a)Sketch the feasible region in both decision space and objective space, and hence identity the non-inferior set.

[answerhappygod]

a)Sketch the feasible region in both decision space and objective space, and hence identity the non-inferior set.
Consider the multiobjective problem max{z1 = 3 x1 – 6x2, 22 = x1 +4x2} subject to - X156, X2 < 5, 3x1 + 2 x2 < 22, X1, X2 > 0.

b. Set Z = (1 ->)z1 + x2: where y € 10,11 For some values of only a single point of the non-inferior set is optimal, and for some values of more than one point of the non-Interior set is optimal. List the values of ytor which more than one point of the non-inferior set is optimal.

C. Set 61 = -1 and consider the e-constraint 21 > 1 Find the coordinates of the optimal solution in both objective space and decision space.