Small Mersenne Prime Factors (page 3292/5850)

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
279987803	559975607	9	~1997
279991157	10639663967	11	~2000
279996281	1679977687	10	~1998
280002419	560004839	9	~1997
280004477	1680026863	10	~1998
280006087	18480401743	11	~2001
280011839	560023679	9	~1997
280014011	560028023	9	~1997
280018379	560036759	9	~1997
280023389	2240187113	10	~1998
280030601	1680183607	10	~1998
280035083	560070167	9	~1997
280040171	560080343	9	~1997
280049699	560099399	9	~1997
280059491	560118983	9	~1997
280067167	5041209007	10	~1999
280068913	1680413479	10	~1998
280076999	560153999	9	~1997
280090103	560180207	9	~1997
280101881	1680611287	10	~1998
280107071	560214143	9	~1997
280109339	560218679	9	~1997
280111757	1680670543	10	~1998
280111961	1680671767	10	~1998
280117499	560234999	9	~1997

Exponent	Prime Factor	Digits	Year
280119407	2240955257	10	~1998
280124597	1680747583	10	~1998
280126181	1680757087	10	~1998
280128743	560257487	9	~1997
280138499	560276999	9	~1997
280140863	560281727	9	~1997
280144583	560289167	9	~1997
280150571	560301143	9	~1997
280150823	560301647	9	~1997
280153121	1680918727	10	~1998
280156451	560312903	9	~1997
280160483	560320967	9	~1997
280161863	560323727	9	~1997
280164191	560328383	9	~1997
280165943	560331887	9	~1997
280179689	3922515647	10	~1999
280188907	6724533769	10	~2000
280196689	6724720537	10	~2000
280197611	560395223	9	~1997
280198511	560397023	9	~1997
280205363	560410727	9	~1997
280228271	560456543	9	~1997
280228841	1681373047	10	~1998
280233683	560467367	9	~1997
280236431	560472863	9	~1997

Exponent	Prime Factor	Digits	Year
280241723	560483447	9	~1997
280243763	560487527	9	~1997
280264571	560529143	9	~1997
280266827	2242134617	10	~1998
280268951	560537903	9	~1997
280278919	44844627041	11	~2002
280287353	1681724119	10	~1998
280290683	560581367	9	~1997
280295819	560591639	9	~1997
280314259	2803142591	10	~1999
280328327	5045909887	10	~1999
280332491	560664983	9	~1997
280338713	1682032279	10	~1998
280345277	1682071663	10	~1998
280345831	2803458311	10	~1999
280356179	560712359	9	~1997
280370459	560740919	9	~1997
280370801	2242966409	10	~1998
280378139	560756279	9	~1997
280380887	2243047097	10	~1998
280382653	4486122449	10	~1999
280390111	24674329769	11	~2001
280394743	6729473833	10	~2000
280399261	1682395567	10	~1998
280409183	560818367	9	~1997

Exponent	Prime Factor	Digits	Year
280409411	560818823	9	~1997
280412999	560825999	9	~1997
280417073	1682502439	10	~1998
280432027	6730368649	10	~2000
280441079	560882159	9	~1997
280445351	560890703	9	~1997
280448849	3926283887	10	~1999
280467443	560934887	9	~1997
280468271	560936543	9	~1997
280468931	5048440759	10	~1999
280473071	560946143	9	~1997
280490459	560980919	9	~1997
280514771	561029543	9	~1997
280529219	561058439	9	~1997
280529759	561059519	9	~1997
280531403	561062807	9	~1997
280531661	1683189967	10	~1998
280533959	561067919	9	~1997
280546943	561093887	9	~1997
280548743	561097487	9	~1997
280549933	1683299599	10	~1998
280558331	561116663	9	~1997
280568287	6733638889	10	~2000
280569851	561139703	9	~1997
280574117	3928037639	10	~1999

5.546.121 digits

26-05-03