Final answer:
To minimize the delivery cost, Factory F1 should send all 8 of its appliances to Distribution Center 2 at $3 each, and Factory F2 should send 9 appliances to Distribution Center 1 at $3 each and 1 appliance to Distribution Center 2 at $8. The total minimum cost of delivery is $59.
Step-by-step explanation:
The goal is to find the lowest cost of delivering 18 appliances from factories F1 and F2 to the two distribution centers. Since F1 makes 8 appliances and F2 makes 10 per day, both factories together produce exactly the number of appliances required by the distribution centers, 18 in total. The costs for delivery are:
- F1 to Distribution Center 1: $4
- F1 to Distribution Center 2: $3
- F2 to Distribution Center 1: $3
- F2 to Distribution Center 2: $8
To minimize costs, we want to assign as many appliances as possible from the factory with the cheaper delivery costs to each respective distribution center. Therefore, F1 should deliver all 8 of its appliances to Distribution Center 2 at $3 each, and F2 should deliver 9 appliances to Distribution Center 1 at $3 each, having 1 appliance left to deliver to Distribution Center 2 at $8.
Now let's calculate the total cost:
- F1 to Distribution Center 2: 8 appliances × $3 = $24
- F2 to Distribution Center 1: 9 appliances × $3 = $27
- F2 to Distribution Center 2: 1 appliance × $8 = $8
Total cost = $24 + $27 + $8 = $59