Abstract: The oscillation of the second order nonlinear neutral delay functional differential equation A(t)x(t)-∑li=1Pi(t)x(t-τ)"+∑mj=1Qj(t)fj(x(t-σ))=0 is established.Sufficient conditions for oscillation of all solutions of the equation and existence of nonoscillatory solution are obtained respectively,which extend and improve the corresponding results of literature.