For $a,b >0,$ we consider a temporally homogeneous, one-dimensional diffusion process $X(t)$ defined over $I = (-b, a),$ with infinitesimal parameters depending on the sign of $X(t).$ We suppose that, when $X(t)$ reaches the position $0,$ it is reflected rightward to $\delta$ with probability $p >0$ and leftward to $ - \delta$ with probability $1-p,$ where $\delta >0.$ Closed analytical expressions are found for the mean exit time from the interval $(-b,a),$ and for the probability of exit through the right end $a,$ in the limit $\delta \rightarrow 0 ^+,$ generalizing the results of Lefebvre, holding for asymmetric Wiener process. Moreover, in alternative to the heavy analytical calculations, a numerical method is presented to es...