Small Mersenne Prime Factors (page 3026/5760)

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
186292343	372584687	9	~1996
186295139	372590279	9	~1996
186295691	372591383	9	~1996
186298751	372597503	9	~1996
186303791	372607583	9	~1996
186306539	372613079	9	~1996
186308123	372616247	9	~1996
186309419	372618839	9	~1996
186311579	372623159	9	~1996
186316439	372632879	9	~1996
186317063	372634127	9	~1996
186325547	4844464223	10	~1998
186328453	1117970719	10	~1997
186333431	372666863	9	~1996
186335273	1118011639	10	~1997
186336911	372673823	9	~1996
186338363	372676727	9	~1996
186346933	1118081599	10	~1997
186351673	1118110039	10	~1997
186356783	372713567	9	~1996
186357371	372714743	9	~1996
186359399	372718799	9	~1996
186362531	372725063	9	~1996
186363563	372727127	9	~1996
186370511	372741023	9	~1996

Exponent	Prime Factor	Digits	Year
186371291	372742583	9	~1996
186371839	1863718391	10	~1997
186373919	372747839	9	~1996
186378719	1491029753	10	~1997
186379639	1863796391	10	~1997
186382303	2982116849	10	~1998
186383111	372766223	9	~1996
186384619	15283538759	11	~2000
186384959	372769919	9	~1996
186390419	372780839	9	~1996
186393191	372786383	9	~1996
186393983	372787967	9	~1996
186405503	372811007	9	~1996
186408191	372816383	9	~1996
186411539	372823079	9	~1996
186413231	372826463	9	~1996
186413567	21251146639	11	~2000
186414419	372828839	9	~1996
186417551	372835103	9	~1996
186419081	1118514487	10	~1997
186425269	4101355919	10	~1998
186426481	1118558887	10	~1997
186435059	372870119	9	~1996
186437677	1118626063	10	~1997
186442469	14542512583	11	~2000

Exponent	Prime Factor	Digits	Year
186445079	372890159	9	~1996
186448313	5593449391	10	~1998
186450839	372901679	9	~1996
186453577	8949771697	10	~1999
186457163	372914327	9	~1996
186457919	372915839	9	~1996
186458843	372917687	9	~1996
186462847	1864628471	10	~1997
186463493	1118780959	10	~1997
186466979	372933959	9	~1996
186474791	372949583	9	~1996
186482519	372965039	9	~1996
186484631	372969263	9	~1996
186490151	372980303	9	~1996
186493691	372987383	9	~1996
186496379	372992759	9	~1996
186499403	372998807	9	~1996
186500033	1119000199	10	~1997
186500477	2611006679	10	~1998
186504371	373008743	9	~1996
186506483	373012967	9	~1996
186520751	373041503	9	~1996
186522719	1492181753	10	~1997
186524291	373048583	9	~1996
186524431	3357439759	10	~1998

Exponent	Prime Factor	Digits	Year
186526919	373053839	9	~1996
186534923	373069847	9	~1996
186537479	1492299833	10	~1997
186539029	10073107567	11	~1999
186541139	373082279	9	~1996
186542947	3357773047	10	~1998
186544753	1119268519	10	~1997
186563651	373127303	9	~1996
186565499	373130999	9	~1996
186566951	373133903	9	~1996
186570551	373141103	9	~1996
186572279	40672756823	11	~2001
186573899	373147799	9	~1996
186578533	2985256529	10	~1998
186582659	373165319	9	~1996
186584477	1492675817	10	~1997
186584701	1119508207	10	~1997
186589369	4478144857	10	~1998
186599459	7837177279	10	~1999
186601931	373203863	9	~1996
186601991	373203983	9	~1996
186602099	373204199	9	~1996
186606397	1119638383	10	~1997
186606533	2612491463	10	~1998
186623243	373246487	9	~1996

5.456.260 digits

26-03-22