Small Mersenne Prime Factors (page 4867/5460)

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
26221687991	52443375983	11	~2012
26222527043	839120865377	12	~2015
26223241679	52446483359	11	~2012
26223361163	52446722327	11	~2012
26223371651	52446743303	11	~2012
26223387059	52446774119	11	~2012
26223629279	52447258559	11	~2012
26224706759	52449413519	11	~2012
26226042131	209808337049	12	~2014
26226151019	52452302039	11	~2012
26226305123	52452610247	11	~2012
26226670331	52453340663	11	~2012
26227612451	52455224903	11	~2012
26228406679	262284066791	12	~2014
26228924321	209831394569	12	~2014
26229049019	52458098039	11	~2012
26230636823	52461273647	11	~2012
26231387249	209851097993	12	~2014
26233367033	157400202199	12	~2014
26234820611	52469641223	11	~2012
26234850839	52469701679	11	~2012
26235114803	52470229607	11	~2012
26235193321	419763093137	12	~2015
26235346079	52470692159	11	~2012
26236631951	52473263903	11	~2012

Exponent	Prime Factor	Dig.	Year
26239397299	262393972991	12	~2014
26239429019	52478858039	11	~2012
26239804601	209918436809	12	~2014
26241037079	52482074159	11	~2012
26242633511	472367403199	12	~2015
26242818473	157456910839	12	~2014
26244054839	52488109679	11	~2012
26245124771	52490249543	11	~2012
26245699133	157474194799	12	~2014
26246867639	52493735279	11	~2012
26247303529	2472...924319	14	2024
26247433607	209979468857	12	~2014
26247796103	52495592207	11	~2012
26249381057	209995048457	12	~2014
26250618437	210004947497	12	~2014
26250887963	52501775927	11	~2012
26250922343	52501844687	11	~2012
26251188731	52502377463	11	~2012
26252952851	52505905703	11	~2012
26254348877	210034791017	12	~2014
26255013121	420080209937	12	~2015
26255062993	1102...570601	15	2025
26255710583	52511421167	11	~2012
26255864711	52511729423	11	~2012
26257201079	52514402159	11	~2012

Exponent	Prime Factor	Dig.	Year
26257402103	52514804207	11	~2012
26257738057	420123808913	12	~2015
26257979009	210063832073	12	~2014
26258352083	52516704167	11	~2012
26260082339	52520164679	11	~2012
26260193243	52520386487	11	~2012
26260711901	157564271407	12	~2014
26261803559	52523607119	11	~2012
26262248483	52524496967	11	~2012
26262503251	262625032511	12	~2014
26263028471	52526056943	11	~2012
26264085607	420225369713	12	~2015
26264262071	52528524143	11	~2012
26265292477	157591754863	12	~2014
26265751693	157594510159	12	~2014
26266804073	367735257023	12	~2014
26270070397	157620422383	12	~2014
26270158793	157620952759	12	~2014
26270806319	52541612639	11	~2012
26271586199	630518068777	12	~2015
26272104709	577986303599	12	~2015
26274269717	157645618303	12	~2014
26275261277	630606270649	12	~2015
26275290917	210202327337	12	~2014
26275300021	788259000631	12	~2015

Exponent	Prime Factor	Dig.	Year
26277944093	157667664559	12	~2014
26278687511	52557375023	11	~2012
26279199371	52558398743	11	~2012
26279316611	52558633223	11	~2012
26285149763	52570299527	11	~2012
26287323253	157723939519	12	~2014
26288125817	210305006537	12	~2014
26288935697	157733614183	12	~2014
26290772639	52581545279	11	~2012
26290956557	157745739343	12	~2014
26292513343	262925133431	12	~2014
26292546323	52585092647	11	~2012
26293968923	52587937847	11	~2012
26294277239	52588554479	11	~2012
26294463521	157766781127	12	~2014
26295298979	52590597959	11	~2012
26295985931	210367887449	12	~2014
26296104563	52592209127	11	~2012
26298642239	52597284479	11	~2012
26300491643	52600983287	11	~2012
26300628899	52601257799	11	~2012
26300895671	52601791343	11	~2012
26302079519	52604159039	11	~2012
26302420139	52604840279	11	~2012
26302795679	52605591359	11	~2012

5.157.210 digits

25-11-02