User blog comment:Simplicityaboveall/Extremely Large Numbers 3/@comment-24920136-20160801224555

"And we obtain a value for heshbar-q which is very very much larger than the Rayo's number."

No we don't. The scales at which rayos number operates pass heshbar so fast it doesn't even feel a difference. It is a difference so minuscule it makes adding a billionth to a googolplex look like rocket boosters.

Think about the doubling function., doubling a number is a pretty big deal right?, double the rent, double someones salary, double an enemys army. Tripling is even more drastic, now consider 10 times a number, that is quite an increase no?. Youre going 70mph on a car, no problem but going to ten times that speed is a whole different matter.

Ok so consider this:

is 10 times googolplex  ALOT bigger than googolplex? much bigger?

Nope, not even noticeably,i will show you by doing the math

(10^10^100)10 = (10^10^100)10^1 = 10^(10^100 + 1)

So, to even notice the difference from one number to another you would need to be able to tell apart a googol from googol+1, and thats way more than the 16 digits of precision calc.exe can handle.

As numbers get bigger, the noticeable effects from operations get harder to notice, some for example grahams number, are indistinguishable even from operations such as n^100 (which is way stronger than x10)