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Published byRobert Hoover Modified over 9 years ago
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Market Demand 市场需求
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Think of an economy containing n consumers, denoted by i = 1, …,n. Consumer i’s ordinary demand function for commodity j is
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When all consumers are price-takers, the market demand function for commodity j is If all consumers are identical then where M = nm.
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The market demand curve is the “horizontal sum” of the individual consumers’ demand curves. Denoted by demand function D=D(P) or inverse demand function P=P(D) p1p1 p1p1 p1p1 2015 35 p1’p1’ p1”p1” p1’p1’ p1”p1” p1’p1’ p1”p1”
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Elasticity measures the “sensitivity” of one variable with respect to another. The elasticity of variable X with respect to variable Y is
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Economists use elasticities to measure the sensitivity of quantity demanded of commodity i with respect to the price of commodity i (own- price elasticity of demand ,需求的自价 格弹性 ) demand for commodity i with respect to the price of commodity j (cross-price elasticity of demand ,需求的交叉价格 弹性 ).
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demand for commodity i with respect to income (income elasticity of demand 需求 的收入弹性 ) quantity supplied of commodity i with respect to the price of commodity i (own- price elasticity of supply 供给的自价格弹 性 )
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Q: Why not use a demand curve’s slope to measure the sensitivity of quantity demanded to a change in a commodity’s own price?
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X1*X1* 550 10 slope = - 2 slope = - 0.2 p1p1 p1p1 In which case is the quantity demanded X 1 * more sensitive to changes to p 1 ? X1*X1*
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550 10 slope = - 2 slope = - 0.2 p1p1 p1p1 X1*X1* X1*X1* In which case is the quantity demanded X 1 * more sensitive to changes to p 1 ?
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550 10 slope = - 2 slope = - 0.2 p1p1 p1p1 10-packsSingle Units X1*X1* X1*X1* In which case is the quantity demanded X 1 * more sensitive to changes to p 1 ?
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550 10 slope = - 2 slope = - 0.2 p1p1 p1p1 10-packsSingle Units X1*X1* X1*X1* In which case is the quantity demanded X 1 * more sensitive to changes to p 1 ? It is the same in both cases.
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Q: Why not just use the slope of a demand curve to measure the sensitivity of quantity demanded to a change in a commodity’s own price? A: Because the value of sensitivity then depends upon the (arbitrary) units of measurement used for quantity demanded.
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is a ratio of percentages and so has no units of measurement. Hence own-price elasticity of demand is a sensitivity measure that is independent of units of measurement.
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Measuring increases in percentage terms keeps the elasticity unit-free 或 Price elasticity of demand
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E.g. Suppose p i = a - bX i. Then X i = (a-p i )/b and
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pipi Xi*Xi* p i = a - bX i * a a/b
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pipi Xi*Xi* p i = a - bX i * a a/b
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pipi Xi*Xi* p i = a - bX i * a a/b
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pipi Xi*Xi* p i = a - bX i * a a/b
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pipi Xi*Xi* a p i = a - bX i * a/b
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pipi Xi*Xi* a p i = a - bX i * a/b a/2 a/2b
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pipi Xi*Xi* a p i = a - bX i * a/b a/2 a/2b
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pipi Xi*Xi* a p i = a - bX i * a/b a/2 a/2b
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pipi Xi*Xi* a p i = a - bX i * a/b a/2 a/2b own-price elastic (有弹性) own-price inelastic (缺乏弹性)
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pipi Xi*Xi* a p i = a - bX i * a/b a/2 a/2b own-price elastic own-price inelastic (own-price unit elastic) 单位弹性
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E.g.Then so
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pipi Xi*Xi* everywhere along the demand curve.
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If raising a commodity’s price causes little decrease in quantity demanded, then sellers’ revenues rise. Hence own-price inelastic ( 缺乏弹性 ) demand causes sellers’ revenues to rise as price rises. If raising a commodity’s price causes a large decrease in quantity demanded, then sellers’ revenues fall. Hence own-price elastic ( 富有弹性 ) demand causes sellers’ revenues to fall as price rises.
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Sellers’ revenue is
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So
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Sellers’ revenue is So
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Sellers’ revenue is So
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so ifthen and a change to price does not alter sellers’ revenue.
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but ifthen and a price increase raises sellers’ revenue.
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And ifthen and a price increase reduces sellers’ revenue.
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In summary: Own-price inelastic demand; price rise causes rise in sellers’ revenue. Own-price unit elastic demand; price rise causes no change in sellers’ revenue. Own-price elastic demand; price rise causes fall in sellers’ revenue.
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A seller’s marginal revenue is the rate at which revenue changes with the number of units sold by the seller.
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p(q) denotes the seller’s inverse demand function; i.e. the price at which the seller can sell q units. Then so
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and so
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says that the rate at which a seller’s revenue changes with the number of units it sells depends on the sensitivity of quantity demanded to price; i.e., upon the of the own-price elasticity of demand.
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Ifthen Ifthen Ifthen
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Selling one more unit raises the seller’s revenue. Selling one more unit reduces the seller’s revenue. Selling one more unit does not change the seller’s revenue. Ifthen Ifthen Ifthen
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An example with linear inverse demand. Then and
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a a/b p qa/2b
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a a/b p qa/2b q $ a/ba/2b R(q)
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Recall that price elasticity of demand is Hence income elasticity of demand is
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Normal good: >0 Inferior good: <0 Luxury good: >1 Necessary good: 0< <1
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From Individual to Market Demand Functions Elasticities Revenue and own-price elasticity of demand Marginal revenue and price elasticity
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消费者对商品 x 和在其它商品上的开支 y (价 格为 1 )的效用函数为 1 )市场上有完全同样的消费者 100 人,写出 x 的市场需求函数。 2 ) x 该如何定价使销售收入最大?此时价格弹 性是多少?
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