Small Mersenne Prime Factors (page 3908/5070)

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
3041973839	6083947679	10	~2005
3042406553	18254439319	11	~2006
3042726611	6085453223	10	~2005
3042861791	6085723583	10	~2005
3042885959	6085771919	10	~2005
3043097129	24344777033	11	~2007
3043156019	6086312039	10	~2005
3043383671	6086767343	10	~2005
3043405577	18260433463	11	~2006
3043445903	6086891807	10	~2005
3043525739	6087051479	10	~2005
3043601941	18261611647	11	~2006
3043709533	18262257199	11	~2006
3043715063	6087430127	10	~2005
3043742171	6087484343	10	~2005
3043790591	6087581183	10	~2005
3043824743	6087649487	10	~2005
3043960019	146110080913	12	~2008
3044077583	6088155167	10	~2005
3044241589	66973314959	11	~2008
3044254751	6088509503	10	~2005
3044262191	6088524383	10	~2005
3044491319	6088982639	10	~2005
3044497559	6088995119	10	~2005
3044527379	6089054759	10	~2005

Exponent	Prime Factor	Digits	Year
3044596799	6089193599	10	~2005
3044809343	6089618687	10	~2005
3044838143	6089676287	10	~2005
3044843407	194869978049	12	~2009
3044886683	6089773367	10	~2005
3044931671	6089863343	10	~2005
3044981141	18269886847	11	~2006
3045056471	6090112943	10	~2005
3045091019	6090182039	10	~2005
3045115519	420225941623	12	~2010
3045186983	6090373967	10	~2005
3045260741	24362085929	11	~2007
3045315311	24362522489	11	~2007
3045330437	18271982623	11	~2006
3045425843	6090851687	10	~2005
3045548003	6091096007	10	~2005
3045670739	6091341479	10	~2005
3045682901	18274097407	11	~2006
3045755939	6091511879	10	~2005
3045909281	18275455687	11	~2006
3045936269	24367490153	11	~2007
3045983411	6091966823	10	~2005
3046005779	6092011559	10	~2005
3046039091	24368312729	11	~2007
3046089659	6092179319	10	~2005

Exponent	Prime Factor	Digits	Year
3046226219	6092452439	10	~2005
3046242239	6092484479	10	~2005
3046271411	6092542823	10	~2005
3046334339	6092668679	10	~2005
3046338773	18278032639	11	~2006
3046548553	18279291319	11	~2006
3046793699	6093587399	10	~2005
3047025011	6094050023	10	~2005
3047180189	24377441513	11	~2007
3047279281	18283675687	11	~2006
3047317079	6094634159	10	~2005
3047352299	6094704599	10	~2005
3047462963	6094925927	10	~2005
3047471111	6094942223	10	~2005
3047717627	24381741017	11	~2007
3047885339	6095770679	10	~2005
3047934083	6095868167	10	~2005
3047935619	6095871239	10	~2005
3048013469	24384107753	11	~2007
3048100763	128020232047	12	~2008
3048206303	6096412607	10	~2005
3048493691	6096987383	10	~2005
3048671599	73168118377	11	~2008
3048709991	6097419983	10	~2005
3048781523	6097563047	10	~2005

Exponent	Prime Factor	Digits	Year
3048804673	18292828039	11	~2006
3048841667	24390733337	11	~2007
3049008461	18294050767	11	~2006
3049102139	6098204279	10	~2005
3049232663	6098465327	10	~2005
3049293059	6098586119	10	~2005
3049354751	6098709503	10	~2005
3049396799	6098793599	10	~2005
3049417039	103680179327	12	~2008
3049514233	18297085399	11	~2006
3049719923	6099439847	10	~2005
3049792901	24398343209	11	~2007
3049798991	6099597983	10	~2005
3049930931	6099861863	10	~2005
3049941299	6099882599	10	~2005
3049944503	6099889007	10	~2005
3049981439	6099962879	10	~2005
3050087171	6100174343	10	~2005
3050172791	6100345583	10	~2005
3050200451	6100400903	10	~2005
3050300171	6100600343	10	~2005
3050329927	73207918249	11	~2008
3050352689	42704937647	11	~2007
3050789039	6101578079	10	~2005
3051219239	6102438479	10	~2005

4.768.925 digits

25-05-04