Letadiscreteself-adjointoperatorT actsinaseparableHilbertspace and have the kernel resolvent, and eigenvalues and eigenfunctions of the operator T be known. In the paper the method of calculation of eigenvalues of the perturbed operator T + P is considered. Resolvent of this operator is presented as convergent Neumann series on eigenfunctions of the operator T. The point of the method is that at first is found a set of numbers which approximate traces of the resolvent degrees of the operator T + P. Then by means of the given set, the system of nonlinear algebraic equations is constructedandsolved.Thesolutionofthesystemisasetofnumbers which approximate firsteigenvalues oftheresolvent oftheperturbed operator T + P.