User:CatPrinceHQ3

The longest named number on the Googology Wiki:

--Defining the ID--

The ID(1) is the largest number a computer can understand; that being most commonly approximated to : 1.798*10^308.The number I just specified is 2^1024, and is also talked about here: https://en.wikipedia.org/wiki/Power_of_two Now, i will specify something else. If you don't know, Multiplication is repeated addition, and Exponentiation is repeated multiplication. Tetration is repeated exponentiation, and that line continues, tetration also being known as hyper-4. Hyper-ID(1), Hyper-2^1024, and Hyper-1.798*10^308 are all the same operation, and are called Identitation, also marked with this symbol: ⇪

So, here's my function. ID(1)⇪ID(1)⇪ID(1)⇪ID(1)...⇪ID(1))))) )---ID(1) times.

That new number is ID(2).

Now we do ID(2)⇪ID(2)...⇪ID(2)))))..)--- ID(2) times.

That new number is ID(3).

Repeat. ID(4), ID(5), ID(10^10), ID(googol), ID(centillion) Source: https://en.wikipedia.org/wiki/Centillion

You'll eventually get to ID(ID(1)), or ID(2^1024). If you continue, The ID will contain ID(ID(1). aka ID(ID(ID(1).

Repeat it.

Then, when the function says and/or contains "ID" ID(1) times, ( ID(ID(ID(ID(ID(...(ID(1)))))...))))) ) you get an Identitillion.

If the function contains "ID" ID(2) times, you get a 2-Identitillion. If the function contains "ID" ID(3) times, you get a 3-Identitillion, If the function contains "ID" ID(ID(1) times, you get a ID(1)-Identitillion. If the function contains "ID" an Identitillion times, you get a Identi-Identitillion. If the function contains "ID" an Identi-Identitillion times, you get an Identi-Identi-Identitillion.

The name of the final number is identi-identi-identi...identitillion, identi being repeated an Identitillion times.

This tower is expandable, as you could say: "Hey! Identi-identi-identi bla bla bla is the number having an identi-identitillion repeats. If you want to expand it, instead of saying identi-identi-identi...identitillion, just say identi(x)-identitillion, x being the amount of "identis".

Just as some food for thought, i'm going to say this as an example: identi(Graham's Number)-identitillion or identi(Rayo(10^100))-identitillion.

--?--

This is a new mathematical operation, such as several others you may use in everyday life.

Cut: also shown with a ~ symbol. 1~ would be 2, because if you cut a plane with a line, you get 2 seperated areas.

2~ would be 4, as 2 lines cutting a plane would result in 4 spaces.

3~ would be 6, as 3 lines cutting a plane would result in 6 spaces.

4~ would be 8, as 4 lines cutting a plane would result in 8 spaces.

5~ would be 10, as 5 lines cutting a plane would result in 10 spaces.

6~ would be 12, as 6 lines cutting a plane would result in 12 spaces.

So it seems as if Cut is the same as *2, but what happens if we try this in 3 dimensional space?

We can mark this with.

1 = 2, as splitting a 3D space with a wall gives 2 seperated areas.

2 = 4, as splitting a 3D space with walls gives 4 seperated areas.

3 = 8, as splitting a 3D space with walls gives 8 seperated areas.

4 = 12, as splitting a 3D space with walls gives 12 seperated areas.

You get the idea, now, lets redo something. If we look at something like 99 dimensional, you don't want to spam. So, instead, 4~3, 3 =3 dimensions, so we could do like 4~999.