The contraints `-x+yle1,-x+3yle9,xge0,yge0` of LLP correspond to

For the function z = 4x+ 9y to be maximum under the constraints x+5yle200,2x+3yle134,xge0,yge0 the values of x and y are

For the following linear programming problem minimize Z=4x+6y subject to the constraints 2x+3yge6,x+yle8,yge1,xge0 , the solution is

The solution of set of constraints x+2yge11,3x+4yle30,2x+5yle30 , x ge0,yge0 includes the point

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 constraints of an LPP are x+yle6,3x+2yge6,xge0 and yge0 Determine the vertices of the feasible region formed by them

The maximum value of z = 4x +3y subject to the constraints 3x+2yge160,5x+2yge200,x+2yge80,x,yge0 is

The region in the xy plane given by y-xle1,2x-6yle3,xge0,yge0 is

The point at which , the maximum value of (3x+2y) subject to the constraints x+yle2,xge0,yge0 obtained , is

The maximum value of P = 3x +4y subject to the constraints x+yle40,2yle60,xge0 and yge0 is

The minimum value of z = 3x + y subject to constraints 2x+3yle6, x+yge1,xge1,xge0,yge0 is