Small Mersenne Prime Factors (page 4779/5025)

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	Dig.	Year
83912379263	167824758527	12	~2016
83912973311	167825946623	12	~2016
83915833367	671326666937	12	~2018
83918419567	2148...409153	14	2023
83927874059	167855748119	12	~2016
83934870179	167869740359	12	~2016
83938128517	503628771103	12	~2017
83945315999	167890631999	12	~2016
83945621411	167891242823	12	~2016
83957275859	167914551719	12	~2016
83957543291	167915086583	12	~2016
83958062291	167916124583	12	~2016
83959211183	167918422367	12	~2016
83963882111	671711056889	12	~2018
83968772003	167937544007	12	~2016
83970624071	167941248143	12	~2016
83976368471	167952736943	12	~2016
83976685829	671813486633	12	~2018
83990395031	167980790063	12	~2016
83990746223	167981492447	12	~2016
83992140443	167984280887	12	~2016
84001534031	168003068063	12	~2016
84008248501	504049491007	12	~2017
84010647179	168021294359	12	~2016
84013631459	168027262919	12	~2016

Exponent	Prime Factor	Dig.	Year
84023746307	672189970457	12	~2018
84030073273	504180439639	12	~2017
84031346543	168062693087	12	~2016
84036422699	168072845399	12	~2016
84036956771	168073913543	12	~2016
84040297823	168080595647	12	~2016
84042679211	168085358423	12	~2016
84043583339	168087166679	12	~2016
84045032651	168090065303	12	~2016
84056465957	672451727657	12	~2018
84061914203	168123828407	12	~2016
84068362811	168136725623	12	~2016
84072352943	168144705887	12	~2016
84072397511	168144795023	12	~2016
84077030171	168154060343	12	~2016
84077781383	168155562767	12	~2016
84094745051	168189490103	12	~2016
84094806701	504568840207	12	~2018
84102294623	168204589247	12	~2016
84107819459	168215638919	12	~2016
84109539901	504657239407	12	~2018
84109590731	168219181463	12	~2016
84111585263	168223170527	12	~2016
84114819983	168229639967	12	~2016
84117882683	168235765367	12	~2016

Exponent	Prime Factor	Dig.	Year
84118708643	168237417287	12	~2016
84119077481	7562...554191	15	2024
84122754139	3405...754673	15	2025
84123451799	168246903599	12	~2016
84126157991	168252315983	12	~2016
84130059371	168260118743	12	~2016
84137575919	168275151839	12	~2016
84138019211	168276038423	12	~2016
84141149243	168282298487	12	~2016
84147786179	168295572359	12	~2016
84148919303	168297838607	12	~2016
84153814271	168307628543	12	~2016
84156833483	168313666967	12	~2016
84159417299	168318834599	12	~2016
84163110461	673304883689	12	~2018
84167231051	168334462103	12	~2016
84167542463	168335084927	12	~2016
84171752663	168343505327	12	~2016
84171840059	168343680119	12	~2016
84176279111	168352558223	12	~2016
84176306843	168352613687	12	~2016
84180388751	168360777503	12	~2016
84190436651	168380873303	12	~2016
84199513753	505197082519	12	~2018
84203355191	168406710383	12	~2016

Exponent	Prime Factor	Dig.	Year
84204177539	168408355079	12	~2016
84214152719	168428305439	12	~2016
84221770631	673774165049	12	~2018
84223627259	168447254519	12	~2016
84224546639	168449093279	12	~2016
84228503123	168457006247	12	~2016
84245345467	2308...657959	14	2023
84251287259	168502574519	12	~2016
84255908417	505535450503	12	~2018
84257929487	3184...346087	14	2024
84262598831	168525197663	12	~2016
84266602261	505599613567	12	~2018
84281074439	168562148879	12	~2016
84283043401	505698260407	12	~2018
84292988183	168585976367	12	~2016
84294002137	505764012823	12	~2018
84307943459	168615886919	12	~2016
84312149951	168624299903	12	~2016
84313302719	168626605439	12	~2016
84317631791	168635263583	12	~2016
84322610903	168645221807	12	~2016
84324666743	168649333487	12	~2016
84337789661	506026737967	12	~2018
84343144703	168686289407	12	~2016
84345887777	506075326663	12	~2018

4.724.182 digits

25-04-13