Small Mersenne Prime Factors (page 2954/5025)

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
306778739	613557479	9	~1997
306814883	613629767	9	~1997
306834113	1841004679	10	~1998
306834383	613668767	9	~1997
306837857	1841027143	10	~1998
306838079	613676159	9	~1997
306842099	613684199	9	~1997
306846623	613693247	9	~1997
306860903	613721807	9	~1997
306865451	613730903	9	~1997
306866531	613733063	9	~1997
306870659	613741319	9	~1997
306872299	3068722991	10	~1999
306875819	613751639	9	~1997
306877663	3068776631	10	~1999
306878687	2455029497	10	~1999
306893507	5524083127	10	~2000
306895703	613791407	9	~1997
306896279	5524133023	10	~2000
306899819	613799639	9	~1997
306917399	613834799	9	~1997
306923413	1841540479	10	~1998
306924659	613849319	9	~1997
306927983	613855967	9	~1997
306930433	1841582599	10	~1998

Exponent	Prime Factor	Digits	Year
306930973	4910895569	10	~1999
306933383	613866767	9	~1997
306942791	613885583	9	~1997
306967403	613934807	9	~1997
306967597	1841805583	10	~1998
306970151	613940303	9	~1997
306977039	613954079	9	~1997
306977843	613955687	9	~1997
306982883	613965767	9	~1997
306986063	20261080159	11	~2001
306994861	1841969167	10	~1998
307000303	3070003031	10	~1999
307008731	614017463	9	~1997
307010339	614020679	9	~1997
307014299	614028599	9	~1997
307034531	614069063	9	~1997
307035959	614071919	9	~1997
307037723	614075447	9	~1997
307041671	614083343	9	~1997
307042271	614084543	9	~1997
307054093	1842324559	10	~1998
307054691	614109383	9	~1997
307055939	614111879	9	~1997
307078301	1842469807	10	~1998
307095683	614191367	9	~1997

Exponent	Prime Factor	Digits	Year
307096343	614192687	9	~1997
307096451	614192903	9	~1997
307115579	614231159	9	~1997
307122181	14741864689	11	~2001
307124879	614249759	9	~1997
307127813	4299789383	10	~1999
307137899	614275799	9	~1997
307139879	614279759	9	~1997
307150163	93987949879	11	~2003
307155689	4300179647	10	~1999
307160761	1842964567	10	~1998
307163891	614327783	9	~1997
307164131	614328263	9	~1997
307164457	4914631313	10	~1999
307179863	614359727	9	~1997
307187351	614374703	9	~1997
307197983	614395967	9	~1997
307200119	614400239	9	~1997
307205999	5529707983	10	~2000
307208731	3072087311	10	~1999
307209323	614418647	9	~1997
307233191	614466383	9	~1997
307236851	614473703	9	~1997
307240799	614481599	9	~1997
307254203	614508407	9	~1997

Exponent	Prime Factor	Digits	Year
307267139	614534279	9	~1997
307282511	614565023	9	~1997
307290779	614581559	9	~1997
307308539	614617079	9	~1997
307331243	614662487	9	~1997
307340459	614680919	9	~1997
307342547	2458740377	10	~1999
307351223	614702447	9	~1997
307352293	14138205479	11	~2001
307371983	614743967	9	~1997
307375823	614751647	9	~1997
307382711	614765423	9	~1997
307390859	614781719	9	~1997
307391299	3073912991	10	~1999
307397683	4918362929	10	~1999
307407239	614814479	9	~1997
307419263	614838527	9	~1997
307427741	1844566447	10	~1998
307427831	614855663	9	~1997
307446941	1844681647	10	~1998
307449371	614898743	9	~1997
307454711	614909423	9	~1997
307464389	2459715113	10	~1999
307464791	614929583	9	~1997
307469777	1844818663	10	~1998

4.724.182 digits

25-04-13