I'm studying analysis on semigroups by myself.
Let $S$ be a semigroup. Show that if $S$ has two or more left zeros then $S$ is not left amenable.
For proof, let $\mu\in \operatorname{LIM}(S)$, then for every $f\in B(S)$ and $s\in S$ we have $\mu(L_sf)=\mu(f)$. I stop here and cannot find a contradiction. Please help me.