Small Mersenne Prime Factors (page 2838/5490)

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
162168449	2270358287	10	~1997
162168959	324337919	9	~1995
162173051	324346103	9	~1995
162179291	324358583	9	~1995
162181223	324362447	9	~1995
162181931	324363863	9	~1995
162181991	324363983	9	~1995
162184619	324369239	9	~1995
162185399	324370799	9	~1995
162189323	324378647	9	~1995
162195023	324390047	9	~1995
162199277	77855652961	11	~2001
162199619	1297596953	10	~1997
162205139	324410279	9	~1995
162205643	324411287	9	~1995
162207791	324415583	9	~1995
162208451	324416903	9	~1995
162219251	324438503	9	~1995
162224759	324449519	9	~1995
162224849	2271147887	10	~1997
162226349	1297810793	10	~1997
162226711	1622267111	10	~1997
162226721	973360327	9	~1996
162226871	324453743	9	~1995
162230069	1297840553	10	~1997

Exponent	Prime Factor	Digits	Year
162234071	324468143	9	~1995
162240803	324481607	9	~1995
162249239	324498479	9	~1995
162252841	973517047	9	~1996
162256291	1622562911	10	~1997
162257423	324514847	9	~1995
162258611	324517223	9	~1995
162258647	1298069177	10	~1997
162264301	973585807	9	~1996
162269423	324538847	9	~1995
162269563	1622695631	10	~1997
162269843	324539687	9	~1995
162270323	324540647	9	~1995
162271199	324542399	9	~1995
162271541	973629247	9	~1996
162273521	973641127	9	~1996
162281219	324562439	9	~1995
162281279	324562559	9	~1995
162282383	324564767	9	~1995
162284543	324569087	9	~1995
162286937	1298295497	10	~1997
162287849	1298302793	10	~1997
162290759	324581519	9	~1995
162295271	324590543	9	~1995
162298957	6491958281	10	~1998

Exponent	Prime Factor	Digits	Year
162301511	324603023	9	~1995
162304679	324609359	9	~1995
162308759	324617519	9	~1995
162309671	324619343	9	~1995
162312779	324625559	9	~1995
162315911	324631823	9	~1995
162318503	324637007	9	~1995
162318599	324637199	9	~1995
162319511	324639023	9	~1995
162323363	324646727	9	~1995
162323459	324646919	9	~1995
162323723	324647447	9	~1995
162328351	1623283511	10	~1997
162335843	324671687	9	~1995
162336203	324672407	9	~1995
162338303	324676607	9	~1995
162340943	324681887	9	~1995
162341213	974047279	9	~1996
162349763	324699527	9	~1995
162355799	324711599	9	~1995
162355871	324711743	9	~1995
162357577	974145463	9	~1996
162359243	324718487	9	~1995
162362471	324724943	9	~1995
162365531	324731063	9	~1995

Exponent	Prime Factor	Digits	Year
162366241	974197447	9	~1996
162369479	324738959	9	~1995
162370223	324740447	9	~1995
162370543	2597928689	10	~1997
162371039	324742079	9	~1995
162375571	1623755711	10	~1997
162376079	324752159	9	~1995
162383183	324766367	9	~1995
162386149	6495445961	10	~1998
162394451	324788903	9	~1995
162397271	324794543	9	~1995
162401159	324802319	9	~1995
162402503	324805007	9	~1995
162409931	324819863	9	~1995
162411323	324822647	9	~1995
162414179	324828359	9	~1995
162420899	324841799	9	~1995
162421691	324843383	9	~1995
162422207	1299377657	10	~1997
162426119	324852239	9	~1995
162428821	4872864631	10	~1998
162430187	1299441497	10	~1997
162439001	974634007	9	~1996
162441857	974651143	9	~1996
162444731	324889463	9	~1995

5.187.277 digits

25-11-17