Small Mersenne Prime Factors (page 2894/5040)

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
265288319	530576639	9	~1997
265292081	2122336649	10	~1998
265294751	530589503	9	~1997
265295843	530591687	9	~1997
265296643	9020085863	10	~2000
265303481	1591820887	10	~1998
265306799	530613599	9	~1997
265311239	4775602303	10	~1999
265318259	2122546073	10	~1998
265327019	530654039	9	~1997
265332679	2653326791	10	~1998
265338089	2122704713	10	~1998
265342331	530684663	9	~1997
265344419	530688839	9	~1997
265345739	530691479	9	~1997
265348691	530697383	9	~1997
265378277	1592269663	10	~1998
265387141	1592322847	10	~1998
265390303	11146392727	11	~2000
265391531	530783063	9	~1997
265393391	530786783	9	~1997
265395001	1592370007	10	~1998
265409099	530818199	9	~1997
265414991	530829983	9	~1997
265418767	4246700273	10	~1999

Exponent	Prime Factor	Digits	Year
265426691	530853383	9	~1997
265427243	530854487	9	~1997
265434791	530869583	9	~1997
265442279	2123538233	10	~1998
265451759	530903519	9	~1997
265463603	530927207	9	~1997
265468453	4247495249	10	~1999
265471751	530943503	9	~1997
265473731	2123789849	10	~1998
265474201	1592845207	10	~1998
265477031	530954063	9	~1997
265477259	530954519	9	~1997
265480223	530960447	9	~1997
265490237	1592941423	10	~1998
265495639	2654956391	10	~1998
265495847	2123966777	10	~1998
265497359	530994719	9	~1997
265504163	531008327	9	~1997
265511699	531023399	9	~1997
265512683	531025367	9	~1997
265514399	2124115193	10	~1998
265519571	531039143	9	~1997
265523519	531047039	9	~1997
265529219	531058439	9	~1997
265538951	531077903	9	~1997

Exponent	Prime Factor	Digits	Year
265543771	4779787879	10	~1999
265544753	1593268519	10	~1998
265549393	1593296359	10	~1998
265550699	531101399	9	~1997
265553111	531106223	9	~1997
265555681	4248890897	10	~1999
265565203	2655652031	10	~1998
265566683	531133367	9	~1997
265568749	5842512479	10	~1999
265577303	531154607	9	~1997
265583663	531167327	9	~1997
265584419	531168839	9	~1997
265586411	531172823	9	~1997
265587433	1593524599	10	~1998
265599563	531199127	9	~1997
265602191	531204383	9	~1997
265603463	531206927	9	~1997
265604081	25497991777	11	~2001
265615019	531230039	9	~1997
265616389	12749586673	11	~2000
265623983	531247967	9	~1997
265624451	531248903	9	~1997
265628171	531256343	9	~1997
265633631	531267263	9	~1997
265634723	531269447	9	~1997

Exponent	Prime Factor	Digits	Year
265658791	2656587911	10	~1998
265668803	531337607	9	~1997
265669301	1594015807	10	~1998
265672453	1594034719	10	~1998
265675477	6376211449	10	~1999
265682099	531364199	9	~1997
265682141	2125457129	10	~1998
265695337	1594172023	10	~1998
265698007	2656980071	10	~1998
265709819	2125678553	10	~1998
265712231	531424463	9	~1997
265713263	531426527	9	~1997
265713703	6377128873	10	~1999
265723517	1594341103	10	~1998
265724279	531448559	9	~1997
265725227	17537864983	11	~2001
265725731	531451463	9	~1997
265728143	531456287	9	~1997
265739561	1594437367	10	~1998
265740611	46770347537	11	~2002
265759751	531519503	9	~1997
265765463	531530927	9	~1997
265772159	531544319	9	~1997
265777331	531554663	9	~1997
265787111	531574223	9	~1997

4.739.325 digits

25-04-20