	12	~2020
226052178239	452104356479	12	~2020
226082101919	452164203839	12	~2020
226136512163	452273024327	12	~2020
226141977983	452283955967	12	~2020
226155332411	452310664823	12	~2020
226178680859	452357361719	12	~2020
226179324863	452358649727	12	~2020

4.768.925 digits

25-05-04