Small Mersenne Prime Factors (page 4032/5025)

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
4923583631	9847167263	10	~2007
4923606491	9847212983	10	~2007
4923695963	9847391927	10	~2007
4923782579	9847565159	10	~2007
4923877499	9847754999	10	~2007
4924039201	29544235207	11	~2008
4924045811	9848091623	10	~2007
4924093961	39392751689	11	~2008
4924243733	29545462399	11	~2008
4924445231	9848890463	10	~2007
4924674263	9849348527	10	~2007
4924722563	9849445127	10	~2007
4924835459	39398683673	11	~2008
4925422289	512243918057	12	~2011
4925675297	29554051783	11	~2008
4926320051	9852640103	10	~2007
4926389561	39411116489	11	~2008
4926577199	39412617593	11	~2008
4926839857	29561039143	11	~2008
4926939911	9853879823	10	~2007
4926965471	9853930943	10	~2007
4927201501	29563209007	11	~2008
4927490731	285794462399	12	~2010
4927572479	39420579833	11	~2008
4927587383	9855174767	10	~2007

Exponent	Prime Factor	Digits	Year
4927872193	29567233159	11	~2008
4927886423	9855772847	10	~2007
4928149571	9856299143	10	~2007
4928432471	9856864943	10	~2007
4928488151	9856976303	10	~2007
4928625323	9857250647	10	~2007
4928730263	9857460527	10	~2007
4928754731	9857509463	10	~2007
4928818241	29572909447	11	~2008
4929162323	9858324647	10	~2007
4929604241	29577625447	11	~2008
4929672617	39437380937	11	~2008
4929806753	29578840519	11	~2008
4930088843	9860177687	10	~2007
4930098119	9860196239	10	~2007
4930309337	29581856023	11	~2008
4930442021	39443536169	11	~2008
4930530239	9861060479	10	~2007
4930673339	9861346679	10	~2007
4930691141	39445529129	11	~2008
4930705271	9861410543	10	~2007
4930769423	9861538847	10	~2007
4931346011	9862692023	10	~2007
4931403731	9862807463	10	~2007
4931579591	9863159183	10	~2007

Exponent	Prime Factor	Digits	Year
4931696723	9863393447	10	~2007
4931697257	29590183543	11	~2008
4932193421	39457547369	11	~2008
4932450899	9864901799	10	~2007
4932711383	9865422767	10	~2007
4933056539	9866113079	10	~2007
4933103099	9866206199	10	~2007
4933146503	9866293007	10	~2007
4933211891	9866423783	10	~2007
4933299971	9866599943	10	~2007
4933396679	9866793359	10	~2007
4933415063	276271243529	12	~2010
4933557701	29601346207	11	~2008
4933685171	9867370343	10	~2007
4933778039	9867556079	10	~2007
4934014511	9868029023	10	~2007
4934237663	9868475327	10	~2007
4934438933	29606633599	11	~2008
4934469791	9868939583	10	~2007
4934475121	29606850727	11	~2008
4934709763	78955356209	11	~2009
4934874023	9869748047	10	~2007
4935205727	118444937449	12	~2009
4935262763	9870525527	10	~2007
4935295691	9870591383	10	~2007

Exponent	Prime Factor	Digits	Year
4935315233	29611891399	11	~2008
4935327533	29611965199	11	~2008
4935531719	9871063439	10	~2007
4936019603	9872039207	10	~2007
4936030061	39488240489	11	~2008
4936107971	9872215943	10	~2007
4936435643	9872871287	10	~2007
4936534139	9873068279	10	~2007
4937136769	108617008919	12	~2009
4937147339	9874294679	10	~2007
4937628719	9875257439	10	~2007
4937703383	9875406767	10	~2007
4937765983	197510639321	12	~2010
4937923961	29627543767	11	~2008
4938224099	9876448199	10	~2007
4938273419	9876546839	10	~2007
4938435479	9876870959	10	~2007
4938519959	9877039919	10	~2007
4938538931	237049868689	12	~2010
4938803459	9877606919	10	~2007
4938816959	9877633919	10	~2007
4938940781	29633644687	11	~2008
4938981623	9877963247	10	~2007
4939047629	39512381033	11	~2008
4939063403	9878126807	10	~2007

4.724.182 digits

25-04-13