Part A:
Question 1. A firm has a production function given by Q = L1/2 K, where L is labour and K is capital. Draw and appropriately label at least three points on each of the isoquants for Q=10 and Q=20. For one of these isoquants prove that MRTS decreases as L increases.
Question 2. A firm initially has a production function given by Q=L1/2K1/2. Over time the production function changes to Q=LK. Show that this change in the production function represents technological progress.
Question 3. A firm uses capital, K, and labour, L. to produce output, Q, according to a Cobb-Douglas production function. An increase in the price of capital will lead the firm to produce using a smaller capital-labour ratio and at a higher total cost if the firm chooses to produce the same level of output" Explain and illustrate whether this statement is true, false or uncertain.
Question 4. A firm has a production function given by Q=Min{L ; K} and produces an output level of 10 units. Draw and appropriately label the firm's conditional demand for labour given the output level of 10 units.
Question 5. Agatha produces mystery novels, N, using labour, L, and capital. K. according to the production function N = LK.112. In the short run, Agatha uses one unit of capital equipment at a cost of $2,000. The next best use of Agatha's time is a job where she could earn $40 per hour. Write Agatha's short run production function, her labour demand function and derive her short-run total cost function.
Part B:
Question 1. A perfectly competitive firm has a production function given by q=2OLK1/2, where q is output, L is labour and K is capital.
a) Derive the conditional input demand functions of the firm.
b) Derive the long-run total cost function for the firm. What is the cost of producing 1000 units of output when the price of labour is $25 and the price of capital is $64 per unit?
c) In the short-run, the firm uses 625 units of capital. Derive the firm's short-run demand lbr labour and its short-run total cost function. Given a product price of P, derive the short-run supply function of the firm.
Question 2. The long-run cost function of a firm in a perfectly competitive market is given by C(q)=600q-20q2+.3q3. where q is firm output. Market demand is given by QD = 100.000-1OP, where Q is market output and P is price.
a) Solve for the long-run equilibrium values of price, output per finn, the number of firms and market output.
b) Suppose that market demand increases by 20,000 units at each price. Solve for the new equilibrium values of price, output, output per finn and number of firms in the long-run equilibrium.
c) If the price of labour that is used in this industry were to increase when product demand increases in part b) what would the shape of the long run industry supply curve be? Briefly explain your reasoning.
Question 3. Consider a duopoly that faces a market demand given by P = 1000-10Q, where P is product price and Q is market output. The two firms in the market have cost structures as follows: firm 1 has costs given by C1 = 100 q1. while finn two has costs given by C2 = 200q2, where subscripts indicate the respective firms. The output in the market is equal to the sum of the firm outputs.
a) Solve for the Coumot equilibrium values of price, market output and lino outputs.
b) Suppose firm 1 chooses its output level first and firm 2 follows. Solve for the Stackelberg equilibrium values of price, market output and firm outputs.
c) Now suppose that firm 1 buys firm 2 and acts as a monopolist in the market. The new firrn decides to produce using only the plant of firm 1. Solve for the equilibrium values of price and output. Compare the monopoly output to the market outputs in part a) and part b) on a diagram of the market demand curve.
Question 4. The market for toasters is perfectly competitive and characterized by a demand function of the form QD=300-4P and a supply function of the form Qs= 100 + P.
a) Determine the equilibrium values of price and quantity in the market and calculate the elasticities of demand and supply at the equilibrium.
b) The government decides to levy a tax on toasters at the rate of 20%. Calculate the new equilibrium prices and output level and explain how the burden of the tax is shared between producers and consumers. Relate this division of the burden to the elasticities calculated in part a).
c) Now suppose that the supply curve is perfectly inelastic. How does this change how the burden of the tax is shared? Explain using a diagram.
Question 5. Consider the payoff matrix below which shows two players each with three strategies.
Player 2 |
Player 2
|
|
A2 |
B2 |
C2 |
A1 |
25, 16
|
18, 24
|
20, 18
|
B1 |
24,25
|
17,28
|
18,23
|
C1 |
26.22
|
16.21
|
16, 19
|
a) Find all Nash equilibria in pure strategies for this simultaneous choice, one-play game. Explain your reasoning.
b) Draw the game in extended form where player 2 chooses first and player I follows. What is the outcome of this game? Explain your reasoning.
c) Can player I bribe or threaten player 2 to get an outcome that player I prefers? Explain your reasoning.