Fact we fogy kith is equal to 105(2*10^10)6003 ~ 101061838.[1] The term was coined by ARsygo. It is the 8th number of Vast Irregulars of Goals.
Approximations[]
| Notation | Approximation |
|---|---|
| Arrow notation | \(105\uparrow(20000000000\uparrow6003)\) (exact) |
| Down-arrow notation | \(10\downarrow\downarrow61837\) |
| Bowers' Exploding Array Function | \(\{105,\{20000000000,6003\}\}\) (exact) |
| Bird's array notation | \(\{105,\{20000000000,6003\}\}\) (exact) |
| Chained arrow notation | \(105\rightarrow(20000000000\rightarrow6003)\) (exact) |
| Copy notation | \(3[3[61839]]\) |
| DeepLineMadom's Array Notation | \(105[3]20000000000[3]6003\) (exact) |
| Hyper-E notation | \(\text{E}61838\#2\) |
| Graham Array Notation | \([105,[20000000000,6003]]\) (exact) |
| Hyperfactorial array notation | \(((8!)!)!\) |
| Steinhaus-Moser Notation | \(5[3][3][3]\) |
| Strong array notation | \(\text{s}(105\text{s}(20000000000,6003))\) |
| X-Sequence Hyper-Exponential Notation | \(105\{1\}20000000000\{1\}6003\) (exact) |
| Fast-growing hierarchy | \(f_2^2(205400)\) |
| Hardy hierarchy | \(H_{\omega^2 2}(205400)\) |
| Slow-growing hierarchy | \(g_{\omega^{\omega^{\omega^4 6+\omega^3 +\omega^2 8+\omega3+8}}}(10)\) |
Sources[]
- ↑ AR Googol - Vast Irregulars of Goals numbers. Retrieved 2023-04-02.