The vertices of a closed convex polygon representing the feasible region of the objective function are (6,2),(4,6),(5,4) and (3,6). Find the maximum value of the function f=7x+11y

The vertices of a closed - convex polygon representing the feasible region of the objective function f are (4,0), (2,4),(3,2) and (1,4) . Find the maximum value of the objective function f=7x+8y.

The vertices of a closed - convex polygon representing the feasible region of the objective function f =5x+3y , are (0,0),(3,0),(3,1),(1,3) and (0,4) . Find the maximum value of the objective function.

The corner points of the feasible region of an LPP are (0,0),(0,8),(2,7),(5,4) and (6,0). The maximum value of the objective function Z = 3x + 2y is:

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

Find the maximum and the minimum value of the function y=x^(3)+6x^(2)-15x+5

If given constraints are 5x+4y ge2, x le6, y le 7 , then the maximum value of the function z=x+2y is

If the vertices of a closed - convex polygon are A(8,0), O(0,0), B (20,10), C(24,5) and D(16,20), then find the maximum value of the objective function f=(1)/(4)x+(1)/(5) y .

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 given graph, the feasible region for a LPP is shaded. The objective function Z = 2x – 3y, will be minimum at: