Small Mersenne Prime Factors (page 2640/5070)

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
153049271	306098543	9	~1995
153056303	306112607	9	~1995
153060493	2448967889	10	~1997
153063923	306127847	9	~1995
153064679	306129359	9	~1995
153070271	306140543	9	~1995
153073391	306146783	9	~1995
153078119	306156239	9	~1995
153090383	306180767	9	~1995
153092759	306185519	9	~1995
153096299	306192599	9	~1995
153097277	918583663	9	~1996
153102023	306204047	9	~1995
153105191	306210383	9	~1995
153108863	306217727	9	~1995
153111373	2449781969	10	~1997
153119753	918718519	9	~1996
153122171	306244343	9	~1995
153122471	306244943	9	~1995
153123671	306247343	9	~1995
153123769	3674970457	10	~1998
153123977	918743863	9	~1996
153124739	306249479	9	~1995
153125081	1225000649	10	~1996
153132779	306265559	9	~1995

Exponent	Prime Factor	Digits	Year
153135011	306270023	9	~1995
153135263	306270527	9	~1995
153136883	306273767	9	~1995
153138959	306277919	9	~1995
153140231	306280463	9	~1995
153141011	306282023	9	~1995
153141119	306282239	9	~1995
153141419	306282839	9	~1995
153141511	1531415111	10	~1997
153142499	306284999	9	~1995
153143723	306287447	9	~1995
153144317	918865903	9	~1996
153144793	918868759	9	~1996
153152537	2144135519	10	~1997
153153157	918918943	9	~1996
153155279	306310559	9	~1995
153159683	306319367	9	~1995
153161741	1225293929	10	~1996
153162193	3369568247	10	~1997
153163511	306327023	9	~1995
153169721	1225357769	10	~1996
153169739	306339479	9	~1995
153175103	306350207	9	~1995
153177779	2757200023	10	~1997
153178979	306357959	9	~1995

Exponent	Prime Factor	Digits	Year
153183731	306367463	9	~1995
153184319	306368639	9	~1995
153184571	306369143	9	~1995
153187283	306374567	9	~1995
153189341	919136047	9	~1996
153198299	306396599	9	~1995
153203111	306406223	9	~1995
153203387	1225627097	10	~1996
153211739	306423479	9	~1995
153219659	306439319	9	~1995
153219811	1532198111	10	~1997
153220139	306440279	9	~1995
153224579	306449159	9	~1995
153226631	306453263	9	~1995
153230879	306461759	9	~1995
153231671	306463343	9	~1995
153235091	306470183	9	~1995
153235153	2451762449	10	~1997
153239111	306478223	9	~1995
153242783	306485567	9	~1995
153247343	306494687	9	~1995
153254831	306509663	9	~1995
153257659	24521225441	11	~2000
153261377	919568263	9	~1996
153262799	306525599	9	~1995

Exponent	Prime Factor	Digits	Year
153264179	306528359	9	~1995
153273359	306546719	9	~1995
153274129	3678579097	10	~1998
153275597	919653583	9	~1996
153280511	306561023	9	~1995
153280811	306561623	9	~1995
153283919	306567839	9	~1995
153289817	1226318537	10	~1996
153290953	919745719	9	~1996
153292823	306585647	9	~1995
153294503	306589007	9	~1995
153296243	306592487	9	~1995
153300011	306600023	9	~1995
153300443	306600887	9	~1995
153302771	306605543	9	~1995
153322511	306645023	9	~1995
153329219	306658439	9	~1995
153332279	306664559	9	~1995
153335051	306670103	9	~1995
153335243	306670487	9	~1995
153338639	306677279	9	~1995
153338879	306677759	9	~1995
153339839	306679679	9	~1995
153340679	306681359	9	~1995
153342557	920055343	9	~1996

4.768.925 digits

25-05-04