Small Mersenne Prime Factors (page 2868/5205)

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
215762243	431524487	9	~1996
215764511	431529023	9	~1996
215776031	431552063	9	~1996
215780753	3020930543	10	~1998
215795903	431591807	9	~1996
215803711	2158037111	10	~1998
215810459	431620919	9	~1996
215813879	431627759	9	~1996
215815253	1294891519	10	~1997
215820239	431640479	9	~1996
215825651	431651303	9	~1996
215839997	1295039983	10	~1997
215842559	431685119	9	~1996
215862851	431725703	9	~1996
215869019	431738039	9	~1996
215872439	431744879	9	~1996
215874023	431748047	9	~1996
215882483	431764967	9	~1996
215884027	3885912487	10	~1998
215885171	431770343	9	~1996
215887151	431774303	9	~1996
215889491	431778983	9	~1996
215901431	431802863	9	~1996
215907899	431815799	9	~1996
215911799	431823599	9	~1996

Exponent	Prime Factor	Digits	Year
215914507	3886461127	10	~1998
215919419	9068615599	10	~1999
215930171	431860343	9	~1996
215932583	431865167	9	~1996
215936663	431873327	9	~1996
215937391	3454998257	10	~1998
215945531	431891063	9	~1996
215951423	431902847	9	~1996
215951441	1295708647	10	~1997
215955037	20299773479	11	~2000
215958923	431917847	9	~1996
215961721	1295770327	10	~1997
215964409	5183145817	10	~1999
215973743	431947487	9	~1996
215988131	431976263	9	~1996
215990399	431980799	9	~1996
215990921	1295945527	10	~1997
215993861	1295963167	10	~1997
215995397	1295972383	10	~1997
216007919	432015839	9	~1996
216010451	432020903	9	~1996
216016991	432033983	9	~1996
216017981	1296107887	10	~1997
216018611	432037223	9	~1996
216020279	432040559	9	~1996

Exponent	Prime Factor	Digits	Year
216026003	432052007	9	~1996
216031831	22899374087	11	~2000
216035903	432071807	9	~1996
216037693	1296226159	10	~1997
216039539	432079079	9	~1996
216041467	7345409879	10	~1999
216043031	432086063	9	~1996
216043981	1296263887	10	~1997
216050459	432100919	9	~1996
216051217	1296307303	10	~1997
216053111	432106223	9	~1996
216054119	432108239	9	~1996
216063301	1296379807	10	~1997
216063983	432127967	9	~1996
216068053	1296408319	10	~1997
216069851	432139703	9	~1996
216072293	13396482167	11	~2000
216073283	432146567	9	~1996
216075071	432150143	9	~1996
216087929	1728703433	10	~1998
216094031	432188063	9	~1996
216119363	432238727	9	~1996
216121679	432243359	9	~1996
216122807	1728982457	10	~1998
216131771	432263543	9	~1996

Exponent	Prime Factor	Digits	Year
216134459	432268919	9	~1996
216140063	432280127	9	~1996
216142691	432285383	9	~1996
216149579	432299159	9	~1996
216152411	432304823	9	~1996
216153251	432306503	9	~1996
216167387	1729339097	10	~1998
216170639	432341279	9	~1996
216174011	432348023	9	~1996
216176591	432353183	9	~1996
216179759	432359519	9	~1996
216183251	432366503	9	~1996
216186143	432372287	9	~1996
216189203	432378407	9	~1996
216195191	432390383	9	~1996
216197843	432395687	9	~1996
216199199	432398399	9	~1996
216211343	432422687	9	~1996
216212939	432425879	9	~1996
216216683	432433367	9	~1996
216220241	1297321447	10	~1997
216240329	1729922633	10	~1998
216240803	432481607	9	~1996
216249751	2162497511	10	~1998
216253259	1730026073	10	~1998

4.903.097 digits

25-07-08