a) Which of $M or $N is the compensating variation, and which is an equivalent variation? Explain your answer conceptually. a) $M is the compensating variation, and $N is the equivalent variation. The compensating variation represents the amount of additional income (reduction in cost of living) that would compensate Jeanine for the move to Seattle, while keeping her at the same level of utility. In other words, $M represents the amount of money she would need to maintain the same level of satisfaction after the move. On the other hand, the equivalent variation represents the amount of additional income (increase in salary) that would make Jeanine indifferent between staying in Bozeman and moving to Seattle. In this case, $N represents the additional income she would need to be equally satisfied with the move. b) Which of $M or $N must be the largest in magnitude? Explain the intuition for why this must be the case. b) $M must be the largest in magnitude. The reason for this is that the cost of living in Seattle is higher than in Bozeman. Jeanine already finds Bozeman and Seattle equally attractive places to live, except for the difference in cost of living. Therefore, to compensate for the higher cost of living in Seattle, the reduction in pay ($M) would need to be greater in magnitude than the additional income ($N) required to make her equally satisfied with the move. c) Solve for the values of M and N, showing your work. c) To solve for the values of M and N, we need to equate the utility levels in both locations. In Bozeman: U(x, y) = (x^(1/2) + y^(1/2))^2 In Seattle: U(x, y) = (x^(1/2) + y^(1/2))^2 We can set these two equations equal to each other and solve for M and N. Solving these equations will give us the values of M and N. d) What is Jeanine's change in consumer surplus associated with her consumption of y when the price increases from 1 to 2?

Question

a) Which of $M or $N is the compensating variation, and which is an equivalent variation? Explain your answer conceptually.   a) $M is the compensating variation, and $N is the equivalent variation. The compensating variation represents the amount of additional income (reduction in cost of living) that would compensate Jeanine for the move to Seattle, while keeping her at the same level of utility. In other words, $M represents the amount of money she would need to maintain the same level of satisfaction after the move. On the other hand, the equivalent variation represents the amount of additional income (increase in salary) that would make Jeanine indifferent between staying in Bozeman and moving to Seattle. In this case, $N represents the additional income she would need to be equally satisfied with the move.    b) Which of $M or $N must be the largest in magnitude? Explain the intuition for why this must be the case.   b) $M must be the largest in magnitude. The reason for this is that the cost of living in Seattle is higher than in Bozeman. Jeanine already finds Bozeman and Seattle equally attractive places to live, except for the difference in cost of living. Therefore, to compensate for the higher cost of living in Seattle, the reduction in pay ($M) would need to be greater in magnitude than the additional income ($N) required to make her equally satisfied with the move.    c) Solve for the values of M and N, showing your work.   c) To solve for the values of M and N, we need to equate the utility levels in both locations. In Bozeman: U(x, y) = (x^(1/2) + y^(1/2))^2 In Seattle: U(x, y) = (x^(1/2) + y^(1/2))^2 We can set these two equations equal to each other and solve for M and N. Solving these equations will give us the values of M and N.    d) What is Jeanine's change in consumer surplus associated with her consumption of y when the price increases from 1 to 2?

Golda · Answer

Stay tuned for the detailed explanation of Jeanine's economic dilemma.

The Economics of Relocating: Jeanine's Dilemma

a) Which of $M or $N is the compensating variation, and which is an equivalent variation? Explain your answer conceptually.

b) Which of $M or $N must be the largest in magnitude? Explain the intuition for why this must be the case.

c) Solve for the values of M and N, showing your work.

d) What is Jeanine's change in consumer surplus associated with her consumption of y when the price increases from 1 to 2?

The Economics of Jeanine's Relocation Decision

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