This is a FOT (Function Of Time)
Constant(the duck):
\(10^{2^{4^{8^{16^{32^{64^{128^{256^{512^{1024^{2048^{4096^{8192^{16384^{32768^{65536^{131072^{262144^{524288^{1048576^{2097152^{4194304^{8388608^{16777216^{33554432^{67108864^{134217128^{268435456^{536870912^{1073741824^{2147483648}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}\)
There are many variables in the duckie number. They are controlled by TIME.
Once every plank time, variable \(p\) gets added to one. It now becomes its successor.
\(y = p/10^{20}\) when p mod \(10^{20}\) = 0
\(z = y/1000\) when y mod 1000 = 0
\(a = z/1000\) when z mod 1000 = 0
\(f = a/1000\) when a mod 1000 = 0
\(p = f/1000\) when f mod 1000 = 0
\(n = p/1000\) when p mod 1000 = 0
\(mi = n/1000\) when n mod 1000 = 0
\(m = mi/1000\) when mi mod 1000 = 0
\(c = m/10\) when m mod 10 = 0
\(de = c/10\) when c mod 10 = 0
\(s = de/10\) when de mod 10 = 0
\(min = s/60\) when s mod 60 = 0
\(h = min/60\) when min mod 60 = 0
\(d = h/24\) when h mod 24 = 0
Whew, that does it with the variables!
The duckie number =
\(p\uparrow^{y\uparrow^{z\uparrow^{a\uparrow^{f\uparrow^{p\uparrow^{n\uparrow^{mi\uparrow^{m \uparrow^{c\uparrow^{de \uparrow^{s \uparrow^{min \uparrow^{h \uparrow^{d \uparrow^{duck}d}h}min}s}de}c}m}mi}n}p}f}a}z}y}p\)