Goober's number[]
Goober's Number: (10^100 &&&...&&& 10^100) <(10^100 &&&...&&& 10^100)> (10^100 &&&...&&& 10^100)
Here's what it means: 10^100 &&&...&&& 10^100 has 10^100 &'s. n && n = n & n & n ... n & n & n, n n's. You can keep going, n &&& n, n &&&& n, etc.
The <>'s are hard to explain. But I can do it. 'n' = {n, n-1, n-2 ... 3, 2, 1}. n°n = '''...'''n'''...''' (n sets of apostrophes). n|n = n°n°n...n°n°n (n n's). After that, n <2> n, n <3> n, etc.
If you want to use 10^100 &&&...&&& 10^100 (10^100 &'s), It's called Gengongingol. 10^100 &&&...&&& 10^100 with 100 &'s is Gengongol. 10^100 && 10^100 is Gengol.
Goober's Cardinal[]
It's very simple: 1/0. Some will say "Uh well that's just infinity durdly burdly snurdly", But it isn't. Then they'll say "So then it's 10∞ durdly burdly snurdly". That's wrong too. 10∞ is what I like to call Indefinity. But no, 1/Indefinity is called S.P.N.E. My cardinal is so large, it completely dwarfs numbers like THERE IS NO GOAL., but it's nothing compared to nothing compared to numbers like Absolute Value. If you want, you can call it Bjarni's number.