Suppose that there are two goods (X and Y). The price of X is $2 per unitu, and the price of Y is $1 per unit. There are two consumers ( A and B). The utility functions for the consumers are: for consumer A: U (X,Y)= X^.5Y^.5 and for consumer B: U(X,Y)=X^.8Y^.2

Consumer A has an income of $100, and Consumer B has an income of $300.

1. Derive the marginal utlities of goods X and Y for consumer A

2. Derive the marginal utilities of goods X and Y for consumer B

3. Set consumer A's MRS equal to the price ratio. Then use the budget constraint to solve for her optimal bundle

4. Set consumer B's MRS equal to the price ratio. Then use the budget contraint to solve for his optimal consumption bundle.

5. Calculate the MRS for each consumer at their optimal consumption bundles.

6. Suppose that there is another conusmer (let's call her C). You don't know anything about her utility function or her income. All you know is that she consumes both goods. What do you know about C's MRS at her optimal consumption bundle? Why?

1. Caty consumes only goods X and Y . Her utility function is: U(X; Y ) = min{X; Y}. We

are given that PX = 3; PY = 6, and Caty's income is 18.

Calculate Caty's optimal consumption bundle, (X, Y). (Hint: Since Caty's indif-

ference curves are not smooth and \curvy", we cannot use MRS = MRT to solve

for the optimal bundle. Draw a diagram to see where Caty's optimal bundle must be

on her IC. How do you characterize this bundle mathematically?)

2. John consumes only goods X and Y . His utility function is: U(X, Y ) = X + 2Y . We are

given that PX = 3; PY = 3, and John's income is 30.

(a) Calculate the slopes of John's budget constraint and his indierence curves, as viewed

with Y as the vertical axis and X as the horizontal axis

(b) Calculate John's optimal consumption bundle, (X, Y). (Hint: Since John's indif-

ference curves are not smooth and \curvy", we cannot use MRS = MRT to solve for

the optimal bundle. Draw a diagram to see where the John's optimal bundle must

be on his IC. How do you characterize this bundle mathematically?)

Hi, my question is about Pareto optimal.

There are 2 consumers and 2 commodities. Consumer A's initial endowment is 4 units of good x and 1 unit of y, and the utility function is U=x*y. Consumer B's initial endowment is 0 unit of x and 7 units of B, and the utility function is U=min{x,y}.

Question: 1) show the locus of Pareto optimal allocations.

2) let good x be the numeraire (price=1) and p denote the price of goody. Write the expression for the amount of goody that consumer B will demand at these prices.

Please show all work and thank you in advance for your help!

Suppose that Claudia has a utility funciton for two goods X and Y, is U(X,Y) = 10X + 10Y. If the Price of X is $2 per unit and the Price of Y is $5 per unit, what is Claudia's optimal bundle of goods? What is her utility at this optimal level? If the Price of X is $4 per unit and the Price of Y is $3 per unit, what is Claudia's optimal bundle of goods? What is her utility at this optimal level? Total Income is Unknown