The given function is:

$f\left(x\right)=(x+2{)}^2-2$

In the function $f\left(x\right)=a(x-h{)}^2+k$, $a$ is a constant and $(h,k)$ is the vertex.

In the given function $a=1,h=-2,k=-2$. It means the graph of the given function is a parabola that opens up and has its vertex at $(-2,-2)$ and its axis of symmetry is the line $x=-2$.

The graph of $y=x^2$ shifts 2 units left and 2 units down.

First, plot the graph of $y=x^2$ then shift the graph 2 units left and then shift the resulted graph 2 units down to get the graph of the function $f\left(x\right)=(x+2{)}^2-2$.

The required graph is shown below:

Using a graphing utility, we get a graph that is the same as the above graph.