Small Mersenne Prime Factors (page 2943/5730)

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
164379359	328758719	9	~1995
164393113	986358679	9	~1996
164398463	328796927	9	~1995
164398547	1315188377	10	~1997
164405519	328811039	9	~1995
164416783	3946002793	10	~1998
164416801	986500807	9	~1996
164418097	986508583	9	~1996
164418341	986510047	9	~1996
164419313	986515879	9	~1996
164429939	328859879	9	~1995
164436323	328872647	9	~1995
164439923	328879847	9	~1995
164440739	328881479	9	~1995
164441521	986649127	9	~1996
164444851	2631117617	10	~1997
164447303	328894607	9	~1995
164450711	328901423	9	~1995
164453413	986720479	9	~1996
164453521	2631256337	10	~1997
164455799	328911599	9	~1995
164462939	328925879	9	~1995
164463419	328926839	9	~1995
164463983	328927967	9	~1995
164464787	1315718297	10	~1997

Exponent	Prime Factor	Digits	Year
164469743	328939487	9	~1995
164470703	328941407	9	~1995
164475929	1315807433	10	~1997
164476043	328952087	9	~1995
164477903	328955807	9	~1995
164478737	2302702319	10	~1997
164479157	986874943	9	~1996
164480999	328961999	9	~1995
164483623	1644836231	10	~1997
164490749	1315925993	10	~1997
164491571	328983143	9	~1995
164499317	986995903	9	~1996
164501977	987011863	9	~1996
164504471	329008943	9	~1995
164505779	329011559	9	~1995
164511313	3948271513	10	~1998
164515199	329030399	9	~1995
164515781	987094687	9	~1996
164516351	329032703	9	~1995
164525063	6910052647	10	~1998
164525951	329051903	9	~1995
164526917	987161503	9	~1996
164527523	329055047	9	~1995
164528459	329056919	9	~1995
164530031	329060063	9	~1995

Exponent	Prime Factor	Digits	Year
164532601	987195607	9	~1996
164534159	329068319	9	~1995
164535251	329070503	9	~1995
164536139	329072279	9	~1995
164536439	329072879	9	~1995
164536919	329073839	9	~1995
164538623	329077247	9	~1995
164542463	329084927	9	~1995
164547587	1316380697	10	~1997
164548343	329096687	9	~1995
164551169	2303716367	10	~1997
164554751	329109503	9	~1995
164555999	329111999	9	~1995
164560619	329121239	9	~1995
164561723	329123447	9	~1995
164566091	329132183	9	~1995
164570347	1645703471	10	~1997
164572619	329145239	9	~1995
164578763	329157527	9	~1995
164579347	2962428247	10	~1998
164583053	393353496671	12	~2003
164584391	329168783	9	~1995
164594993	2304329903	10	~1997
164597003	329194007	9	~1995
164599723	6913188367	10	~1998

Exponent	Prime Factor	Digits	Year
164602457	987614743	9	~1996
164602727	1316821817	10	~1997
164607491	329214983	9	~1995
164612243	329224487	9	~1995
164614319	329228639	9	~1995
164614559	329229119	9	~1995
164617763	329235527	9	~1995
164627017	987762103	9	~1996
164629523	4280367599	10	~1998
164634991	13500069263	11	~1999
164635711	6914699863	10	~1998
164638139	329276279	9	~1995
164638403	329276807	9	~1995
164639459	329278919	9	~1995
164639903	329279807	9	~1995
164641643	329283287	9	~1995
164647403	329294807	9	~1995
164653277	1317226217	10	~1997
164657579	329315159	9	~1995
164659919	329319839	9	~1995
164660159	329320319	9	~1995
164660939	329321879	9	~1995
164663099	329326199	9	~1995
164666951	329333903	9	~1995
164670431	329340863	9	~1995

5.426.516 digits

26-03-08