Small Mersenne Prime Factors (page 5106/5745)

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
26796550841	160779305047	12	~2014
26796676223	53593352447	11	~2012
26797000199	53594000399	11	~2012
26797110971	53594221943	11	~2012
26798154143	53596308287	11	~2012
26798740739	53597481479	11	~2012
26800291883	53600583767	11	~2012
26800464683	53600929367	11	~2012
26800932083	53601864167	11	~2012
26801085323	53602170647	11	~2012
26801107981	2830...027937	14	2024
26801595563	53603191127	11	~2012
26801616251	53603232503	11	~2012
26806789463	53613578927	11	~2012
26808337763	53616675527	11	~2012
26809015991	53618031983	11	~2012
26809050563	53618101127	11	~2012
26810066999	53620133999	11	~2012
26811798617	214494388937	12	~2014
26813590513	160881543079	12	~2014
26816595319	482698715743	12	~2015
26817803231	53635606463	11	~2012
26818248683	53636497367	11	~2012
26819691401	160918148407	12	~2014
26819780081	214558240649	12	~2014

Exponent	Prime Factor	Dig.	Year
26823304331	53646608663	11	~2012
26823366203	53646732407	11	~2012
26824183163	53648366327	11	~2012
26824716983	53649433967	11	~2012
26824902899	53649805799	11	~2012
26825923343	53651846687	11	~2012
26828045663	53656091327	11	~2012
26828393099	53656786199	11	~2012
26829220193	375609082703	12	~2015
26830512179	53661024359	11	~2012
26830594391	53661188783	11	~2012
26832269099	53664538199	11	~2012
26832513359	53665026719	11	~2012
26832961691	53665923383	11	~2012
26833034909	214664279273	12	~2014
26833939763	53667879527	11	~2012
26835367451	53670734903	11	~2012
26836277543	53672555087	11	~2012
26836597691	53673195383	11	~2012
26838602837	161031617023	12	~2014
26838658331	53677316663	11	~2012
26838713519	53677427039	11	~2012
26840466959	53680933919	11	~2012
26841367691	53682735383	11	~2012
26842196039	53684392079	11	~2012

Exponent	Prime Factor	Dig.	Year
26842634939	53685269879	11	~2012
26843683991	214749471929	12	~2014
26845267037	375833738519	12	~2015
26845399019	53690798039	11	~2012
26845654903	429530478449	12	~2015
26847642803	53695285607	11	~2012
26853291623	53706583247	11	~2012
26853792109	6955...562311	14	2025
26854622423	53709244847	11	~2012
26855423351	53710846703	11	~2012
26855610479	214844883833	12	~2014
26855787683	53711575367	11	~2012
26855809811	214846478489	12	~2014
26855888113	644541314713	12	~2015
26857604243	53715208487	11	~2012
26857888103	53715776207	11	~2012
26858487893	161150927359	12	~2014
26858512319	53717024639	11	~2012
26858795459	53717590919	11	~2012
26861632151	53723264303	11	~2012
26861668679	53723337359	11	~2012
26862272603	53724545207	11	~2012
26862825851	53725651703	11	~2012
26863033019	53726066039	11	~2012
26863259723	53726519447	11	~2012

Exponent	Prime Factor	Dig.	Year
26863680671	53727361343	11	~2012
26864178811	268641788111	12	~2014
26864568761	8397...946887	14	2024
26866284911	53732569823	11	~2012
26868637267	268686372671	12	~2014
26870922971	53741845943	11	~2012
26871602053	161229612319	12	~2014
26872094783	53744189567	11	~2012
26872111319	53744222639	11	~2012
26872470539	53744941079	11	~2012
26878026671	53756053343	11	~2012
26878313639	53756627279	11	~2012
26878742519	53757485039	11	~2012
26880850261	161285101567	12	~2014
26880986999	53761973999	11	~2012
26881452131	53762904263	11	~2012
26881677197	215053417577	12	~2014
26882444591	53764889183	11	~2012
26883465599	53766931199	11	~2012
26884441511	53768883023	11	~2012
26885084669	215080677353	12	~2014
26885373637	161312241823	12	~2014
26885490007	268854900071	12	~2014
26886925199	53773850399	11	~2012
26887125481	161322752887	12	~2014

5.441.361 digits

26-03-15