Small Mersenne Prime Factors (page 3050/5205)

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
313669619	627339239	9	~1997
313683239	627366479	9	~1997
313684771	3136847711	10	~1999
313686251	627372503	9	~1997
313692563	627385127	9	~1997
313697981	2509583849	10	~1999
313702043	627404087	9	~1997
313706759	627413519	9	~1997
313707019	55839849383	11	~2002
313737323	627474647	9	~1997
313750117	1882500703	10	~1999
313753259	627506519	9	~1997
313753679	627507359	9	~1997
313764179	627528359	9	~1997
313772579	627545159	9	~1997
313778119	3137781191	10	~1999
313780583	627561167	9	~1997
313781183	627562367	9	~1997
313787339	627574679	9	~1997
313791637	1882749823	10	~1999
313801583	627603167	9	~1997
313812419	627624839	9	~1997
313814227	5021027633	10	~2000
313823987	8159423663	10	~2000
313824503	627649007	9	~1997

Exponent	Prime Factor	Digits	Year
313846079	627692159	9	~1997
313849381	1883096287	10	~1999
313853261	2510826089	10	~1999
313853999	627707999	9	~1997
313859471	627718943	9	~1997
313862167	3138621671	10	~1999
313868231	627736463	9	~1997
313870391	627740783	9	~1997
313870751	627741503	9	~1997
313874089	6905229959	10	~2000
313874591	627749183	9	~1997
313885031	627770063	9	~1997
313897823	627795647	9	~1997
313902731	627805463	9	~1997
313905853	1883435119	10	~1999
313908599	627817199	9	~1997
313913233	1883479399	10	~1999
313913339	627826679	9	~1997
313928521	5022856337	10	~2000
313938563	627877127	9	~1997
313960957	1883765743	10	~1999
313964879	627929759	9	~1997
313992851	627985703	9	~1997
314002499	628004999	9	~1997
314006783	628013567	9	~1997

Exponent	Prime Factor	Digits	Year
314009051	628018103	9	~1997
314010863	628021727	9	~1997
314011151	628022303	9	~1997
314013083	628026167	9	~1997
314019383	628038767	9	~1997
314029517	1884177103	10	~1999
314031383	628062767	9	~1997
314035817	1884214903	10	~1999
314040851	628081703	9	~1997
314041417	1884248503	10	~1999
314043731	628087463	9	~1997
314049611	628099223	9	~1997
314051161	1884306967	10	~1999
314056621	14446604567	11	~2001
314057363	628114727	9	~1997
314060183	23240453543	11	~2001
314064431	628128863	9	~1997
314073299	628146599	9	~1997
314074963	5025199409	10	~2000
314075903	628151807	9	~1997
314076803	628153607	9	~1997
314085743	628171487	9	~1997
314092319	628184639	9	~1997
314097101	34550681111	11	~2002
314100863	628201727	9	~1997

Exponent	Prime Factor	Digits	Year
314105471	628210943	9	~1997
314110523	628221047	9	~1997
314119703	628239407	9	~1997
314129891	628259783	9	~1997
314142329	4397992607	10	~1999
314142707	5654568727	10	~2000
314144471	628288943	9	~1997
314146439	628292879	9	~1997
314148547	12565941881	11	~2001
314150423	628300847	9	~1997
314155537	1884933223	10	~1999
314162591	628325183	9	~1997
314164307	5654957527	10	~2000
314164619	628329239	9	~1997
314166899	628333799	9	~1997
314167067	2513336537	10	~1999
314170739	628341479	9	~1997
314179751	628359503	9	~1997
314194031	628388063	9	~1997
314205851	628411703	9	~1997
314209277	1885255663	10	~1999
314213219	628426439	9	~1997
314249291	628498583	9	~1997
314255471	8170642247	10	~2000
314261999	628523999	9	~1997

4.903.097 digits

25-07-08