Small Mersenne Prime Factors (page 2967/5205)

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
263470859	526941719	9	~1997
263485979	526971959	9	~1997
263495777	1580974663	10	~1998
263496377	1580978263	10	~1998
263509619	527019239	9	~1997
263510099	4743181783	10	~1999
263522411	527044823	9	~1997
263529179	527058359	9	~1997
263529401	1581176407	10	~1998
263540243	527080487	9	~1997
263544719	527089439	9	~1997
263551271	14758871177	11	~2000
263554103	527108207	9	~1997
263558831	527117663	9	~1997
263568191	527136383	9	~1997
263570999	527141999	9	~1997
263578019	527156039	9	~1997
263586439	4744555903	10	~1999
263596439	527192879	9	~1997
263603779	2636037791	10	~1998
263616623	527233247	9	~1997
263619817	1581718903	10	~1998
263623873	1581743239	10	~1998
263629451	527258903	9	~1997
263635019	527270039	9	~1997

Exponent	Prime Factor	Digits	Year
263640959	527281919	9	~1997
263652971	527305943	9	~1997
263659199	527318399	9	~1997
263660003	527320007	9	~1997
263661539	527323079	9	~1997
263680541	2109444329	10	~1998
263683943	527367887	9	~1997
263695541	1582173247	10	~1998
263704559	527409119	9	~1997
263705723	527411447	9	~1997
263706203	527412407	9	~1997
263716031	527432063	9	~1997
263721779	527443559	9	~1997
263726531	527453063	9	~1997
263727251	527454503	9	~1997
263733059	527466119	9	~1997
263739083	527478167	9	~1997
263739677	1582438063	10	~1998
263740811	6857261087	10	~1999
263746019	527492039	9	~1997
263746331	527492663	9	~1997
263750939	527501879	9	~1997
263751023	527502047	9	~1997
263754899	527509799	9	~1997
263757341	2110058729	10	~1998

Exponent	Prime Factor	Digits	Year
263763371	527526743	9	~1997
263763431	527526863	9	~1997
263766361	1582598167	10	~1998
263766479	527532959	9	~1997
263770319	527540639	9	~1997
263772961	1582637767	10	~1998
263802037	4220832593	10	~1999
263810669	3693349367	10	~1999
263815823	527631647	9	~1997
263829959	527659919	9	~1997
263834071	23217398249	11	~2001
263835893	1583015359	10	~1998
263837507	2110700057	10	~1998
263853971	2110831769	10	~1998
263854523	527709047	9	~1997
263868023	527736047	9	~1997
263880971	527761943	9	~1997
263882291	527764583	9	~1997
263883497	3694368959	10	~1999
263884823	527769647	9	~1997
263887451	527774903	9	~1997
263894377	1583366263	10	~1998
263906413	16890010433	11	~2000
263910791	527821583	9	~1997
263916833	1583500999	10	~1998

Exponent	Prime Factor	Digits	Year
263926583	527853167	9	~1997
263927221	4222835537	10	~1999
263929079	527858159	9	~1997
263932147	2639321471	10	~1998
263932379	527864759	9	~1997
263934371	527868743	9	~1997
263937071	4750867279	10	~1999
263944211	527888423	9	~1997
263954129	2111633033	10	~1998
263964923	527929847	9	~1997
263967659	527935319	9	~1997
263968931	527937863	9	~1997
263972231	527944463	9	~1997
263983451	527966903	9	~1997
263984771	527969543	9	~1997
263987519	527975039	9	~1997
263988667	2639886671	10	~1998
263989079	527978159	9	~1997
263990443	2639904431	10	~1998
263990843	527981687	9	~1997
264009041	1584054247	10	~1998
264012071	528024143	9	~1997
264012851	528025703	9	~1997
264017423	528034847	9	~1997
264021431	528042863	9	~1997

4.903.097 digits

25-07-08