Small Mersenne Prime Factors (page 3766/5235)

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
1571193623	3142387247	10	~2003
1571198963	3142397927	10	~2003
1571215043	3142430087	10	~2003
1571297303	3142594607	10	~2003
1571313959	3142627919	10	~2003
1571334311	12570674489	11	~2004
1571347031	3142694063	10	~2003
1571405039	3142810079	10	~2003
1571421769	34571278919	11	~2005
1571434811	3142869623	10	~2003
1571466131	3142932263	10	~2003
1571473499	3142946999	10	~2003
1571483327	12571866617	11	~2004
1571509613	47145288391	11	~2006
1571568083	3143136167	10	~2003
1571601413	9429608479	10	~2004
1571621867	28289193607	11	~2005
1571655497	9429932983	10	~2004
1571702729	12573621833	11	~2004
1571728997	9430373983	10	~2004
1571813759	3143627519	10	~2003
1571827391	3143654783	10	~2003
1571917211	3143834423	10	~2003
1571940431	3143880863	10	~2003
1571971697	12575773577	11	~2004

Exponent	Prime Factor	Digits	Year
1572050113	37729202713	11	~2005
1572071843	3144143687	10	~2003
1572079919	3144159839	10	~2003
1572132491	3144264983	10	~2003
1572157799	3144315599	10	~2003
1572176003	3144352007	10	~2003
1572268499	3144536999	10	~2003
1572270671	3144541343	10	~2003
1572389971	25158239537	11	~2005
1572415811	3144831623	10	~2003
1572470051	3144940103	10	~2003
1572493453	9434960719	10	~2004
1572551759	3145103519	10	~2003
1572573311	3145146623	10	~2003
1572576179	3145152359	10	~2003
1572650687	103794945343	12	~2007
1572701771	3145403543	10	~2003
1572720803	78636040151	11	~2006
1572747251	3145494503	10	~2003
1572749771	3145499543	10	~2003
1572861299	3145722599	10	~2003
1572872417	9437234503	10	~2004
1572905759	3145811519	10	~2003
1572925691	3145851383	10	~2003
1572966797	37751203129	11	~2005

Exponent	Prime Factor	Digits	Year
1573070399	3146140799	10	~2003
1573209433	9439256599	10	~2004
1573218551	3146437103	10	~2003
1573226411	3146452823	10	~2003
1573234583	3146469167	10	~2003
1573257659	3146515319	10	~2003
1573262591	3146525183	10	~2003
1573267691	3146535383	10	~2003
1573340101	25173441617	11	~2005
1573454093	22028357303	11	~2005
1573473983	3146947967	10	~2003
1573505399	3147010799	10	~2003
1573519691	3147039383	10	~2003
1573631051	3147262103	10	~2003
1573701221	135338305007	12	~2007
1573723799	3147447599	10	~2003
1573728521	12589828169	11	~2004
1573874579	3147749159	10	~2003
1573991819	3147983639	10	~2003
1574124551	3148249103	10	~2003
1574196671	3148393343	10	~2003
1574267951	3148535903	10	~2003
1574372713	9446236279	10	~2004
1574509679	12596077433	11	~2004
1574530693	25192491089	11	~2005

Exponent	Prime Factor	Digits	Year
1574537351	3149074703	10	~2003
1574538281	12596306249	11	~2004
1574572451	3149144903	10	~2003
1574717999	3149435999	10	~2003
1574774483	3149548967	10	~2003
1574817737	12598541897	11	~2004
1574908661	9449451967	10	~2004
1574908987	37797815689	11	~2005
1574952517	9449715103	10	~2004
1575090877	63003635081	11	~2006
1575094273	9450565639	10	~2004
1575141371	3150282743	10	~2003
1575221423	3150442847	10	~2003
1575229091	3150458183	10	~2003
1575252671	3150505343	10	~2003
1575253633	9451521799	10	~2004
1575253859	3150507719	10	~2003
1575262499	3150524999	10	~2003
1575314759	3150629519	10	~2003
1575331091	3150662183	10	~2003
1575461339	3150922679	10	~2003
1575501671	3151003343	10	~2003
1575528263	3151056527	10	~2003
1575534071	3151068143	10	~2003
1575586763	3151173527	10	~2003

4.933.056 digits

25-07-20