Small Mersenne Prime Factors (page 2880/5025)

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
261471839	522943679	9	~1997
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
261531107	2092248857	10	~1998
261536039	523072079	9	~1997
261543671	523087343	9	~1997
261550631	523101263	9	~1997
261563501	1569381007	10	~1998
261570719	523141439	9	~1997
261576443	523152887	9	~1997
261582593	6277982233	10	~1999
261588493	1569530959	10	~1998
261591839	523183679	9	~1997
261596081	1569576487	10	~1998
261597577	1569585463	10	~1998
261607721	7848231631	10	~2000
261615371	67496765719	11	~2002

Exponent	Prime Factor	Digits	Year
261619499	523238999	9	~1997
261622993	4185967889	10	~1999
261625319	523250639	9	~1997
261628463	523256927	9	~1997
261630023	523260047	9	~1997
261631703	523263407	9	~1997
261635807	6802530983	10	~1999
261636317	1569817903	10	~1998
261637979	523275959	9	~1997
261644651	523289303	9	~1997
261655643	523311287	9	~1997
261667583	523335167	9	~1997
261674663	523349327	9	~1997
261679259	523358519	9	~1997
261680411	523360823	9	~1997
261681599	523363199	9	~1997
261683531	523367063	9	~1997
261685231	10990779703	11	~2000
261691043	523382087	9	~1997
261704591	2093636729	10	~1998
261707021	1570242127	10	~1998
261726631	4187626097	10	~1999
261730883	523461767	9	~1997
261734653	1570407919	10	~1998
261742751	523485503	9	~1997

Exponent	Prime Factor	Digits	Year
261747599	523495199	9	~1997
261755821	4188093137	10	~1999
261760097	2094080777	10	~1998
261771563	523543127	9	~1997
261776479	2617764791	10	~1998
261780973	1570685839	10	~1998
261783779	523567559	9	~1997
261804623	6283310953	10	~1999
261810611	523621223	9	~1997
261820271	523640543	9	~1997
261829943	523659887	9	~1997
261835043	523670087	9	~1997
261847829	2094782633	10	~1998
261855577	1571133463	10	~1998
261864143	523728287	9	~1997
261868931	4713640759	10	~1999
261869423	523738847	9	~1997
261876203	523752407	9	~1997
261877633	1571265799	10	~1998
261881099	523762199	9	~1997
261882011	523764023	9	~1997
261886379	523772759	9	~1997
261888491	523776983	9	~1997
261893393	1571360359	10	~1998
261894371	523788743	9	~1997

Exponent	Prime Factor	Digits	Year
261896003	523792007	9	~1997
261901163	523802327	9	~1997
261901259	523802519	9	~1997
261902159	523804319	9	~1997
261909863	523819727	9	~1997
261911999	523823999	9	~1997
261915299	523830599	9	~1997
261922931	523845863	9	~1997
261935951	523871903	9	~1997
261945869	2095566953	10	~1998
261951299	2095610393	10	~1998
261951863	523903727	9	~1997
261956063	523912127	9	~1997
261957191	523914383	9	~1997
261960551	523921103	9	~1997
261960911	523921823	9	~1997
261962957	1571777743	10	~1998
261965401	1571792407	10	~1998
261968299	15194161343	11	~2000
261971603	523943207	9	~1997
261974039	523948079	9	~1997
261979559	523959119	9	~1997
261991237	1571947423	10	~1998
261995311	4191924977	10	~1999
261998873	1571993239	10	~1998

4.724.182 digits

25-04-13