In the tableau for the maximization problem below, the values of the six constants are unknown…

In the tableau for the maximization problem below, the values of the six constants are unknown (assume there are no artificial variables):

State restrictions on the six unknowns that would make the following statements true about the given tableau:

(a) The current solution is optimal but an alternate optimum exists.

(b) The current solution is infeasible. (State which variable.)

(c) One of the constraints is inconsistent.

(d) The current solution is a degenerate basic feasible solution. (Which variable causes degeneracy?)

(e) The current solution is feasible but the problem has no finite optimum.

(f) The current solution is the unique optimum solution.

(g) The current solution is feasible but the objective can be improved by replacing x_{6} by x_{1}. What will be the total change in the objective function value after the pivot?

In the tableau for the maximization problem below, the values of the six constants are unknown…