35.4 Break-Even Analysis
Overviewβ
Break-even analysis determines the sales volume needed to cover all costs (no profit, no loss). Understanding break-even helps businesses set prices, plan sales, and make decisions about costs and operations.
Break-Even Pointβ
Break-Even Formulaβ
Break-Even (Units) = Fixed Costs Γ· (Selling Price - Variable Cost per Unit)
Break-Even (Sales) = Fixed Costs Γ· Contribution Margin Ratio
Componentsβ
Components:
- Fixed costs: Costs that don't change with volume (rent, salaries)
- Variable costs: Costs that change with volume (materials, commissions)
- Selling price: Price per unit
- Contribution margin: Selling price - Variable cost per unit
Break-Even Calculationβ
Example Calculationβ
Example:
- Fixed costs: β¬30,000/month
- Variable cost per unit: β¬5
- Selling price: β¬10
- Contribution margin: β¬10 - β¬5 = β¬5
Break-Even (Units): β¬30,000 Γ· β¬5 = 6,000 units/month
Break-Even (Sales): 6,000 units Γ β¬10 = β¬60,000/month
Uses of Break-Even Analysisβ
Pricing Decisionsβ
Pricing:
- Understand minimum price needed
- Evaluate price changes
- Assess profitability at different prices
- Make pricing decisions
Cost Managementβ
Cost Management:
- Understand impact of cost changes
- Evaluate cost reduction opportunities
- Assess fixed vs. variable cost structure
- Make cost decisions
Sales Planningβ
Sales Planning:
- Understand sales targets needed
- Plan for profitability
- Assess sales requirements
- Make sales decisions
Margin of Safetyβ
Margin of Safetyβ
Margin of Safety = Actual Sales - Break-Even Sales
Margin of Safety % = (Actual Sales - Break-Even Sales) Γ· Actual Sales
Purpose: Measures how much sales can decline before losses occur
Interpretation:
- Higher: More safety, less risk
- Lower: Less safety, more risk
- Important for risk assessment
Luxembourg Compliance Noteβ
Important Considerations:
- Cost structure: Understand fixed vs. variable costs
- Pricing: Break-even informs pricing decisions
- Planning: Use for business planning
- Decision making: Support business decisions
- PCN costs: Costs must be properly classified (PCN)
Think It Throughβ
Artisan Boulangerie has fixed costs of β¬5,000/month. Each pastry costs β¬1 to make and sells for β¬3. How many pastries must they sell to break even? What is their margin of safety if they sell 3,000 pastries/month?
Concepts in Practiceβ
Break-Even Analysis Example
Artisan Boulangerie break-even:
Costs:
- Fixed costs: β¬5,000/month
- Variable cost per pastry: β¬1
- Selling price: β¬3
- Contribution margin: β¬3 - β¬1 = β¬2
Break-Even:
- Break-even units: β¬5,000 Γ· β¬2 = 2,500 pastries/month
- Break-even sales: 2,500 Γ β¬3 = β¬7,500/month
Actual Performance:
- Actual sales: 3,000 pastries/month = β¬9,000
- Margin of safety: β¬9,000 - β¬7,500 = β¬1,500
- Margin of safety %: β¬1,500 Γ· β¬9,000 = 16.7%
Analysis: Must sell 2,500 pastries to break even. Current sales of 3,000 provide 16.7% margin of safety.