User blog:MachineGunSuper/Grand PI

Grand PI (Gπ)

A really, really big version of π.

The used notation is gonna be Ea.. xEaπ = x^π ! '''eg: 3Eaπ = 3^π ! = 2688.97'''

a) πEaπ = π^π ! =3745.88.       = PIE [1]

Now, let's see what happens when adding 2 Ea's. xEaEaπ = xπ^(xEaπ) ! eg. 2EaEaπ=2π^(2Eaπ) !

b) πEaEaπ = ππ^(πEaπ) !      = PIE [2] Ok, how about 3 Ea's? xEaEaEaπ = x^(xEaEaπ) * (xEaπ) !   * = multiplied by eg: 4EaEaEaπ = 4^(4EaEaπ) * (4Eaπ) !

c) πEaEaEaπ = π^(πEaEaπ) * (πEaπ) !      = PIE [3]

'''So, the numbers have grown by A LOT. Let's see what happens when we put 4 Ea's.''' xEaEaEaEaπ = x^(xEaEaEaπ) * (xEaEaπ) * (xEaπ) ! eg: 5EaEaEaEaπ = 5^(5EaEaEaπ) * 5(EaEaπ) * (5Eaπ) !

d) πEaEaEaEaπ = π^(πEaEaEaπ) * (πEaEaπ) * (πEaπ) !    = PIE [4]

The last thing we have to understand before we move on is what 5 Ea's means. xEaEaEaEaEaπ = x^(xEaEaEaEaπ) * (xEaEaEaπ) * (xEaEaπ) * (xEaπ) ! eg: 2EaEaEaEaEaπ = 2^(2EaEaEaEaπ) * (2EaEaEaπ) * (2EaEaπ) * (2Eaπ) !

e) πEaEaEaEaEaπ = π^(πEaEaEaEaπ) * (πEaEaEaπ) * (πEaEaπ) * (πEaπ) !    = PIE [5]

'''By now, I assume that everybody understood how this works. If you didn't, than go and read it again in order to understand this.'''

....

.... .... .... πEaEaEaEaEaEaEa..............EaEaEaEaEaEaπ = π^(πEaEaEa....Eaπ) * (πEaEa...Eaπ) * . PIE [3005] times!!        PIE [3004] times   PIE [3003]

'''Ok, just take your time and understand how LARGE that number is. How many Ea's there are in it. How many π's there are. It's probably not the biggest number, but it definetly is uncalculable.'''

And the crazyest thing is that even with this ultra gigantic size, that number represents only and only 3,14% of Gπ (Grand PI)

So can you imagine how big Gπ is?

Even if this isn't true, people have said that Gπ is equal to  PIE (PIE π)