Small Mersenne Prime Factors (page 4743/5025)

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
70734053303	141468106607	12	~2016
70739432161	424436592967	12	~2017
70742148539	141484297079	12	~2016
70745441531	565963532249	12	~2017
70750176599	141500353199	12	~2016
70752083459	141504166919	12	~2016
70753302803	4712...666799	14	2023
70753805459	3282...732977	14	2023
70754413571	141508827143	12	~2016
70756401973	424538411839	12	~2017
70769017199	141538034399	12	~2016
70770995831	141541991663	12	~2016
70771498823	141542997647	12	~2016
70773823619	141547647239	12	~2016
70776681719	141553363439	12	~2016
70777628711	141555257423	12	~2016
70779165179	141558330359	12	~2016
70785811823	141571623647	12	~2016
70788259799	141576519599	12	~2016
70789121363	141578242727	12	~2016
70804373723	141608747447	12	~2016
70807695017	424846170103	12	~2017
70810356161	424862136967	12	~2017
70816262969	566530103753	12	~2017
70820073851	141640147703	12	~2016

Exponent	Prime Factor	Dig.	Year
70821336263	141642672527	12	~2016
70826175503	141652351007	12	~2016
70828800431	141657600863	12	~2016
70835489531	141670979063	12	~2016
70842866723	141685733447	12	~2016
70844954123	141689908247	12	~2016
70850998811	141701997623	12	~2016
70859723699	141719447399	12	~2016
70860666251	141721332503	12	~2016
70862219819	141724439639	12	~2016
70865960411	141731920823	12	~2016
70866273743	141732547487	12	~2016
70868599943	141737199887	12	~2016
70870176673	425221060039	12	~2017
70873229939	141746459879	12	~2016
70878880199	567031041593	12	~2017
70880083691	141760167383	12	~2016
70880425751	141760851503	12	~2016
70883394863	141766789727	12	~2016
70885054211	141770108423	12	~2016
70885755623	141771511247	12	~2016
70888179199	708881791991	12	~2017
70892352539	141784705079	12	~2016
70902240551	141804481103	12	~2016
70903636679	141807273359	12	~2016

Exponent	Prime Factor	Dig.	Year
70910045287	709100452871	12	~2017
70911783073	425470698439	12	~2017
70919928119	141839856239	12	~2016
70921045631	141842091263	12	~2016
70925837441	425555024647	12	~2017
70927103399	141854206799	12	~2016
70928353763	141856707527	12	~2016
70929718679	141859437359	12	~2016
70944120671	141888241343	12	~2016
70944198973	425665193839	12	~2017
70946007323	141892014647	12	~2016
70947945611	141895891223	12	~2016
70948107179	141896214359	12	~2016
70949100821	425694604927	12	~2017
70952806499	141905612999	12	~2016
70959252863	141918505727	12	~2016
70959903947	567679231577	12	~2017
70962779971	709627799711	12	~2017
70965960671	141931921343	12	~2016
70967759771	141935519543	12	~2016
70968336011	141936672023	12	~2016
70973516543	141947033087	12	~2016
70977086909	567816695273	12	~2017
70979844599	141959689199	12	~2016
70980437677	425882626063	12	~2017

Exponent	Prime Factor	Dig.	Year
70987210799	141974421599	12	~2016
70989955931	141979911863	12	~2016
70991519141	425949114847	12	~2017
70991806643	141983613287	12	~2016
70992661163	141985322327	12	~2016
70995136393	425970818359	12	~2017
70996256651	141992513303	12	~2016
71000797943	142001595887	12	~2016
71001773039	142003546079	12	~2016
71003158223	142006316447	12	~2016
71004328919	142008657839	12	~2016
71006631491	142013262983	12	~2016
71007585179	142015170359	12	~2016
71009658311	142019316623	12	~2016
71013278249	568106225993	12	~2017
71016729383	142033458767	12	~2016
71019095891	142038191783	12	~2016
71021015111	142042030223	12	~2016
71022394451	142044788903	12	~2016
71023572443	142047144887	12	~2016
71026291883	142052583767	12	~2016
71031894023	142063788047	12	~2016
71033641631	142067283263	12	~2016
71050299731	142100599463	12	~2016
71050633949	568405071593	12	~2017

4.724.182 digits

25-04-13