Mellin Transform of Heaviside Step Function/Corollary

Theorem
Let $c$ be a constant real number.

Let $\mu_c \left({t}\right)$ be the Heaviside step function.

Let $\mathcal M$ be the Mellin transform.

Then:
 * $\mathcal M \left\{ {\mu\left({c - t}\right)}\right\} \left({s}\right) = \dfrac {c^s} s$

for $c > 0, \Re \left({s}\right) > 0$