Small Mersenne Prime Factors (page 3325/5760)

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
322442999	644885999	9	~1997
322446053	1934676319	10	~1999
322449971	644899943	9	~1997
322462979	644925959	9	~1997
322463363	644926727	9	~1997
322466527	29021987431	11	~2002
322471427	15478628497	11	~2001
322477703	644955407	9	~1997
322478171	644956343	9	~1997
322482593	64496518601	11	~2002
322490471	644980943	9	~1997
322491359	644982719	9	~1997
322496711	644993423	9	~1997
322498079	644996159	9	~1997
322505191	3225051911	10	~1999
322505581	1935033487	10	~1999
322512077	9675362311	10	~2000
322525103	645050207	9	~1997
322529951	645059903	9	~1997
322534391	645068783	9	~1997
322541759	645083519	9	~1997
322544993	7741079833	10	~2000
322552403	645104807	9	~1997
322554971	645109943	9	~1997
322558871	645117743	9	~1997

Exponent	Prime Factor	Digits	Year
322564751	645129503	9	~1997
322590899	645181799	9	~1997
322606079	645212159	9	~1997
322608119	645216239	9	~1997
322609121	40648749247	11	~2002
322609621	1935657727	10	~1999
322614863	645229727	9	~1997
322615679	645231359	9	~1997
322618279	10969021487	11	~2000
322625951	645251903	9	~1997
322630859	645261719	9	~1997
322631053	1935786319	10	~1999
322638203	645276407	9	~1997
322649699	645299399	9	~1997
322656611	645313223	9	~1997
322665521	2581324169	10	~1999
322668719	645337439	9	~1997
322671131	645342263	9	~1997
322675319	645350639	9	~1997
322690013	10326080417	11	~2000
322696259	645392519	9	~1997
322738079	645476159	9	~1997
322742663	645485327	9	~1997
322748963	645497927	9	~1997
322761281	2582090249	10	~1999

Exponent	Prime Factor	Digits	Year
322762763	645525527	9	~1997
322764851	2582118809	10	~1999
322778537	4518899519	10	~2000
322792559	645585119	9	~1997
322798711	3227987111	10	~1999
322803631	5810465359	10	~2000
322805159	645610319	9	~1997
322815299	645630599	9	~1997
322815457	1936892743	10	~1999
322819163	645638327	9	~1997
322838363	645676727	9	~1997
322851259	5811322663	10	~2000
322861079	645722159	9	~1997
322863193	1937179159	10	~1999
322873007	2582984057	10	~1999
322878833	1937272999	10	~1999
322888883	645777767	9	~1997
322892231	645784463	9	~1997
322904303	645808607	9	~1997
322911971	645823943	9	~1997
322925951	645851903	9	~1997
322935551	645871103	9	~1997
322944283	3229442831	10	~1999
322956563	645913127	9	~1997
322964051	645928103	9	~1997

Exponent	Prime Factor	Digits	Year
322966499	13564592959	11	~2001
322976579	645953159	9	~1997
322996631	645993263	9	~1997
322996763	645993527	9	~1997
323006977	9690209311	10	~2000
323008079	646016159	9	~1997
323011943	646023887	9	~1997
323015327	2584122617	10	~1999
323015663	646031327	9	~1997
323016193	1938097159	10	~1999
323018231	646036463	9	~1997
323026807	10982911439	11	~2000
323026871	646053743	9	~1997
323027339	646054679	9	~1997
323031557	4522441799	10	~2000
323033591	646067183	9	~1997
323043793	1938262759	10	~1999
323054003	646108007	9	~1997
323055143	646110287	9	~1997
323070899	646141799	9	~1997
323083151	646166303	9	~1997
323090543	646181087	9	~1997
323092313	1938553879	10	~1999
323098403	646196807	9	~1997
323104877	9693146311	10	~2000

5.456.260 digits

26-03-22