Small Mersenne Prime Factors (page 3045/5190)

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
315260579	630521159	9	~1997
315261731	630523463	9	~1997
315266051	630532103	9	~1997
315270311	630540623	9	~1997
315276173	1891657039	10	~1999
315311879	630623759	9	~1997
315347171	630694343	9	~1997
315352799	630705599	9	~1997
315352883	630705767	9	~1997
315356551	3153565511	10	~1999
315376499	630752999	9	~1997
315391247	2523129977	10	~1999
315403223	630806447	9	~1997
315405283	3154052831	10	~1999
315408251	630816503	9	~1997
315417191	630834383	9	~1997
315420527	5677569487	10	~2000
315422699	630845399	9	~1997
315426179	630852359	9	~1997
315427643	630855287	9	~1997
315444263	630888527	9	~1997
315445199	630890399	9	~1997
315446783	630893567	9	~1997
315453629	2523629033	10	~1999
315461651	630923303	9	~1997

Exponent	Prime Factor	Digits	Year
315472691	630945383	9	~1997
315473813	7571371513	10	~2000
315479663	630959327	9	~1997
315480491	630960983	9	~1997
315488051	630976103	9	~1997
315488879	630977759	9	~1997
315489599	630979199	9	~1997
315492563	630985127	9	~1997
315496513	1892979079	10	~1999
315505997	1893035983	10	~1999
315506291	631012583	9	~1997
315512237	7572293689	10	~2000
315525503	631051007	9	~1997
315535439	631070879	9	~1997
315543797	4417613159	10	~1999
315548531	631097063	9	~1997
315548963	631097927	9	~1997
315552299	631104599	9	~1997
315559043	631118087	9	~1997
315567443	631134887	9	~1997
315570383	631140767	9	~1997
315585899	631171799	9	~1997
315587399	631174799	9	~1997
315591599	631183199	9	~1997
315594803	631189607	9	~1997

Exponent	Prime Factor	Digits	Year
315603611	631207223	9	~1997
315612119	631224239	9	~1997
315614723	631229447	9	~1997
315617077	12624683081	11	~2001
315623111	631246223	9	~1997
315627671	631255343	9	~1997
315628403	631256807	9	~1997
315638663	631277327	9	~1997
315643817	1893862903	10	~1999
315663371	631326743	9	~1997
315665951	631331903	9	~1997
315687137	1894122823	10	~1999
315687661	1894125967	10	~1999
315703919	631407839	9	~1997
315711323	631422647	9	~1997
315714263	631428527	9	~1997
315717373	1894304239	10	~1999
315721979	631443959	9	~1997
315730979	631461959	9	~1997
315731723	631463447	9	~1997
315743423	631486847	9	~1997
315762371	631524743	9	~1997
315763139	631526279	9	~1997
315766043	631532087	9	~1997
315770431	3157704311	10	~1999

Exponent	Prime Factor	Digits	Year
315773329	59996932511	11	~2002
315774971	631549943	9	~1997
315777353	4420882943	10	~1999
315780119	631560239	9	~1997
315794603	631589207	9	~1997
315813613	1894881679	10	~1999
315818159	631636319	9	~1997
315818801	2526550409	10	~1999
315819683	631639367	9	~1997
315825491	631650983	9	~1997
315828061	6948217343	10	~2000
315846317	24636012727	11	~2001
315852983	631705967	9	~1997
315854041	1895124247	10	~1999
315856811	631713623	9	~1997
315859679	631719359	9	~1997
315866879	631733759	9	~1997
315877241	2527017929	10	~1999
315880199	631760399	9	~1997
315887063	631774127	9	~1997
315887471	631774943	9	~1997
315898559	631797119	9	~1997
315913319	631826639	9	~1997
315932219	631864439	9	~1997
315937201	1895623207	10	~1999

4.888.230 digits

25-06-29