1. How do you plot the objective function? Answer: Objective function lines are drawn on the graph in the same way as constraint lines, with the exception that you can opt to distinguish them from constraint lines by drawing a dotted line instead of a straight line. 2. Differentiate the direction of improvement for the maximization objective function and minimization objective function. Answer: They differ from various aspects. The corner-point approach cannot tackle minimization issues, which is a distinction between minimization and maximization problems. Unbounded regions are common in maximizing issues. Unbounded zones are common in minimization issues. 3. The last corner of the feasible region that the objective function hits as it is moving toward its improvement is the optimum point. How do you find the coordinates of the optimum point? Answer: In finding the point of contact of the ruler with the feasible region that is closest to the origin if the purpose is to minimize the objective function. This is the optimal function minimization point. On the other hand, finding the point of contact of the ruler with the feasible region that is the farthest from the origin if the purpose is to maximize the objective function. This is the most efficient way to maximize the function. "I affirm that I have not given or received any unauthorized help on this activity (discussion) and that this work is my own.”