Small Mersenne Prime Factors (page 5062/5190)

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
175162758779	350325517559	12	~2019
175163710583	350327421167	12	~2019
175164185051	350328370103	12	~2019
175173636899	350347273799	12	~2019
175183562783	350367125567	12	~2019
175195714079	350391428159	12	~2019
175203036023	350406072047	12	~2019
175213070119	6623...504983	14	2023
175223940491	350447880983	12	~2019
175237242311	350474484623	12	~2019
175307380453	3166...098119	15	2023
175311103091	350622206183	12	~2019
175319090819	350638181639	12	~2019
175329182663	350658365327	12	~2019
175340425753	1683...872289	14	2024
175347218699	350694437399	12	~2019
175347467363	350694934727	12	~2019
175359423191	350718846383	12	~2019
175374110039	350748220079	12	~2019
175387706003	350775412007	12	~2019
175406465231	350812930463	12	~2019
175415728151	350831456303	12	~2019
175418761943	350837523887	12	~2019
175450541699	350901083399	12	~2019
175458266051	350916532103	12	~2019

Exponent	Prime Factor	Dig.	Year
175469521151	350939042303	12	~2019
175470635531	350941271063	12	~2019
175477038883	3544...854367	14	2023
175518019223	351036038447	12	~2019
175518488291	351036976583	12	~2019
175531005623	351062011247	12	~2019
175545000971	351090001943	12	~2019
175567657319	351135314639	12	~2019
175572593351	351145186703	12	~2019
175602039383	351204078767	12	~2019
175606296731	351212593463	12	~2019
175613306639	351226613279	12	~2019
175616054891	351232109783	12	~2019
175617872471	351235744943	12	~2019
175646904599	351293809199	12	~2019
175711133231	351422266463	12	~2019
175717176539	351434353079	12	~2019
175753083503	351506167007	12	~2019
175769516459	351539032919	12	~2019
175794857411	351589714823	12	~2019
175813730051	351627460103	12	~2019
175818473783	351636947567	12	~2019
175829022059	351658044119	12	~2019
175832223023	351664446047	12	~2019
175878450851	351756901703	12	~2019

Exponent	Prime Factor	Dig.	Year
175884828863	351769657727	12	~2019
175885524959	351771049919	12	~2019
175893991631	351787983263	12	~2019
175910040959	351820081919	12	~2019
175925225579	351850451159	12	~2019
175937831291	351875662583	12	~2019
175943439137	2779...383647	14	2024
175951207583	351902415167	12	~2019
175953648911	351907297823	12	~2019
175957920839	351915841679	12	~2019
175968979451	351937958903	12	~2019
175979716439	351959432879	12	~2019
175980972599	1830...150297	14	2024
176003636531	352007273063	12	~2019
176007089831	352014179663	12	~2019
176007411683	352014823367	12	~2019
176012942543	352025885087	12	~2019
176029697891	352059395783	12	~2019
176048435351	352096870703	12	~2019
176065227731	352130455463	12	~2019
176069589011	352139178023	12	~2019
176076749879	352153499759	12	~2019
176082564719	352165129439	12	~2019
176083878263	352167756527	12	~2019
176102522831	352205045663	12	~2019

Exponent	Prime Factor	Dig.	Year
176119634291	352239268583	12	~2019
176119760231	352239520463	12	~2019
176124376331	352248752663	12	~2019
176140388981	1514...452367	14	2024
176140820939	352281641879	12	~2019
176147215319	352294430639	12	~2019
176149074599	352298149199	12	~2019
176158217639	352316435279	12	~2019
176162278343	352324556687	12	~2019
176170059671	352340119343	12	~2019
176185481519	352370963039	12	~2019
176200032383	352400064767	12	~2019
176203292351	352406584703	12	~2019
176214593131	7506...673807	14	2025
176234940649	7317...574649	15	2025
176249605379	352499210759	12	~2019
176262951191	352525902383	12	~2019
176272470323	352544940647	12	~2019
176278643063	1124...561023	17	2023
176292272231	352584544463	12	~2019
176293283651	352586567303	12	~2019
176310101963	352620203927	12	~2019
176322036851	352644073703	12	~2019
176335812239	2151...093159	14	2024
176336548163	352673096327	12	~2019

4.888.230 digits

25-06-29