Miner Enumeration

The Miner Enumeration, is a system of letters for shortening numbers, like $$\eth, \mho , \ell , \Re , \hbar , \aleph$$ made up by Miners.

$$\eth=10^{\pi^2}\approx 7,406,352,891$$

$$\ell=10^{3^{R_2}}\approx 153,607,762,635,675$$

$$\Re=10^{6!}=10^{720}$$

$$\mho=2^{\eth}\approx 10^{2,229,534,379}$$

$$\hbar=\pi^{\Re}\approx 10^{10^{719.7}}$$

$$\wp=1+\left ( \frac{1}{\eth} \right)^\ell\approx 1$$

$$\Im=(10i+R_2)^{\pi^{\pi}}\approx (-4.681\times 10^{35})-(8.128\times 10^{36}i)$$

$$\backepsilon \text{ =}$$ inaccesible cardinal.

$$\imath \text{ =}$$ 0=1 cardinal.

$$\complement_1\text{ = }0=\imath$$ cardinal

$$\complement_2\text{ = }0=\complement_1$$ cardinal

$$\complement_3\text{ = }0=\complement_2$$ cardinal

$$\complement_n\text{ = }0=\complement_{n-1}$$ cardinal

$$\complement_0\text{ = }\imath$$

$$\infty=\text{number of digits of pi}^2$$

Watch this video for $$\aleph_n$$

Also, in the $$\ell$$ and $$\Im$$ formulas you saw a R2 right? This means "Ratio of 2", or $$1 + \sqrt{2}$$, this is the formula for Rn: $$\frac{n+\sqrt{n^2+4}}{2}$$. And yes, i saw this on a Youtube channel that i dont remember the name.