Grangoldexibong is equal to E100,000,000#100,000,000#2 = E100,000,000#(E100,000,000#100,000,000) = EE...EE100,000,000 (grangolbong E's) = 101010...1010100,000,000 (grangolbong 10's) using Hyper-E notation.[1] The term was coined by Sbiis Saibian. This number belongs to the grangol regiment.
Etymology[]
The name of the number is based on suffix -dex and the number grangolbong.
Approximations in other notations[]
| Notation | Lower bound | Upper bound |
|---|---|---|
| Arrow notation | \(10^{8} \uparrow\uparrow (10^{8} \uparrow\uparrow 101)\) | \(10^{8}+1 \uparrow\uparrow (10^{8}+1 \uparrow\uparrow 101)\) |
| Chained arrow notation | \(10^{8} \rightarrow (10^{8} \rightarrow 101 \rightarrow 2) \rightarrow 2\) | \(10^{8}+1 \rightarrow (10^{8}+1 \rightarrow 101 \rightarrow 2) \rightarrow 2\) |
| BEAF | {{10,8},{{10,8},101,2},2} | {{10,8}+1,{{10,8}+1,101,2},2} |
| Bird's array notation | {{10,8},{{10,8},101,2},2} | {{10,8}+1,{{10,8}+1,101,2},2} |
| Hyperfactorial array notation | \((10^{8}+2!1)!1\) | \((10^{8}+3!1)!1\) |
| Fast-growing hierarchy | \(f_3(f_3(10^8))\) | \(f_3(f_3(10^8+1))\) |
| Hardy hierarchy | \(H_{(\omega^3) 2}(10^8)\) | \(H_{(\omega^3) 2}(10^8+1)\) |
| Slow-growing hierarchy | \(g_{\varepsilon_{\varepsilon_0}}(10^8)\) | \(g_{\varepsilon_{\varepsilon_0}}(10^8+1)\) |
Sources[]
- ↑ Saibian, Sbiis. Hyper-E Numbers. Retrieved 2016-07-19.