Small Mersenne Prime Factors (page 3847/5025)

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	Digits	Year
2798850371	5597700743	10	~2005
2798861423	5597722847	10	~2005
2798889311	5597778623	10	~2005
2798893199	5597786399	10	~2005
2799094283	5598188567	10	~2005
2799144311	5598288623	10	~2005
2799144563	5598289127	10	~2005
2799162323	5598324647	10	~2005
2799391643	5598783287	10	~2005
2799452651	5598905303	10	~2005
2799486323	5598972647	10	~2005
2799507071	5599014143	10	~2005
2799535811	5599071623	10	~2005
2799723779	5599447559	10	~2005
2799725063	5599450127	10	~2005
2799776123	5599552247	10	~2005
2799780383	5599560767	10	~2005
2799885629	83996568871	11	~2008
2799894659	50398103863	11	~2007
2799900533	16799403199	11	~2006
2799983831	5599967663	10	~2005
2800011373	16800068239	11	~2006
2800025099	5600050199	10	~2005
2800121897	16800731383	11	~2006
2800290299	5600580599	10	~2005

Exponent	Prime Factor	Digits	Year
2800335133	61607372927	11	~2007
2800347131	5600694263	10	~2005
2800562939	5601125879	10	~2005
2800706543	5601413087	10	~2005
2800739603	5601479207	10	~2005
2800794317	16804765903	11	~2006
2800819979	5601639959	10	~2005
2800866659	89627733089	11	~2008
2800964233	84028926991	11	~2008
2801007893	16806047359	11	~2006
2801114891	5602229783	10	~2005
2801137439	5602274879	10	~2005
2801156693	16806940159	11	~2006
2801157287	22409258297	11	~2006
2801312639	5602625279	10	~2005
2801357201	16808143207	11	~2006
2801473271	5602946543	10	~2005
2801474917	16808849503	11	~2006
2801492399	5602984799	10	~2005
2801499671	5602999343	10	~2005
2801529299	89648937569	11	~2008
2801770091	5603540183	10	~2005
2801838839	5603677679	10	~2005
2801901083	5603802167	10	~2005
2801912107	28019121071	11	~2006

Exponent	Prime Factor	Digits	Year
2801972399	5603944799	10	~2005
2801992211	5603984423	10	~2005
2802181201	44834899217	11	~2007
2802219653	16813317919	11	~2006
2802248831	5604497663	10	~2005
2802444563	5604889127	10	~2005
2802669539	5605339079	10	~2005
2802753851	22422030809	11	~2006
2802884039	5605768079	10	~2005
2802911381	22423291049	11	~2006
2802967883	5605935767	10	~2005
2802992111	22423936889	11	~2006
2803055399	5606110799	10	~2005
2803129079	5606258159	10	~2005
2803470359	5606940719	10	~2005
2803472459	5606944919	10	~2005
2803525271	5607050543	10	~2005
2803643321	16821859927	11	~2006
2803646591	5607293183	10	~2005
2803652363	5607304727	10	~2005
2803658041	84109741231	11	~2008
2803748663	5607497327	10	~2005
2803771463	67290515113	11	~2007
2803789061	16822734367	11	~2006
2803977733	44863643729	11	~2007

Exponent	Prime Factor	Digits	Year
2804093819	5608187639	10	~2005
2804162171	5608324343	10	~2005
2804256089	22434048713	11	~2006
2804292971	5608585943	10	~2005
2804382131	5608764263	10	~2005
2804551697	16827310183	11	~2006
2804599877	22436799017	11	~2006
2804611897	16827671383	11	~2006
2804693513	16828161079	11	~2006
2804798207	22438385657	11	~2006
2804901157	16829406943	11	~2006
2805225461	22441803689	11	~2006
2805270431	5610540863	10	~2005
2805328439	5610656879	10	~2005
2805401051	5610802103	10	~2005
2805476339	5610952679	10	~2005
2805723779	67337370697	11	~2007
2805976889	22447815113	11	~2006
2806042451	5612084903	10	~2005
2806181809	67348363417	11	~2007
2806187759	5612375519	10	~2005
2806285739	5612571479	10	~2005
2806325999	5612651999	10	~2005
2806360589	22450884713	11	~2006
2806499851	44903997617	11	~2007

4.724.182 digits

25-04-13