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The marginal revenue curve is affected by the same factors as the demand curve – changes in income, changes in the prices of complements and substitutes, changes in populations, etc. [15] These factors can cause the MR curve to shift and rotate. [16] Marginal revenue curve differs under perfect competition and imperfect competition (monopoly ...
The Laffer curve assumes that no tax revenue is raised at the extreme tax rates of 0% and 100%, meaning that there is a tax rate between 0% and 100% that maximizes government tax revenue. [a] [1] [2] The shape of the curve is a function of taxable income elasticity—i.e., taxable income changes in
Maximum total revenue is achieved where the elasticity of demand is 1. The above movements along the demand curve result from changes in supply: When demand is inelastic, an increase in supply will lead to a decrease in total revenue while a decrease in supply will lead to an increase in total revenue.
The company maximises its profits and produces a quantity where the company's marginal revenue (MR) is equal to its marginal cost (MC). The company is able to collect a price based on the average revenue (AR) curve. The difference between the company's average revenue and average cost, multiplied by the quantity sold (Qs), gives the total profit.
Total revenue, the product price times the quantity of the product demanded, can be represented at an initial point by a rectangle with corners at the following four points on the demand graph: price (P 1), quantity demanded (Q 1), point A on the demand curve, and the origin (the intersection of the price axis and the quantity axis).
Given a demand curve, a company's total revenue is equal to the product of the demand curve and quantity supplied. The marginal revenue curve can then be calculated as the derivative of the total revenue curve with respect to the quantity produced. [17] This provides the additional revenue of each unit sold.
The marginal revenue function has twice the slope of the inverse demand function. [9] The marginal revenue function is below the inverse demand function at every positive quantity. [10] The inverse demand function can be used to derive the total and marginal revenue functions. Total revenue equals price, P, times quantity, Q, or TR = P×Q.
The Laffer curve theorises that, even for price-inelastic goods (such as addictive necessary items), there will be a tax revenue maximising point, beyond which total tax revenue will fall as taxes increase. [9] This may be due to: A cost limit on what can actually be afforded; The existence of expensive substitutes (which become less expensive)