This exercise brings together several parts of the course: it may help to revise the sections...
This exercise brings together several parts of the course: it may help to revise the sections on consumer choice, demand, cost minimization and cost functions. Problem: The market for good X consists of 6400 consumers and one producer (a monopolist). The consumers are all identical and have preferences over X and Y (standing for all other goods) given by ?(?, ?) = √? + ? The associated marginal utilities are ??? = 1 2√? and ??? = 1. The price of Y is $1 per unit, and each consumer has an income of $10. Hint: You can assume that this consumer choice problem has an interior solution for any price that is relevant to this market. The monopolist can produce X using the production function ?(?,?) = min{?, 2?}. The cost of labor (L) is w=1 and the cost of capital (K) is r=2. Find the optimal price and quantity sold for the monopolist in the market for good X. Hints: you will need to go through the following steps: 1) find the individual demand for good X by each consumer, 2) find market demand for good X, 3) solve the producers cost minimization problem (with Q (quantity of X) as a variable), 4) use this solution to find the cost function, 5) using the cost and market demand functions you have found, derive the optimal monopoly price and quantity. You may need to take several derivatives along the way. Here are some rules to help: 1. ? ?? ?√? = ? 2√? , where a is a constant. 2. ? ?? ?? = ?, where b is a constant.
Homework Answers
Add Answer to:
This exercise brings together several parts of the course: it
may help to revise the sections...
Exercise 4 Let us consider a monopolist with cost unction function C = 12000 + 30q...
Exercise 4 Let us consider a monopolist with cost unction function C = 12000 + 30q that serves 1000 consumers with individual demand functions q = 60 - p. - Compute the quantity Q the monopolist decide to produce, the price pQm), and the total profits. -If the monopolist has complete information about each consumer determine the the quantity that she decide to produce in order to maximize profits? Compute the profits. -Let assume that 500 new consumers enter in...
PROBLEM II. In a market of a certain good, there is a monopolist who has a...
PROBLEM II. In a market of a certain good, there is a monopolist who has a constant marginal cost c = 8. There are two consumers (i = 1,2) in this market, and their dennand functions are given by p 20-4q for consumer 1 and p 25-5q for consumer 2. Suppose that the monopolist is trying to design an optimal two-part tariff Q4. If the monopolist maximizes its profit while it wants to attract both consumers, what fixed fee does...
question #6 P2 = $1 for each Gala. Find her optimal demand and show it on...
question #6
P2 = $1 for each Gala. Find her optimal demand and show it on the graph. (e) Describe Kate's optimal choice(s) when p $1. Consumer Demand For each of the following utility functions, write down a transformation that would turn it into a Cobb-Douglas utility function of the form U(, )"ys where a B-1. (a) U(x, y) γχαν'-a where γ is a constant. (b) U(, y)-y 6. For each of the following utility functions, write down 2 monotonic...
please help solve. Is this also 3rd degree price discrimination? A price-discriminating monopolist faces the following...
please help solve. Is this also
3rd degree price discrimination?
A price-discriminating monopolist faces the following inverse demand functions: In Market One it is P1- 80-Q1 and in Market Two it is P2 60-Q2 Marginal cost is constant at $10. Consumers in market two can resell the good to consumers in market one at a cost of $4 per unit. Find the profit-maximizing quantity and price charged in each market subject to the resale constraint.
20y25 Consider a product that has a cost function c(y) (А-р) Demand for this product is...
20y25 Consider a product that has a cost function c(y) (А-р) Demand for this product is represented by the demand curve: y (NOTE: this the demand curve, not the inverse demand curve) 1) Write the profit maximization problem for a monopolist 2) Use the envelope theorem to determine whether the monopolist's profits will increase or decrease with b. C 3)What is the elasticity of demand (in terms of p)? What restriction must be on the elasticity of demand for a...
In a market of a certain good, there is a monopolist who has a constant marginal...
In a market of a certain good, there is a monopolist who has a constant marginal cost c = 8. There are two consumers (i = 1, 2) in this market, and their demand functions are given by p = 20 − 4q for consumer 1 and p = 25 − 5q for consumer 2. Suppose that the monopolist is trying to design an optimal two-part tariff. A. If the monopolist maximizes its profit while it wants to attract both...
1. Consumer’s utility function is: U (X,Y) = 10X + Y. Consumer’s income M is 40...
1. Consumer’s utility function is: U (X,Y) = 10X + Y. Consumer’s income M is 40 euros, the price per unit of good X (i.e. Px ) is 5 euros and the price per unit of good Y (i.e. Py) is 1 euro. a) What is the marginal utility of good X (MUx) for the consumer? ( Answer: MUx = 10) b) What is the marginal utility of good Y (MUy) for the consumer? ( Answer: MUy = 1) c)...
Suppose that there two goods X and Y, available in arbitrary non- negative quantities (so the...
Suppose that there two goods X and Y, available in arbitrary non- negative quantities (so the the consumption set is R2). The consumer has preferences over consumption bundles that are strongly monotone, strictly convex, and represented by the following (differentiable) utility function: u(x, y)-y+2aVT, where z is the quantity of good X, and y is the quantity of good Y, and a 20 is a utility parameter The consumer has strictly positive wealth w > 0. The price of good...
3. Assume that a monopolist produces a good at constant marginal cost MC(q) = 1. Demand...
3. Assume that a monopolist produces a good at constant marginal cost MC(q) = 1. Demand is given by pºq) = 10 - 2q. There are no other pre-existing distortions in the market. (a) What is the privately optimal quantity and price chosen by the monopolist? For parts (b) and (c), assume that a tax of $t is imposed on every unit of output produced by the monopolist. (b) Derive the optimal quantity and price chosen by the monopolist as...
A consumer has the following preferences u(11, 12) = log (11) + 12 Suppose the price...
A consumer has the following preferences u(11, 12) = log (11) + 12 Suppose the price of good 1 is pı and the price of good 2 is P2. The consumer has income m. (a) Find the optimal choices for the utility maximization problem in terms of P1, P2 and m. Denote the Lagrange multiplier by 1. (b) How do the optimal choices change as m increases? What does the income offer curve (also called the income expansion path) look...
Exercise 4 Let us consider a monopolist with cost unction function C = 12000 + 30q that serves 1000 consumers with individual demand functions q = 60 - p. - Compute the quantity Q the monopolist decide to produce, the price pQm), and the total profits. -If the monopolist has complete information about each consumer determine the the quantity that she decide to produce in order to maximize profits? Compute the profits. -Let assume that 500 new consumers enter in...
PROBLEM II. In a market of a certain good, there is a monopolist who has a constant marginal cost c = 8. There are two consumers (i = 1,2) in this market, and their dennand functions are given by p 20-4q for consumer 1 and p 25-5q for consumer 2. Suppose that the monopolist is trying to design an optimal two-part tariff Q4. If the monopolist maximizes its profit while it wants to attract both consumers, what fixed fee does...
question #6
P2 = $1 for each Gala. Find her optimal demand and show it on the graph. (e) Describe Kate's optimal choice(s) when p $1. Consumer Demand For each of the following utility functions, write down a transformation that would turn it into a Cobb-Douglas utility function of the form U(, )"ys where a B-1. (a) U(x, y) γχαν'-a where γ is a constant. (b) U(, y)-y 6. For each of the following utility functions, write down 2 monotonic...
please help solve. Is this also
3rd degree price discrimination?
A price-discriminating monopolist faces the following inverse demand functions: In Market One it is P1- 80-Q1 and in Market Two it is P2 60-Q2 Marginal cost is constant at $10. Consumers in market two can resell the good to consumers in market one at a cost of $4 per unit. Find the profit-maximizing quantity and price charged in each market subject to the resale constraint.
20y25 Consider a product that has a cost function c(y) (А-р) Demand for this product is represented by the demand curve: y (NOTE: this the demand curve, not the inverse demand curve) 1) Write the profit maximization problem for a monopolist 2) Use the envelope theorem to determine whether the monopolist's profits will increase or decrease with b. C 3)What is the elasticity of demand (in terms of p)? What restriction must be on the elasticity of demand for a...
Suppose that there two goods X and Y, available in arbitrary non- negative quantities (so the the consumption set is R2). The consumer has preferences over consumption bundles that are strongly monotone, strictly convex, and represented by the following (differentiable) utility function: u(x, y)-y+2aVT, where z is the quantity of good X, and y is the quantity of good Y, and a 20 is a utility parameter The consumer has strictly positive wealth w > 0. The price of good...
3. Assume that a monopolist produces a good at constant marginal cost MC(q) = 1. Demand is given by pºq) = 10 - 2q. There are no other pre-existing distortions in the market. (a) What is the privately optimal quantity and price chosen by the monopolist? For parts (b) and (c), assume that a tax of $t is imposed on every unit of output produced by the monopolist. (b) Derive the optimal quantity and price chosen by the monopolist as...
A consumer has the following preferences u(11, 12) = log (11) + 12 Suppose the price of good 1 is pı and the price of good 2 is P2. The consumer has income m. (a) Find the optimal choices for the utility maximization problem in terms of P1, P2 and m. Denote the Lagrange multiplier by 1. (b) How do the optimal choices change as m increases? What does the income offer curve (also called the income expansion path) look...
Most questions answered within 3 hours.
-
How
would I know whether a given amino acid has an ionizable group or
not? please...
asked 4 minutes ago -
True or false?
True False The function of the enzyme acyl CoA
synthetase is the ATP-dependent coupling...
asked 4 minutes ago -
Nadia Corporation adjusts its debt so that its interest coverage
(EBIT/Interest) remains constant at 3. Nadia’s...
asked 6 minutes ago -
In a clinical trial, 20 out of 600 patients taking a
prescription drug complained of flulike...
asked 12 minutes ago -
7. How many types of nuclear processes can produce energy? 8.
How many types of radioactive...
asked 16 minutes ago -
For both the Sn2 and Sn1 reaction
conditions:
Structure | Rxn (Y/N) at room T° Rxn...
asked 17 minutes ago -
11. In cell N2, enter a formula using the IF function and a
structured reference to...
asked 16 minutes ago -
There is X-linked mutations in flies in this example. You need
to determine the inheritence pattern...
asked 18 minutes ago -
1) There is a 5.0 μC charge at each of 3 corners of a square
(each...
asked 29 minutes ago -
A study of 420,095 cell phone users found that
134 of them developed cancer of the...
asked 33 minutes ago -
2.50 g of NH4Cl is added to 12.9 g of water. Calculate the
molality of the...
asked 36 minutes ago -
Part 1
(a) Calculate the pH at 25°C of a 0.10 M solution of a
weak...
asked 37 minutes ago