Small Mersenne Prime Factors (page 2600/5040)

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
144685273	868111639	9	~1996
144685643	289371287	9	~1995
144692819	289385639	9	~1995
144698063	289396127	9	~1995
144698651	2604575719	10	~1997
144708251	289416503	9	~1995
144708719	289417439	9	~1995
144715139	289430279	9	~1995
144719843	289439687	9	~1995
144722891	1157783129	10	~1996
144722987	1157783897	10	~1996
144723083	289446167	9	~1995
144725183	289450367	9	~1995
144733091	289466183	9	~1995
144738809	1157910473	10	~1996
144741491	289482983	9	~1995
144742901	4631772833	10	~1998
144743299	6079218559	10	~1998
144744781	868468687	9	~1996
144750737	868504423	9	~1996
144753901	2316062417	10	~1997
144756413	49796206073	11	~2000
144756613	3474158713	10	~1997
144758303	289516607	9	~1995
144759911	289519823	9	~1995

Exponent	Prime Factor	Digits	Year
144760277	1158082217	10	~1996
144770459	289540919	9	~1995
144772583	289545167	9	~1995
144776921	868661527	9	~1996
144777851	289555703	9	~1995
144777911	289555823	9	~1995
144785167	2316562673	10	~1997
144795659	289591319	9	~1995
144799799	289599599	9	~1995
144806303	289612607	9	~1995
144808019	3475392457	10	~1997
144809183	289618367	9	~1995
144810587	1158484697	10	~1996
144811223	289622447	9	~1995
144813719	289627439	9	~1995
144821843	289643687	9	~1995
144823499	289646999	9	~1995
144825367	1448253671	10	~1996
144825959	289651919	9	~1995
144827279	289654559	9	~1995
144828011	289656023	9	~1995
144829829	1158638633	10	~1996
144831383	289662767	9	~1995
144832747	2606989447	10	~1997
144833177	4344995311	10	~1998

Exponent	Prime Factor	Digits	Year
144839111	289678223	9	~1995
144844079	289688159	9	~1995
144846133	869076799	9	~1996
144846683	289693367	9	~1995
144850379	289700759	9	~1995
144850859	289701719	9	~1995
144853411	1448534111	10	~1996
144861161	869166967	9	~1996
144862871	289725743	9	~1995
144866723	289733447	9	~1995
144869579	289739159	9	~1995
144870431	289740863	9	~1995
144870703	6084569527	10	~1998
144872323	1448723231	10	~1996
144879071	289758143	9	~1995
144880303	19703721209	11	~1999
144880559	289761119	9	~1995
144883169	1159065353	10	~1996
144887773	869326639	9	~1996
144887903	289775807	9	~1995
144890861	1159126889	10	~1996
144891023	289782047	9	~1995
144891449	1159131593	10	~1996
144892421	1159139369	10	~1996
144901469	2028620567	10	~1997

Exponent	Prime Factor	Digits	Year
144902423	289804847	9	~1995
144904499	289808999	9	~1995
144909059	289818119	9	~1995
144913283	289826567	9	~1995
144913859	289827719	9	~1995
144914401	869486407	9	~1996
144914831	289829663	9	~1995
144915971	289831943	9	~1995
144922201	3188288423	10	~1997
144926557	869559343	9	~1996
144928559	289857119	9	~1995
144932363	289864727	9	~1995
144934627	3478431049	10	~1997
144936419	289872839	9	~1995
144939253	869635519	9	~1996
144943871	289887743	9	~1995
144947339	289894679	9	~1995
144950501	869703007	9	~1996
144950837	2029311719	10	~1997
144952103	289904207	9	~1995
144955513	869733079	9	~1996
144955691	289911383	9	~1995
144956159	1159649273	10	~1996
144959219	289918439	9	~1995
144960239	289920479	9	~1995

4.739.325 digits

25-04-20