The given function is:

$f\left(x\right)=x^3-3x+2 (-2,2)$

The required graph is shown below:

A function $f$ has a local maximum at c if there is an open interval I containing c so that for all x in I , $f\left(x\right)\le f\left(c\right)$. We will call $f\left(c\right)$ a local maximum value of $f$.

A function $f$ has a local minimum at c if there is an open interval I containing c so that, for all x in I , $f\left(x\right)\ge f\left(c\right)$. We call $f\left(c\right)$ a local minimum value of $f$.

From the graph we have drawn, we can see that $f$ has a local maximum at $(-1,4)$.

Here $f\left(x\right)<f(-1)$.

Therefore, the local maximum is $f(-1)=4$.

From the graph we have drawn, we can see that $f$ has a local minimum at $(1,0)$.

Here $f\left(x\right)>1$.

Therefore, the local minimum is $f\left(1\right)=0$

We can see from the graph that the function is increasing from the point $(-2,0)$ to $(-1,4)$ and from point $(1,0)$ to $(2,4)$.

So we can conclude from it that $f$ is increasing on the intervals $(-2,-1)$ and $(1,2)$.

We can see from the graph that the function is decreasing from the point $(-1,4)$ to $(1,0)$.

So we can conclude from it that $f$ is decreasing on the intervals $(-1,1)$.