Small Mersenne Prime Factors (page 2904/5025)

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
275006401	1650038407	10	~1998
275007613	1650045679	10	~1998
275019539	550039079	9	~1997
275034803	550069607	9	~1997
275037071	550074143	9	~1997
275038139	550076279	9	~1997
275050091	550100183	9	~1997
275053837	1650323023	10	~1998
275053997	2200431977	10	~1998
275058347	13202800657	11	~2000
275058811	2750588111	10	~1999
275061179	550122359	9	~1997
275062043	550124087	9	~1997
275066063	550132127	9	~1997
275066471	550132943	9	~1997
275067563	550135127	9	~1997
275079671	550159343	9	~1997
275084651	550169303	9	~1997
275086793	1650520759	10	~1998
275091731	550183463	9	~1997
275116757	3851634599	10	~1999
275124263	6602982313	10	~2000
275136611	550273223	9	~1997
275144459	550288919	9	~1997
275144591	550289183	9	~1997

Exponent	Prime Factor	Digits	Year
275148479	550296959	9	~1997
275151743	550303487	9	~1997
275159459	550318919	9	~1997
275161739	26965850423	11	~2001
275164451	550328903	9	~1997
275167643	550335287	9	~1997
275182847	2201462777	10	~1998
275190857	1651145143	10	~1998
275192531	550385063	9	~1997
275220551	550441103	9	~1997
275223437	1651340623	10	~1998
275239619	550479239	9	~1997
275243159	550486319	9	~1997
275245643	550491287	9	~1997
275247397	4403958353	10	~1999
275248637	1651491823	10	~1998
275249413	1651496479	10	~1998
275249963	550499927	9	~1997
275255819	550511639	9	~1997
275258843	550517687	9	~1997
275259599	550519199	9	~1997
275259739	2752597391	10	~1999
275285051	550570103	9	~1997
275294111	550588223	9	~1997
275301623	550603247	9	~1997

Exponent	Prime Factor	Digits	Year
275306873	3854296223	10	~1999
275314043	550628087	9	~1997
275316323	550632647	9	~1997
275328023	550656047	9	~1997
275331239	550662479	9	~1997
275334971	550669943	9	~1997
275348831	550697663	9	~1997
275357933	1652147599	10	~1998
275376071	550752143	9	~1997
275381063	550762127	9	~1997
275382119	550764239	9	~1997
275395511	7160283287	10	~2000
275400803	550801607	9	~1997
275401391	550802783	9	~1997
275410391	550820783	9	~1997
275423089	21483000943	11	~2001
275426699	550853399	9	~1997
275433083	550866167	9	~1997
275481803	643525491809	12	~2004
275498477	2203987817	10	~1998
275504171	551008343	9	~1997
275508899	551017799	9	~1997
275514779	551029559	9	~1997
275515969	8265479071	10	~2000
275523623	551047247	9	~1997

Exponent	Prime Factor	Digits	Year
275525951	551051903	9	~1997
275542109	2204336873	10	~1998
275549831	551099663	9	~1997
275552663	551105327	9	~1997
275555123	551110247	9	~1997
275573939	551147879	9	~1997
275581231	4960462159	10	~1999
275582243	551164487	9	~1997
275588639	551177279	9	~1997
275591203	2755912031	10	~1999
275598419	551196839	9	~1997
275600411	551200823	9	~1997
275639557	1653837343	10	~1998
275669291	551338583	9	~1997
275674823	551349647	9	~1997
275678861	1654073167	10	~1998
275687651	551375303	9	~1997
275694697	13233345457	11	~2000
275702099	551404199	9	~1997
275710661	1654263967	10	~1998
275711699	551423399	9	~1997
275712191	551424383	9	~1997
275725871	2205806969	10	~1998
275726543	551453087	9	~1997
275727383	551454767	9	~1997

4.724.182 digits

25-04-13