User blog:BlauesWasser/Kefts Number

The kefts number is not very big, (compared to other googolisms) it was made using the Kefts function.

Kefts number Value:

I use curly brackets and square brackets to make it easier to understand.

Kefts(Kefts[Kefts{3,3,3}], Kefts[Kefts{3,3,3}], Kefts[Kefts{3,3,3}]) == Kefts(subA, subA, subA)

Because this looks a little crazy, I'm going to show you the value of each Kefts sub.

Curcly Kefts value (Kefts{n, a, b}) subB:

\({^{^{^{3}3}3}3}\), Im going to call this \(subB\) to define the other Kefts values.

Square Kefts value (Kefts[n, a, b]), subA:

\({^{^{.}.}.}subB}\), this is called \(subA\) Remember, there is \(subB!\) amount of subBs to define subA (soz if that sounds confusing)