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ECOS 2002

Assignment 4

1. Dual Mandate: Suppose the central bank has a dual mandate. This implies the following IS-MP-AS model:

IS : t = − (Rt − )

MP : Rt − = (πt − ) + d¯t

AS : πt = πt − 1 + t +

(a) Why does the above model represent a dual mandate?

(b) Solve for the AD curve of this economy.

(c) Compare the slope of the AD curve in this economy to the slope of an AD curve in an economy with a single mandate (i.e. set d¯ = 0.). Does the slope make sense given the central bank’s objectives? Explain using a graph.

2. Rational Expectations: Consider the following IS-MP-AS model:

IS : t = − (Rt − )

MP : Rt − = (πt − ) + d¯t

AS : πt = πe + t +

(a) Solve for the AD curve and substitute it into the AS curve. Then, solve for πt .

(b) Under the assumption of rational expectations, the agents in the economy are assumed to know the actual value of πt at every point in time. This implies that πe = πt. Using this fact solve for the rational expectations value of πe . Does your answer make intuitive sense? Explain your solution.

3. Dynamic IS-MP-AS: For this exercise you will need to download the spreadsheet IS MP AS Q2.xlsx.

(a) Simulate a supply shock by changing the “bar o” cell from zero to one. De- scribe the effect of the supply shock.

(b) Simulate a demand shock by changing the “bar o” cell from one to zero and the “bar a” cell from zero to one. Based on the path of output, inflation, and the interest rates is it possible to distinguish a supply shock (your answer from part (a)) from a demand shock? Explain.

MP : Rt − = (πt − 1 − ) + Yt1 .

Assume that = 0.2. Modify the spreadsheet to reflect this assumption. What is the effect of this change on the prediction for the effect of a demand shock ( = 1)? Explain and include a picture of the dynamics. (Note: I do not want the whole spreadsheet, just the picture of the path of output, inflation, and the interest rate.)

4. Monetary Policy and the Taylor Rule: In class we learned that one way to sum- marize monetary policy is to think about interest rates set according to a Taylor rule:

it = + πt+ ϕπ(πt − ) + ϕy(yt − y¯). (1)

Download the spreadsheet Australian Data.xlsx and test whether the RBA’s pol- icy can be approximated by a Taylor rule. Assume ϕπ = 1.5, ϕy = 1, = 2, = 2.5 and = 3. (Hint: In a new column code the equation from the Taylor rule. It is easier to “hard” code the parameter of the model like is done in the IS MP AS Q2.xlsx spreadsheet. To do this you simply click on the cell you want and press F4. Pressing F4 will put dollars signs (✩) in and around the cell name and will hold that parameter fixed as you drag the equation to a new cell to create the predictions. You can also just place ✩’s in the equation as well. This should work in all spreadsheet software. Use IS MP AS Q2.xlsx as an example, if you are having trouble getting started.)