So I am trying to think of an example of a finite group of size $n$ for each $ n \gt 1 $, but nothing is coming to mind.
If it is a finite group denoted as $G$, then the order of G is is $|G|$, but I can't think of a group that satisfies this. I am just stuck and I am not sure if I am not understanding the question.
Here you go:
$$\mathbb{Z}/n \mathbb{Z}$$