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 Alternate solution of tetration for "convergent" bases discovered mike3 Long Time Fellow Posts: 368 Threads: 44 Joined: Sep 2009 09/15/2010, 02:18 AM (09/14/2010, 11:36 PM)sheldonison Wrote: This makes sense, in that I'm fairly certain that the attracting regular iteration is a 1-cyclic function of the entire regular superfunction. http://math.eretrandre.org/tetrationforu...hp?tid=515 At least, it seems to be the case for base e^(1/e), and for sqrt(2). I'll half to read up on your post, to try to better understand your algorithm, (and ideally, your numerical approximations as well, and how you iteratively develop the solution). - Sheldon I'll post the details of the numerical algorithm in the Computation forum, then. « Next Oldest | Next Newest »

 Messages In This Thread Alternate solution of tetration for "convergent" bases discovered - by mike3 - 09/13/2010, 11:30 AM RE: Alternate solution of tetration for "convergent" bases discovered - by tommy1729 - 09/13/2010, 11:20 PM RE: Alternate solution of tetration for "convergent" bases discovered - by mike3 - 09/14/2010, 01:50 AM RE: Alternate solution of tetration for "convergent" bases discovered - by tommy1729 - 09/14/2010, 12:26 PM RE: Alternate solution of tetration for "convergent" bases discovered - by mike3 - 09/14/2010, 11:04 PM RE: Alternate solution of tetration for "convergent" bases discovered - by sheldonison - 09/14/2010, 11:36 PM RE: Alternate solution of tetration for "convergent" bases discovered - by mike3 - 09/15/2010, 02:18 AM RE: Alternate solution of tetration for "convergent" bases discovered - by sheldonison - 09/13/2010, 11:45 PM RE: Alternate solution of tetration for "convergent" bases discovered - by mike3 - 09/14/2010, 01:53 AM RE: Alternate solution of tetration for "convergent" bases discovered - by sheldonison - 09/14/2010, 02:18 PM RE: Alternate solution of tetration for "convergent" bases discovered - by tommy1729 - 09/14/2010, 07:41 PM

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