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{{R|Tetration}}

{{r|Tetration}}

{{r|Tetration}}

{{r|Tetration}}

{{r|Tetration}}

{{r|Tetration}}

*[[tetration]]

{{r|Tetration}}

{{r|Tetration}}

{{r|Tetration}}

{{r|Maps of tetration}}

(* of defivatives of tetration along the real axis *) (*end of generator of plot of derivatives of tetration *)

...trationBaseSqrt2v00/code]] C++ generator of [[contour plot]] of analytic [[tetration]] with base <math>\sqrt{2}</math> ...trationBaseSqrt2u00/code]] C++ generator of [[contour plot]] of modified [[tetration]] with base <math>\sqrt{2}</math>

===Tetration=== ...onAsymptoticParameters01.jpg|left|700px|FIg.4. parameters of asymptotic of tetration versus logarithm of the base}}

...ge|AnalyticTetrtionBase2figure0.jpg|right|200px|Fig.0. Graphic of analytic tetration <math>f=F_2(x)=\exp_2^x(1)</math> versus <math>x</math>.}} In this page, I collect pieces and figures, which can be used to build-up [[tetration]].

[[Tetration]],

The 4th Ackermann function is related to [[tetration]] on base 2 through

// e1etf.cin is routine that evaluates [[tetration]] to Henryk base <math>\eta = \exp(1/\mathrm e)</math>.

// [[Equation]] and [[User:Dmitrii Kouznetsov/Analytic Tetration]]

..., first non-elementary superfunction considered was super-exponential or [[tetration]], that corresponds to In particular, the [[Ackernann functions]] and [[tetration]] can be interpreted in terms of super-functions.