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If the feasible region for a solution of linear inequations is bounded, it is called as:
  • a)
    Concave Polygon
  • b)
    Finite Region
  • c)
    Convex Polygon
  • d)
    None of the above
Correct answer is option 'C'. Can you explain this answer?
Verified Answer
If the feasible region for a solution of linear inequations is bounded...
A bounded feasible region will have both a maximum value and a minimum value for the objective function. It is bounded if it can be enclosed in any shape.
A convex polygon is a simple not self-intersecting closed shape in which no line segment between two points on the boundary ever goes outside the polygon.
Hence, the answer is convex polygon.
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If the feasible region for a solution of linear inequations is bounded, it is called as:a)Concave Polygonb)Finite Regionc)Convex Polygond)None of the aboveCorrect answer is option 'C'. Can you explain this answer?
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