Small Mersenne Prime Factors (page 4750/5340)

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
24462123611	48924247223	11	~2012
24462213383	48924426767	11	~2012
24462458063	48924916127	11	~2012
24463595771	48927191543	11	~2012
24463690799	48927381599	11	~2012
24464046881	195712375049	12	~2014
24464354729	195714837833	12	~2014
24464474579	1098...859711	15	2023
24464552713	146787316279	12	~2013
24465543143	48931086287	11	~2012
24466256543	636122670119	12	~2015
24468631331	48937262663	11	~2012
24468964463	48937928927	11	~2012
24470112083	48940224167	11	~2012
24470790433	146824742599	12	~2013
24472171103	48944342207	11	~2012
24472830383	48945660767	11	~2012
24473109383	48946218767	11	~2012
24473358517	146840151103	12	~2013
24476239943	48952479887	11	~2012
24476902031	48953804063	11	~2012
24476952347	587446856329	12	~2015
24477297863	48954595727	11	~2012
24477503651	48955007303	11	~2012
24477537547	391640600753	12	~2014

Exponent	Prime Factor	Dig.	Year
24477815717	146866894303	12	~2013
24478459991	48956919983	11	~2012
24479345699	48958691399	11	~2012
24480096841	146880581047	12	~2013
24480136979	48960273959	11	~2012
24480212951	48960425903	11	~2012
24480399323	48960798647	11	~2012
24480776669	5733...958799	14	2024
24481291811	48962583623	11	~2012
24481700723	48963401447	11	~2012
24481972937	146891837623	12	~2013
24481975163	48963950327	11	~2012
24484377851	195875022809	12	~2014
24484994123	48969988247	11	~2012
24485020223	48970040447	11	~2012
24486399187	244863991871	12	~2014
24486713831	48973427663	11	~2012
24487741571	48975483143	11	~2012
24489055043	48978110087	11	~2012
24490903379	48981806759	11	~2012
24493176193	146959057159	12	~2013
24495709379	48991418759	11	~2012
24495842051	48991684103	11	~2012
24497406371	48994812743	11	~2012
24498327797	342976589159	12	~2014

Exponent	Prime Factor	Dig.	Year
24498449903	48996899807	11	~2012
24498471097	146990826583	12	~2013
24499340903	48998681807	11	~2012
24501842203	245018422031	12	~2014
24502056899	49004113799	11	~2012
24502171163	49004342327	11	~2012
24503251823	49006503647	11	~2012
24503776021	735113280631	12	~2015
24504545291	196036362329	12	~2014
24505410883	392086574129	12	~2014
24505773059	49011546119	11	~2012
24507093899	49014187799	11	~2012
24507435383	49014870767	11	~2012
24508082639	49016165279	11	~2012
24509532431	49019064863	11	~2012
24509606963	49019213927	11	~2012
24510286139	196082289113	12	~2014
24512306363	49024612727	11	~2012
24512404139	49024808279	11	~2012
24514747403	49029494807	11	~2012
24515331341	196122650729	12	~2014
24515410571	196123284569	12	~2014
24516298637	147097791823	12	~2013
24517541099	49035082199	11	~2012
24517591801	147105550807	12	~2013

Exponent	Prime Factor	Dig.	Year
24519639217	147117835303	12	~2013
24520869257	196166954057	12	~2014
24522037223	49044074447	11	~2012
24523323043	2928...713343	14	2024
24523407743	49046815487	11	~2012
24524085623	49048171247	11	~2012
24524592607	245245926071	12	~2014
24529678759	588712290217	12	~2015
24534438671	49068877343	11	~2012
24535082861	147210497167	12	~2013
24536188679	49072377359	11	~2012
24537152669	196297221353	12	~2014
24537640739	196301125913	12	~2014
24538529303	49077058607	11	~2012
24540272353	147241634119	12	~2013
24542013731	49084027463	11	~2012
24543441899	49086883799	11	~2012
24543624971	49087249943	11	~2012
24543849313	147263095879	12	~2013
24543963683	49087927367	11	~2012
24548655223	245486552231	12	~2014
24554552303	49109104607	11	~2012
24556080011	49112160023	11	~2012
24556177259	49112354519	11	~2012
24556550407	392904806513	12	~2014

5.037.460 digits

25-09-07