Small Mersenne Prime Factors (page 3170/5775)

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
238463363	476926727	9	~1996
238471991	476943983	9	~1996
238484231	476968463	9	~1996
238485959	476971919	9	~1996
238495837	1430975023	10	~1998
238514891	477029783	9	~1996
238515443	477030887	9	~1996
238518493	1431110959	10	~1998
238519019	477038039	9	~1996
238520783	477041567	9	~1996
238523531	477047063	9	~1996
238527911	477055823	9	~1996
238540391	477080783	9	~1996
238543463	477086927	9	~1996
238546963	3816751409	10	~1999
238548911	477097823	9	~1996
238550113	1431300679	10	~1998
238565363	477130727	9	~1996
238575983	477151967	9	~1996
238583063	477166127	9	~1996
238584161	1431504967	10	~1998
238585379	1908683033	10	~1998
238586983	2385869831	10	~1998
238588211	4294587799	10	~1999
238588997	1908711977	10	~1998

Exponent	Prime Factor	Digits	Year
238601039	477202079	9	~1996
238611599	477223199	9	~1996
238613057	1908904457	10	~1998
238617503	477235007	9	~1996
238618199	477236399	9	~1996
238619707	2386197071	10	~1998
238620419	477240839	9	~1996
238622291	477244583	9	~1996
238623691	2386236911	10	~1998
238632773	3340858823	10	~1999
238635119	477270239	9	~1996
238650571	2386505711	10	~1998
238652003	477304007	9	~1996
238654103	477308207	9	~1996
238658111	477316223	9	~1996
238660703	477321407	9	~1996
238661231	477322463	9	~1996
238663679	477327359	9	~1996
238666751	477333503	9	~1996
238672691	477345383	9	~1996
238675103	477350207	9	~1996
238680719	477361439	9	~1996
238683743	477367487	9	~1996
238686971	477373943	9	~1996
238687919	477375839	9	~1996

Exponent	Prime Factor	Digits	Year
238694279	477388559	9	~1996
238698191	477396383	9	~1996
238699871	477399743	9	~1996
238704443	477408887	9	~1996
238705679	477411359	9	~1996
238709363	477418727	9	~1996
238710973	10980704759	11	~2000
238713383	477426767	9	~1996
238717631	477435263	9	~1996
238720259	477440519	9	~1996
238724231	477448463	9	~1996
238728443	477456887	9	~1996
238733903	477467807	9	~1996
238737563	477475127	9	~1996
238755899	477511799	9	~1996
238756499	477512999	9	~1996
238756751	477513503	9	~1996
238761577	51572500633	11	~2001
238774883	477549767	9	~1996
238787503	8118775103	10	~1999
238794013	10984524599	11	~2000
238794779	477589559	9	~1996
238794851	477589703	9	~1996
238798913	3343184783	10	~1999
238806569	1910452553	10	~1998

Exponent	Prime Factor	Digits	Year
238807343	73075046959	11	~2002
238811759	4298611663	10	~1999
238823713	1432942279	10	~1998
238824791	477649583	9	~1996
238827299	477654599	9	~1996
238829341	3821269457	10	~1999
238831139	477662279	9	~1996
238831403	477662807	9	~1996
238832543	477665087	9	~1996
238834153	3821346449	10	~1999
238837871	477675743	9	~1996
238839277	1433035663	10	~1998
238842599	477685199	9	~1996
238843861	1433063167	10	~1998
238845647	1910765177	10	~1998
238849379	10031673919	11	~2000
238855451	477710903	9	~1996
238861979	477723959	9	~1996
238873057	16721113991	11	~2000
238874477	3344242679	10	~1999
238876811	477753623	9	~1996
238887241	1433323447	10	~1998
238893563	477787127	9	~1996
238899371	477798743	9	~1996
238900943	477801887	9	~1996

5.471.290 digits

26-03-29