Small Mersenne Prime Factors (page 4342/5745)

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
2939711191	52914801439	11	~2007
2939828779	29398287791	11	~2007
2939878751	5879757503	10	~2005
2939892107	23519136857	11	~2006
2939937283	29399372831	11	~2007
2940125257	17640751543	11	~2006
2940197443	211694215897	12	~2009
2940214331	5880428663	10	~2005
2940268679	5880537359	10	~2005
2940391561	17642349367	11	~2006
2940408371	5880816743	10	~2005
2940498371	5880996743	10	~2005
2940559103	5881118207	10	~2005
2940594659	5881189319	10	~2005
2940638243	5881276487	10	~2005
2940742463	5881484927	10	~2005
2940779983	29407799831	11	~2007
2940929819	5881859639	10	~2005
2941173563	5882347127	10	~2005
2941219871	23529758969	11	~2006
2941442351	5882884703	10	~2005
2941483421	17648900527	11	~2006
2941483631	5882967263	10	~2005
2941511593	158841626023	12	~2008
2941545983	282388414369	12	~2009

Exponent	Prime Factor	Digits	Year
2941669403	5883338807	10	~2005
2942018819	5884037639	10	~2005
2942069519	5884139039	10	~2005
2942151323	5884302647	10	~2005
2942174429	23537395433	11	~2006
2942191979	5884383959	10	~2005
2942246063	5884492127	10	~2005
2942265331	617875719511	12	~2010
2942328773	17653972639	11	~2006
2942419691	5884839383	10	~2005
2942536871	5885073743	10	~2005
2942635879	29426358791	11	~2007
2942709743	5885419487	10	~2005
2942766719	5885533439	10	~2005
2942778851	5885557703	10	~2005
2942864887	29428648871	11	~2007
2942954407	52973179327	11	~2007
2943009899	23544079193	11	~2006
2943026843	5886053687	10	~2005
2943089459	5886178919	10	~2005
2943095993	17658575959	11	~2006
2943103349	23544826793	11	~2006
2943206621	17659239727	11	~2006
2943311377	17659868263	11	~2006
2943458543	5886917087	10	~2005

Exponent	Prime Factor	Digits	Year
2943497327	23547978617	11	~2006
2943753203	76537583279	11	~2008
2943880763	5887761527	10	~2005
2943928657	17663571943	11	~2006
2944025537	23552204297	11	~2006
2944037039	5888074079	10	~2005
2944252387	29442523871	11	~2007
2944356839	5888713679	10	~2005
2944669391	5889338783	10	~2005
2944782371	5889564743	10	~2005
2944913593	17669481559	11	~2006
2944918591	29449185911	11	~2007
2944923419	5889846839	10	~2005
2944965733	17669794399	11	~2006
2945016449	23560131593	11	~2006
2945120461	17670722767	11	~2006
2945212811	5890425623	10	~2005
2945272129	559601704511	12	~2010
2945355869	23562846953	11	~2006
2945373971	5890747943	10	~2005
2945435707	29454357071	11	~2007
2945446957	17672681743	11	~2006
2945467559	5890935119	10	~2005
2945469671	5890939343	10	~2005
2945506463	801177757937	12	~2010

Exponent	Prime Factor	Digits	Year
2945508971	5891017943	10	~2005
2945528141	23564225129	11	~2006
2945721161	23565769289	11	~2006
2945957411	23567659289	11	~2006
2945960123	5891920247	10	~2005
2946149711	5892299423	10	~2005
2946151823	5892303647	10	~2005
2946162911	5892325823	10	~2005
2946181517	17677089103	11	~2006
2946321299	5892642599	10	~2005
2946472751	23571782009	11	~2006
2946723023	5893446047	10	~2005
2946749293	17680495759	11	~2006
2946807119	5893614239	10	~2005
2946885647	70725255529	11	~2008
2946912071	5893824143	10	~2005
2946978491	5893956983	10	~2005
2947221001	88416630031	11	~2008
2947278821	17683672927	11	~2006
2947362923	5894725847	10	~2005
2947471223	5894942447	10	~2005
2947612957	17685677743	11	~2006
2947626359	5895252719	10	~2005
2947636463	5895272927	10	~2005
2947679279	5895358559	10	~2005

5.441.361 digits

26-03-15