Small Mersenne Prime Factors (page 3707/5070)

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
1763122957	169259803873	12	~2007
1763229913	10579379479	11	~2004
1763560391	3527120783	10	~2003
1763653883	3527307767	10	~2003
1763724239	3527448479	10	~2003
1763887571	3527775143	10	~2003
1763923631	3527847263	10	~2003
1763974783	17639747831	11	~2005
1763993501	14111948009	11	~2005
1764064979	3528129959	10	~2003
1764066809	14112534473	11	~2005
1764072671	3528145343	10	~2003
1764110717	10584664303	11	~2004
1764169651	102321839759	12	~2007
1764244453	28227911249	11	~2005
1764257221	28228115537	11	~2005
1764294359	3528588719	10	~2003
1764315089	14114520713	11	~2005
1764356261	10586137567	11	~2004
1764428117	10586568703	11	~2004
1764471899	3528943799	10	~2003
1764509471	3529018943	10	~2003
1764567179	3529134359	10	~2003
1764591793	10587550759	11	~2004
1764786143	3529572287	10	~2003

Exponent	Prime Factor	Digits	Year
1764799259	3529598519	10	~2003
1764858367	42356600809	11	~2006
1764905399	3529810799	10	~2003
1764944543	3529889087	10	~2003
1765040339	3530080679	10	~2003
1765047241	10590283447	11	~2004
1765129799	3530259599	10	~2003
1765168579	17651685791	11	~2005
1765181963	3530363927	10	~2003
1765209371	3530418743	10	~2003
1765320391	70612815641	11	~2006
1765415831	3530831663	10	~2003
1765453499	3530906999	10	~2003
1765511771	3531023543	10	~2003
1765549193	10593295159	11	~2004
1765562423	3531124847	10	~2003
1765753259	3531506519	10	~2003
1765753513	10594521079	11	~2004
1765796777	10594780663	11	~2004
1765817723	3531635447	10	~2003
1765868617	10595211703	11	~2004
1765890151	28254242417	11	~2005
1765903019	3531806039	10	~2003
1765916233	10595497399	11	~2004
1765987703	3531975407	10	~2003

Exponent	Prime Factor	Digits	Year
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
1766954087	14135632697	11	~2005
1766965633	10601793799	11	~2004
1767074759	3534149519	10	~2003

Exponent	Prime Factor	Digits	Year
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
1767989711	3535979423	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
1768484183	3536968367	10	~2003
1768508449	38907185879	11	~2006

4.768.925 digits

25-05-04