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Popular Questions
- The area of the feasible region for the following constraints
- A vertex of a feasible region by the linear constraints 3x + 4y
- The maximum value of z is where, z = 4x + 2y subject to constraints
- The minimum value of the objective function z = 2x + 10y subject to constraints
- Variables of the objective function of the linear programming problem are
- The point which provides the solution of the linear programming problem, maximise
- Maximum value of z =12x + 3y, subject to constraints
- The region represented by the inequation system
- The maximum value of z = 4x + 2y subject to constraints
- The maximum value of z = 10x + 6y, subject to constraints
- For the LPP, minimise z = x1 + x2 such that inequalities 5x1 + 10x2
- The maximum value of z = 5x + 3y, subject to constraints 3x + 5y
- Maximum value of z = 3x + 4y subject to constraints x - y
- For an LPP, minimise z = 2x + y subject to constraints 5x + 10y
- If given constraints are 5x + 4y - > 2 , x < - 6 and y < - 7, then the maximum value of the function z = x + 2y is
- The constraints -x1 + x2 < - 1, -x1 + 3x2 < - 9 and x1, x2 < - 0 defines on
- If x + y < - 2 ; x > - 0, y > - 0 is the point at which maximum value of 3x + 2y attained will be
