The bounce statement which symbol is "〙" is a type of statement for numbers. It is a very large statement, and surpasses all the record holders by a ton, it can be used like 〙2 〙2 which bounces 2 by Infinifinity about Infinifinity times which repeats Final Infinity times and this mass number expanding is infinite.
〙 〙2 〙 〙bounce( 〙)2 looks extremely weird but is basically something that bounces 2 by OMEGATION every 10^-OMEGATION seconds which goes on OMEGATION times which the mass number expanding is Infinifinite.
A different type of bounce, 〙x 〙is ‹n(n), for example, ‹OMEGATION(OMEGATION(ABSOLUTE GOOGOLOGY)) is one of the things you can say.
Then finally, we have the Hoop(n) function.
- Hoop(1) is 1, but Hoop(1.1) is TREE(3). Hoop(1.2) is Absolute Infinity, and Hoop(2) is Infinifinity.
- Hoop(Infinifinity) is ABSOLUTE GOOGOLOGY
- Hoop(ABSOLUTE GOOGLOGY) is Epsolute
- Hoop(Epsolute) is something very high.
- Hoop(Hoop(Epsolute)) is also something extremely high.
- Hoop{Epsolute} is like Hoop(Hoop(Hoop(Hoop(Hoop(Epsolute))))).
The Hoop Function is where it bounces by bounce which gets bounced by bounce and bounced by bounce and this goes on bounce times which goes on a bounce amount.
It also gets super bounced Superbounce times while getting Superbounced and this goes on superbounce times which goes on superbounce times.
Hoop(1) gets HOOP by 1 while HOOP by 1 meaning nothing changes.
Hoop(1.00000000000001) is like Googolplex, it HOOPS that number by that number that amount of times every 10^-that number seconds. This happens Googol times then gets you Googolplex.
Analysis[]
The big statement isn't given, making Hoop() function nonsense. This function is in a It-Box with a greater-potential Post-Writing too.