Small Mersenne Prime Factors (page 3085/5460)

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
264910879	44505027673	11	~2002
264916199	529832399	9	~1997
264918967	2649189671	10	~1999
264919043	529838087	9	~1997
264926293	1589557759	10	~1998
264929453	1589576719	10	~1998
264933479	529866959	9	~1997
264938327	6888396503	10	~2000
264941003	529882007	9	~1997
264956221	1589737327	10	~1998
264956773	1589740639	10	~1998
264965171	529930343	9	~1997
264972563	529945127	9	~1997
264973763	529947527	9	~1997
264975299	529950599	9	~1997
264984119	529968239	9	~1997
264990431	529980863	9	~1997
264993299	529986599	9	~1997
264998933	1589993599	10	~1998
265002431	530004863	9	~1997
265005659	530011319	9	~1997
265009499	530018999	9	~1997
265010099	530020199	9	~1997
265015319	530030639	9	~1997
265021873	1590131239	10	~1998

Exponent	Prime Factor	Digits	Year
265024379	530048759	9	~1997
265041503	530083007	9	~1997
265051499	530102999	9	~1997
265054799	530109599	9	~1997
265058219	530116439	9	~1997
265058947	4771061047	10	~1999
265059779	530119559	9	~1997
265063163	530126327	9	~1997
265066751	530133503	9	~1997
265066811	530133623	9	~1997
265066979	530133959	9	~1997
265067171	530134343	9	~1997
265067563	2650675631	10	~1999
265075697	1590454183	10	~1998
265076963	530153927	9	~1997
265081763	530163527	9	~1997
265096043	530192087	9	~1997
265106557	1590639343	10	~1998
265112483	530224967	9	~1997
265113239	530226479	9	~1997
265123931	530247863	9	~1997
265125083	530250167	9	~1997
265133699	530267399	9	~1997
265146023	530292047	9	~1997
265146353	6363512473	10	~1999

Exponent	Prime Factor	Digits	Year
265147199	530294399	9	~1997
265148909	8484765089	10	~2000
265167979	2651679791	10	~1999
265168919	530337839	9	~1997
265176839	530353679	9	~1997
265178279	530356559	9	~1997
265181201	1591087207	10	~1998
265182143	530364287	9	~1997
265190801	7955724031	10	~2000
265196903	530393807	9	~1997
265202243	530404487	9	~1997
265221017	2121768137	10	~1998
265222823	530445647	9	~1997
265228739	530457479	9	~1997
265230697	1591384183	10	~1998
265234523	530469047	9	~1997
265237991	530475983	9	~1997
265244233	1591465399	10	~1998
265246139	530492279	9	~1997
265253591	530507183	9	~1997
265255631	530511263	9	~1997
265256471	530512943	9	~1997
265258223	530516447	9	~1997
265262843	530525687	9	~1997
265265771	530531543	9	~1997

Exponent	Prime Factor	Digits	Year
265270633	1591623799	10	~1998
265273523	530547047	9	~1997
265274963	530549927	9	~1997
265275911	530551823	9	~1997
265288319	530576639	9	~1997
265292081	2122336649	10	~1998
265294751	530589503	9	~1997
265295843	530591687	9	~1997
265296491	530592983	9	~1997
265296643	9020085863	10	~2000
265303481	1591820887	10	~1998
265306799	530613599	9	~1997
265311239	4775602303	10	~1999
265318259	2122546073	10	~1998
265327019	530654039	9	~1997
265332679	2653326791	10	~1999
265338089	2122704713	10	~1998
265342331	530684663	9	~1997
265344419	530688839	9	~1997
265345739	530691479	9	~1997
265348691	530697383	9	~1997
265355999	4776407983	10	~1999
265378277	1592269663	10	~1998
265387141	1592322847	10	~1998
265390303	11146392727	11	~2000

5.157.210 digits

25-11-02