Small Mersenne Prime Factors (page 4707/5190)

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
33023455121	198140730727	12	~2014
33029677211	66059354423	11	~2013
33030030251	66060060503	11	~2013
33032563799	66065127599	11	~2013
33033550181	198201301087	12	~2014
33036142319	66072284639	11	~2013
33042649331	66085298663	11	~2013
33044640311	66089280623	11	~2013
33046756343	66093512687	11	~2013
33047903519	66095807039	11	~2013
33052572359	66105144719	11	~2013
33054054779	264432438233	12	~2015
33056194337	264449554697	12	~2015
33056439553	198338637319	12	~2014
33056816563	793363597513	12	~2016
33058094579	66116189159	11	~2013
33060335543	66120671087	11	~2013
33061135091	66122270183	11	~2013
33062300471	66124600943	11	~2013
33062969021	198377814127	12	~2014
33064303439	66128606879	11	~2013
33065711891	264525695129	12	~2015
33067127123	66134254247	11	~2013
33067131719	66134263439	11	~2013
33067198379	66134396759	11	~2013

Exponent	Prime Factor	Dig.	Year
33067598321	264540786569	12	~2015
33068278403	66136556807	11	~2013
33069764723	66139529447	11	~2013
33072237179	66144474359	11	~2013
33074214143	66148428287	11	~2013
33074310359	66148620719	11	~2013
33074514251	66149028503	11	~2013
33076302131	66152604263	11	~2013
33078215039	66156430079	11	~2013
33078826843	330788268431	12	~2015
33078849911	66157699823	11	~2013
33079348871	66158697743	11	~2013
33082865219	66165730439	11	~2013
33083834579	66167669159	11	~2013
33084059663	66168119327	11	~2013
33084294037	794023056889	12	~2016
33085234163	66170468327	11	~2013
33085592339	66171184679	11	~2013
33087359161	198524154967	12	~2014
33087902759	66175805519	11	~2013
33088848887	264710791097	12	~2015
33090266897	198541601383	12	~2014
33093127757	264745022057	12	~2015
33094190903	66188381807	11	~2013
33094514591	66189029183	11	~2013

Exponent	Prime Factor	Dig.	Year
33095552939	66191105879	11	~2013
33097073939	66194147879	11	~2013
33097744943	66195489887	11	~2013
33097874941	198587249647	12	~2014
33097932947	264783463577	12	~2015
33099273353	463389826943	12	~2015
33100459201	198602755207	12	~2014
33100905059	66201810119	11	~2013
33101385563	66202771127	11	~2013
33102029771	66204059543	11	~2013
33104052017	264832416137	12	~2015
33105936599	66211873199	11	~2013
33107598539	66215197079	11	~2013
33109386731	66218773463	11	~2013
33111221519	66222443039	11	~2013
33111247283	66222494567	11	~2013
33112016123	66224032247	11	~2013
33112330463	66224660927	11	~2013
33112391831	66224783663	11	~2013
33113930639	66227861279	11	~2013
33115319591	66230639183	11	~2013
33115820219	66231640439	11	~2013
33116573411	66233146823	11	~2013
33118137317	198708823903	12	~2014
33118499471	66236998943	11	~2013

Exponent	Prime Factor	Dig.	Year
33118962197	198713773183	12	~2014
33119001983	66238003967	11	~2013
33120245351	66240490703	11	~2013
33120483131	66240966263	11	~2013
33120587459	66241174919	11	~2013
33121068611	66242137223	11	~2013
33122522593	198735135559	12	~2014
33122991623	66245983247	11	~2013
33125987711	66251975423	11	~2013
33128027843	66256055687	11	~2013
33129402023	66258804047	11	~2013
33129422681	198776536087	12	~2014
33133241423	3260...560233	14	2023
33133241461	198799448767	12	~2014
33133813799	66267627599	11	~2013
33136973651	66273947303	11	~2013
33138712571	66277425143	11	~2013
33141466859	66282933719	11	~2013
33142907351	66285814703	11	~2013
33144076859	66288153719	11	~2013
33144969677	464029575479	12	~2015
33146267783	66292535567	11	~2013
33151839277	795644142649	12	~2016
33151994779	331519947791	12	~2015
33152349239	66304698479	11	~2013

4.888.230 digits

25-06-29