Small Mersenne Prime Factors (page 4130/5025)

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	Dig.	Year
6735087839	13470175679	11	~2008
6735985141	323327286769	12	~2011
6736005359	13472010719	11	~2008
6736144153	40416864919	11	~2009
6736842743	13473685487	11	~2008
6737374883	13474749767	11	~2008
6737539079	13475078159	11	~2008
6737701499	121278626983	12	~2010
6737821331	53902570649	11	~2009
6738968891	13477937783	11	~2008
6739019197	309994883063	12	~2011
6739304963	13478609927	11	~2008
6739539139	67395391391	11	~2009
6739588811	53916710489	11	~2009
6740346143	13480692287	11	~2008
6740349719	13480699439	11	~2008
6740575379	13481150759	11	~2008
6740797379	13481594759	11	~2008
6740829617	53926636937	11	~2009
6740990759	13481981519	11	~2008
6741709511	13483419023	11	~2008
6741779171	13483558343	11	~2008
6741828623	13483657247	11	~2008
6741837299	13483674599	11	~2008
6741932663	13483865327	11	~2008

Exponent	Prime Factor	Dig.	Year
6742093313	40452559879	11	~2009
6742115593	40452693559	11	~2009
6742171739	13484343479	11	~2008
6742369859	53938958873	11	~2009
6743418431	13486836863	11	~2008
6743466563	13486933127	11	~2008
6743733803	13487467607	11	~2008
6744271223	13488542447	11	~2008
6744371113	40466226679	11	~2009
6744597131	13489194263	11	~2008
6744733847	53957870777	11	~2009
6745102883	13490205767	11	~2008
6745167083	13490334167	11	~2008
6745298099	13490596199	11	~2008
6745331471	13490662943	11	~2008
6745569023	13491138047	11	~2008
6745620593	40473723559	11	~2009
6745999591	593647964009	12	~2012
6746205419	13492410839	11	~2008
6746756063	13493512127	11	~2008
6747116471	13494232943	11	~2008
6747228431	13494456863	11	~2008
6747446963	13494893927	11	~2008
6748151339	13496302679	11	~2008
6748307459	13496614919	11	~2008

Exponent	Prime Factor	Dig.	Year
6749159981	40494959887	11	~2009
6749571443	13499142887	11	~2008
6749596871	53996774969	11	~2009
6749830259	13499660519	11	~2008
6749873281	40499239687	11	~2009
6750093547	108001496753	12	~2010
6750120323	13500240647	11	~2008
6750354503	13500709007	11	~2008
6750388811	13500777623	11	~2008
6750513557	40503081343	11	~2009
6750565931	13501131863	11	~2008
6750576641	40503459847	11	~2009
6751002977	162024071449	12	~2010
6751143923	13502287847	11	~2008
6751339211	54010713689	11	~2009
6752119133	40512714799	11	~2009
6752128679	13504257359	11	~2008
6752210981	40513265887	11	~2009
6752326943	13504653887	11	~2008
6752753951	13505507903	11	~2008
6753239411	13506478823	11	~2008
6753581561	40521489367	11	~2009
6753805043	13507610087	11	~2008
6753859163	13507718327	11	~2008
6753879491	13507758983	11	~2008

Exponent	Prime Factor	Dig.	Year
6754182791	13508365583	11	~2008
6754306943	13508613887	11	~2008
6754787183	13509574367	11	~2008
6755160983	13510321967	11	~2008
6755353343	13510706687	11	~2008
6755501719	67555017191	11	~2009
6755723291	13511446583	11	~2008
6756016451	13512032903	11	~2008
6756136117	40536816703	11	~2009
6756309299	13512618599	11	~2008
6756622283	13513244567	11	~2008
6757183403	13514366807	11	~2008
6757531523	13515063047	11	~2008
6757629083	13515258167	11	~2008
6757684259	13515368519	11	~2008
6757866551	13515733103	11	~2008
6758321281	40549927687	11	~2009
6759093119	13518186239	11	~2008
6759099779	13518199559	11	~2008
6759112163	13518224327	11	~2008
6759469723	67594697231	11	~2009
6759725111	13519450223	11	~2008
6759811979	13519623959	11	~2008
6759866783	13519733567	11	~2008
6759986423	13519972847	11	~2008

4.724.182 digits

25-04-13