Small Mersenne Prime Factors (page 4806/5730)

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
10916014001	65496084007	11	~2011
10916253617	87330028937	11	~2011
10916282579	21832565159	11	~2009
10917210071	87337680569	11	~2011
10917441323	21834882647	11	~2009
10917613211	21835226423	11	~2009
10917657083	21835314167	11	~2009
10919164643	21838329287	11	~2009
10919319179	21838638359	11	~2009
10920607559	21841215119	11	~2009
10920622211	21841244423	11	~2009
10920727319	21841454639	11	~2009
10921367939	21842735879	11	~2009
10921625483	21843250967	11	~2009
10922422487	87379379897	11	~2011
10922768891	21845537783	11	~2009
10922974151	21845948303	11	~2009
10923294023	21846588047	11	~2009
10924894537	262197468889	12	~2012
10924979003	21849958007	11	~2009
10925055787	196651004167	12	~2012
10925076023	21850152047	11	~2009
10925217983	21850435967	11	~2009
10925243099	21850486199	11	~2009
10925282521	65551695127	11	~2011

Exponent	Prime Factor	Dig.	Year
10925627231	21851254463	11	~2009
10925639363	21851278727	11	~2009
10925757179	21851514359	11	~2009
10926096563	21852193127	11	~2009
10927506599	21855013199	11	~2009
10927678057	65566068343	11	~2011
10928421551	21856843103	11	~2009
10928862611	21857725223	11	~2009
10929084841	65574509047	11	~2011
10929445199	21858890399	11	~2009
10929516203	21859032407	11	~2009
10929566663	21859133327	11	~2009
10930090883	21860181767	11	~2009
10930325849	87442606793	11	~2011
10931426459	21862852919	11	~2009
10931480711	21862961423	11	~2009
10931674931	21863349863	11	~2009
10931914519	109319145191	12	~2011
10932738083	21865476167	11	~2009
10932831619	196790969143	12	~2012
10933056007	721581696463	12	~2013
10933859903	21867719807	11	~2009
10933874339	459222722239	12	~2013
10933936679	87471493433	11	~2011
10934156137	65604936823	11	~2011

Exponent	Prime Factor	Dig.	Year
10934576771	21869153543	11	~2009
10935533953	503034561839	12	~2013
10935589319	21871178639	11	~2009
10935874751	21871749503	11	~2009
10936163219	21872326439	11	~2009
10936298783	21872597567	11	~2009
10936456703	21872913407	11	~2009
10936630739	21873261479	11	~2009
10937030099	21874060199	11	~2009
10937317889	328119536671	12	~2012
10937435039	21874870079	11	~2009
10937890079	21875780159	11	~2009
10937927711	21875855423	11	~2009
10938312659	21876625319	11	~2009
10938715043	21877430087	11	~2009
10939009391	21878018783	11	~2009
10939326683	546966334151	12	~2013
10939633283	21879266567	11	~2009
10940909533	240700009727	12	~2012
10940928503	21881857007	11	~2009
10941077507	87528620057	11	~2011
10941130559	21882261119	11	~2009
10942223843	21884447687	11	~2009
10942571117	65655426703	11	~2011
10942619711	21885239423	11	~2009

Exponent	Prime Factor	Dig.	Year
10942912349	87543298793	11	~2011
10942921901	87543375209	11	~2011
10943127187	109431271871	12	~2011
10943274107	87546192857	11	~2011
10943499323	21886998647	11	~2009
10943519771	21887039543	11	~2009
10944236377	65665418263	11	~2011
10944621899	21889243799	11	~2009
10944730859	21889461719	11	~2009
10945231151	21890462303	11	~2009
10946136263	21892272527	11	~2009
10946418047	525428066257	12	~2013
10946547853	65679287119	11	~2011
10946975779	109469757791	12	~2011
10947137791	175154204657	12	~2012
10947768131	525492870289	12	~2013
10947912593	153270776303	12	~2012
10948013017	65688078103	11	~2011
10948127171	21896254343	11	~2009
10948835531	21897671063	11	~2009
10948927579	897812061479	12	~2013
10949625983	21899251967	11	~2009
10950402227	87603217817	11	~2011
10950431099	21900862199	11	~2009
10950445691	87603565529	11	~2011

5.426.516 digits

26-03-08