In the given graph, the feasible region for a LPP is shaded.

The objective function Z=2x-3y, will be minimum at:

In the given figure, if the shaded region is the feasible region and the objective function is z = x - 2y, the minimum value of Z occurs at:

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

Based on the given shaded region as the feasible region in the graph, at which point(s) is the objective function Z = 3x + 9y is maximum?

Based on the given shaded region as the feasible region in the graph, at which point(s) is the objective function Z = 3x + 9y maximum?

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

The feasible regions for two LPP is show in the following figure. Based on the given information, answer the following questions: If R_(2) is the feasible region and the objective function is Z_(2) = 4x + 3y, then the minimum value of Z_(2) occurs at:

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

In the following the feasible region (shaded) for a LPP is shown Determine the maximum and minimum value of Z=x+2y

The feasible regions for two LPP is show in the following figure. Based on the given information, answer the following questions: If R_(1) is the feasible region, and the ojective function is Z_(1) = 2x - y , then the maximum value of Z_(1) occurs at:

The feasible region for an LPP is shown in the Let Z = 4x + 3y be the objective function. Maximum of Z occur at :