Small Mersenne Prime Factors (page 2974/5190)

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
271152571	4880746279	10	~1999
271155281	2169242249	10	~1998
271156883	542313767	9	~1997
271160819	542321639	9	~1997
271161431	542322863	9	~1997
271161481	1626968887	10	~1998
271169891	542339783	9	~1997
271182391	4881283039	10	~1999
271194701	2169557609	10	~1998
271203071	542406143	9	~1997
271205219	542410439	9	~1997
271208999	542417999	9	~1997
271211579	542423159	9	~1997
271211821	4339389137	10	~1999
271211959	2712119591	10	~1999
271214543	542429087	9	~1997
271216331	542432663	9	~1997
271220171	542440343	9	~1997
271222361	2169778889	10	~1998
271222631	542445263	9	~1997
271245809	2169966473	10	~1998
271266581	1627599487	10	~1998
271283783	542567567	9	~1997
271284311	2170274489	10	~1998
271286003	542572007	9	~1997

Exponent	Prime Factor	Digits	Year
271290421	1627742527	10	~1998
271294931	542589863	9	~1997
271302719	2170421753	10	~1998
271303861	1627823167	10	~1998
271306171	2713061711	10	~1999
271312091	542624183	9	~1997
271322039	542644079	9	~1997
271324457	1627946743	10	~1998
271330181	2170641449	10	~1998
271342031	542684063	9	~1997
271345103	542690207	9	~1997
271354091	542708183	9	~1997
271356697	1628140183	10	~1998
271360091	542720183	9	~1997
271361039	542722079	9	~1997
271363031	4884534559	10	~1999
271364903	542729807	9	~1997
271366913	1628201479	10	~1998
271367483	542734967	9	~1997
271367909	3799150727	10	~1999
271377059	542754119	9	~1997
271378823	542757647	9	~1997
271383803	542767607	9	~1997
271397099	542794199	9	~1997
271403221	1628419327	10	~1998

Exponent	Prime Factor	Digits	Year
271411691	542823383	9	~1997
271414931	542829863	9	~1997
271416503	542833007	9	~1997
271430303	542860607	9	~1997
271445099	2171560793	10	~1998
271449313	4343189009	10	~1999
271459453	1628756719	10	~1998
271481531	542963063	9	~1997
271482461	1628894767	10	~1998
271502459	543004919	9	~1997
271509599	543019199	9	~1997
271519657	1629117943	10	~1998
271522949	2172183593	10	~1998
271524641	1629147847	10	~1998
271530323	543060647	9	~1997
271543379	543086759	9	~1997
271543403	543086807	9	~1997
271546477	1629278863	10	~1998
271547123	543094247	9	~1997
271548899	543097799	9	~1997
271550701	4344811217	10	~1999
271552223	543104447	9	~1997
271568749	45623549833	11	~2002
271573751	543147503	9	~1997
271575719	543151439	9	~1997

Exponent	Prime Factor	Digits	Year
271590131	543180263	9	~1997
271590899	543181799	9	~1997
271609463	543218927	9	~1997
271610459	543220919	9	~1997
271618199	543236399	9	~1997
271632611	543265223	9	~1997
271636583	543273167	9	~1997
271646159	543292319	9	~1997
271663079	543326159	9	~1997
271663751	4889947519	10	~1999
271673459	543346919	9	~1997
271704787	2717047871	10	~1999
271706777	1630240663	10	~1998
271710497	3803946959	10	~1999
271710623	543421247	9	~1997
271711283	543422567	9	~1997
271719599	543439199	9	~1997
271721759	543443519	9	~1997
271724891	543449783	9	~1997
271728797	2173830377	10	~1998
271728943	2717289431	10	~1999
271731611	543463223	9	~1997
271734563	543469127	9	~1997
271744717	12500256983	11	~2000
271744987	2717449871	10	~1999

4.888.230 digits

25-06-29