Small Mersenne Prime Factors (page 2947/5730)

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
165578723	331157447	9	~1995
165579059	331158119	9	~1995
165579761	1324638089	10	~1997
165584579	331169159	9	~1995
165587131	2980568359	10	~1998
165589871	331179743	9	~1995
165590279	331180559	9	~1995
165593423	331186847	9	~1995
165595141	4967854231	10	~1998
165605351	331210703	9	~1995
165613559	331227119	9	~1995
165615251	331230503	9	~1995
165623459	331246919	9	~1995
165625571	331251143	9	~1995
165628387	2981310967	10	~1998
165629111	331258223	9	~1995
165630911	331261823	9	~1995
165631439	2981365903	10	~1998
165645091	29484826199	11	~2000
165645731	331291463	9	~1995
165646531	1656465311	10	~1997
165648443	331296887	9	~1995
165653707	2650459313	10	~1997
165660611	331321223	9	~1995
165664931	331329863	9	~1995

Exponent	Prime Factor	Digits	Year
165665057	993990343	9	~1996
165665099	331330199	9	~1995
165665723	331331447	9	~1995
165666731	331333463	9	~1995
165667871	331335743	9	~1995
165672179	331344359	9	~1995
165672613	2650761809	10	~1997
165674393	994046359	9	~1996
165676397	994058383	9	~1996
165676591	10934655007	11	~1999
165680731	1656807311	10	~1997
165681479	331362959	9	~1995
165687059	331374119	9	~1995
165688811	331377623	9	~1995
165691283	331382567	9	~1995
165693841	994163047	9	~1996
165698759	331397519	9	~1995
165705983	331411967	9	~1995
165706967	3976967209	10	~1998
165707471	331414943	9	~1995
165716113	994296679	9	~1996
165722699	331445399	9	~1995
165724981	994349887	9	~1996
165730151	331460303	9	~1995
165732929	2320261007	10	~1997

Exponent	Prime Factor	Digits	Year
165740321	994441927	9	~1996
165742211	331484423	9	~1995
165746159	331492319	9	~1995
165747149	1325977193	10	~1997
165748867	1657488671	10	~1997
165749533	994497199	9	~1996
165750437	994502623	9	~1996
165761171	331522343	9	~1995
165763133	994578799	9	~1996
165765053	994590319	9	~1996
165767111	331534223	9	~1995
165773843	331547687	9	~1995
165775331	331550663	9	~1995
165777247	1657772471	10	~1997
165780103	1657801031	10	~1997
165786781	994720687	9	~1996
165796703	331593407	9	~1995
165803801	10279835663	11	~1999
165809129	1326473033	10	~1997
165813023	331626047	9	~1995
165816257	994897543	9	~1996
165817451	331634903	9	~1995
165818273	994909639	9	~1996
165825251	331650503	9	~1995
165829303	34824153631	11	~2000

Exponent	Prime Factor	Digits	Year
165839221	4975176631	10	~1998
165841801	995050807	9	~1996
165841943	331683887	9	~1995
165842291	331684583	9	~1995
165846731	331693463	9	~1995
165847463	331694927	9	~1995
165847823	331695647	9	~1995
165848939	331697879	9	~1995
165850361	995102167	9	~1996
165854677	2653674833	10	~1997
165859691	331719383	9	~1995
165861029	2322054407	10	~1997
165863723	331727447	9	~1995
165873371	331746743	9	~1995
165878819	331757639	9	~1995
165881459	331762919	9	~1995
165882683	331765367	9	~1995
165883087	1658830871	10	~1997
165883801	23555499743	11	~2000
165885809	3981259417	10	~1998
165901979	331803959	9	~1995
165903131	331806263	9	~1995
165905483	331810967	9	~1995
165906431	331812863	9	~1995
165907537	995445223	9	~1996

5.426.516 digits

26-03-08