Small Mersenne Prime Factors (page 3645/5025)

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
1611109583	3222219167	10	~2003
1611140519	3222281039	10	~2003
1611239129	12889913033	11	~2004
1611260351	3222520703	10	~2003
1611346403	3222692807	10	~2003
1611376031	3222752063	10	~2003
1611382919	3222765839	10	~2003
1611436201	9668617207	10	~2004
1611458759	3222917519	10	~2003
1611545891	3223091783	10	~2003
1611566821	35454470063	11	~2005
1611581099	3223162199	10	~2003
1611590219	3223180439	10	~2003
1611627371	3223254743	10	~2003
1611708971	3223417943	10	~2003
1611761153	22564656143	11	~2005
1611815123	3223630247	10	~2003
1611842423	3223684847	10	~2003
1611931807	16119318071	11	~2005
1611952031	3223904063	10	~2003
1611956939	3223913879	10	~2003
1611969071	3223938143	10	~2003
1612018379	3224036759	10	~2003
1612045763	3224091527	10	~2003
1612046521	270823815529	12	~2008

Exponent	Prime Factor	Digits	Year
1612049081	9672294487	10	~2004
1612060199	3224120399	10	~2003
1612110301	25793764817	11	~2005
1612182371	3224364743	10	~2003
1612196543	3224393087	10	~2003
1612203863	3224407727	10	~2003
1612220231	3224440463	10	~2003
1612225193	9673351159	10	~2004
1612263839	3224527679	10	~2003
1612404659	3224809319	10	~2003
1612445183	3224890367	10	~2003
1612458791	3224917583	10	~2003
1612497611	3224995223	10	~2003
1612500899	3225001799	10	~2003
1612503383	3225006767	10	~2003
1612518179	3225036359	10	~2003
1612559797	9675358783	10	~2004
1612628431	16126284311	11	~2005
1612631879	3225263759	10	~2003
1612691963	3225383927	10	~2003
1612706197	9676237183	10	~2004
1612734671	3225469343	10	~2003
1612743791	3225487583	10	~2003
1612746659	3225493319	10	~2003
1612835519	3225671039	10	~2003

Exponent	Prime Factor	Digits	Year
1612843619	3225687239	10	~2003
1612886771	3225773543	10	~2003
1612949603	3225899207	10	~2003
1612979689	38711512537	11	~2006
1612982411	3225964823	10	~2003
1613156443	103242012353	12	~2007
1613161139	3226322279	10	~2003
1613201713	9679210279	10	~2004
1613238773	9679432639	10	~2004
1613304239	3226608479	10	~2003
1613319899	3226639799	10	~2003
1613377853	9680267119	10	~2004
1613409503	3226819007	10	~2003
1613411161	9680466967	10	~2004
1613430179	3226860359	10	~2003
1613452271	3226904543	10	~2003
1613534399	3227068799	10	~2003
1613629343	3227258687	10	~2003
1613631599	3227263199	10	~2003
1613674823	3227349647	10	~2003
1613675711	3227351423	10	~2003
1613745359	3227490719	10	~2003
1613772233	9682633399	10	~2004
1613815139	51642084449	11	~2006
1613835233	9683011399	10	~2004

Exponent	Prime Factor	Digits	Year
1613865767	12910926137	11	~2004
1613924243	3227848487	10	~2003
1614030157	9684180943	10	~2004
1614051437	22596720119	11	~2005
1614096937	9684581623	10	~2004
1614171553	35511774167	11	~2005
1614188447	12913507577	11	~2004
1614231539	3228463079	10	~2003
1614259343	38742224233	11	~2006
1614293423	3228586847	10	~2003
1614327023	3228654047	10	~2003
1614356477	9686138863	10	~2004
1614360323	3228720647	10	~2003
1614409007	12915272057	11	~2004
1614498923	3228997847	10	~2003
1614577883	41979024959	11	~2006
1614596579	3229193159	10	~2003
1614622469	22604714567	11	~2005
1614624497	9687746983	10	~2004
1614732599	3229465199	10	~2003
1614747971	3229495943	10	~2003
1614809099	3229618199	10	~2003
1614829451	3229658903	10	~2003
1614841691	3229683383	10	~2003
1614862643	3229725287	10	~2003

4.724.182 digits

25-04-13