The objective function of LPP defined over the convex set attains

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11.

The objective function of LPP defined over the convex set attains it optimum value at

  • atleast two of the corner points

  • all the corner points

  • atleast one of the corner points

  • None of the corner points


A.

atleast two of the corner points

The objective function of LPP defined over the convex set attains its optimum value atleast one of the corner points.


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12.

If x + y  2, x  0, y  0 the point at which maximum value of 3x + 2y attained will be

  • (0, 2)

  • (0, 0)

  • (2, 0)

  • 12, 12


13.

If an LPP admits optimal solution at two consecutive vertices of a feasible region, then

  • the LPP under consideration is not solvable

  • the LPP under consideration must be reconstructed

  • the required optimal solution is at the mid-point of the line joining two points

  • the optimal solution occurs at every point on the line joining these two points


14.

By graphical method, the solution of linear programming problem maxirmze z = 3x1 + 5x2 subject to 3x1 + 2x 18, x1  4, x2  6, x1  0, x2  0

  • x1 = 2, x2 = 0, z = 6

  • x1 = 2, x2 = 6, z = 36

  • x1 = 4, x2 = 3, z = 36

  • x1 = 4, x2 = 6, z = 42


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15.

If x and y are independent vanables, then the angle between lines of regression is

  • 45°

  • 30°

  • 90°


16.

In a linear programming problem z = 2x + y when 5x + 10y 50, x + y  1, y  4 and x, y  0 minimum value of z is

  • 0

  • 1

  • 2

  • 1/2


17.

The maximum value of z = 4x + 2y subject to the constraints 2x + 3y 18, x + y  10, x, y  0

  • 36

  • 40

  • 20

  • None of these


18.

The maximum value of μ = 3x + 4y, subject to the conditions x + y 40, x + 2y 60, x, y 0, is

  • 130

  • 140

  • 40

  • 120


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19.

If x + y  2; x  20, y  20, then the point, at which the maximumvalue of 3x + 2y is attained, will be

  • (0, 0)

  • 12, 12

  • (2, 0)

  • (0, 2)


20.

The maximum value of P = 6x + 8y, if 2x + y  30, x + 2y  24; x  20, y  20, will be

  • 90

  • 120

  • 96

  • 240


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