We present resonant state solutions of the higher-order nonlinear Schrӧdinger model, with Pӧschl-Teller (PT) potential, under certain parametric conditions. It is found that the localized solutions can be expressed in terms of the hypergeometric functions F(a, b, c; z). The dynamics of these resonant states and their control using isospectral Hamiltonian approach is well illustrated for PT potential, which is analytically tractable.