ECON6001/6701: Final exam S1 2021
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ECON6001/6701: Final exam S1 2021
1 Short Questions (50 points)
Group Q1 (3 points)
1. Consider the following tree.
How many strategies does player 1 have?
2. How many strategies does player 2 have?
3. Consider the following tree.
How many strategies does player 1 have?
4. How many strategies does player 2 have?
Group Q2 (5 points)
1. Consider the following tree.
What is SPNE of this game? You have to provide strategy for each player. The answer without the properly formulated strategy will give you 0 points.
2. Consider the following tree.
What is SPNE of this game? You have to provide strategy for each player. The answer without the properly formulated strategy will give you 0 points.
Group Q3 (8 points)
1. Consider the following game tree:
The SPNE payoff of player 1 is __ and this game has __ pure-strategy NE in total.
2. Consider the following game tree:
The SPNE payoff of player 1 is __ and this game has __ pure-strategy NE in total.
Group Q4 (3 points)
1. Which returns to scale does technology F (K, L, Z) = √KL + Z min(K, L) exhibit?
(a) IRS
(b) CRS
(c) DRS
(d) Not defined
2. Which returns to scale does technology F(K, L, Z) =pKL + Z min(K, L) exhibit?
(a) IRS
(b) CRS
(c) DRS
(d) Not defined
3. Which returns to scale does technology F(K, L, Z) =pKL + Z + min(K, L) exhibit?
(a) IRS
(b) CRS
(c) DRS
(d) Not defined
Group Q5 (7 points)
1. Consider the following matrix game:
|
|
C |
D |
E |
|
A |
1, 1 |
1, 5 |
1, 2 |
|
B |
2, 4 |
0, 3 |
5, 1 |
This game has __ pure-strategy NE. In MSNE, player 1 chooses A with probability __.
2. Consider the following matrix game:
|
|
C |
D |
E |
|
A |
1, 1 |
1, 5 |
1, 2 |
|
B |
2, 4 |
0, 3 |
5, 1 |
This game has __ pure-strategy NE. In MSNE, player 2 chooses C with probability __.
3. Consider the following matrix game:
|
|
D |
E |
|
A |
6, 2 |
3, 1 |
|
B |
3, 5 |
2, 3 |
|
C |
3, 1 |
5, |
This game has __ pure-strategy NE. In MSNE, player 1 chooses A with probability __.
4. Consider the following matrix game:
|
|
D |
E |
|
A |
6, 2 |
3, 1 |
|
B |
3, 5 |
2, 3 |
|
C |
3, 1 |
5, |
This game has __ pure-strategy NE. In MSNE, player 2 chooses D with probability __.
Group Q6 (4 points)
1. A firm has access to the following technologies: F1 (K, L, Z) = 2K + L + 3Z and F2 (K, L, Z) = K +2L+2Z . Then the aggregate technology is __. Provide your answer in the form: 5K +5L+5Z without spaces.
2. A firm has access to the following technologies: F1 (K, L, Z) = 3K + 2L + Z and F2 (K, L, Z) = K +3L+4Z . Then the aggregate technology is __. Provide your answer in the form: 5K +5L+5Z without spaces.
3. A firm has access to the following technologies: F1 (K, L, Z) = 5K + 2L + 2Z and F2 (K, L, Z) = 3K +6L+ Z . Then the aggregate technology is __. Provide your answer in the form: 5K +5L+5Z without spaces.
Group Q7 (6 points)
1. Suppose there are three types of car quality: lemons, oranges and peaches. The probability distri- bution of cars in the economy is: P (L) = 0.25, P (O) = 0.5 and P (P) = 0.25. The corresponding values for the seller are: $1,000, $1,500 and $2,000, whereas the values for the buyer are: $1,200, $1,700 and $2,200. Suppose the price of a random car in $1,700. What is the expected value of this car for the buyer? Round the number to the nearest integer if necessary.
2. Suppose there are three types of car quality: lemons, oranges and peaches. The probability dis- tribution of cars in the economy is: P (L) = 0.2, P (O) = 0.6 and P (P) = 0.2. The corresponding values for the seller are: $1,000, $1,500 and $2,000, whereas the values for the buyer are: $1,200, $1,700 and $2,200. Suppose the price of a random car in $1,700. What is the expected value of this car for the buyer? Round the number to the nearest integer if necessary.
3. Suppose there are three types of car quality: lemons, oranges and peaches. The probability distri- bution of cars in the economy is: P (L) = 
, P (O) = 
and P (P) = 0.5. The corresponding values for the seller are: $1,000, $1,500 and $2,000, whereas the values for the buyer are: $1,200, $1,700 and $2,200. Suppose the price of a random car in $1,700. What is the expected value of this car for the buyer? Round the number to the nearest integer if necessary.
Group Q8 (6 points)
1. Consider an exchange economy with two consumers and two goods x and y . Consumer 1’s utility is u1 (x, y) = x 
y 
and initial income I1 = 55. The interior of the Pareto set is y1 = 
and price of good y is py = 10. The government wants to achieve an equilibrium allocation in which consumer 1 buys x1 = 5. What is the required lump-sum transfer from consumer 1 to consumer 2 that allows to achieve this in equilibrium?
2. Consider an exchange economy with two consumers and two goods x and y . Consumer 1’s utility is u1 (x, y) = x0 .75 y0 .25 and initial income I1 = 25. The interior of the Pareto set is y1 = 
and price of good y is py = 2. The government wants to achieve an equilibrium allocation in which consumer 1 buys x1 = 5. What is the required lump-sum transfer from consumer 1 to consumer 2 that allows to achieve this in equilibrium?
Group Q9 (4 points)
1. Choose all correct statements:
I. In the Stackelberg model, the firm that moves last has an advantage because it can adapt to what the first-mover does.
II. In the Cournot oligopoly, the firm with greater marginal costs will produce less.
III. Short-run cost can be smaller than long-run cost.
2. Choose all correct statements:
I. In the Stackelberg model, the firm that moves first loses because it cannot adapt to what the other firm does.
II. In the Cournot oligopoly, the firm with greater marginal costs will produce more.
III. Short-run cost are never smaller than long-run cost.
Group Q10 (4 points)
1. Suppose there are two states of the world, S = {s1 , s2 } and a consumer evaluates AA acts as follows:
V (f) = min{z : f(s)(z) > 0 for some s} + 0.5 max{z : f(s)(z) > 0 for some s}. What is the value of the following act g?
2. Suppose there are two states of the world, S = {s1 , s2 } and a consumer evaluates AA acts as follows:
V (f) = min{z : f(s)(z) > 0 for some s} + 0.5 max{z : f(s)(z) > 0 for some s}. What is the value of the following act g?
3. Suppose there are two states of the world, S = {s1 , s2 } and a consumer evaluates AA acts as follows:
V (f) = min{z : f(s)(z) > 0 for some s} + 0.5 max{z : f(s)(z) > 0 for some s}. What is the value of the following act g?
2 Long Answer Questions (50 points)
Group Q11 (25 points)
1. Suppose there are two states of the world S = {s1 , s2 } and only one consumption good x. There are two SEU consumers. Denote xi(j) consumption of consumer i in state j . Utility of consumer 1 in state j is u1 (x1(j), x2(1), x2(2)) = x2(1)x2(2) ln x1(j) and utility of consumer 2 in state j is u2 (x2(j)) = ln x2(j) . The initial endowments representing available consumption in each state are w1 = (5, 4) and w2 = (5, 6). Consumer 1 believes that P (s1 ) = P (s2 ) = 0.5, whereas consumer 2 believes P (s1 ) = 0.8 and P (s2 ) = 0.2. The consumers can buy and sell Arrow assets.
(a) Find the equilibrium Arrow prices and allocation. (13 points)
(b) Derive the interior of the Pareto set. Does the 1st welfare theorem hold in this economy? (12 points)
2. Suppose there are two states of the world S = {s1 , s2 } and only one consumption good x. There are two SEU consumers. Denote xi(j) consumption of consumer i in state j . Utility of consumer 1 in state j is u1 (x1(j), x2(1), x2(2)) = 
and utility of consumer 2 in state j is u2 (x2(j)) = ln x2(j) . The initial endowments representing available consumption in each state are w1 = (6, 5) and w2 = (6, 7). Consumer 1 believes that P (s1 ) = P (s2 ) = 0.5, whereas consumer 2 believes P (s1 ) = 0.25 and P (s2 ) = 0.75. The consumers can buy and sell Arrow assets.
(a) Find the equilibrium Arrow prices and allocation. (13 points)
(b) Derive the interior of the Pareto set. Does the 1st welfare theorem hold in this economy? (12 points)
Group Q12 (8 points)
1. Suppose a firm has access to the following technologies: F1 (K, L) = √KL, F2 (K, L) = (K + 1)0 .25 (L + 1)0 .75 and F3 (K, L) = K0 .8 (L + 1)0 .2 . Formulate the optimization problem the firm has to solve to obtain the aggregated technology. Clearly state the variables the firm is choosing. Write down the Lagrangian for this problem.
2. Suppose a firm has access to the following technologies: F1 (K, L) = √K + L, F2 (K, L) = K + ln(L + 5) and F3 (K, L) = K0 .4 L0 .6 . Formulate the optimization problem the firm has to solve to obtain the aggregated technology. Clearly state the variables the firm is choosing. Write down the Lagrangian for this problem.
Group Q13 (17 points)
1. Suppose the cost function is c(q, w1 , w2 ) = 4qw1 + 2 
+ 10w2 , where wi is the price of input xi . Recover the production technology of this firm.
2. Suppose the cost function is c(q, w1 , w2 ) = 
+ 20w1 + 0.5qw2 , where wi is the price of input xi . Recover the production technology of this firm.
2022-06-07