Small Mersenne Prime Factors (page 5556/5670)

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
231014917163	462029834327	12	~2020
231022605791	462045211583	12	~2020
231051434699	462102869399	12	~2020
231056894483	462113788967	12	~2020
231067940951	462135881903	12	~2020
231111142319	462222284639	12	~2020
231114279719	462228559439	12	~2020
231120019451	462240038903	12	~2020
231121964939	462243929879	12	~2020
231129997151	462259994303	12	~2020
231133249643	462266499287	12	~2020
231141775103	462283550207	12	~2020
231149415779	462298831559	12	~2020
231153014639	462306029279	12	~2020
231157852643	462315705287	12	~2020
231160675019	462321350039	12	~2020
231167066939	462334133879	12	~2020
231178455971	462356911943	12	~2020
231180911939	462361823879	12	~2020
231193494907	2450...460143	14	2024
231205956011	462411912023	12	~2020
231208508291	462417016583	12	~2020
231229896119	462459792239	12	~2020
231239322911	462478645823	12	~2020
231249234851	462498469703	12	~2020

Exponent	Prime Factor	Dig.	Year
231282388751	462564777503	12	~2020
231305850851	462611701703	12	~2020
231335141321	4552...119729	15	2025
231340511819	462681023639	12	~2020
231343355819	462686711639	12	~2020
231352819811	462705639623	12	~2020
231358825811	462717651623	12	~2020
231391290503	462782581007	12	~2020
231398904239	462797808479	12	~2020
231417131651	462834263303	12	~2020
231425533991	462851067983	12	~2020
231428503643	462857007287	12	~2020
231435653411	462871306823	12	~2020
231455856479	462911712959	12	~2020
231486932711	462973865423	12	~2020
231487820099	462975640199	12	~2020
231493166171	462986332343	12	~2020
231500007743	463000015487	12	~2020
231512874487	1264...469903	15	2023
231535673879	463071347759	12	~2020
231537038003	463074076007	12	~2020
231546735599	463093471199	12	~2020
231554511371	463109022743	12	~2020
231555569783	463111139567	12	~2020
231597267983	463194535967	12	~2020

Exponent	Prime Factor	Dig.	Year
231598430891	463196861783	12	~2020
231606701603	463213403207	12	~2020
231627272819	463254545639	12	~2020
231628727851	1871...103609	15	2025
231644516531	463289033063	12	~2020
231658380311	463316760623	12	~2020
231658722731	463317445463	12	~2020
231665132999	463330265999	12	~2020
231668418743	463336837487	12	~2020
231668923751	463337847503	12	~2020
231678910091	463357820183	12	~2020
231687622931	463375245863	12	~2020
231690370991	463380741983	12	~2020
231702247391	463404494783	12	~2020
231706785083	463413570167	12	~2020
231717070523	463434141047	12	~2020
231743245619	463486491239	12	~2020
231767132819	463534265639	12	~2020
231771387371	463542774743	12	~2020
231781636043	463563272087	12	~2020
231793754723	463587509447	12	~2020
231805218083	463610436167	12	~2020
231812178797	2549...667671	14	2024
231827565059	463655130119	12	~2020
231837090119	463674180239	12	~2020

Exponent	Prime Factor	Dig.	Year
231853888583	463707777167	12	~2020
231856865171	463713730343	12	~2020
231910624691	463821249383	12	~2020
231923088263	463846176527	12	~2020
231942848843	463885697687	12	~2020
231953408149	6568...877969	15	2025
231955029479	463910058959	12	~2020
231965058791	463930117583	12	~2020
231973291499	463946582999	12	~2020
231988901051	463977802103	12	~2020
231989684579	463979369159	12	~2020
232004202791	464008405583	12	~2020
232024182683	464048365367	12	~2020
232028801171	464057602343	12	~2020
232041801413	1020...621721	15	2025
232043586899	464087173799	12	~2020
232045105223	464090210447	12	~2020
232077755159	464155510319	12	~2020
232090364339	464180728679	12	~2020
232091932211	464183864423	12	~2020
232110208489	6081...624119	14	2023
232119889619	464239779239	12	~2020
232121278871	464242557743	12	~2020
232146663839	464293327679	12	~2020
232148465039	464296930079	12	~2020

5.366.787 digits

26-02-08