Small Mersenne Prime Factors (page 5025/5730)

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
21435947051	42871894103	11	~2012
21437207509	514492980217	12	~2014
21437214143	42874428287	11	~2012
21438553991	42877107983	11	~2012
21439223831	42878447663	11	~2012
21441049583	42882099167	11	~2012
21441576983	42883153967	11	~2012
21442350623	42884701247	11	~2012
21443964023	42887928047	11	~2012
21445516601	171564132809	12	~2013
21446081183	42892162367	11	~2012
21446344609	471819581399	12	~2014
21446642303	42893284607	11	~2012
21446837459	42893674919	11	~2012
21447038581	128682231487	12	~2013
21447128231	42894256463	11	~2012
21447366779	42894733559	11	~2012
21447509981	171580079849	12	~2013
21447978337	128687870023	12	~2013
21449504137	128697024823	12	~2013
21451017683	686432565857	12	~2015
21451516451	42903032903	11	~2012
21451591037	171612728297	12	~2013
21452688791	42905377583	11	~2012
21453002699	42906005399	11	~2012

Exponent	Prime Factor	Dig.	Year
21454213139	42908426279	11	~2012
21454722853	128728337119	12	~2013
21455215403	42910430807	11	~2012
21455532733	128733196399	12	~2013
21455727563	42911455127	11	~2012
21456660839	42913321679	11	~2012
21457658821	128745952927	12	~2013
21458799959	42917599919	11	~2012
21460212863	42920425727	11	~2012
21460223699	42920447399	11	~2012
21460286759	42920573519	11	~2012
21460478579	42920957159	11	~2012
21461154839	42922309679	11	~2012
21466473719	42932947439	11	~2012
21467898839	42935797679	11	~2012
21468378479	42936756959	11	~2012
21468586439	515246074537	12	~2014
21468992033	128813952199	12	~2013
21469490017	128816940103	12	~2013
21469626653	644088799591	12	~2015
21470059553	128820357319	12	~2013
21470467631	42940935263	11	~2012
21470600561	128823603367	12	~2013
21470682131	171765457049	12	~2013
21470737031	42941474063	11	~2012

Exponent	Prime Factor	Dig.	Year
21471697031	42943394063	11	~2012
21473055437	6764...626551	14	2023
21473283119	42946566239	11	~2012
21474298451	42948596903	11	~2012
21475677491	42951354983	11	~2012
21476567291	42953134583	11	~2012
21476828111	42953656223	11	~2012
21476878331	42953756663	11	~2012
21477041561	128862249367	12	~2013
21477668339	42955336679	11	~2012
21478188899	42956377799	11	~2012
21478203203	42956406407	11	~2012
21478681463	42957362927	11	~2012
21479574503	42959149007	11	~2012
21479755877	128878535263	12	~2013
21479912159	3097...333279	14	2024
21480097061	128880582367	12	~2013
21480331451	42960662903	11	~2012
21480356399	42960712799	11	~2012
21480476579	42960953159	11	~2012
21480576191	42961152383	11	~2012
21481095173	128886571039	12	~2013
21481281131	42962562263	11	~2012
21482460949	472614140879	12	~2014
21483033311	42966066623	11	~2012

Exponent	Prime Factor	Dig.	Year
21486868619	42973737239	11	~2012
21488370899	42976741799	11	~2012
21488480543	42976961087	11	~2012
21488895839	42977791679	11	~2012
21489125051	171913000409	12	~2013
21489786491	42979572983	11	~2012
21490279211	687688934753	12	~2015
21490884479	42981768959	11	~2012
21491264891	42982529783	11	~2012
21491477933	128948867599	12	~2013
21491694463	214916944631	12	~2013
21492071737	128952430423	12	~2013
21492265643	42984531287	11	~2012
21492599543	42985199087	11	~2012
21493183199	42986366399	11	~2012
21493399439	42986798879	11	~2012
21493914791	42987829583	11	~2012
21494159903	42988319807	11	~2012
21494438159	42988876319	11	~2012
21495097861	128970587167	12	~2013
21495752917	644872587511	12	~2015
21496412783	558906732359	12	~2014
21496574969	171972599753	12	~2013
21496768103	42993536207	11	~2012
21501593429	172012747433	12	~2013

5.426.516 digits

26-03-08