We obtain interval oscillation criteria for the second-order impulsive delay differential equation$$\begin{gathered}\left(r(t) \Phi_\alpha\left(x^{\prime}(t)\right)\right)^{\prime}+p(t) \Phi_\alpha(x(t-\tau))+\sum_{i=1}^n q_i(t) \Phi_{\beta_i}(x(t-\tau))=e(t), t \geq t_0, t \neq t_k \\x\left(t_k^{+}\right)=a_k x\left(t_k\right), \quad x^{\prime}\left(t_k^{+}\right)=b_k x^{\prime}\left(t_k\right), k=1,2,3, \ldots\end{gathered}$$The results obtained in this paper extend some of the existing results. We have given some examples to illustrate our results.