The corner points of the feasible region determined by the system of linear contraints are `(0,0), (0,40),( 20,40),(60,20),(60,0).` The objective function is `Z=4x+3y`. Compare the quantity in Column `A` and Column `B`.

The corner points of the feasible region determined by the system of linear constraints are (0, 0), (0, 40). (20, 40), (60, 20). (60, 0). "The objective function is Z = 4x + 3y . Compare the quantity in Column A and Column B. {:("Column A", "Column B"),("Maximum of Z",325):}

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 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 :

The corner points of the feasible region of the system of linear inequations x+yge2,x+yle5,x-yge0,x,yge0 are :

The carner points of the feasible region formed by the system of linear inequations x-yge-1,-x+yge0,x+yle2andx,yge0 , are

The corner points of the feasible region determined by a system of linear inequations are (0,0),(4,0),(2,4) and (0,5). If the minimum value of Z=ax+by,a, bgt0 occurs at (2,4) and (0,5) ,then :

The corner points of the feasible region determined by the system of linear constraints are (0, 10), (5, 5) (15, 15), (0, 20). Let Z = px + qy , where p,q gt 0 . Then, the condition on p and q so that the maximum of Z occurs at both the points (15, 15) and (0, 20), is

The corner points of the feasible region determined by the system of linear constraints are (0,10) , (5,5) (25,20),(0,30) Let z = px + qy , where p,qgt0 Condition on p and q so that te maximum of z occurs at both the points (25,20 ) and (0,30) is ………

If the corner points of a feasible region of system of linear inequalities are (15,20) (40,15) and (2,72) and the objective function is Z = 6x + 3y then Z_(max) - Z_(min) =