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Edgeworth Box Analysis: Two Consumers Lecture 25 November 19 2002 Slides adapted from slide set for Microeconomics by Pindyck and Rubinfeld, Prentice Hall, 1998.
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The Edgeworth Box Analysis Francis Edgeworth developed this method of analysis in the last portion of the 19th century. Provides a powerful way of graphically studying exchange and the role of markets. Understanding the Edgeworth Box is critical to understanding exchange and markets.
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To Form and Edgeworth Box Rotate one of the graphs onto the other one until it forms a box.
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x2x2 y2y2 x1x1 y1y1 Bill Jane Here the axes for Jane have been rotated
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x2x2 y2y2 x1x1 y1y1 Move axes for Jane to close box Bill Jane
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Total Fixed Supply of y Total Fixed Supply of x A Bill Jane
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Consider two consumers and two products x1x1 y1y1 0 x1x1 y1y1 0 BillJane
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The Edgeworth Box x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 0 x1x1 y1y1 0
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x1x1 y1y1 y2y2 x2x2 Bill Jane I 2 II 12 III 12 III 1 II 1 I 1 A C Trading area?
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 2 II 12 III 12 III 1 II 1 I 1 A C What about A here?
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 2 II 12 III 12 III 1 II 1 I 1 A B C PARETO OPTIMAL
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Pareto Optimal When no change can make one better off without making the other worse off.
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 IV 1 IV 2 III 2 II 2 I 2 A B C E E’ E” Contract line
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Contract Line Is the locus of Pareto optimal points
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 IV 1 IV 2 III 2 II 2 I 2 A B C E E’ E”
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 III 2 II 2 I 2 A B C E E’ E” y’ 2 y” 2 y’ 1 y” 1 x’ 2 x” 2 x’ 1 x” 1 Pareto improving-- from A or B to E or E”
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 III 2 II 2 I 2 A B C E E’ E”
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Understanding the Picture Any point in the Edgeworth box indicates a particular distribution of the two goods among the two individuals, e.g., Bill and Jane. Each individual has an indifference curve going through that point. If the distribution is Pareto optimal, those two indifference curves are tangent at that point.
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Prices that are consistent with the Pareto optimal point At that tangency of the two indifference curves, the slope of the tangency line--the straight line drawn through the point of tangency--represents the relative prices for the two goods. Hence, there are relative prices that will be consistent with the Pareto optimum.
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 III 2 II 2 I 2 A B C E E’ E” Price or budget line
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Tangent line is really a budget line for both individuals If one extends the tangent line to each axis, we now have a budget line. For example, the budget line for Jane is I Jane = P x x jane + P y y Jane where I is the income Jane could get from selling the X and Y she holds at the Pareto optimum point.
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x y Jane C E Price or budget line I jane /P x I jane /P y I Jane = P x x jane + P y y Jane Budget Line for Jane
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Marginal Rate of Substitution MRS xy = the number of units of y one is willing to give up per unit of x and stay on same indifference curve. Slope of indifference curve gives the marginal rate of substitution.
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x y Jane D Price or budget line I jane /P x I jane /P y Marginal Rate of Substitution Slope of indifference curve gives the marginal rate of substitution
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MARGINAL RATE OF SUBSTITUTION
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At point D Slope of indifference curve equals the slope of the budget line or MRS xy = -P x / P y
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NOW RETURN TO EDGEWORTH BOX ANALYSIS At point E’, the indifference curve for Jane is just tangent to the indifference curve for Bill, and the price line is the tangency line at E. In other words, Slope(Indifference curve for Jane) = Slope(Indifference curve for Bill) = Slope of price line
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The prices (ratio of prices) can produce the optimum
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The Edgeworth Box x1x1 y1y1 y2y2 x2x2 Bill Jane I 1 II 1 III 1 III 2 II 2 I 2 A B C E E’ E” Price or budget line
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