I couldn't show this problem. Can somebody help me by this question?
Consider a polyhedron $\{X \in \mathbb{R}^n | AX \leq b, X \geq 0 \}$ and a non-degenerate basic feasible solution $X^*$. We introduce slack variables z and construct a corresponding polyhedron $\{(X,Z)| Ax + Z = b, X\geq 0, Z \geq 0\}$ in standard form. Show that $(X^*, b – AX^*)$ is a non-degenerate basic feasible solution for the new polyhedron.