User blog:Superlirarder/Superlirarder's function (better)

Thats better function made by Superlirarder.

definition
X(n) power number to itself. So, if we want power n to... for example 5, it will look like X5(n). XL(n) tetrate n to itself. XXL(n) pentate n to itself and so on.

examples
X(100) is 10^100 - googol

X10(10) is 10^10 - dialogue, or ten billions

XL(3) is 3^^3 - megafugathree

XXL(3) is 3^^^3 - tritri

XXXXXXXXXL(10) is 10^^^^^^^^^^10 - tridecal

expansion
X!a(n) where a - is number of L's. So, we can made X!a!2(n) when it gets X!(X(n))(n). X!(X(n))(n) is X!2!1(n), but its not really short it. X!(X(n(X(n)(n)(n) is X!3!1(n). X!(X(n(X(n(X(n)(n)(n)(n) is X!4!1(n), and so on. When it gets X!(X(n))!1(n) is X!2!2, X!(X(n)(X(n)))!1(n) is X!3!2, etc. X!(X(n))!2 is X!2!3(n). X!1!(X(n)) is X!2!1!1, etc. So, X!!b(n) is number of ! after a. We can have: X!!!c(n) = X!!a!!a!!a.... c times. X!!!!e(n) = X!!!a!!!a!!!a.... e times. and so on.

Xa(n) is number of !'s

Xa, 2(n) = X(X(n))(n)

a, a(n) = X(X(X(X(X...a times(n)))))..a times.

a, a, a = XX!a!a!a... a times(n)

a, a, a, a = Xa!!a!!a... a times

Xaa = Xa, a, a, a, ... a times times

Xaa, a = Xa!a!a!a... a times

And so on.