The feasible region of an LPP is shown in the figure. If `z=3x+9y` ,then the minimum value of z occurs at

The feasible region for an LPP is shown in following figure. Find the minimum value of Z=11x+7y.

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

The feasible region for an LPP is shown in the following figure. Let F=3x--4y be the objective function. Maximum value of F is

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:

The feasible region for an LPP is shown in the below. Let F = 3x - 4y be the objective function. Maximum value of F is :

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 a LPP is shown in the following figure. Evaluate Z=4x+y at each of the corner points of the region. Find the minimum value of Z, if it exists

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:

The feasible region of a sytem of linear inequations is shown below. If Z = 2x + y, then the minimum value of Z is:

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