User blog:Alejandro Magno/Untitled Notation

My Untitled Notation (as i call it) is a new type of notation (or something like that) coined by me (alejandro magno) (yes, i am a googologist) (that means i can create my methods and my numbers).

Definition
I will make the things simple.

It can be expressed like this:

{a,b,c} where a is the base number (the number to be affected), c is the times number (the times the operation will be applicated to the base number), and b is the operation number (the operation to be applicated to the base number) (1 is addition, 2 is multiplication, 3 is exponentation, 4 is tetration, 5 is pentation, and so on).

Examples
{10,10,10} = 10↑↑↑↑↑↑↑↑10 aprox.

{15,8,11} = 15↑↑↑↑↑↑11 aprox.

{100,100,100} = 100↑↑↑↑↑↑↑.......↑↑↑↑↑↑↑100 with 98 arrows aprox.

Extended Notation
This was supposed to be a system to name numbers, but it ended as an extension.

Here's how it works:

a-b-c = {a,b,c}

a-b-c-0 = a-b-c

a-b-c-1 = {{a,b,c}, {a,b,c}, {a,b,c}} (1 sublevel)

If you don't know what a sublevel is, here's a quick description:

A sublevel is an entry of my notation that is a number made with my notation (for example: {10,10,10}) that is part of another number made with my notation. We can take that number and then make the entry of another number maked with my notation be that number, and we can take that number and then make more sublevels and then more and then more and then more and then more. And so on.

a-b-c-d = (d sublevels)

And for further extensions:

a-b-c-d-0 = a-b-c-d

a-b-c-d-1 = a-b-c-(a-b-c-d) (1 sublevel)

a-b-c-d-e = (e sublevels)

...and we can continue adding and adding.

But...

there are MORE extensions to come.

For example:

a-b-c--0 = a-b-c

a-b-c--1 = a-b-c-d

a-b-c--d = a-b-c-d-d-d-...-d-d-d w/ d entries

a-b-c--d-1 = a-b-c--(a-b-c--d)

a-b-c--d-e = (e sublevels)

a-b-c--d-e-1 = a-b-c--d-(a-b-c--d-e) (1 sublevel)

...

-- UNDER CONSTRUCTION -