Small Mersenne Prime Factors (page 3637/5070)

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
1462965683	2925931367	10	~2003
1462976951	2925953903	10	~2003
1462998083	2925996167	10	~2003
1463001041	8778006247	10	~2004
1463005283	2926010567	10	~2003
1463037143	2926074287	10	~2003
1463044087	14630440871	11	~2004
1463071451	2926142903	10	~2003
1463075231	2926150463	10	~2003
1463105771	2926211543	10	~2003
1463137811	2926275623	10	~2003
1463294951	2926589903	10	~2003
1463298899	2926597799	10	~2003
1463299283	2926598567	10	~2003
1463314031	2926628063	10	~2003
1463452031	2926904063	10	~2003
1463452553	8780715319	10	~2004
1463525813	20489361383	11	~2005
1463528621	11708228969	11	~2004
1463538919	35124934057	11	~2005
1463599103	2927198207	10	~2003
1463686061	8782116367	10	~2004
1463732723	2927465447	10	~2003
1463743807	14637438071	11	~2004
1463751797	8782510783	10	~2004

Exponent	Prime Factor	Digits	Year
1463778697	8782672183	10	~2004
1463795713	23420731409	11	~2005
1463800301	11710402409	11	~2004
1463825999	2927651999	10	~2003
1463845871	2927691743	10	~2003
1463850779	2927701559	10	~2003
1463952383	2927904767	10	~2003
1463982323	2927964647	10	~2003
1463992073	125903318279	12	~2007
1463992091	2927984183	10	~2003
1464051299	2928102599	10	~2003
1464062339	2928124679	10	~2003
1464077387	11712619097	11	~2004
1464121303	105416733817	12	~2006
1464135901	8784815407	10	~2004
1464228013	8785368079	10	~2004
1464290771	2928581543	10	~2003
1464321457	8785928743	10	~2004
1464386879	2928773759	10	~2003
1464417551	2928835103	10	~2003
1464497543	2928995087	10	~2003
1464550991	2929101983	10	~2003
1464563533	8787381199	10	~2004
1464581837	8787491023	10	~2004
1464589859	2929179719	10	~2003

Exponent	Prime Factor	Digits	Year
1464685757	11717486057	11	~2004
1464696371	2929392743	10	~2003
1464699479	2929398959	10	~2003
1464794651	2929589303	10	~2003
1464879359	2929758719	10	~2003
1464896099	2929792199	10	~2003
1464911407	93754330049	11	~2006
1464990479	2929980959	10	~2003
1465011659	2930023319	10	~2003
1465047659	2930095319	10	~2003
1465060703	2930121407	10	~2003
1465061579	11720492633	11	~2004
1465082579	2930165159	10	~2003
1465087103	2930174207	10	~2003
1465095781	8790574687	10	~2004
1465251661	8791509967	10	~2004
1465349351	2930698703	10	~2003
1465376219	2930752439	10	~2003
1465445963	2930891927	10	~2003
1465479371	2930958743	10	~2003
1465527131	2931054263	10	~2003
1465534919	2931069839	10	~2003
1465539503	2931079007	10	~2003
1465620707	319505314127	12	~2008
1465687733	20519628263	11	~2005

Exponent	Prime Factor	Digits	Year
1465710419	2931420839	10	~2003
1465732223	2931464447	10	~2003
1465744349	20520420887	11	~2005
1465767623	2931535247	10	~2003
1465778459	2931556919	10	~2003
1465835699	2931671399	10	~2003
1465853783	2931707567	10	~2003
1465981259	2931962519	10	~2003
1465989359	11727914873	11	~2004
1465994423	2931988847	10	~2003
1466071207	23457139313	11	~2005
1466079073	35185897753	11	~2005
1466117459	26390114263	11	~2005
1466180879	2932361759	10	~2003
1466266051	14662660511	11	~2004
1466303183	2932606367	10	~2003
1466303339	2932606679	10	~2003
1466321357	8797928143	10	~2004
1466349623	2932699247	10	~2003
1466370403	14663704031	11	~2004
1466466383	2932932767	10	~2003
1466526731	11732213849	11	~2004
1466638759	14666387591	11	~2004
1466653169	11733225353	11	~2004
1466683931	2933367863	10	~2003

4.768.925 digits

25-05-04