The grangolbyte is equal to 8^100#100 using Hyper-E notation.[1] The term was coined by Sbiis Saibian. This number belongs to the grangol regiment. In base 10, this number is approximately E90#100.
Approximations in other notations[]
| Notation | Lower bound | Upper bound |
|---|---|---|
| Arrow notation | \(52 \uparrow\uparrow 101\) | \(53 \uparrow\uparrow 101\) |
| Down-arrow notation | \(52 \downarrow\downarrow\downarrow 101\) | \(53 \downarrow\downarrow\downarrow 101\) |
| Steinhaus-Moser Notation | 99[4] | 100[4] |
| Chained arrow notation | \(52 \rightarrow 101 \rightarrow 2\) | \(53 \rightarrow 101 \rightarrow 2\) |
| BEAF | \(\{52,101,2\}\) | \(\{53,101,2\}\) |
| Hyperfactorial array notation | \(103!1\) | \(104!1\) |
| Bird's array notation | \(\{52,101,2\}\) | \(\{53,101,2\}\) |
| Strong array notation | \(s(52,101,2)\) | \(s(53,101,2)\) |
| Nested factorial notation | \(99![2]\) | \(100![2]\) |
| Fast-growing hierarchy | \(f_3(100)\) | \(f_3(101)\) |
| Hardy hierarchy | \(H_{\omega^3}(100)\) | \(H_{\omega^3}(101)\) |
| Slow-growing hierarchy | \(g_{\varepsilon_0}(100)\) | \(g_{\varepsilon_0}(101)\) |
Sources[]
- ↑ Saibian, Sbiis. 4.3.2 - Hyper-E Notation - Large Numbers. Retrieved 2016-07-18.