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Difference between revisions of "Mersenneplustwo factorizations"

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{{Last update|2019|03|05}}
 
The '''Mersenneplustwo factorizations''' is a [[distributed computing project]], which tries to [[factorization|factor]] numbers of the form: 2<sup>p</sup>+1 (with p being a prime, as well as simultaneously 2<sup>p</sup>-1 being prime). All such numbers are divisible by 3 since 2<sup>p</sup>-1 is not divisible by 3 (it's assumed to be prime) and 2<sup>p</sup> is not divisible by 3 (it's only prime factor is 2).
 
The '''Mersenneplustwo factorizations''' is a [[distributed computing project]], which tries to [[factorization|factor]] numbers of the form: 2<sup>p</sup>+1 (with p being a prime, as well as simultaneously 2<sup>p</sup>-1 being prime). All such numbers are divisible by 3 since 2<sup>p</sup>-1 is not divisible by 3 (it's assumed to be prime) and 2<sup>p</sup> is not divisible by 3 (it's only prime factor is 2).
  
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==Status==
 
==Status==
As of this moment (2005-09-12), about 8GHz is being dedicated to this project - more needed! :-)
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As of this moment (2005-09-12), about 8GHz is being dedicated to this project. {{C|red|Update needed or remove!}}
  
 
==Results==
 
==Results==

Revision as of 10:55, 5 March 2019

Last update: 2019

The Mersenneplustwo factorizations is a distributed computing project, which tries to factor numbers of the form: 2p+1 (with p being a prime, as well as simultaneously 2p-1 being prime). All such numbers are divisible by 3 since 2p-1 is not divisible by 3 (it's assumed to be prime) and 2p is not divisible by 3 (it's only prime factor is 2).

It is managed by James Wanless (Bearnol).

How to participate

Participants use ECMclient to automatically download numbers, do ECM curves on them and upload them again.

Status

As of this moment (2005-09-12), about 8GHz is being dedicated to this project. Update needed or remove!

Results

Best results so far include 37-digit factor of M9941+2 (FDBid) found by ECMNet, as well as 36-digit factor of M11213+2 (FDBid) found using mprime (the linux version of Prime95 by George Woltman).

More recently, a 41-digit factor of M110503+2 (FDBid) was also found by ECMNet.

External links