Small Mersenne Prime Factors (page 3124/5670)

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
239049197	1434295183	10	~1998
239055611	478111223	9	~1996
239056847	11952842351	11	~2000
239064851	478129703	9	~1996
239066057	1434396343	10	~1998
239077031	1912616249	10	~1998
239082923	478165847	9	~1996
239097563	478195127	9	~1996
239101139	1912809113	10	~1998
239103383	478206767	9	~1996
239107679	478215359	9	~1996
239108531	478217063	9	~1996
239112431	478224863	9	~1996
239118023	478236047	9	~1996
239131811	478263623	9	~1996
239135471	478270943	9	~1996
239137499	478274999	9	~1996
239138051	478276103	9	~1996
239148373	1434890239	10	~1998
239149271	478298543	9	~1996
239149811	478299623	9	~1996
239154551	478309103	9	~1996
239156171	478312343	9	~1996
239164463	478328927	9	~1996
239178419	478356839	9	~1996

Exponent	Prime Factor	Digits	Year
239186797	1435120783	10	~1998
239199419	478398839	9	~1996
239205119	478410239	9	~1996
239211803	478423607	9	~1996
239213099	478426199	9	~1996
239217437	1913739497	10	~1998
239223521	1913788169	10	~1998
239226563	478453127	9	~1996
239229401	13396846457	11	~2000
239236213	1435417279	10	~1998
239240471	478480943	9	~1996
239243759	478487519	9	~1996
239258179	4306647223	10	~1999
239264999	478529999	9	~1996
239272031	478544063	9	~1996
239272499	478544999	9	~1996
239275741	1435654447	10	~1998
239283547	3828536753	10	~1999
239284823	478569647	9	~1996
239285339	478570679	9	~1996
239285857	1435715143	10	~1998
239287943	478575887	9	~1996
239295431	478590863	9	~1996
239297231	478594463	9	~1996
239310803	478621607	9	~1996

Exponent	Prime Factor	Digits	Year
239311283	478622567	9	~1996
239322431	478644863	9	~1996
239330951	478661903	9	~1996
239331539	478663079	9	~1996
239340071	478680143	9	~1996
239348579	478697159	9	~1996
239350379	478700759	9	~1996
239352719	478705439	9	~1996
239353199	478706399	9	~1996
239368931	478737863	9	~1996
239370311	478740623	9	~1996
239371199	478742399	9	~1996
239374931	478749863	9	~1996
239379083	478758167	9	~1996
239384671	4308924079	10	~1999
239389079	478778159	9	~1996
239399399	478798799	9	~1996
239399603	478799207	9	~1996
239403023	478806047	9	~1996
239405041	3830480657	10	~1999
239405879	478811759	9	~1996
239425387	5746209289	10	~1999
239435783	478871567	9	~1996
239436137	1915489097	10	~1998
239444819	478889639	9	~1996

Exponent	Prime Factor	Digits	Year
239450903	478901807	9	~1996
239453999	478907999	9	~1996
239456699	478913399	9	~1996
239457203	15804175399	11	~2000
239461289	1915690313	10	~1998
239462543	478925087	9	~1996
239464691	478929383	9	~1996
239467493	1436804959	10	~1998
239468447	1915747577	10	~1998
239468891	478937783	9	~1996
239472221	1915777769	10	~1998
239479451	478958903	9	~1996
239484743	11974237151	11	~2000
239487673	1436926039	10	~1998
239501651	479003303	9	~1996
239504159	479008319	9	~1996
239505419	479010839	9	~1996
239506691	479013383	9	~1996
239507231	479014463	9	~1996
239517023	479034047	9	~1996
239518451	479036903	9	~1996
239521231	2395212311	10	~1998
239532119	479064239	9	~1996
239534363	479068727	9	~1996
239539931	479079863	9	~1996

5.366.787 digits

26-02-08