Small Mersenne Prime Factors (page 2850/5070)

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
235116743	470233487	9	~1996
235121591	470243183	9	~1996
235123331	470246663	9	~1996
235124471	470248943	9	~1996
235130183	470260367	9	~1996
235134299	470268599	9	~1996
235134719	470269439	9	~1996
235135091	470270183	9	~1996
235140491	470280983	9	~1996
235147403	6113832479	10	~1999
235153591	2351535911	10	~1998
235154981	1410929887	10	~1998
235161373	1410968239	10	~1998
235167497	11288039857	11	~2000
235170899	470341799	9	~1996
235182113	3292549583	10	~1998
235182331	2351823311	10	~1998
235186631	470373263	9	~1996
235197119	1881576953	10	~1998
235198319	470396639	9	~1996
235204499	470408999	9	~1996
235221659	470443319	9	~1996
235225259	1881802073	10	~1998
235234291	2352342911	10	~1998
235237501	1411425007	10	~1998

Exponent	Prime Factor	Digits	Year
235239899	470479799	9	~1996
235248803	470497607	9	~1996
235250243	470500487	9	~1996
235252013	1411512079	10	~1998
235258139	470516279	9	~1996
235260107	1882080857	10	~1998
235262519	470525039	9	~1996
235268167	2352681671	10	~1998
235275479	470550959	9	~1996
235282199	470564399	9	~1996
235284593	3293984303	10	~1998
235288199	470576399	9	~1996
235288967	1882311737	10	~1998
235299419	470598839	9	~1996
235300931	470601863	9	~1996
235305677	1411834063	10	~1998
235323191	470646383	9	~1996
235324501	1411947007	10	~1998
235327439	470654879	9	~1996
235329209	3294608927	10	~1998
235329683	470659367	9	~1996
235330223	470660447	9	~1996
235335851	470671703	9	~1996
235338359	470676719	9	~1996
235338899	470677799	9	~1996

Exponent	Prime Factor	Digits	Year
235342571	470685143	9	~1996
235349693	1412098159	10	~1998
235359419	470718839	9	~1996
235362833	1412176999	10	~1998
235362923	470725847	9	~1996
235366559	470733119	9	~1996
235366679	470733359	9	~1996
235375103	470750207	9	~1996
235380809	93681561983	11	~2002
235389083	470778167	9	~1996
235400939	470801879	9	~1996
235408403	470816807	9	~1996
235424617	3766793873	10	~1999
235427711	470855423	9	~1996
235428239	470856479	9	~1996
235432451	470864903	9	~1996
235435229	16951336489	11	~2000
235437827	1883502617	10	~1998
235439423	470878847	9	~1996
235448957	1412693743	10	~1998
235449443	470898887	9	~1996
235449959	4238099263	10	~1999
235452383	470904767	9	~1996
235454651	470909303	9	~1996
235461431	470922863	9	~1996

Exponent	Prime Factor	Digits	Year
235471679	470943359	9	~1996
235474741	1412848447	10	~1998
235488443	470976887	9	~1996
235489451	1883915609	10	~1998
235498163	470996327	9	~1996
235503659	471007319	9	~1996
235506191	471012383	9	~1996
235509797	1413058783	10	~1998
235512731	471025463	9	~1996
235513871	471027743	9	~1996
235515179	7536485729	10	~1999
235516559	471033119	9	~1996
235516643	471033287	9	~1996
235521581	1884172649	10	~1998
235526519	471053039	9	~1996
235536263	471072527	9	~1996
235554239	471108479	9	~1996
235556039	471112079	9	~1996
235562477	1884499817	10	~1998
235563599	471127199	9	~1996
235567583	471135167	9	~1996
235587563	471175127	9	~1996
235596983	471193967	9	~1996
235597643	471195287	9	~1996
235608671	471217343	9	~1996

4.768.925 digits

25-05-04