The optimal value of the objective function is attained at the point

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

In a LPP, the objective function is always.

Objective function of an LPP is

The value of objective function is maximum under linear constraints

Which of the following statements is false? A) The feasible region is always a concave region B) The maximum (or minimum) solution of the objective function occurs at the vertex of the feasible region C) If two corner points produce the same maximum (or minimum) value of the objective function, then every point on the line segment joining these points will also give the same maximum (or minimum) two. values D) All of the above

The value of an objective function is maximum under linear constraints:

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

Let R be the feasible region (convex polygon) for a linear programming problem and Z = ax + by be the objective function. Then, which of the following statements is false? A) When Z has an optimal value, where the variables x and y are subject to constraints described by linear inequalities, this optimal value must occur at a corner point (vertex) of the feasible region . B)If R is bounded, then the objective function Z has both a maximum and a minimum value on Rand each of these occurs at a corner point of R . C) If R is unbounded, then a maximum or a minimum value of the objective function may not exist D) If R is unbounded and a maximum or a minimum value of the objective function z exists, it must occur at corner point of R