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

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

The objective function of a L.P.P is

Objective function of a L.P.P. 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.

If x,y,z are positive numbers in A.P., then

A wooden object floats in water kept in as beaker. The object is near a side of the beaker figure. Let P_1,P_2,P_3 be the pressure at the three points A,B and C of the bottom as shown in the figure.

Let the equation of the plane containing the line x-y - z -4=0=x+y+ 2z-4 and is parallel to the line of intersection of the planes 2x + 3y +z=1 and x + 3y + 2z = 2 be x + Ay + Bz + C=0 Compute the value of |A+B+C| .

State whether the following relations are functions or not. If it is a function check for one- to- oneness and ontoness. If it is not a function state why? If X = { x,y,z } and f= {(x,y) (x,z) (z,x) } : (f: X to X)

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