The ground state is the lowest-energy state of the quantum mechanical system. We compute the ground state energy by using the ground state energy functional Eg[ρ] of electronic density ρ, which is deduced from the Kohn-Sham total-energy functional and local density approximation. To compute the ground state energy of atoms, we have to compute each electronic density of the ground state of atoms. The electronic density of atoms is a function about the wave function of atoms, so the first step is to determine the wave functions of ground state of atoms by solving the Kohn-Sham equation HΨ = εΨ. The Kohn-Sham equation is a problem of the second order partial differential equation. The wave function of the ground state of atoms is the function Ψ corresponding to the minimal ε of the Kohn-Sham equation. For the convenience of solving the Kohn-Sham equation, we discretize the Hamiltonian H of the Kohn-Sham equation and the problem become an eigenvalue problem. In this computation, we determine the wave function of the ground state of atoms by selfconsistency. The errors between the computation and the realistic values are less than 15%.