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1) Consider a consumer with utility function u=xy (MU),=y, MU y=xand RS ). 1 = 100,...
Consider a consumer with a utility function u(x1, x2) = min{21, 222}. Suppose the prices of...
Consider a consumer with a utility function u(x1, x2) = min{21, 222}. Suppose the prices of good 1 and good 2 are p1 = P2 = 4. The consumer's income is m = 120. (a) Find the consumer's preferred bundle. (b) Draw the consumer's budget line. (c) On the same graph, indicate the consumer's preferred bundle and draw the indifference curve through it. (d) Now suppose that the consumer gets a discount on good 1: each unit beyond the 4th...
Suppose that a consumer’s utility function is U=xy with MUx=y and MUy=x. Suppose the consumer‘s income...
Suppose that a consumer’s utility function is U=xy with MUx=y and MUy=x. Suppose the consumer‘s income is $480. For this question you may need to use the following approximations: sqrt(2) is approximately 1.4, sqrt(3) is approx. 1.7 and sqrt(5) is approx 2.2. a) Initially, the price of y is $4 and the price of x is $6. What is the consumer’s optimal bundle? b) What is the consumer's initial utility? Now suppose that price of x increases to $8 and...
how did they get MRS= -x2/x1? Consider the utility function u ( 2 2) = Inc. +Inc. Suppose that the initial situation...
how
did they get MRS= -x2/x1?
Consider the utility function u ( 2 2) = Inc. +Inc. Suppose that the initial situation s given by Pi = 1, P2 = 2 and m = 100. Note that MU = 1 and MU2 = a) Find the consumer's optimal consumption bundle (0,2) and his utility at this consumption bundle. Solution: The budget line is 2.02 = 100 - 21 (1) Since the optimal bundle is an interior point, the tangency condition...
1. Utility is given by U(x, y) = xy + 10y, with marginal utilities MU, =...
1. Utility is given by U(x, y) = xy + 10y, with marginal utilities MU, = y and MU, = x + 10. The price of r is Px and the price of y is Py. The consumer has income m. (a) Assume first that we have an interior solution. Solve for the demand for r. (b) Suppose now that m= 100. Since x must never be negative, what is the maximum price for good x for which this consumer...
(f) A representative consumer has a utility function U (x, y) = xy. A representative firm...
(f) A representative consumer has a utility function U (x, y) = xy. A representative firm makes good x and has a production function x = f(k, l) = (kl)0.25and an unavoidable fixed cost equal to A. There are 100 consumers and, initially, 100 firms. Prices are w = v = Py = 1 and Px is determined in a competitive market. Representative consumer income is I = 2. In the long run,the number of firms is M (determined endogenously),...
Consider a consumer in a two good economy whose preferences are rep resented by the following utility function U(x...
Consider a consumer in a two good economy whose preferences are rep resented by the following utility function U(x, y) = Vo+y d) Find her expenditure function, E(pr. Py, U). e) Solve her utility maximization problem for when pz = 1TL, Py = 4TL. and, I = 16TL. f) Solve her expenditure minimization problem for when pr = 1TL, Py = 4TL, and, U = 2. g How much do we have to compensate her (in terms of money) to...
Problem 1 Consider a consumer with the utility function U(21,22) = 10x 23 -50. Suppose the...
Problem 1 Consider a consumer with the utility function U(21,22) = 10x 23 -50. Suppose the prices of X1 and 22 are 10 and 2 respectively and the consumer has an income of 150. How did the '50' in the utility function influence the optimal con- sumption bundle? How did the '10' in the utility function influence the optimal consumption bundle? (i.e., how would the optimal bun- dle change if these coefficients were to change?). How would the optimal bundle...
4. Andy's utility is represented by the function U(X,Y) - XY. His marginal utility of X...
4. Andy's utility is represented by the function U(X,Y) - XY. His marginal utility of X is MUx = Y. His marginal utility of Y is MUY = . He has income $12. When the prices are Px - 1 and Py -1, Andy's optimal consumption bundle is X* -6 and Y' = 6. When the prices are Px = 1 and P, = 4, Andy's optimal consumption bundle is X** = 6 and Y* 1.5. Suppose the price of...
(d) A representative consumer has a utility function U (x, y) = xy. A representative firm...
(d) A representative consumer has a utility function U (x, y) = xy. A representative firm makes good x and has a production function x = f(k, l) = (kl)0.25and an unavoidable fixed cost equal to A. There are 100 consumers and, initially, 100 firms. Prices are w = v = Py = 1 and Px is determined in a competitive market. Representative consumer income is I = 2. (d) Solve for the equilibrium price and quantity of good x?
Suppose that a consumer had a utility function given by: U-XY This consumer has a budget...
Suppose that a consumer had a utility function given by: U-XY This consumer has a budget of $48. Fill in the value of this consumer's demand function. X (For instance, if X = 4/Px, then X = 4 * (1/Px) and enter 4) IS
Consider a consumer with a utility function u(x1, x2) = min{21, 222}. Suppose the prices of good 1 and good 2 are p1 = P2 = 4. The consumer's income is m = 120. (a) Find the consumer's preferred bundle. (b) Draw the consumer's budget line. (c) On the same graph, indicate the consumer's preferred bundle and draw the indifference curve through it. (d) Now suppose that the consumer gets a discount on good 1: each unit beyond the 4th...
how
did they get MRS= -x2/x1?
Consider the utility function u ( 2 2) = Inc. +Inc. Suppose that the initial situation s given by Pi = 1, P2 = 2 and m = 100. Note that MU = 1 and MU2 = a) Find the consumer's optimal consumption bundle (0,2) and his utility at this consumption bundle. Solution: The budget line is 2.02 = 100 - 21 (1) Since the optimal bundle is an interior point, the tangency condition...
1. Utility is given by U(x, y) = xy + 10y, with marginal utilities MU, = y and MU, = x + 10. The price of r is Px and the price of y is Py. The consumer has income m. (a) Assume first that we have an interior solution. Solve for the demand for r. (b) Suppose now that m= 100. Since x must never be negative, what is the maximum price for good x for which this consumer...
Consider a consumer in a two good economy whose preferences are rep resented by the following utility function U(x, y) = Vo+y d) Find her expenditure function, E(pr. Py, U). e) Solve her utility maximization problem for when pz = 1TL, Py = 4TL. and, I = 16TL. f) Solve her expenditure minimization problem for when pr = 1TL, Py = 4TL, and, U = 2. g How much do we have to compensate her (in terms of money) to...
Problem 1 Consider a consumer with the utility function U(21,22) = 10x 23 -50. Suppose the prices of X1 and 22 are 10 and 2 respectively and the consumer has an income of 150. How did the '50' in the utility function influence the optimal con- sumption bundle? How did the '10' in the utility function influence the optimal consumption bundle? (i.e., how would the optimal bun- dle change if these coefficients were to change?). How would the optimal bundle...
4. Andy's utility is represented by the function U(X,Y) - XY. His marginal utility of X is MUx = Y. His marginal utility of Y is MUY = . He has income $12. When the prices are Px - 1 and Py -1, Andy's optimal consumption bundle is X* -6 and Y' = 6. When the prices are Px = 1 and P, = 4, Andy's optimal consumption bundle is X** = 6 and Y* 1.5. Suppose the price of...
Suppose that a consumer had a utility function given by: U-XY This consumer has a budget of $48. Fill in the value of this consumer's demand function. X (For instance, if X = 4/Px, then X = 4 * (1/Px) and enter 4) IS
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