Summary: Let \(\{S_n: n\geq 0\}\) with \(S_0=0\) be a random walk with negative drift and let \(\tau_x=\min\{k>0: S_k<-x\}\), \(x\geq 0\). Assuming that the distribution of i.i.d. increments of the random walk is absolutely continuous with subexponential density we find the asymptotic behavior, as \(n\to \infty\), of the probabilities \(\operatorname{P}(\tau_x=n)\) and \(\operatorname{P}(S_n\in [y,y+\Delta), \tau_x>n)\) for fixed \(x\) and various ranges of \(y\). The case of lattice distribution of increments is considered as well.