Visualization of Terto-grahal using arrow notation

The Terto-Grahal, an extension of Aarex Tiaokhiao's Grahal, is equal to G(G(G(G(1)))) where G(x) represents Graham's Sequence.[1] The name was coined by SuperJedi224.

It is more than two-ex-force-forcal but less than three-ex-force-forcal.


Notation Approximation
X-Sequence Hyper-Exponential Notation \(3\{X+1\}3\{X+1\}3\{X+1\}3\{X\}4\)
Fast-growing hierarchy \(f_{\omega +1}^4(f_{4}^2(3))\)


Numbers By SuperJedi224

Fibonacci Numbers

Pound-Star Notation

Based on the Faxul

Googovipleccix family

Graham Sequence Numbers

Deutero-Grahal · Trito-Grahal · Terto-Grahal

-Illion numbers

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