Small Mersenne Prime Factors (page 5203/5850)

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
27764243711	55528487423	11	~2013
27765595271	55531190543	11	~2013
27765757091	55531514183	11	~2013
27765838703	721911806279	12	~2015
27766076609	222128612873	12	~2014
27767052721	166602316327	12	~2014
27767485451	55534970903	11	~2013
27768844931	55537689863	11	~2013
27768858503	55537717007	11	~2013
27769426859	55538853719	11	~2013
27770653139	55541306279	11	~2013
27771185863	444338973809	12	~2015
27771556523	55543113047	11	~2013
27773140631	222185125049	12	~2014
27774273479	222194187833	12	~2014
27774505079	55549010159	11	~2013
27775332551	55550665103	11	~2013
27776864639	55553729279	11	~2013
27778138931	55556277863	11	~2013
27778153451	55556306903	11	~2013
27778327721	222226621769	12	~2014
27778779251	55557558503	11	~2013
27779269139	55558538279	11	~2013
27781940639	55563881279	11	~2013
27784772003	55569544007	11	~2013

Exponent	Prime Factor	Dig.	Year
27785464043	55570928087	11	~2013
27786121271	55572242543	11	~2013
27786136577	166716819463	12	~2014
27787508459	55575016919	11	~2013
27789092939	55578185879	11	~2013
27790772651	55581545303	11	~2013
27791571877	166749431263	12	~2014
27791682323	55583364647	11	~2013
27792582947	222340663577	12	~2014
27793356743	55586713487	11	~2013
27793934351	55587868703	11	~2013
27795587003	55591174007	11	~2013
27795683999	55591367999	11	~2013
27796028677	166776172063	12	~2014
27797624951	55595249903	11	~2013
27800214731	55600429463	11	~2013
27800452451	55600904903	11	~2013
27801747383	55603494767	11	~2013
27802108553	166812651319	12	~2014
27803734229	222429873833	12	~2014
27805879763	55611759527	11	~2013
27806109239	55612218479	11	~2013
27807745313	166846471879	12	~2014
27808489739	55616979479	11	~2013
27813698063	55627396127	11	~2013

Exponent	Prime Factor	Dig.	Year
27814082123	55628164247	11	~2013
27814295279	55628590559	11	~2013
27814445873	166886675239	12	~2014
27820715513	166924293079	12	~2014
27822027323	55644054647	11	~2013
27822380483	55644760967	11	~2013
27823203203	55646406407	11	~2013
27824111723	55648223447	11	~2013
27824918123	55649836247	11	~2013
27825440339	55650880679	11	~2013
27825501661	166953009967	12	~2014
27829010039	55658020079	11	~2013
27829746299	55659492599	11	~2013
27830631431	55661262863	11	~2013
27831675359	55663350719	11	~2013
27835747799	55671495599	11	~2013
27835870259	55671740519	11	~2013
27835911133	167015466799	12	~2014
27836719919	55673439839	11	~2013
27838528979	222708231833	12	~2014
27838846883	55677693767	11	~2013
27840529721	167043178327	12	~2014
27841741331	55683482663	11	~2013
27843512167	501183219007	12	~2015
27843978251	55687956503	11	~2013

Exponent	Prime Factor	Dig.	Year
27845042903	55690085807	11	~2013
27845051999	55690103999	11	~2013
27845362397	835360871911	12	~2015
27845440583	55690881167	11	~2013
27845811377	167074868263	12	~2014
27846211709	389846963927	12	~2015
27848035511	55696071023	11	~2013
27848834411	55697668823	11	~2013
27850199173	167101195039	12	~2014
27852442511	55704885023	11	~2013
27852550343	55705100687	11	~2013
27854011037	167124066223	12	~2014
27854271631	278542716311	12	~2014
27856225571	55712451143	11	~2013
27856588181	167139529087	12	~2014
27856986281	222855890249	12	~2014
27857059679	222856477433	12	~2014
27857194537	167143167223	12	~2014
27858250439	222866003513	12	~2014
27859751669	222878013353	12	~2014
27861857201	222894857609	12	~2014
27862531799	55725063599	11	~2013
27862830161	167176980967	12	~2014
27862851041	167177106247	12	~2014
27864806111	55729612223	11	~2013

5.546.121 digits

26-05-03