In this thesis, we will study about numerical ranges of weighted permutation matrices and weighted shift matrices. Firstly, we know that if $A$ is a $3 imes3$ weighted permutation matrix, $W(A)$ has symmetry of $frac{2pi}{3}$. Thus, if there is a line segment on $partial W(A)$ then $W(A)$ is a triangle. Moreover, $A$ is normal. If $A$ is a $3 imes3$ weighted permutation matrix, $W(A)$ has symmetry of $frac{2pi}{4}$. If there is a line segment on $partial W(A)$ then $W(A)$ is a quadrangle. Moreover, $Acong A_{1}oplus A_{2}$, where $A_{1}$ and $A_{2}$ are $2 imes 2$ weighted permutation matrices. Let $A$ be a $4 imes4$ companion matrix. We will see that $W(A)$ has four line segments if and only if $A$ can be reducible. Another subject is that we are interested in finding the order of the weights of a weighted shift matrix so that the numerical radius will be the largest.