The following table depicts the budgeted sales volume and per unit costs and profits for an English manufacturer (Toys Ltd.) of two different children’s toys, both of which are produced in the same factory: Calculate the contribution per unit and total contribution for each of the two products. Since product B is unprofitable, calculate its break-even outpute. sales quantity. Should management discontinue its production? Explain and justify your answer.
Question 2 – A multi-product company
The following table depicts the budgeted sales volume and per unit costs and profits for an English manufacturer (Toys Ltd.) of two different children’s toys, both of which are produced in the same factory:
- Calculate the contribution per unit and total contribution for each of the two products. Since product B is unprofitable, calculate its break-even outpute. sales quantity. Should management discontinue its production? Explain and justify your answer.
contribution per unit
A: 40-12-12-5 = 11
B: 39-6-20-4 = 9
total contribution
A: 11*2500 = 27 500
B: 9*3000 = 27 000
break-even output (B)
FC=10*3 000 = 30 000
BEP= 30 000/9 = 3 333,33 units
The BEP is below the budgeted sales volume, but they should still keep producing, because they have prositive contribution. The contribution is at 9 and the FC is at 10 so they almost cover all fixed cost. If they stop producing they would face even higher losses.
(b) Consider Toys Ltd. again. Assume that the production manager is considering a new packaging machine. For a total investment of £10,000, Fixed Overhead Cost can be reduced by £5,000 and the per unit cost of material and labor can both be reduced by 10%, for both products. Calculate the impact of such a scheme on total profits. Should they accept or reject this new scheme?
Investment= 10 000
FC = reduced by 5000 =
Reduce material A= 10.8 B= 5.4
And labour A =10.8 B= 18
Total Profit with investment of 10 000: A(2500*(40-10.8-10.8-5) – 2 500*6) + B(3000*(39-5.4-18-4) – 3000*10) -10 000+5000 = A(3 3500-15 000) + B(34 800-30 000) -5000 = £18 300
Original total Profit: A(2 500*5) + B(3000*-1) = £9500
They increase their profits by £9300 if they make the investment, thus make the investment fot the new packaging machine.
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