First row superpent or lapent is equal to \(\{5,5,5,5,5(1)2\}=\{5,5(1)3\}\) in BEAF.[1] The term was coined by ARsygo.
Approximations[]
| Notation | Approximation |
|---|---|
| Bird's array notation | \(\{5,5[2]3\}\) (exact) |
| Cascading-E notation | \(\text{E}[5]5\#\text{^}\#5\#\#\#\#5\) |
| DeepLineMadom's Array Notation | \(5[1\{2\}3]5\) |
| X-Sequence Hyper-Exponential Notation | \(5\{X^{X}+X^3\}5\) |
| Fast-growing hierarchy | \(f_{\omega^{\omega}+\omega^3}(5)\) |
| Hardy hierarchy | \(H_{\omega^{\omega^{\omega}+\omega^3}}(5)\) |
| Slow-growing hierarchy (with this system of fundamental sequences) | \(g_{\psi_0(\Omega^{\Omega^{\Omega}+\Omega^3})}(5)\) |
Sources[]
- ↑ AR Googol - Numbers from BEAF. Retrieved 2024-06-22.