In this paper we study the three-dimensional two-phase magnetohydrodynamic interface problem in a bounded domain. The two incompressible fluids are both Newtonian and the surface tension is considered. We shall use the Galerkin method to construct the approximate solutions in a bounded domain. Due to the magnetic field in the magnetohydrodynamic equations, we cannot use the method of monotone operators to solve the approximate equations. Instead, we will construct an iterating operator and solve the equations by finding the fixed-point of the operator. To deal with the free interface, we shall prove the compactness of the iterating operator and then use the Schauder fixed-point theorem. The existence of the varifold solution is established by the weak convergence method.