Consider the interval $\left[-1,1\right]$ for the given graph of f.

It can be observed that the given graph has no break, hole or gap in the interval $\left[0, 4\right]$. So, the graph of f appears to be continuous on $\left[0, 4\right]$.

It can be observed that in the interval $\left(0, 4\right)$, the graph has no corner, no vertical line or no discontinuous point. So, the graph f  appears to be differentiable on $\left(0, 4\right)$.

From the graph, $f\left(-1\right)=0$ and $f\left(1\right)=0$.

$\Rightarrow f\left(-1\right)=f\left(1\right)$

So, Rolle's theorem applies. There exists some $c\in \left(0, 4\right)$ such that $f\text{'}\left(c\right)=0$ or the graph has horizontal tangent line.

From the graph of f, such values of c where the graph has horizontal tangent line is $c=0$.