The objective function of LLP defined over the convex set attains its optimum value at

The value of objective function is maximum under linear constraints

The optimal value of the objective function is attained at the points

The objective function P (x,y) = 2x+3y is maximized subject to the constraints x+yle30,x-yge0,3leyle12,0lexle20 The function attains the maximum value at the points

The feasible region for LPP is shown shaded in the figure . Find the minimum value of the objective function z = 11x + 7y.

Let the function f, g, h are defined from the set of real numbers RR to RR such that f(x) = x^2-1, g(x) = sqrt(x^2+1), h(x) = {(0, if x lt 0), (x, if x gt= 0):}. Then h o (f o g)(x) is defined by

The corner points of the feasible region are A (50,50), B(10,50),C(60,0) and D (60,4) . The objective function is P=(5)/(2)x+(3)/(2)y+410 . The minimum value of P is at point