The first we prove that the equation : $ bcx + cay + abz = 2abc - ab - ac - bc$ has no solution on $ N_0$ Obivious $ a|x + 1,b|y + 1,c|z + 1$ so $ bcx + abz + cay\geq bc(a - 1) + ca(b - 1) + ab(c - 1)> 2abc - ab - ac - bc$ (contradition) Now we prove that each $ n > 2abc - ab - ac - bc$ can represent in this form. $ b(cx + az) = 2abc - ab - bc - ca - cay + k$ $ \{2abc - ab - ac - bc - cay\}_{y = 0}^b$ is a complete reside mod $ b$ so we can chose $ y_0$ such that: $ cx + az = \frac {2abc - ab - ac - bc - cay_0 + k}{b}$ $ az + cx = \frac { 2abc - ba - bc - cay - ac + k}{b} > ac - a - c (1)$ Result we know that for each $ n \geq (a - 1)(b - 1)$ then the equation $ ax + by = n$ has non negative integer solution. So $ (1)$ has solution. The problem has been proven.