Small Mersenne Prime Factors (page 3740/5160)

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
1655759593	9934557559	10	~2004
1655785259	3311570519	10	~2003
1655786591	3311573183	10	~2003
1655838659	3311677319	10	~2003
1655852519	3311705039	10	~2003
1655871839	3311743679	10	~2003
1655949623	3311899247	10	~2003
1656008219	3312016439	10	~2003
1656010991	3312021983	10	~2003
1656028331	3312056663	10	~2003
1656048263	3312096527	10	~2003
1656057059	3312114119	10	~2003
1656070211	3312140423	10	~2003
1656106547	13248852377	11	~2004
1656168911	3312337823	10	~2003
1656245639	3312491279	10	~2003
1656258683	3312517367	10	~2003
1656269963	3312539927	10	~2003
1656271079	3312542159	10	~2003
1656396233	9938377399	10	~2004
1656429497	9938576983	10	~2004
1656476929	89449754167	11	~2007
1656482843	3312965687	10	~2003
1656534947	29817629047	11	~2005
1656617519	3313235039	10	~2003

Exponent	Prime Factor	Digits	Year
1656631421	9939788527	10	~2004
1656636911	3313273823	10	~2003
1656664021	9939984127	10	~2004
1656714853	9940289119	10	~2004
1656861749	39764681977	11	~2006
1656884233	9941305399	10	~2004
1657056853	9942341119	10	~2004
1657112603	3314225207	10	~2003
1657247639	3314495279	10	~2003
1657257839	3314515679	10	~2003
1657377119	3314754239	10	~2003
1657382459	13259059673	11	~2004
1657388833	9944332999	10	~2004
1657436939	3314873879	10	~2003
1657536911	3315073823	10	~2003
1657644239	3315288479	10	~2003
1657656193	26522499089	11	~2005
1657709351	3315418703	10	~2003
1657710191	13261681529	11	~2004
1657728491	3315456983	10	~2003
1657731899	3315463799	10	~2003
1657835339	3315670679	10	~2003
1657900943	3315801887	10	~2003
1657907747	39789785929	11	~2006
1657972817	9947836903	10	~2004

Exponent	Prime Factor	Digits	Year
1657977731	3315955463	10	~2003
1658000111	3316000223	10	~2003
1658079803	3316159607	10	~2003
1658265599	3316531199	10	~2003
1658460623	3316921247	10	~2003
1658481239	3316962479	10	~2003
1658489039	3316978079	10	~2003
1658493989	13267951913	11	~2004
1658501081	9951006487	10	~2004
1658596237	9951577423	10	~2004
1658626283	3317252567	10	~2003
1658646217	9951877303	10	~2004
1658663483	3317326967	10	~2003
1658702579	3317405159	10	~2003
1658722319	3317444639	10	~2003
1658751023	3317502047	10	~2003
1658772023	3317544047	10	~2003
1658864951	3317729903	10	~2003
1658870077	9953220463	10	~2004
1658875499	3317750999	10	~2003
1658918231	3317836463	10	~2003
1658920811	3317841623	10	~2003
1658931503	3317863007	10	~2003
1658936183	3317872367	10	~2003
1658956703	3317913407	10	~2003

Exponent	Prime Factor	Digits	Year
1658992631	3317985263	10	~2003
1659034319	3318068639	10	~2003
1659039071	3318078143	10	~2003
1659048401	9954290407	10	~2004
1659166451	3318332903	10	~2003
1659384659	3318769319	10	~2003
1659391523	3318783047	10	~2003
1659404113	9956424679	10	~2004
1659405521	9956433127	10	~2004
1659444623	3318889247	10	~2003
1659467819	3318935639	10	~2003
1659500663	3319001327	10	~2003
1659563693	9957382159	10	~2004
1659575891	3319151783	10	~2003
1659609923	3319219847	10	~2003
1659630503	3319261007	10	~2003
1659722111	3319444223	10	~2003
1659795491	3319590983	10	~2003
1659796409	49793892271	11	~2006
1659830707	175942054943	12	~2007
1659873419	3319746839	10	~2003
1659913691	29878446439	11	~2005
1659961223	3319922447	10	~2003
1659989351	3319978703	10	~2003
1659990719	3319981439	10	~2003

4.858.378 digits

25-06-15