The following data are available: variable cost per unit, P8, fixed cost per unit P10, profit P20,000. The above data is based on a production of 20,000 units. How many units are needed to break-even?
Cost-Volume-Profit Analysis
Cost Volume Profit (CVP) analysis is a cost accounting method that analyses the effect of fluctuating cost and volume on the operating profit. Also known as break-even analysis, CVP determines the break-even point for varying volumes of sales and cost structures. This information helps the managers make economic decisions on a short-term basis. CVP analysis is based on many assumptions. Sales price, variable costs, and fixed costs per unit are assumed to be constant. The analysis also assumes that all units produced are sold and costs get impacted due to changes in activities. All costs incurred by the company like administrative, manufacturing, and selling costs are identified as either fixed or variable.
Marginal Costing
Marginal cost is defined as the change in the total cost which takes place when one additional unit of a product is manufactured. The marginal cost is influenced only by the variations which generally occur in the variable costs because the fixed costs remain the same irrespective of the output produced. The concept of marginal cost is used for product pricing when the customers want the lowest possible price for a certain number of orders. There is no accounting entry for marginal cost and it is only used by the management for taking effective decisions.
The following data are available: variable cost per unit, P8, fixed cost per unit P10, profit P20,000. The above data is based on a production of 20,000 units. How many units are needed to break-even?
The company creates products using P20 worth of direct materials per unit. The total fixed cost is P150,000. The units are always sold at P25 per unit. In the next year, the total fixed costs were increased to P200,000 when the company acquired another warehouse How many additional units must be sold to break even compared to the previous break-even point?
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