In a LPP, the maximum value of the objective function Z = ax +by is always finite.

Consider the following statements I. If the feasible region of an LPP is undbounded then maximum or minimum value of the obJective function Z = ax + by may or may not exist . II. Maximum value of the objective function Z = ax + by in an LPP always occurs at only one corner point of the feasible region. Ill. In an LPP, the minimum value of the objective function Z = ax + by is always 0, if origin is one of the corner point of the feasible region. IV. In an LPP, the maximum value of the objective function Z = ax + by is always finite. Which of the following statements are true?

In a LPP, the maximum value of the objective function Z = ax +by is always 0, if origin is one of the corner point of the feasible region.

The maximum value of the function is

Objective function of an LPP is

The corner points of the feasible region of an LPP are (0,0),(0,8),(2,7),(5,4) and (6,0). The maximum value of the objective function Z = 3x + 2y is:

The corner points of the feasible region of a system of linear inequalities are (0, 0), (4,0), (3,9), (1, 5) and (0, 3). If the maximum value of objective function, Z = ax + by occurs at points (3, 9) and (1, 5), then the relation between a and b is:

In the feasible region for a LPP is ..., then the optimal value of the objective function Z= ax + by may or may not exist.

Maximum value of the objective function Z = ax +by in a LPP always occurs at only one corner point of the feasible region.

In a LPP, the objective function is always.

If the feasibile region for a LPP is undoubed, maximum or minimum of the objective function Z = ax + by may or may not exist.