Part Find the maximum value of the objective function 3z – Dy subject to the constraints -9y < 0, I 2 0, 7z + 2y < 63, z+ 7y < 56 Find the maximum value of the objective function I+ 6y subject to the same constraints. First, graph and shade the feasible set, i.e., the points (if any) that satisfy the given constraints. Then find the coordinates of all of the corner points of the feasible set. Which one of the following statements best describes the comer points: A. There are no corner points, because there are no points that satisfy all of the inequalities. B. There are no corner points, because the shaded points constitute a single half-plane. C. There is exactly one corner point D. There are exactly two corner points. E. There are exactly three corner points. F. There are exactiy four corner points. G. There are exactly five corner points. H. There are more than five corner points. Statement: f - Part 2 Yes, that is correct. What are the comer points? Beginning with the corner point that is closest to the origin (or the origin if it is a corner point) and then proceeding around the boundary in counter-clockwise order, enter the coordinates of the corner points: First corner: ( 田) Second comer. ( Third comer: ( Fourth corner: (

need help with part 2

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* Part 1 Find the maximum value of the objective function 3z – 9y subject to the constraints 0, I 2 0, 7z + 2y < 63, I+ 7y < 56 Find the maximum value of the objective function :+ 6y subject to the same constraints. First, graph and shade the feasible set, i.e., the points (if any) that satisfy the given constraints. Then find the coordinates of all of the corner points of the feasible set. Which one of the folloving statements best describes the comer points: A. There are no corner points, because there are no points that satisfy all of the inequalities. B. There are no corner points, because the shaded points constitute a single half-plane. C. There is exactly one corner point. D. There are exactly two corner points. E. There are exactly three corner points. F. There are exactly four corner points. G. There are exactly five corner points. H. There are more than five corner points. Statement: f * Part 2 Yes, that is correct. What are the comer points? Beginning with the corner point that is closest to the origin (or the origin if it is a corner point) and then proceeding around the boundary in counter-clockwise order, enter the coordinates of the comer points: First corner: ( 田) Second corner. ( 出) Third comer: ( Fourth corner: