Question: Digital Controls, Inc. (DCI), manufactures two models of a radar gun used by police monitor the speed of automobiles. Model A has an accuracy of plus or minus 1 mile per hour, whereas the smaller model B has an accuracy of plus or minus 3 miles per hour. For the next week, the company has orders for 100 units of model A and 150 units of model B. Although Del purchases all the electronic components used in both models, the plastic cases for both models are manufactured at a Del plant in Newark, New Jersey. Each model A case requires 4 minutes of injection-molding tiMeand 6 minutes of assembly time. Each model B case requires 3 minutes of injection-molding tiMeand 8 minutes of assembly time. For next week, the Newark plant has 600 minutes of injection-molding time available and 1080 minutes of assembly time available. The manufacturing cost is $10 per case for model A and $6 per case for model B. Depending upon demand and the time available at the ewark plant, Del occasionally purchases cases for one or both models from an outside supplier in order to fill customer orders that could not be filled otherwise. The purchase cost is $14 for each model A case and $9 for each model B case. Management wants to develop a minimum cost plan that will determine how many cases of each model should be produced at the Newark plant and how many cases of each model should be purchased. The following decision variables were used to formulate a linear programming model for this problem:

AM = number of cases of model A manufactured
BM = number of cases of model B manufactured
AP = number of cases of model A purchased

BP = number of cases of model B purchased

The linear programming model that can be used to solve this problem is as follows:

Min l0 AM + 6BM + 14AP + 9BP
S.t.

lAM + + IAP + =100 Demand for model A

+ IBM + IBM = 150 Demand for model B

4AM + 3BM ≤ 600 Injection molding time

6AM + 8BM ≤ 1080 Assembly time

AM, BM, AP, BP ≥ 0

A.) What is the optimal solution and what is the optimal value of the objective function?

B.) Which constraints are binding?

C.) What are the dual prices? Interpret each.

D.) If you could change the right-hand side of one constraint by one unit, which one would
you choose? Why?