Question
Georgia Cabinets manufactures kitchen cabinets that are sold to local dealers throughout the Southeast. Because of a large backlog of orders for oak and cherry
Georgia Cabinets manufactures kitchen cabinets that are sold to local dealers throughout the Southeast. Because of a large backlog of orders for oak and cherry cabinets, the company decided to contract with three smaller cabinetmakers to do the final finishing operation. For the three cabinetmakers, the number of hours required to complete all the oak cabinets, the number of hours required to complete all the cherry cabinets, the number of hours available for the final finishing operation, and the cost per hour to perform the work are shown here:
| Cabinetmaker 1 | Cabinetmaker 2 | Cabinetmaker 3 | |
| Hours required to complete all the oak cabinets | 50 | 44 | 30 |
| Hours required to complete all the cherry cabinets | 60 | 43 | 33 |
| Hours available | 40 | 25 | 30 |
| Cost per hour | $32 | $43 | $59 |
For example, Cabinetmaker 1 estimates that it will take 50 hours to complete all the oak cabinets and 60 hours to complete all the cherry cabinets. However, Cabinetmaker 1 only has 40 hours available for the final finishing operation. Thus, Cabinetmaker 1 can only complete 40/50 = 0.8, or 80%, of the oak cabinets if it worked only on oak cabinets. Similarly, Cabinetmaker 1 can only complete 40/60 = 0.67, or 67%, of the cherry cabinets if it worked only on cherry cabinets.
Formulate a linear programming model that can be used to determine the proportion of the oak cabinets and the proportion of the cherry cabinets that should be given to each of the three cabinetmakers in order to minimize the total cost of completing both projects.
| Let | O1 = proportion of Oak cabinets assigned to cabinetmaker 1 |
| O2 = proportion of Oak cabinets assigned to cabinetmaker 2 | |
| O3 = proportion of Oak cabinets assigned to cabinetmaker 3 | |
| C1 = proportion of Cherry cabinets assigned to cabinetmaker 1 | |
| C2 = proportion of Cherry cabinets assigned to cabinetmaker 2 | |
| C3 = proportion of Cherry cabinets assigned to cabinetmaker 3 |
A)
| O1 | O2 | O3 | C1 | C2 | C3 | |||
| Min | 1600 | 1892 | 1770 | 1920 | 1849 | 1947 | ||
| 50 | 60 | 40 | ||||||
| 44 | 43 | 25 | ||||||
| 30 | 33 | 30 | ||||||
| 1 | 1 | 1 | = | 1 | ||||
| 1 | 1 | 1 | = | 1 |
B)
Solve the model formulated in part (a). What proportion of the oak cabinets and what proportion of the cherry cabinets should be assigned to each cabinetmaker? What is the total cost of completing both projects? If required, round your answers for the proportions to three decimal places, and for the total cost to two decimal places.
| Cabinetmaker 1 | Cabinetmaker 2 | Cabinetmaker 3 | |
|---|---|---|---|
| Oak | O1 = | O2 = | O3 = |
| Cherry | C1 = | C2 = | C3 = |
Total Cost = $
Please answer part B for me above. Part A is correct, I provided the numbers to help answer part B. Thank you!
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Comprehensive Audits Of Radiotherapy Practices A Tool For Quality Improvement, Quality Assurance Team For Radiation Oncology
Authors: International Atomic Energy Agency
1st Edition
9201037074, 978-9201037077
