Small Mersenne Prime Factors (page 4636/5070)

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
37210893299	74421786599	11	~2014
37211180557	595378888913	12	~2016
37218394523	74436789047	11	~2014
37219871603	74439743207	11	~2014
37219984523	74439969047	11	~2014
37222160999	74444321999	11	~2014
37224675947	297797407577	12	~2015
37225179443	74450358887	11	~2014
37226587901	223359527407	12	~2015
37228187543	74456375087	11	~2014
37229609699	74459219399	11	~2014
37230220199	74460440399	11	~2014
37232129219	74464258439	11	~2014
37234696091	74469392183	11	~2014
37235523901	223413143407	12	~2015
37235799599	74471599199	11	~2014
37239866173	223439197039	12	~2015
37241042339	74482084679	11	~2014
37243439591	74486879183	11	~2014
37244153137	595906450193	12	~2016
37248000071	74496000143	11	~2014
37248176639	74496353279	11	~2014
37248314819	74496629639	11	~2014
37249053791	74498107583	11	~2014
37249105757	223494634543	12	~2015

Exponent	Prime Factor	Dig.	Year
37249221851	74498443703	11	~2014
37250384771	74500769543	11	~2014
37252450271	2950...614633	14	2024
37253487361	223520924167	12	~2015
37253667719	74507335439	11	~2014
37254709571	74509419143	11	~2014
37254916697	298039333577	12	~2015
37256560931	74513121863	11	~2014
37257693563	74515387127	11	~2014
37258024613	223548147679	12	~2015
37259113799	74518227599	11	~2014
37260332951	298082663609	12	~2015
37263065891	74526131783	11	~2014
37264720799	74529441599	11	~2014
37266931319	74533862639	11	~2014
37267287671	74534575343	11	~2014
37267458071	74534916143	11	~2014
37268896163	74537792327	11	~2014
37270376777	298163014217	12	~2015
37270512557	223623075343	12	~2015
37271749631	74543499263	11	~2014
37271763311	74543526623	11	~2014
37272587699	74545175399	11	~2014
37272645869	521817042167	12	~2016
37274082761	223644496567	12	~2015

Exponent	Prime Factor	Dig.	Year
37274308411	596388934577	12	~2016
37279596719	74559193439	11	~2014
37280793839	74561587679	11	~2014
37284341513	223706049079	12	~2015
37285170203	74570340407	11	~2014
37288198511	74576397023	11	~2014
37289963159	74579926319	11	~2014
37289981471	74579962943	11	~2014
37291874663	74583749327	11	~2014
37292345099	74584690199	11	~2014
37292405831	74584811663	11	~2014
37295179511	74590359023	11	~2014
37295409083	74590818167	11	~2014
37297034477	223782206863	12	~2015
37297134923	74594269847	11	~2014
37302820883	74605641767	11	~2014
37306823111	74613646223	11	~2014
37307776679	74615553359	11	~2014
37307814983	74615629967	11	~2014
37308934583	74617869167	11	~2014
37309288111	373092881111	12	~2015
37310440439	74620880879	11	~2014
37313129411	74626258823	11	~2014
37314528599	74629057199	11	~2014
37316319503	74632639007	11	~2014

Exponent	Prime Factor	Dig.	Year
37317728243	74635456487	11	~2014
37319078003	74638156007	11	~2014
37320018023	74640036047	11	~2014
37320945533	223925673199	12	~2015
37321775339	74643550679	11	~2014
37326191891	74652383783	11	~2014
37327708811	74655417623	11	~2014
37328245763	74656491527	11	~2014
37333719491	74667438983	11	~2014
37334174243	74668348487	11	~2014
37334200031	74668400063	11	~2014
37335088523	74670177047	11	~2014
37336195163	74672390327	11	~2014
37337453291	74674906583	11	~2014
37337588399	74675176799	11	~2014
37337870711	74675741423	11	~2014
37338677813	522741489383	12	~2016
37342235531	74684471063	11	~2014
37342800413	522799205783	12	~2016
37343349551	74686699103	11	~2014
37344773351	74689546703	11	~2014
37344958499	74689916999	11	~2014
37346487239	74692974479	11	~2014
37347053531	74694107063	11	~2014
37351886653	597630186449	12	~2016

4.768.925 digits

25-05-04