In: Statistics and Probability
The following is an Excel Question:
We have three factories (A, B, C) and five distributors (P, Q, R,
S, T) of our products.
The products are shipped by truck from factory to distributor. At
most 180 units of our
products fit a truck. The shipping cost is $1 per unit to load the
truck and $1 per unit to
unload the truck plus the mileage cost. The mileage cost is based
on the mileage the
truck must travel between the factory and the distributor. The
mileage cost of $15 per
mile is independent of the number of units of products in the
truck. The maximum
monthly productions of the factories are: A 4000 units, B 2000
units, and C 1500 units.
The monthly demands by the distributors are: P 1000 units, Q 1600
units, R 1500 units, S
2000 units, and T 1400 units. The mileage chart of the distances
between factories and
distributors is:
Distributors (Mileage Chart) | |||||
Factories | P | Q | R | S | T |
A | 100 | 140 | 200 | 150 | 35 |
B | 50 | 65 | 60 | 70 | 80 |
C | 40 | 150 | 100 | 90 | 130 |
Use Solver to determine the number of units to send each month
from each factory to
each distributor so as to minimize the total shipping costs. Your
worksheet should also
show the number of trucks to send from each factory to each
distributor and total
shipping cost. Note that to find the optimal solution depends
heavily on starting a good
initial solution, so please test your model thoroughly. Show all
formulas used in getting the answer.
The Excel Solver output is:
The Solver Parameters are:
The formulas used are:
The solution is highlighted in yellow colour.
Distributors (Mileage Chart) | ||||||
Factories | P | Q | R | S | T | Supply |
A | 100 | 140 | 200 | 150 | 35 | 4000 |
B | 50 | 65 | 60 | 70 | 80 | 2000 |
C | 40 | 150 | 100 | 90 | 130 | 1500 |
Demand | 1000 | 1600 | 1500 | 2000 | 1400 | |
Distributors (Mileage Chart) | ||||||
Factories | P | Q | R | S | T | Supply |
A | 1000 | 1600 | 0 | 0 | 1400 | 4000 |
B | 0 | 0 | 1500 | 500 | 0 | 2000 |
C | 0 | 0 | 0 | 1500 | 0 | 1500 |
Demand | 1000 | 1600 | 1500 | 2000 | 1400 | |
Total cost | 633000 |