Small Mersenne Prime Factors (page 3254/5670)

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
305316983	610633967	9	~1997
305317763	610635527	9	~1997
305325071	610650143	9	~1997
305325071	2442600569	10
305331839	610663679	9	~1997
305332763	610665527	9	~1997
305333783	610667567	9	~1997
305334803	610669607	9	~1997
305360411	610720823	9	~1997
305360603	610721207	9	~1997
305362391	610724783	9	~1997
305365519	5496579343	10	~2000
305373791	610747583	9	~1997
305375219	2443001753	10	~1999
305380871	610761743	9	~1997
305385911	610771823	9	~1997
305390681	2443125449	10	~1999
305394757	1832368543	10	~1998
305401331	610802663	9	~1997
305409983	610819967	9	~1997
305411791	4886588657	10	~1999
305413463	610826927	9	~1997
305418803	610837607	9	~1997
305424419	610848839	9	~1997
305427977	4275991679	10	~1999

Exponent	Prime Factor	Digits	Year
305429549	45814432351	11	~2002
305431319	610862639	9	~1997
305435771	610871543	9	~1997
305438671	3054386711	10	~1999
305441779	10385020487	11	~2000
305446283	610892567	9	~1997
305450423	610900847	9	~1997
305452019	610904039	9	~1997
305458739	610917479	9	~1997
305464897	1832789383	10	~1998
305469089	2443752713	10	~1999
305480723	610961447	9	~1997
305485451	610970903	9	~1997
305492401	1832954407	10	~1998
305493997	1832963983	10	~1998
305499539	610999079	9	~1997
305504351	611008703	9	~1997
305511113	165587023247	12	~2003
305512283	611024567	9	~1997
305517851	611035703	9	~1997
305524517	2444196137	10	~1999
305529599	611059199	9	~1997
305531777	2444254217	10	~1999
305538503	611077007	9	~1997
305539681	1833238087	10	~1998

Exponent	Prime Factor	Digits	Year
305546861	1833281167	10	~1998
305557229	2444457833	10	~1999
305564243	611128487	9	~1997
305589833	1833538999	10	~1998
305594483	611188967	9	~1997
305598037	1833588223	10	~1998
305602079	611204159	9	~1997
305604023	611208047	9	~1997
305604239	2444833913	10	~1999
305605493	1833632959	10	~1998
305611289	9168338671	10	~2000
305615591	611231183	9	~1997
305621863	3056218631	10	~1999
305627291	611254583	9	~1997
305650637	2445205097	10	~1999
305652071	2445216569	10	~1999
305652847	3056528471	10	~1999
305654399	611308799	9	~1997
305665847	7335980329	10	~2000
305691181	1834147087	10	~1998
305691677	2445533417	10	~1999
305691839	611383679	9	~1997
305710501	1834263007	10	~1998
305719259	611438519	9	~1997
305724851	611449703	9	~1997

Exponent	Prime Factor	Digits	Year
305740783	29351115169	11	~2001
305745683	611491367	9	~1997
305755379	611510759	9	~1997
305755643	611511287	9	~1997
305762939	611525879	9	~1997
305766551	611533103	9	~1997
305766737	2446133897	10	~1999
305767859	611535719	9	~1997
305774519	611549039	9	~1997
305776831	5503982959	10	~2000
305778839	611557679	9	~1997
305779091	611558183	9	~1997
305779343	611558687	9	~1997
305810471	611620943	9	~1997
305810831	611621663	9	~1997
305812883	611625767	9	~1997
305821991	611643983	9	~1997
305825171	611650343	9	~1997
305825711	611651423	9	~1997
305832671	611665343	9	~1997
305833439	611666879	9	~1997
305842139	611684279	9	~1997
305845229	2446761833	10	~1999
305847803	611695607	9	~1997
305851297	1835107783	10	~1998

5.366.787 digits

26-02-08