In a LPP, the maximum value of the objective function Z = ax +by is always 0, if origin is one of the corner point of the feasible region.

In a LPP, the maximum value of the objective function Z = ax +by is always finite.

Maximum value of the objective function Z = ax +by in a LPP always occurs at only one corner point of the feasible region.

In a LPP, the objective function is always.

In a LPP, if the objective function Z=ax+by has the same maximum value of two corner points of the feasible region, then every point of the line segment joining these two points give the same ..value.

In an L.P.P. if the objective function Z=ax+by by has same maximum value on two corner points of the feasible region, then the number of points at which maximum value of Z occurs is

In the feasible region for a LPP is ..., then the optimal value of the objective function Z= ax + by may or may not exist.

The least value of the function f(x) = ax + (b)/(x) (x gt 0, a gt 0, b gt 0)

If the feasibile region for a LPP is unbounded, maximum or minimum of the objective function Z = ax + by may or may not exist.

The maximum value of the function f(x)=(1+x)^(0.3)/(1+x^(0.3)) in [0,1] is

The optimal value of the objective function is attained at the points A)Given by intersection of inequations with the axes only B)Given by intersection of inequations with the axes only C)Given by corner points of the feasible region D)None of these