Small Mersenne Prime Factors (page 2642/5070)

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	Digits	Year
153653173	921919039	9	~1996
153653543	307307087	9	~1995
153660179	307320359	9	~1995
153665819	307331639	9	~1995
153667637	3688023289	10	~1998
153669121	922014727	9	~1996
153676709	5839714943	10	~1998
153678071	307356143	9	~1995
153680117	1229440937	10	~1996
153691841	922151047	9	~1996
153694031	307388063	9	~1995
153698423	307396847	9	~1995
153707423	307414847	9	~1995
153710807	1229686457	10	~1996
153711101	1229688809	10	~1996
153719843	307439687	9	~1995
153721583	307443167	9	~1995
153725617	922353703	9	~1996
153732863	307465727	9	~1995
153735551	307471103	9	~1995
153736031	307472063	9	~1995
153737651	307475303	9	~1995
153741743	307483487	9	~1995
153742163	307484327	9	~1995
153744763	2459916209	10	~1997

Exponent	Prime Factor	Digits	Year
153745741	3382406303	10	~1997
153749471	307498943	9	~1995
153750539	307501079	9	~1995
153753311	307506623	9	~1995
153754889	1230039113	10	~1996
153757033	922542199	9	~1996
153761557	3690277369	10	~1998
153767051	307534103	9	~1995
153777779	307555559	9	~1995
153780983	307561967	9	~1995
153782411	307564823	9	~1995
153785531	307571063	9	~1995
153798839	307597679	9	~1995
153803371	2768460679	10	~1997
153806351	307612703	9	~1995
153808859	1230470873	10	~1996
153812159	307624319	9	~1995
153815461	922892767	9	~1996
153822743	307645487	9	~1995
153826919	307653839	9	~1995
153827117	2153579639	10	~1997
153827291	307654583	9	~1995
153828953	922973719	9	~1996
153833363	307666727	9	~1995
153841931	1230735449	10	~1996

Exponent	Prime Factor	Digits	Year
153844367	1230754937	10	~1996
153847471	1538474711	10	~1997
153852053	923112319	9	~1996
153854243	307708487	9	~1995
153854303	307708607	9	~1995
153858553	923151319	9	~1996
153862991	307725983	9	~1995
153865001	923190007	9	~1996
153865813	923194879	9	~1996
153866519	307733039	9	~1995
153881831	307763663	9	~1995
153881837	5847509807	10	~1998
153882803	4924249697	10	~1998
153883801	2462140817	10	~1997
153884587	1538845871	10	~1997
153884981	1231079849	10	~1996
153891937	923351623	9	~1996
153897839	307795679	9	~1995
153905309	23085796351	11	~2000
153905651	307811303	9	~1995
153906191	307812383	9	~1995
153909263	307818527	9	~1995
153910271	307820543	9	~1995
153922319	307844639	9	~1995
153926711	307853423	9	~1995

Exponent	Prime Factor	Digits	Year
153935471	307870943	9	~1995
153937163	307874327	9	~1995
153939601	923637607	9	~1996
153940379	307880759	9	~1995
153941699	307883399	9	~1995
153942071	1231536569	10	~1996
153942671	307885343	9	~1995
153943379	307886759	9	~1995
153946207	9852557249	10	~1999
153950813	923704879	9	~1996
153953291	307906583	9	~1995
153953777	923722663	9	~1996
153955237	923731423	9	~1996
153956303	307912607	9	~1995
153968891	307937783	9	~1995
153976211	307952423	9	~1995
153976379	307952759	9	~1995
153978179	307956359	9	~1995
153979207	2463667313	10	~1997
153985703	307971407	9	~1995
153990983	307981967	9	~1995
153992759	307985519	9	~1995
154004771	308009543	9	~1995
154006379	308012759	9	~1995
154006681	924040087	9	~1996

4.768.925 digits

25-05-04