Small Mersenne Prime Factors (page 3116/5070)

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
418869323	837738647	9	~1998
418869719	837739439	9	~1998
418871617	2513229703	10	~1999
418878191	837756383	9	~1998
418879199	837758399	9	~1998
418880521	9215371463	10	~2001
418887277	2513323663	10	~1999
418903993	2513423959	10	~1999
418911131	837822263	9	~1998
418912139	837824279	9	~1998
418915823	837831647	9	~1998
418917839	837835679	9	~1998
418929239	837858479	9	~1998
418931543	837863087	9	~1998
418933103	837866207	9	~1998
418939739	837879479	9	~1998
418944809	5865227327	10	~2000
418949171	837898343	9	~1998
418949831	837899663	9	~1998
418971073	2513826439	10	~1999
418980817	2513884903	10	~1999
418984651	4189846511	10	~2000
418988543	837977087	9	~1998
418993319	3351946553	10	~2000
419007419	838014839	9	~1998

Exponent	Prime Factor	Digits	Year
419013659	3352109273	10	~2000
419024363	838048727	9	~1998
419045531	838091063	9	~1998
419057543	838115087	9	~1998
419059337	2514356023	10	~1999
419061037	2514366223	10	~1999
419063587	70402682617	11	~2003
419070191	838140383	9	~1998
419080637	3352645097	10	~2000
419102291	838204583	9	~1998
419106283	4191062831	10	~2000
419114639	10058751337	11	~2001
419128043	838256087	9	~1998
419131913	2514791479	10	~1999
419133497	2514800983	10	~1999
419136671	838273343	9	~1998
419137111	6706193777	10	~2001
419144591	838289183	9	~1998
419157971	838315943	9	~1998
419161283	838322567	9	~1998
419167153	12575014591	11	~2001
419167739	838335479	9	~1998
419169539	838339079	9	~1998
419171471	838342943	9	~1998
419175143	838350287	9	~1998

Exponent	Prime Factor	Digits	Year
419175899	838351799	9	~1998
419178971	838357943	9	~1998
419180579	838361159	9	~1998
419186377	6706982033	10	~2001
419193209	3353545673	10	~2000
419213141	2515278847	10	~1999
419227499	838454999	9	~1998
419246699	838493399	9	~1998
419261351	838522703	9	~1998
419261519	3354092153	10	~2000
419270521	20124985009	11	~2002
419272219	70437732793	11	~2003
419273333	2515639999	10	~1999
419277191	838554383	9	~1998
419286337	6708581393	10	~2001
419298959	838597919	9	~1998
419309783	838619567	9	~1998
419311523	838623047	9	~1998
419311979	838623959	9	~1998
419320619	838641239	9	~1998
419337911	838675823	9	~1998
419337953	2516027719	10	~1999
419424371	838848743	9	~1998
419427311	838854623	9	~1998
419432411	838864823	9	~1998

Exponent	Prime Factor	Digits	Year
419434229	5872079207	10	~2000
419444141	3355553129	10	~2000
419445253	2516671519	10	~1999
419446103	838892207	9	~1998
419465723	838931447	9	~1998
419470061	2516820367	10	~1999
419486423	838972847	9	~1998
419500093	2517000559	10	~1999
419501699	17619071359	11	~2002
419503583	839007167	9	~1998
419508263	839016527	9	~1998
419518559	839037119	9	~1998
419518997	2517113983	10	~1999
419548013	2517288079	10	~2000
419550503	839101007	9	~1998
419563093	6713009489	10	~2001
419584793	5874187103	10	~2000
419592007	20140416337	11	~2002
419598329	3356786633	10	~2000
419598359	839196719	9	~1998
419637539	839275079	9	~1998
419637983	839275967	9	~1998
419641091	839282183	9	~1998
419642039	839284079	9	~1998
419675339	839350679	9	~1998

4.768.925 digits

25-05-04