Small Mersenne Prime Factors (page 2885/5040)

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
260729411	521458823	9	~1997
260737417	1564424503	10	~1998
260738711	521477423	9	~1997
260744611	4693402999	10	~1999
260754479	521508959	9	~1997
260759903	521519807	9	~1997
260767027	2607670271	10	~1998
260779751	521559503	9	~1997
260782883	521565767	9	~1997
260783027	2086264217	10	~1998
260788139	4694186503	10	~1999
260788883	521577767	9	~1997
260788943	521577887	9	~1997
260789773	1564738639	10	~1998
260801677	1564810063	10	~1998
260810377	1564862263	10	~1998
260810939	521621879	9	~1997
260814803	521629607	9	~1997
260815211	521630423	9	~1997
260819411	521638823	9	~1997
260825039	521650079	9	~1997
260826701	1564960207	10	~1998
260835083	521670167	9	~1997
260838779	18780392089	11	~2001
260846077	1565076463	10	~1998

Exponent	Prime Factor	Digits	Year
260856371	521712743	9	~1997
260860673	1565164039	10	~1998
260863139	521726279	9	~1997
260873213	1565239279	10	~1998
260876639	521753279	9	~1997
260879953	4174079249	10	~1999
260884103	521768207	9	~1997
260897837	1565387023	10	~1998
260898613	1565391679	10	~1998
260899141	1565394847	10	~1998
260901143	521802287	9	~1997
260915423	521830847	9	~1997
260917859	521835719	9	~1997
260919311	521838623	9	~1997
260932499	521864999	9	~1997
260936609	2087492873	10	~1998
260937923	521875847	9	~1997
260945759	521891519	9	~1997
260946157	1565676943	10	~1998
260947079	521894159	9	~1997
260953937	1565723623	10	~1998
260957591	521915183	9	~1997
260958707	2087669657	10	~1998
260966003	521932007	9	~1997
260969699	521939399	9	~1997

Exponent	Prime Factor	Digits	Year
260980151	521960303	9	~1997
260980799	521961599	9	~1997
260982539	521965079	9	~1997
260983741	1565902447	10	~1998
260985779	521971559	9	~1997
260985953	1565915719	10	~1998
260990531	2087924249	10	~1998
261002039	522004079	9	~1997
261005681	1566034087	10	~1998
261032099	522064199	9	~1997
261039899	522079799	9	~1997
261043931	2088351449	10	~1998
261051911	522103823	9	~1997
261052859	522105719	9	~1997
261069793	4177116689	10	~1999
261071611	2610716111	10	~1998
261071953	1566431719	10	~1998
261078203	522156407	9	~1997
261079297	18275550791	11	~2001
261081179	522162359	9	~1997
261096551	522193103	9	~1997
261098641	10443945641	11	~2000
261104999	522209999	9	~1997
261108563	522217127	9	~1997
261109151	522218303	9	~1997

Exponent	Prime Factor	Digits	Year
261109183	8877712223	10	~2000
261116099	522232199	9	~1997
261119011	2611190111	10	~1998
261120131	522240263	9	~1997
261126611	522253223	9	~1997
261128183	522256367	9	~1997
261138659	522277319	9	~1997
261139583	522279167	9	~1997
261142261	1566853567	10	~1998
261151823	522303647	9	~1997
261164117	1566984703	10	~1998
261177901	1567067407	10	~1998
261186479	522372959	9	~1997
261193291	33955127831	11	~2001
261198923	522397847	9	~1997
261204737	3656866319	10	~1999
261205151	522410303	9	~1997
261210311	522420623	9	~1997
261225121	1567350727	10	~1998
261225311	522450623	9	~1997
261227303	522454607	9	~1997
261227651	522455303	9	~1997
261230759	522461519	9	~1997
261243023	522486047	9	~1997
261244177	4179906833	10	~1999

4.739.325 digits

25-04-20