The corner points of the feasible region determined by the system of linear constraints are as shown below:

Let `Z=3x -4y` be the objective function. Find the maximum and minimum value of Z and also the corresponding points at which the maximum and minimum value occurs.

The corner points of the feasible region determined by the system of linear constraints are as shown below: Let Z=px +qy where p,q gt 0 be the objective function. Find the condition on p and q so that the maximum value of Z occurs at B ( 4,10 ) and C (6,8 ) Also mention the number of optimal solutions in this case.

Find the maximum and minimum values of |z| satisfying |z+(1)/(z)|=2

The corner points of a feasible region determined by a system of linear inequations are (0, 0), (4,0), (5,2), (2, 2) and (0, 1). If the objective function is Z = x + y, then maximum of Z occurs at:

The corneer points of a feasible region, determined by a system of linear inequations, are (0,0),(1,0),(4,3),(2,1) and (0,1). If the objective function is Z = 2x - 3y, then the minimum value of Z is :

Find the maximum and minimum values of the function y=4x^3-3x^2-6x+1

The feasible solution for a LPP is hown as below, Let Z =3x -4y be the objective function . Then, Maximum of Z 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 corner points of a feasible region determined by a system of linear inequalities are (20,40),(50,100),(0,200) and (0,50). If the objective funtion Z=x+2y , then maximum of Z occurs at.

The feasible solution for a LPP is hown as below, Let Z =3x -4y be the objective function . Then, Minimum of Z occurs at

If |z+(4)/(z)|=2, find the maximum and minimum values of |z|