Faddeev equations with local potentials in the momentum space are two-variable integral equations whose kernels have singularities in the case of break-up proceses and three-body scattering. In the frame of singular integral equation theory a numerical technique for solving the two-variable equations is presented. The practice shows that numerical solutions converge. Differential Cross-sections for complete kinematics are obtained. It is clear that the aqreement between the theoretical results and the experimental ones is very well.