In: Accounting
Northwood Company manufactures basketballs. The company has a ball that sells for $25. At present, the ball is manufactured in a small plant that relies heavily on direct labor workers. Thus, variable expenses are high, totaling $15.00 per ball, of which 60% is direct labor cost.
Last year, the company sold 62,000 of these balls, with the following results:
Sales (62,000 balls) | $ | 1,550,000 |
Variable expenses | 930,000 | |
Contribution margin | 620,000 | |
Fixed expenses | 426,000 | |
Net operating income | $ | 194,000 |
1. Compute (a) last year's CM ratio and the break-even point in balls, and (b) the degree of operating leverage at last year’s sales level. (Round "Unit sales to break even" to the nearest whole unit and other answers to 2 decimal places.)
CM Ratio | % | |
Unit sales to break even | balls | |
Degree of operating leverage |
2. Due to an increase in labor rates, the company estimates that next year's variable expenses will increase by $3.00 per ball. If this change takes place and the selling price per ball remains constant at $25.00, what will be next year's CM ratio and the break-even point in balls? (Round "CM Ratio" to 2 decimal places and "Unit sales to break even" to the nearest whole unit.)
CM Ratio | % | |
Unit sales to break even | balls |
3. Refer to the data in Required (2). If the expected change in variable expenses takes place, how many balls will have to be sold next year to earn the same net operating income, $194,000, as last year? (Round your answer to the nearest whole unit.)
Number of balls = |
4. Refer again to the data in Required (2). The president feels that the company must raise the selling price of its basketballs. If Northwood Company wants to maintain the same CM ratio as last year (as computed in requirement 1a), what selling price per ball must it charge next year to cover the increased labor costs? (Round your answer to 2 decimal places.)
Selling price =
5. Refer to the original data. The company is discussing the construction of a new, automated manufacturing plant. The new plant would slash variable expenses per ball by 40.00%, but it would cause fixed expenses per year to double. If the new plant is built, what would be the company’s new CM ratio and new break-even point in balls? (Round "CM Ratio" to 2 decimal places and "Unit sales to break even" to the nearest whole unit.)
CM Ratio | % | |
Unit sales to break even | balls |
6A. If the new plant is built, how many balls will have to be sold next year to earn the same net operating income, $194,000, as last year? (Round your answer to the nearest whole unit.)
Number of balls =
6B. Assume the new plant is built and that next year the company manufactures and sells 62,000 balls (the same number as sold last year). Prepare a contribution format income statement and Compute the degree of operating leverage. (Round "Degree of operating leverage" to 2 decimal places.)
Northwood Company | |
Contribution Income Statement | |
Degree of operating leverage |
Solution 1:
Contribution margin ratio = Contribution margin / sales = $620,000 / $1,550,000 = 40%
Contribution margin per unit = $25 - $15 = $10 per unit
Breakeven sales units = Fixed cost / contribution margin per unit = $426,000 / 10 = 42600 units
Degree of operating leverage = Contribution margin / Net operating income = $620,000 / $194,000 = 3.20
Solution 2:
New variable cost per unit = $15 + $3 = $18 per ball
new contribution margin per unit = $25 - $18 = $7 per unit
New contribution margin ratio = $7 / $25 =28%
New breakeven point in balls = $426,000 / $7 = 60857 units
Solution 3:
Nos of balls to be sold to earn target income = (Fixed cost + Target profit) / contribution margin per unit
= ($426,000 + $194,000) / $7 = 88571 units
Solution 4:
Variable cost per unit = $18 per unit
Required contribution margin ratio = 40%
required variable cost ratio = 60%
New selling price per unit = $18 / 60% = $30 per unit
Solution 5:
New variable cost per unit = $15 * 60% = $9 per unit
New contribution margin per unit = 25- $9 = $16 per unit
New fixed costs = $426,000*2 = $852,000
New CM ratio = $16/$25 = 64%
New break even point = $852,000/ $16 = 53250 units
Solution 6a:
Nos of balls to be sold to earn target income = (Fixed cost + Target profit) / contribution margin per unit
= ($852,000 + $194,000) / $16 = 65375 units
Solution 6b:
Northwood Company | |
Contribution margin income statement | |
Particulars | Amount |
Sales (62000*$25) | $1,550,000.00 |
Variable cost (62000*$9) | $558,000.00 |
Contribution margin | $992,000.00 |
Fixed expenses | $852,000.00 |
Net Operating income | $140,000.00 |
Degree of operating leverage (Contribution / Net Operating income) | 7.1 |