Quiz 2 Topics in Macroeconomics

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Problem 1
We consider a CES production function.

π‘Œπ‘‘ = 𝐴 (𝛼𝐾𝑑
πœŽβˆ’1
𝜎 + (1 βˆ’ 𝛼)𝐿𝑑
πœŽβˆ’1
𝜎 )
𝜎
πœŽβˆ’1
.

Q1: As
𝜎 β†’ 1, prove the CobbDouglas production function 𝐴𝐾𝑑 𝛼𝐿𝑑 1βˆ’π›Ό. (10 marks)

Q2: As 𝜎 β†’ 0, prove the Leontief production function π‘Œπ‘‘ = 𝐴 min(𝐾𝑑, 𝐿𝑑). (10 marks)

Q3: The profit maximization problem is given by max
𝐾𝑑,𝐿𝑑
πœ‹π‘‘ = π‘Œπ‘‘ βˆ’ 𝑅𝑑𝐾𝑑 βˆ’ 𝑀𝑑𝐿𝑑

By solving the profit maximization problem, derive the definition of the value of 𝜎 mathematically. (10 marks)

Problem 2
The utility maximization problem is given by max
𝑐1𝑑,𝑐2𝑑,𝑠𝑑
𝑒𝑑 = (π‘Ž1
1
πœƒ(𝑐1𝑑)πœƒβˆ’1
πœƒ + π‘Ž2
1
πœƒ(𝑐2𝑑)πœƒβˆ’1
πœƒ )
πœƒ
πœƒβˆ’1

subject to 𝑐1𝑑 + 𝑠𝑑 = 𝑀𝑑 + 𝑒
𝑐2𝑑 = (1 + π‘Ÿπ‘‘+1)𝑠𝑑

Q4: By solving the maximization problem, characterize the saving function depending on the value of πœƒ, i.e., there are three cases. (30 marks)

Q5: By solving the maximization problem, derive the definition of the value of πœƒ mathematically. (10 marks)

Problem 3
Consider a CES utility function.
𝑒𝑑 = (π‘Ž1
1
πœƒ(𝑐1𝑑)πœƒβˆ’1
πœƒ + π‘Ž2
1
πœƒ(𝑐2𝑑)πœƒβˆ’1
πœƒ )
πœƒ
πœƒβˆ’1

Q6: Derive 𝑒𝑑 as πœƒ β†’ 1. (10 marks)
Problem 4

Consider the following CES production function.

π‘Œ
𝑑 = 𝐴 (𝛼 (𝐾𝑑
β„Ž
1
)

𝜎
βˆ’1
𝜎

+
(1 βˆ’ 𝛼) (𝐿𝑑
β„Ž
2
)

𝜎
βˆ’1
𝜎

)

𝜎

𝜎
βˆ’1

Q7: Derive factor prices 𝑅𝑑 and 𝑀𝑑. (10 marks)

Q8: Compute the values of 𝑅𝑑 and 𝑀𝑑, respectively, as 𝜎 β†’ 0. (10 marks)