Small Mersenne Prime Factors (page 2787/5205)

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
183751499	367502999	9	~1996
183751559	367503119	9	~1996
183754799	1470038393	10	~1997
183758171	367516343	9	~1996
183759731	367519463	9	~1996
183763043	367526087	9	~1996
183768097	1102608583	10	~1997
183771779	367543559	9	~1996
183772943	367545887	9	~1996
183776651	1470213209	10	~1997
183782363	367564727	9	~1996
183792239	367584479	9	~1996
183792781	1102756687	10	~1997
183801911	367603823	9	~1996
183808739	367617479	9	~1996
183813611	367627223	9	~1996
183820751	367641503	9	~1996
183823163	367646327	9	~1996
183824159	367648319	9	~1996
183825211	1838252111	10	~1997
183825431	367650863	9	~1996
183826717	1102960303	10	~1997
183827599	16176828713	11	~2000
183829571	367659143	9	~1996
183830957	1102985743	10	~1997

Exponent	Prime Factor	Digits	Year
183853073	1103118439	10	~1997
183855473	5515664191	10	~1998
183856223	367712447	9	~1996
183857231	367714463	9	~1996
183858599	367717199	9	~1996
183865067	3309571207	10	~1998
183865499	367730999	9	~1996
183866233	2941859729	10	~1998
183867863	367735727	9	~1996
183868459	1838684591	10	~1997
183869579	367739159	9	~1996
183874421	1103246527	10	~1997
183876503	367753007	9	~1996
183879203	367758407	9	~1996
183879323	367758647	9	~1996
183879623	367759247	9	~1996
183881543	367763087	9	~1996
183882299	367764599	9	~1996
183883571	367767143	9	~1996
183885791	367771583	9	~1996
183896963	367793927	9	~1996
183900553	8459425439	10	~1999
183903029	29056678583	11	~2000
183905063	367810127	9	~1996
183909331	7724191903	10	~1999

Exponent	Prime Factor	Digits	Year
183910439	367820879	9	~1996
183912193	1103473159	10	~1997
183916771	1839167711	10	~1997
183920519	367841039	9	~1996
183922391	367844783	9	~1996
183927859	3310701463	10	~1998
183927983	10299967049	11	~1999
183932999	367865999	9	~1996
183943649	103008443441	12	~2002
183946211	367892423	9	~1996
183949823	367899647	9	~1996
183951731	367903463	9	~1996
183957041	1103742247	10	~1997
183957803	367915607	9	~1996
183959519	367919039	9	~1996
183959663	367919327	9	~1996
183966011	367932023	9	~1996
183967499	367934999	9	~1996
183976511	367953023	9	~1996
183977063	367954127	9	~1996
183980183	367960367	9	~1996
183980339	367960679	9	~1996
183981839	367963679	9	~1996
183983837	1103903023	10	~1997
183987851	367975703	9	~1996

Exponent	Prime Factor	Digits	Year
183990959	367981919	9	~1996
183999071	367998143	9	~1996
184013231	1472105849	10	~1997
184015823	368031647	9	~1996
184018979	368037959	9	~1996
184019663	368039327	9	~1996
184034759	368069519	9	~1996
184038359	368076719	9	~1996
184040891	368081783	9	~1996
184045781	1104274687	10	~1997
184049711	368099423	9	~1996
184053071	368106143	9	~1996
184054583	368109167	9	~1996
184054991	368109983	9	~1996
184058879	368117759	9	~1996
184066139	368132279	9	~1996
184077059	368154119	9	~1996
184084037	1104504223	10	~1997
184086971	368173943	9	~1996
184089131	368178263	9	~1996
184090103	368180207	9	~1996
184094033	1104564199	10	~1997
184094837	1472758697	10	~1997
184099373	1104596239	10	~1997
184100897	1472807177	10	~1997

4.903.097 digits

25-07-08