Small Mersenne Prime Factors (page 3077/5460)

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
261142261	1566853567	10	~1998
261151823	522303647	9	~1997
261164117	1566984703	10	~1998
261177901	1567067407	10	~1998
261186479	522372959	9	~1997
261191207	2089529657	10	~1998
261192643	4179082289	10	~1999
261193291	33955127831	11	~2001
261198923	522397847	9	~1997
261204737	3656866319	10	~1999
261205151	522410303	9	~1997
261210311	522420623	9	~1997
261225121	1567350727	10	~1998
261225311	522450623	9	~1997
261227303	522454607	9	~1997
261227651	522455303	9	~1997
261227723	522455447	9	~1997
261230759	522461519	9	~1997
261243023	522486047	9	~1997
261244177	4179906833	10	~1999
261253379	522506759	9	~1997
261255479	522510959	9	~1997
261283439	522566879	9	~1997
261286439	522572879	9	~1997
261286691	522573383	9	~1997

Exponent	Prime Factor	Digits	Year
261287063	522574127	9	~1997
261295319	522590639	9	~1997
261296471	522592943	9	~1997
261299399	522598799	9	~1997
261310079	522620159	9	~1997
261316721	9930035399	10	~2000
261323423	522646847	9	~1997
261326761	1567960567	10	~1998
261329291	522658583	9	~1997
261332563	4181321009	10	~1999
261333623	522667247	9	~1997
261334471	2613344711	10	~1998
261337499	2090699993	10	~1998
261338783	522677567	9	~1997
261343739	522687479	9	~1997
261347279	522694559	9	~1997
261347351	522694703	9	~1997
261348443	522696887	9	~1997
261348887	2090791097	10	~1998
261350891	522701783	9	~1997
261352859	522705719	9	~1997
261353063	522706127	9	~1997
261354419	522708839	9	~1997
261359933	1568159599	10	~1998
261372281	1568233687	10	~1998

Exponent	Prime Factor	Digits	Year
261372473	1568234839	10	~1998
261372539	522745079	9	~1997
261372719	522745439	9	~1997
261373163	522746327	9	~1997
261373583	522747167	9	~1997
261374969	2090999753	10	~1998
261381353	1568288119	10	~1998
261392903	522785807	9	~1997
261399877	1568399263	10	~1998
261404543	522809087	9	~1997
261407357	2091258857	10	~1998
261414793	10456591721	11	~2000
261420479	522840959	9	~1997
261430979	522861959	9	~1997
261431519	522863039	9	~1997
261433439	522866879	9	~1997
261436961	1568621767	10	~1998
261444809	14118019687	11	~2000
261445321	1568671927	10	~1998
261452819	522905639	9	~1997
261459059	522918119	9	~1997
261464129	2091713033	10	~1998
261468299	522936599	9	~1997
261471191	522942383	9	~1997
261471839	522943679	9	~1997

Exponent	Prime Factor	Digits	Year
261474743	522949487	9	~1997
261481463	522962927	9	~1997
261486331	4706753959	10	~1999
261496283	6798903359	10	~1999
261497963	522995927	9	~1997
261501143	523002287	9	~1997
261502673	3661037423	10	~1999
261506363	523012727	9	~1997
261510383	523020767	9	~1997
261516539	523033079	9	~1997
261524111	523048223	9	~1997
261531107	2092248857	10	~1998
261536039	523072079	9	~1997
261543599	523087199	9	~1997
261543671	523087343	9	~1997
261550631	523101263	9	~1997
261552491	523104983	9	~1997
261563501	1569381007	10	~1998
261570719	523141439	9	~1997
261571763	523143527	9	~1997
261576443	523152887	9	~1997
261582593	6277982233	10	~1999
261588493	1569530959	10	~1998
261591839	523183679	9	~1997
261596081	1569576487	10	~1998

5.157.210 digits

25-11-02