Small Mersenne Prime Factors (page 3792/5130)

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
1995084023	3990168047	10	~2004
1995123803	51873218879	11	~2006
1995252851	3990505703	10	~2004
1995321379	127700568257	12	~2007
1995352253	11972113519	11	~2005
1995442837	11972657023	11	~2005
1995458579	3990917159	10	~2004
1995522719	3991045439	10	~2004
1995537359	3991074719	10	~2004
1995548759	3991097519	10	~2004
1995601931	3991203863	10	~2004
1995631031	3991262063	10	~2004
1995633779	3991267559	10	~2004
1995640799	3991281599	10	~2004
1995698567	15965588537	11	~2005
1995843851	15966750809	11	~2005
1995856319	15966850553	11	~2005
1995902879	3991805759	10	~2004
1995919997	27942879959	11	~2006
1995970703	3991941407	10	~2004
1996156579	19961565791	11	~2005
1996239877	427195333679	12	~2009
1996276571	3992553143	10	~2004
1996286899	47910885577	11	~2006
1996303139	3992606279	10	~2004

Exponent	Prime Factor	Digits	Year
1996312523	3992625047	10	~2004
1996349843	3992699687	10	~2004
1996388903	3992777807	10	~2004
1996514953	143749076617	12	~2007
1996516211	3993032423	10	~2004
1996576987	19965769871	11	~2005
1996670699	3993341399	10	~2004
1996684607	35940322927	11	~2006
1996722527	15973780217	11	~2005
1996729079	3993458159	10	~2004
1996778363	3993556727	10	~2004
1996875371	3993750743	10	~2004
1996922177	15975377417	11	~2005
1996934111	3993868223	10	~2004
1996969703	3993939407	10	~2004
1996970483	3993940967	10	~2004
1996975901	11981855407	11	~2005
1997024707	19970247071	11	~2005
1997059331	3994118663	10	~2004
1997153003	3994306007	10	~2004
1997203451	3994406903	10	~2004
1997223479	3994446959	10	~2004
1997230919	3994461839	10	~2004
1997283011	15978264089	11	~2005
1997379599	3994759199	10	~2004

Exponent	Prime Factor	Digits	Year
1997392343	3994784687	10	~2004
1997423081	11984538487	11	~2005
1997429519	3994859039	10	~2004
1997526131	3995052263	10	~2004
1997536019	15980288153	11	~2005
1997576741	11985460447	11	~2005
1997659463	3995318927	10	~2004
1997752643	3995505287	10	~2004
1997774221	11986645327	11	~2005
1997867437	11987204623	11	~2005
1997872463	3995744927	10	~2004
1997910113	11987460679	11	~2005
1997947043	3995894087	10	~2004
1997965223	3995930447	10	~2004
1998043877	11988263263	11	~2005
1998142271	3996284543	10	~2004
1998145223	3996290447	10	~2004
1998265259	3996530519	10	~2004
1998286397	15986291177	11	~2005
1998344653	11990067919	11	~2005
1998357983	3996715967	10	~2004
1998432497	15987459977	11	~2005
1998448799	3996897599	10	~2004
1998461123	3996922247	10	~2004
1998493261	11990959567	11	~2005

Exponent	Prime Factor	Digits	Year
1998523979	3997047959	10	~2004
1998596123	3997192247	10	~2004
1998644177	15989153417	11	~2005
1998815939	15990527513	11	~2005
1998851713	43974737687	11	~2006
1998881737	11993290423	11	~2005
1998894011	3997788023	10	~2004
1998924749	63965591969	11	~2007
1999019549	15992156393	11	~2005
1999052663	3998105327	10	~2004
1999119179	15992953433	11	~2005
1999261093	31988177489	11	~2006
1999302551	3998605103	10	~2004
1999408679	3998817359	10	~2004
1999427159	3998854319	10	~2004
1999459883	3998919767	10	~2004
1999531463	3999062927	10	~2004
1999746797	11998480783	11	~2005
1999820051	3999640103	10	~2004
1999891703	3999783407	10	~2004
1999965683	3999931367	10	~2004
1999994833	11999968999	11	~2005
2000002331	4000004663	10	~2004
2000084771	4000169543	10	~2004
2000127659	4000255319	10	~2004

4.828.532 digits

25-06-01