The minimum value of `z=2x_(1)+3x_2` subjected to the constraints `2x_(1)+7x_(2)ge22,x_(1)+x_(2)ge6,5x_(1)+x_(2)ge10` and `x_(1),x_(2)ge0`, is

The maximum value of z = 4x +2y subject to the constraints 2x+3yle18,x+yge10,x,yge0 is

The constraints -x_(1)+x_(2)lt 1, -x_(1)+3x_(2)le9, x_(1), x_(2)gt, 0 defines on

The minimum value of z = 4x+5y subject to the constraints xge30,yge40 and xge , y ge0 is

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

By graphical method, the solutions of linear programming problem maximise Z=3x_(1)+5x_(2) subject to constraints 3x_(1)+2x_(2) le 18, x_(1) le 4, x_(2) le 6, x_(1) ge0,x_(2) ge 0 are

The linear programming problem : Maximize z=x_(1)+x_(2) subject to constraints x_(1)+2x_(2)le2000,x_(1)+x_(2)le1500,x_(2)le600,x_(1)ge0 has

The LPP problem Max z=x_(1)+x_(2) such that -2x_(1)+x_(2)le1,x_(1)le2,x_(1)+x_(2)le3 and x_(1),x_(2)ge0 has