Answer:
165 oversize rackets = 32 machine hours (79.71% of total production)
42 standard size rackets = 7 machine hours (20.29% of total production)
total profit contribution = (165 x $15) + (42 x $10) = $2,895
Step-by-step explanation:
materials machine hours profit
standard size 0.125 kg 1/6 $10
oversize 0.4 kg 1/5 $15
constraints 80 kilograms of materials
40 hours of manufacturing
profit per machine hour:
standard size $10 x 6 = $60 x 40 hours = $2,400 (total possible production = 240 rackets)
oversize $15 x 5 = $75 x 40 hours = $3,000 (total possible production = 200 rackets)
profit per kilogram of alloy:
standard size $10 / 0.125 = $80 x 80 kgs = $6,400 (total possible production = 480 rackets)
oversize $15 / .4 = $37.50 x 80 hours = $3,000 (total possible production = 200 rackets)
since the most important constraint is the manufacturing hours available, the company should try to produce the products that yield the highest contribution margin per machine hour. In this case, at least 20% of total production must be standard size rackets, so the remaining 80% should be oversize rackets that yield a higher profit.
165 oversize rackets = 32 machine hours (79.71% of total production)
42 standard size rackets = 7 machine hours (20.29% of total production)
total manufacturing time = 40 hours
if we produce 166 oversize rackets and 41 standard size rackets, total manufacturing time will exceed 40 hours (40.03 hours exactly).