Small Mersenne Prime Factors (page 2868/5025)

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
255118459	10204738361	11	~2000
255121631	510243263	9	~1997
255131759	510263519	9	~1997
255136559	510273119	9	~1997
255138083	510276167	9	~1997
255149399	510298799	9	~1997
255153383	510306767	9	~1997
255159083	510318167	9	~1997
255161771	510323543	9	~1997
255163631	510327263	9	~1997
255171359	510342719	9	~1997
255179363	510358727	9	~1997
255181919	510363839	9	~1997
255196943	510393887	9	~1997
255206621	1531239727	10	~1998
255216191	510432383	9	~1997
255217031	510434063	9	~1997
255219131	510438263	9	~1997
255219551	510439103	9	~1997
255222239	510444479	9	~1997
255229283	510458567	9	~1997
255238871	510477743	9	~1997
255241271	510482543	9	~1997
255246311	510492623	9	~1997
255249307	2552493071	10	~1998

Exponent	Prime Factor	Digits	Year
255260053	4084160849	10	~1999
255266519	6126396457	10	~1999
255272093	1531632559	10	~1998
255273107	6126554569	10	~1999
255280451	510560903	9	~1997
255288743	12764437151	11	~2000
255289883	510579767	9	~1997
255290303	510580607	9	~1997
255298343	510596687	9	~1997
255301199	510602399	9	~1997
255301493	1531808959	10	~1998
255309863	510619727	9	~1997
255312803	510625607	9	~1997
255314879	510629759	9	~1997
255318179	510636359	9	~1997
255322979	510645959	9	~1997
255330059	510660119	9	~1997
255332531	510665063	9	~1997
255346697	1532080183	10	~1998
255349091	510698183	9	~1997
255353159	510706319	9	~1997
255353941	1532123647	10	~1998
255367019	510734039	9	~1997
255369311	510738623	9	~1997
255371777	20429742161	11	~2001

Exponent	Prime Factor	Digits	Year
255375311	510750623	9	~1997
255378083	510756167	9	~1997
255385499	2043083993	10	~1998
255386363	510772727	9	~1997
255394169	3575518367	10	~1999
255397277	1532383663	10	~1998
255398459	510796919	9	~1997
255400373	1532402239	10	~1998
255402599	510805199	9	~1997
255411083	510822167	9	~1997
255411419	510822839	9	~1997
255411899	4597414183	10	~1999
255451151	510902303	9	~1997
255452471	510904943	9	~1997
255453323	510906647	9	~1997
255458647	4598255647	10	~1999
255465299	510930599	9	~1997
255472883	510945767	9	~1997
255473831	510947663	9	~1997
255483659	6131607817	10	~1999
255484343	510968687	9	~1997
255484877	2043879017	10	~1998
255500153	1533000919	10	~1998
255502211	511004423	9	~1997
255509279	511018559	9	~1997

Exponent	Prime Factor	Digits	Year
255509977	1533059863	10	~1998
255512291	511024583	9	~1997
255516497	2044131977	10	~1998
255518803	4088300849	10	~1999
255528431	511056863	9	~1997
255529583	511059167	9	~1997
255532523	511065047	9	~1997
255532859	6132788617	10	~1999
255541619	511083239	9	~1997
255545161	1533270967	10	~1998
255547991	511095983	9	~1997
255550979	511101959	9	~1997
255551617	1533309703	10	~1998
255554723	511109447	9	~1997
255559751	511119503	9	~1997
255560531	511121063	9	~1997
255563579	2044508633	10	~1998
255591491	511182983	9	~1997
255610547	2044884377	10	~1998
255618971	511237943	9	~1997
255623273	1533739639	10	~1998
255633551	511267103	9	~1997
255636863	511273727	9	~1997
255640247	2045121977	10	~1998
255644959	2556449591	10	~1998

4.724.182 digits

25-04-13