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Small Mersenne Prime Factors
Prime numbers of the form Mp= 2p − 1 are called Mersenne primes. For Mp to be prime, p must also be prime.
Any factor q of a Mersenne number 2p − 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
5656352411911312704823912 ~2015
5656762489111313524978312 ~2015
5657078743111314157486312 ~2015
5657106364356571063643112 ~2017
5657252396311314504792712 ~2015
5657593513111315187026312 ~2015
5657730673333946384039912 ~2016
5657897055733947382334312 ~2016
5658432870133950597220712 ~2016
5658514987111317029974312 ~2015
5658532426133951194556712 ~2016
5658644463733951866782312 ~2016
5658664604311317329208712 ~2015
5658856199911317712399912 ~2015
5658964129111317928258312 ~2015
5659064965111318129930312 ~2015
5659619582311319239164712 ~2015
5659790989111319581978312 ~2015
5659935185911319870371912 ~2015
5660352173945282817391312 ~2016
5660747965111321495930312 ~2015
5660951165911321902331912 ~2015
5661195553111322391106312 ~2015
5661388322311322776644712 ~2015
5661584693911323169387912 ~2015
Exponent Prime Factor Dig. Year
5662089067111324178134312 ~2015
5662312669111324625338312 ~2015
5662634962133975809772712 ~2016
5662855237111325710474312 ~2015
5663170302133979021812712 ~2016
5663444159911326888319912 ~2015
5663562767911327125535912 ~2015
5663694893911327389787912 ~2015
5664014993911328029987912 ~2015
5664058405111328116810312 ~2015
5664187826311328375652712 ~2015
5664322147333985932883912 ~2016
5665108471733990650830312 ~2016
5665570072133993420432712 ~2016
5666040349733996242098312 ~2016
5666386820311332773640712 ~2015
5666462366311332924732712 ~2015
5666492557111332985114312 ~2015
5666599027333999594163912 ~2016
5667137089111334274178312 ~2015
5667273414134003640484712 ~2016
5668127569111336255138312 ~2015
5668194769111336389538312 ~2015
5668513403945348107231312 ~2016
566871589634274...85810314 2024
Exponent Prime Factor Dig. Year
5668738229334012429375912 ~2016
5668886234311337772468712 ~2015
5669059555111338119110312 ~2015
5669414345911338828691912 ~2015
5669465107334016790643912 ~2016
5670095941111340191882312 ~2015
5670397426745363179413712 ~2016
5670547418311341094836712 ~2015
5671030226311342060452712 ~2015
5671214681911342429363912 ~2015
5671874227334031245363912 ~2016
5672266694311344533388712 ~2015
5672743144745381945157712 ~2016
5672774084311345548168712 ~2015
5672883189734037299138312 ~2016
5673286643911346573287912 ~2015
5673447067111346894134312 ~2015
5673482420311346964840712 ~2015
5673568973911347137947912 ~2015
5673578499734041470998312 ~2016
5673807002311347614004712 ~2015
5674582465111349164930312 ~2015
5675270125111350540250312 ~2015
5675517821334053106927912 ~2016
5676031754311352063508712 ~2015
Exponent Prime Factor Dig. Year
5676129225156761292251112 ~2017
5676386407111352772814312 ~2015
5676615799334059694795912 ~2016
5676621266311353242532712 ~2015
5677129045111354258090312 ~2015
5677484906311354969812712 ~2015
5678045336311356090672712 ~2015
5678047817945424382543312 ~2016
5678690261911357380523912 ~2015
5678783819911357567639912 ~2015
5678899555111357799110312 ~2015
5679122435911358244871912 ~2015
5679366103111358732206312 ~2015
5679711257911359422515912 ~2015
5679943585111359887170312 ~2015
5680193743111360387486312 ~2015
5680449413911360898827912 ~2015
5680661767111361323534312 ~2015
5680682003911361364007912 ~2015
5680982407734085894446312 ~2016
5681739060756817390607112 ~2017
5681966648311363933296712 ~2015
5682206153911364412307912 ~2015
5682263886756822638867112 ~2017
5682342254311364684508712 ~2015
4720
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25-04-28