Feasible region of an L.P.P is shown shaded in the following figure. Minimum of `Z=4x+3y` occurs at the point.

The feasible region of an L.P.P is shown shaded in the figure. Let Z=3 x-4 y be the objective function. The minimum of Z occurs at

The feasbile regin of the LPP is shown shaded in the figure Let Z=3x-4y be the objective function. Therefore maximum value of z is

The graph of a linear programming problem is given below. The shaded region is the feasible region. The objective function is Max Z=px+qy (i) What are the coordinates of the corners of the feasible region. (ii) Write the constraints. (iii) If the Z occurs at A and B, what is the relation between p and q. (iv) If q=1 write the objective, function. (v) Find the Max Z.

Consider the circle x^(2) + y^(2) = 16 and the straight line y = sqrt3x as shown in the figure. (i)Find the points A and B as shown in the figure. (ii) Find the area of the shaded region in the figure using definite integral.

The corner points of the feasible region determined by the following sytem of linear inequalities: 2x+yle10, x+3yle15, x, yge0 are (0,0),(5,0),(3,4) and (0,5). Let Z=px+qy where p,qge0 . Condition on p and q so that the maximum of Z occurs at both (3,4) and (0,5) is

Consider the linear programming problem Maximize Z=4x+y Subject to the constraints. x+y le 50 3x+y le 90 x gt 0, y gt 0 (i) Draw its feasible region. (ii) Find the corner points of the feasbile region. (iii) Find the corner at whcih Z attains its maximum.

Consider the linear inequalities 2x+3yle6, 2x+y le 4, x ge0, y ge0 (i) Mark the feasible region. (ii) Maximise the function Z=4x+5y subject to the given constraints.

A variable chord of the circle x^2+y^2=4 is drawn from the point P(3,5) meeting the circle at the point A and Bdot A point Q is taken on the chord such that 2P Q=P A+P B . The locus of Q is (a) x^2+y^2+3x+4y=0 (b) x^2+y^2=36 (c) x^2+y^2=16 (d) x^2+y^2-3x-5y=0