Small Mersenne Prime Factors (page 4384/5340)

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
7275156041	451059674543	12	~2012
7275292883	14550585767	11	~2008
7275355957	43652135743	11	~2009
7275700573	116411209169	12	~2010
7276045789	174625098937	12	~2011
7276568461	218297053831	12	~2011
7276634663	14553269327	11	~2008
7277393843	538527144383	12	~2012
7277451971	14554903943	11	~2008
7277480401	116439686417	12	~2010
7277585251	72775852511	11	~2010
7277787659	14555575319	11	~2008
7277909591	14555819183	11	~2008
7277979083	14555958167	11	~2008
7277985497	43667912983	11	~2009
7278205283	14556410567	11	~2008
7278867521	43673205127	11	~2009
7278876359	14557752719	11	~2008
7278907871	14557815743	11	~2008
7279052003	14558104007	11	~2008
7279760911	72797609111	11	~2010
7279796101	43678776607	11	~2009
7280057591	14560115183	11	~2008
7280175821	58241406569	11	~2010
7280211761	58241694089	11	~2010

Exponent	Prime Factor	Dig.	Year
7280235251	14560470503	11	~2008
7280477423	14560954847	11	~2008
7280855053	43685130319	11	~2009
7281340427	58250723417	11	~2010
7281420959	14562841919	11	~2008
7281534563	14563069127	11	~2008
7281974039	14563948079	11	~2008
7282013213	101948184983	12	~2010
7282594271	14565188543	11	~2008
7282659899	14565319799	11	~2008
7282755911	14565511823	11	~2008
7282904593	43697427559	11	~2009
7282992539	14565985079	11	~2008
7283546867	58268374937	11	~2010
7283962157	58271697257	11	~2010
7284245219	14568490439	11	~2008
7284301469	58274411753	11	~2010
7284419117	58275352937	11	~2010
7284555923	14569111847	11	~2008
7284761117	58278088937	11	~2010
7284806411	14569612823	11	~2008
7284858359	14569716719	11	~2008
7284889043	14569778087	11	~2008
7284958091	14569916183	11	~2008
7285450883	14570901767	11	~2008

Exponent	Prime Factor	Dig.	Year
7285474033	43712844199	11	~2009
7285557743	14571115487	11	~2008
7285563959	14571127919	11	~2008
7287508391	14575016783	11	~2008
7287642959	14575285919	11	~2008
7287703693	43726222159	11	~2009
7288537037	58308296297	11	~2010
7288583557	291543342281	12	~2011
7288791439	72887914391	11	~2010
7289061443	14578122887	11	~2008
7289118299	14578236599	11	~2008
7289156009	58313248073	11	~2010
7289297783	14578595567	11	~2008
7289311091	14578622183	11	~2008
7289802077	43738812463	11	~2009
7290288787	291611551481	12	~2011
7290390599	14580781199	11	~2008
7290567503	14581135007	11	~2008
7290927643	72909276431	11	~2010
7291024211	14582048423	11	~2008
7291067977	43746407863	11	~2009
7291460783	14582921567	11	~2008
7291558919	14583117839	11	~2008
7291709651	14583419303	11	~2008
7291877291	14583754583	11	~2008

Exponent	Prime Factor	Dig.	Year
7291916519	14583833039	11	~2008
7292214757	43753288543	11	~2009
7292308739	14584617479	11	~2008
7292818783	116685100529	12	~2010
7292913599	14585827199	11	~2008
7292940731	14585881463	11	~2008
7293045971	131274827479	12	~2010
7293266423	14586532847	11	~2008
7293354001	43760124007	11	~2009
7293383183	14586766367	11	~2008
7293445319	14586890639	11	~2008
7293925237	43763551423	11	~2009
7294530823	116712493169	12	~2010
7294919543	14589839087	11	~2008
7295125379	58361003033	11	~2010
7295917367	58367338937	11	~2010
7296100499	14592200999	11	~2008
7296380401	43778282407	11	~2009
7296727019	14593454039	11	~2008
7296742679	14593485359	11	~2008
7297312559	14594625119	11	~2008
7297873259	14595746519	11	~2008
7298069039	14596138079	11	~2008
7298211119	175157066857	12	~2011
7299786679	131396160223	12	~2010

5.037.460 digits

25-09-07