Mapping on a set with respect to function composition

Question

In Isaacs' Algebra, I found the following exercise

Let $G$ be a group of mappings on a set $X$ with respect to function composition. Find an example where $G$ is not a subset of $\operatorname{Sym}(X)$ and $|G|\geq 2$.

I don't understand what "mapping on a set $X$ with respect to function composition" means.