Small Mersenne Prime Factors (page 2850/5670)

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
145326323	290652647	9	~1995
145329539	290659079	9	~1995
145330897	871985383	9	~1996
145333043	290666087	9	~1995
145336283	290672567	9	~1995
145337519	290675039	9	~1995
145337663	290675327	9	~1995
145338059	24707470031	11	~1999
145341797	872050783	9	~1996
145344937	872069623	9	~1996
145346843	290693687	9	~1995
145347539	6104596639	10	~1998
145350563	290701127	9	~1995
145351831	5814073241	10	~1998
145352423	290704847	9	~1995
145354763	290709527	9	~1995
145357451	290714903	9	~1995
145358159	290716319	9	~1995
145358879	290717759	9	~1995
145359029	3488616697	10	~1997
145359323	290718647	9	~1995
145366271	290732543	9	~1995
145373321	1162986569	10	~1996
145380023	290760047	9	~1995
145382401	872294407	9	~1996

Exponent	Prime Factor	Digits	Year
145386029	7850845567	10	~1998
145390379	290780759	9	~1995
145391231	290782463	9	~1995
145392623	290785247	9	~1995
145407599	290815199	9	~1995
145410719	290821439	9	~1995
145413899	290827799	9	~1995
145416611	290833223	9	~1995
145421761	872530567	9	~1996
145423823	290847647	9	~1995
145424399	290848799	9	~1995
145424641	4362739231	10	~1998
145427363	290854727	9	~1995
145431131	290862263	9	~1995
145436339	290872679	9	~1995
145436771	17452412521	11	~1999
145438031	290876063	9	~1995
145438151	290876303	9	~1995
145443719	290887439	9	~1995
145450043	290900087	9	~1995
145450439	290900879	9	~1995
145451297	2036318159	10	~1997
145457783	290915567	9	~1995
145462631	290925263	9	~1995
145467659	290935319	9	~1995

Exponent	Prime Factor	Digits	Year
145467671	290935343	9	~1995
145468919	290937839	9	~1995
145472423	290944847	9	~1995
145476203	290952407	9	~1995
145478603	290957207	9	~1995
145479563	290959127	9	~1995
145483033	872898199	9	~1996
145483729	5819349161	10	~1998
145486877	1163895017	10	~1996
145488353	872930119	9	~1996
145498817	872992903	9	~1996
145504277	873025663	9	~1996
145509131	291018263	9	~1995
145510091	291020183	9	~1995
145511227	1455112271	10	~1996
145512863	291025727	9	~1995
145514423	291028847	9	~1995
145514903	291029807	9	~1995
145523243	291046487	9	~1995
145526831	291053663	9	~1995
145532333	873193999	9	~1996
145537811	291075623	9	~1995
145548563	291097127	9	~1995
145548719	291097439	9	~1995
145550423	291100847	9	~1995

Exponent	Prime Factor	Digits	Year
145553399	291106799	9	~1995
145553483	291106967	9	~1995
145557697	873346183	9	~1996
145558033	873348199	9	~1996
145558691	291117383	9	~1995
145559413	873356479	9	~1996
145559639	1164477113	10	~1996
145566601	873399607	9	~1996
145567297	3493615129	10	~1997
145567619	291135239	9	~1995
145568651	291137303	9	~1995
145569503	291139007	9	~1995
145572671	291145343	9	~1995
145573019	6114066799	10	~1998
145574201	1164593609	10	~1996
145575959	291151919	9	~1995
145576283	291152567	9	~1995
145579319	291158639	9	~1995
145582499	291164999	9	~1995
145585763	291171527	9	~1995
145586663	291173327	9	~1995
145587503	291175007	9	~1995
145590239	291180479	9	~1995
145593121	2329489937	10	~1997
145593493	873560959	9	~1996

5.366.787 digits

26-02-08