Small Mersenne Prime Factors (page 2894/5460)

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
184193939	368387879	9	~1996
184202339	368404679	9	~1996
184204523	368409047	9	~1996
184209359	368418719	9	~1996
184210421	1105262527	10	~1997
184211171	368422343	9	~1996
184217681	1473741449	10	~1997
184226963	368453927	9	~1996
184234571	10317135977	11	~1999
184240607	1473924857	10	~1997
184241171	368482343	9	~1996
184241951	368483903	9	~1996
184244591	368489183	9	~1996
184250903	368501807	9	~1996
184253039	368506079	9	~1996
184262443	4422298633	10	~1998
184265423	368530847	9	~1996
184266437	1105598623	10	~1997
184266611	368533223	9	~1996
184269671	368539343	9	~1996
184273451	368546903	9	~1996
184273561	1105641367	10	~1997
184274591	368549183	9	~1996
184276451	368552903	9	~1996
184283119	6265626047	10	~1999

Exponent	Prime Factor	Digits	Year
184285163	368570327	9	~1996
184287359	368574719	9	~1996
184289123	368578247	9	~1996
184289159	368578319	9	~1996
184299191	368598383	9	~1996
184301459	368602919	9	~1996
184305791	368611583	9	~1996
184306301	1105837807	10	~1997
184307003	368614007	9	~1996
184311119	368622239	9	~1996
184317251	368634503	9	~1996
184318559	368637119	9	~1996
184321271	368642543	9	~1996
184321283	368642567	9	~1996
184329059	368658119	9	~1996
184329479	368658959	9	~1996
184333559	368667119	9	~1996
184336259	368672519	9	~1996
184341851	368683703	9	~1996
184345361	1106072167	10	~1997
184354619	368709239	9	~1996
184357157	1106142943	10	~1997
184360271	368720543	9	~1996
184362179	368724359	9	~1996
184363391	368726783	9	~1996

Exponent	Prime Factor	Digits	Year
184366271	368732543	9	~1996
184375091	368750183	9	~1996
184386971	368773943	9	~1996
184405223	368810447	9	~1996
184406699	368813399	9	~1996
184408603	2950537649	10	~1998
184413191	368826383	9	~1996
184418603	368837207	9	~1996
184426031	368852063	9	~1996
184430723	368861447	9	~1996
184431053	1106586319	10	~1997
184432579	3319786423	10	~1998
184432691	368865383	9	~1996
184432763	368865527	9	~1996
184435211	368870423	9	~1996
184449143	368898287	9	~1996
184459013	4427016313	10	~1998
184461059	368922119	9	~1996
184462609	5533878271	10	~1998
184463003	368926007	9	~1996
184465363	1844653631	10	~1997
184467611	368935223	9	~1996
184472531	368945063	9	~1996
184479719	368959439	9	~1996
184480031	368960063	9	~1996

Exponent	Prime Factor	Digits	Year
184484411	368968823	9	~1996
184491193	1106947159	10	~1997
184497479	368994959	9	~1996
184503419	369006839	9	~1996
184503877	1107023263	10	~1997
184504547	8856218257	10	~1999
184506719	369013439	9	~1996
184508279	369016559	9	~1996
184513859	369027719	9	~1996
184514831	369029663	9	~1996
184516901	1107101407	10	~1997
184517351	369034703	9	~1996
184517951	369035903	9	~1996
184518197	2583254759	10	~1998
184522379	369044759	9	~1996
184525877	1476207017	10	~1997
184526411	369052823	9	~1996
184526759	369053519	9	~1996
184528697	1476229577	10	~1997
184529099	369058199	9	~1996
184531883	4428765193	10	~1998
184535423	369070847	9	~1996
184538531	369077063	9	~1996
184547651	369095303	9	~1996
184548473	1107290839	10	~1997

5.157.210 digits

25-11-02