We will discuss the relationship between complex Hessian matrices and the Levi forms. If the complex Hessian matrix is positive definite, the associated Levi form must be positive. Thus, we can ensure the Levi pseudoconvexity by observing the eigenvalues of the respected complex Hessian matrix. Finally, we will use the Chern-Moser normal form to look up the real analytic defining function of the domain $D$ in $mathbb{C}^{n+1}$. verify pseudoconvexity of a domain at a boundary point. At the end a couple of working examples will be given.