User:Googleaarex/Variations of omega

\(\omega\) is equal to first limit ordinal.

\(\omega(A)\) is equal to \(\omega 2\)

\(\omega(A^{n-1})\) is equal to \(\omega n\)

\(\omega(A^\omega)\) is equal to \(\omega^2\)

\(\omega(A^{\omega^2})\) is equal to \(\omega^3\)

\(\omega(B)\) is equal to \(\omega^\omega\)

\(\omega(B^{n-1})\) is equal to \(^n\omega\)

\(\omega(B^\omega)\) is equal to \(\varepsilon_0\)