Small Mersenne Prime Factors (page 3679/5025)

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
1765903019	3531806039	10	~2003
1765916233	10595497399	11	~2004
1765987703	3531975407	10	~2003
1765989479	3531978959	10	~2003
1766015549	14128124393	11	~2005
1766182823	3532365647	10	~2003
1766221777	10597330663	11	~2004
1766229599	3532459199	10	~2003
1766343011	3532686023	10	~2003
1766348803	28261580849	11	~2005
1766395357	10598372143	11	~2004
1766429663	3532859327	10	~2003
1766472899	3532945799	10	~2003
1766473697	10598842183	11	~2004
1766478101	10598868607	11	~2004
1766531639	3533063279	10	~2003
1766568017	10599408103	11	~2004
1766610011	3533220023	10	~2003
1766612411	3533224823	10	~2003
1766674499	3533348999	10	~2003
1766675639	3533351279	10	~2003
1766813047	17668130471	11	~2005
1766823613	10600941679	11	~2004
1766824919	3533649839	10	~2003
1766887357	10601324143	11	~2004

Exponent	Prime Factor	Digits	Year
1766954087	14135632697	11	~2005
1766965633	10601793799	11	~2004
1767074759	3534149519	10	~2003
1767212159	3534424319	10	~2003
1767256717	10603540303	11	~2004
1767502343	3535004687	10	~2003
1767517679	84840848593	11	~2007
1767626111	3535252223	10	~2003
1767686339	3535372679	10	~2003
1767702239	3535404479	10	~2003
1767747301	28283956817	11	~2005
1767836159	3535672319	10	~2003
1767948239	3535896479	10	~2003
1767983111	3535966223	10	~2003
1768025999	3536051999	10	~2003
1768140659	3536281319	10	~2003
1768155071	3536310143	10	~2003
1768243583	3536487167	10	~2003
1768247339	3536494679	10	~2003
1768264271	3536528543	10	~2003
1768329131	3536658263	10	~2003
1768330379	3536660759	10	~2003
1768340333	10610041999	11	~2004
1768461389	53053841671	11	~2006
1768465841	10610795047	11	~2004

Exponent	Prime Factor	Digits	Year
1768484183	3536968367	10	~2003
1768508449	38907185879	11	~2006
1768576213	10611457279	11	~2004
1768676879	3537353759	10	~2003
1768732859	3537465719	10	~2003
1768815263	3537630527	10	~2003
1768846451	3537692903	10	~2003
1768977599	3537955199	10	~2003
1769052661	38919158543	11	~2006
1769137343	3538274687	10	~2003
1769174171	3538348343	10	~2003
1769200679	3538401359	10	~2003
1769220899	3538441799	10	~2003
1769320991	3538641983	10	~2003
1769350937	10616105623	11	~2004
1769494957	10616969743	11	~2004
1769589539	3539179079	10	~2003
1769617373	10617704239	11	~2004
1769703251	3539406503	10	~2003
1769722379	3539444759	10	~2003
1769749199	3539498399	10	~2003
1769756903	3539513807	10	~2003
1769758499	3539516999	10	~2003
1769786429	42474874297	11	~2006
1769809177	10618855063	11	~2004

Exponent	Prime Factor	Digits	Year
1769817613	10618905679	11	~2004
1769865791	3539731583	10	~2003
1769925383	3539850767	10	~2003
1769947499	3539894999	10	~2003
1769984039	3539968079	10	~2003
1770025331	3540050663	10	~2003
1770032963	3540065927	10	~2003
1770066971	3540133943	10	~2003
1770120787	212414494441	12	~2008
1770128471	3540256943	10	~2003
1770160571	3540321143	10	~2003
1770173017	28322768273	11	~2005
1770184499	3540368999	10	~2003
1770255569	14162044553	11	~2005
1770277979	3540555959	10	~2003
1770389339	3540778679	10	~2003
1770519983	3541039967	10	~2003
1770549743	3541099487	10	~2003
1770577573	10623465439	11	~2004
1770588503	3541177007	10	~2003
1770600707	14164805657	11	~2005
1770612131	3541224263	10	~2003
1770614843	159355335871	12	~2007
1770636599	31871458783	11	~2006
1770643403	3541286807	10	~2003

4.724.182 digits

25-04-13