Small Mersenne Prime Factors (page 4574/5025)

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
33627732683	67255465367	11	~2013
33629305991	67258611983	11	~2013
33633697421	201802184527	12	~2014
33633769979	67267539959	11	~2013
33633828803	67267657607	11	~2013
33635178719	67270357439	11	~2013
33636984323	67273968647	11	~2013
33638315219	67276630439	11	~2013
33639987119	67279974239	11	~2013
33643977023	67287954047	11	~2013
33646708247	269173665977	12	~2015
33649361099	67298722199	11	~2013
33650445313	201902671879	12	~2014
33652822823	67305645647	11	~2013
33652908599	67305817199	11	~2013
33654133517	471157869239	12	~2015
33655747607	605803456927	12	~2016
33660668161	538570690577	12	~2015
33660746597	471250452359	12	~2015
33660796199	67321592399	11	~2013
33662006771	67324013543	11	~2013
33662898611	67325797223	11	~2013
33663644363	67327288727	11	~2013
33664932461	201989594767	12	~2014
33667231463	67334462927	11	~2013

Exponent	Prime Factor	Dig.	Year
33667397243	67334794487	11	~2013
33668745899	67337491799	11	~2013
33670227491	67340454983	11	~2013
33670463819	67340927639	11	~2013
33671857369	740780862119	12	~2016
33672348299	67344696599	11	~2013
33674015279	67348030559	11	~2013
33675265979	67350531959	11	~2013
33676000703	67352001407	11	~2013
33676371479	67352742959	11	~2013
33676675171	538826802737	12	~2015
33678934739	67357869479	11	~2013
33679886819	67359773639	11	~2013
33682574041	1286...283663	14	2023
33682910731	336829107311	12	~2015
33683526479	67367052959	11	~2013
33683835131	67367670263	11	~2013
33686562911	67373125823	11	~2013
33690688151	67381376303	11	~2013
33690736679	67381473359	11	~2013
33692888773	202157332639	12	~2014
33693406319	67386812639	11	~2013
33693413521	539094616337	12	~2015
33693545351	67387090703	11	~2013
33694995011	67389990023	11	~2013

Exponent	Prime Factor	Dig.	Year
33695640131	67391280263	11	~2013
33696136751	67392273503	11	~2013
33699131699	269593053593	12	~2015
33700951331	67401902663	11	~2013
33703680011	269629440089	12	~2015
33703838939	67407677879	11	~2013
33704193769	1238...669223	18	2025
33704285999	67408571999	11	~2013
33706627511	67413255023	11	~2013
33707023213	202242139279	12	~2014
33710074523	67420149047	11	~2013
33710117459	67420234919	11	~2013
33710493923	67420987847	11	~2013
33710792903	67421585807	11	~2013
33711191639	67422383279	11	~2013
33712070279	67424140559	11	~2013
33712273633	202273641799	12	~2014
33712998953	202277993719	12	~2014
33714606323	67429212647	11	~2013
33715320563	67430641127	11	~2013
33716679383	67433358767	11	~2013
33718198991	67436397983	11	~2013
33718245023	67436490047	11	~2013
33719191873	202315151239	12	~2014
33720767819	67441535639	11	~2013

Exponent	Prime Factor	Dig.	Year
33722433131	67444866263	11	~2013
33722657459	67445314919	11	~2013
33722857079	67445714159	11	~2013
33723418369	741915204119	12	~2016
33723722339	67447444679	11	~2013
33725609831	67451219663	11	~2013
33726778511	67453557023	11	~2013
33726817571	67453635143	11	~2013
33727106279	67454212559	11	~2013
33727120157	202362720943	12	~2014
33727331621	269818652969	12	~2015
33727459253	202364755519	12	~2014
33727911011	67455822023	11	~2013
33729071483	67458142967	11	~2013
33729125447	269833003577	12	~2015
33729613763	67459227527	11	~2013
33730182659	67460365319	11	~2013
33736796759	67473593519	11	~2013
33737834171	67475668343	11	~2013
33738098843	67476197687	11	~2013
33739160699	67478321399	11	~2013
33740779511	67481559023	11	~2013
33741240191	67482480383	11	~2013
33742425817	202454554903	12	~2014
33743086379	67486172759	11	~2013

4.724.182 digits

25-04-13