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The Worldwide Equity-Income Fund is a U.S. based mutual fund whose objective is to seek current income through participation in the U.S. and global equity and fixed-income markets. According to its bylaws, Worldwide can invest no more than 25% of its funds in the assets of any one country. Currently, it holds a substantial amount of foreign securities, heavily weighted in British stocks and bonds. Mary Larson, CFA, has recently joined Worldwide as a portfolio manager. Larson is a recent graduate of Washington State University with a double major in Economics and Finance, where she studied interest rate parity and purchasing power parity. Larson’s role at Worldwide will encompass many areas, including forecasting and strategy.Larson has been asked to examine the current portfolio holdings, and project how the current position will perform over the next year under various interest rate scenarios. U.S. interest rates are currently 7% and the real rate of interest has been about 2% over the past 20 years. Today's spot rate is $1.7921 per British pound.
Due to a weakening in world oil prices, as well as the results from the recent U.S. presidential election, Larson determines it is necessary to calculate her own forecast of the expected inflation rate in the U.S. The international Fisher relation predicts that the interest rate differential between two countries should be equal to the expected inflation differential. Therefore, countries with higher expected inflation rates will have higher nominal interest rates, and vice versa. A change in domestic rates could lead Larson to suggest substantial changes to the current portfolio corporation. Larson is asked to recall the correct representation of purchasing power parity. St is the exchange rate at time t, expressed in units of foreign currency per domestic currency. ID and IF are the expected rates of inflation in the domestic and foreign countries, and E( ) denotes an expected value. Which of the following is the most accurate representation of purchasing power parity (PPP)?
A)
E(S1) / S0 = [1 + E(iDC)] / 1 + E(iFC)].
B)
E(S1) / S0 = [1 + E(iFC)] / [1 + E(iDC)].
C)
E(S0) / S1 = [1 + E(iFC)] / 1 + E(iDC)].



The correct representation of purchasing power parity is:  E(S1) / S0 = [1 + E(iFC)] / [1 + E(iDC)]. (Study Session 4, LOS 18.g)

Larson predicts that the spot exchange rate for British pounds will be $1.8653 per pound in one year. Using the information above and assuming the expected inflation rate in the U.S. is 6%, Larson has arrived at her conclusion based upon the assumption that the inflation rate in Great Britain will be:
A)
1.8%.
B)
3.6%.
C)
10.3%.



Using the information above and assuming the expected inflation rate in the U.S. is 6%, the expected inflation rate in Great Britain is 0.018, or 1.8%, computed as:
The relative form of the purchasing power parity condition implies that the expected future spot rate can be estimated as follows:
St=0 x (1 + IUS)/(1 + IUK) = E[St+1]

So, we can rearrange this equation to isolate the unknown, the expected inflation rate in the United Kingdom:

1 + IUK = 1.06 (1.7921 / 1.8653) = 1.018
IUK = .018 = 1.8%

(Study Session 4, LOS 18.h)


Larson recalls that while relative PPP does tend to hold closely over the long term, PPP may not hold in the short run due to one of several reasons. Which of the following is least likely a reason why PPP may not hold in the short run?
A)
A common consumption basket does not exist across countries.
B)
Factors of production are mobile in the short run.
C)
Transactions costs prevent arbitrage.



Factors of production are immobile in the short run. Both remaining choices are valid reasons why PPP may not hold in the short run. (Study Session 4, LOS 14.a)

Based upon the interest rate information given above, and using the exact version of the Fisher relationship, Larson calculates that the market-consensus implied expected inflation rate in the U.S. is:
A)
5.0%.
B)
−4.7%.
C)
4.9%.



Using the information above and the exact version of the Fisher relationship, the market-consensus expected inflation rate in the U.S. is 1.07 / 1.02 − 1 = 0.049 or 4.9%. Remember that the alternate version of the international Fisher relation, the linear approximation, will produce a slightly different result. (Study Session 4, LOS 18.j)

The foundation of Larson’s predictions of future spot rates and interest rates depend upon several key assumptions. Larson knows that if capital markets are integrated, capital can flow freely across borders. Given this information about capital markets which one of the following statements is most accurate?
A)
Nominal interest rates should be equal across countries.
B)
Inflation rates should be equal across countries.
C)
Real interest rates should be equal across countries.



If capital markets are integrated, capital will flow freely across borders, and real interest rates should be equal across countries. Countries with high relative real rates will see their currencies appreciate as foreign investors sell their home currencies and buy the currency of the country with the high real rate. (Study Session 4, LOS 18.i)

Suppose that the current spot exchange rate for U.S. Dollars into British Pounds is $1.4339 per pound. If the current interest rate is 5% in the U.S. and 7% in Britain, what is the expected spot exchange per pound rate 12 months from now according to uncovered interest rate parity?
A)
$1.4612.
B)
$1.4212.
C)
$1.4071.



Uncovered interest rate parity estimates future exchange rates based on the relationship in nominal interest rates. Multiplying the current spot exchange rate by the nominal annual U.S. interest rate and dividing by the nominal annual British interest rate yields the estimate of the spot exchange rate 12 months from now ($1.4339 × 1.05) / 1.07 = $1.4071. (Study Session 4, LOS 18.l)

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George Canyon, CFA, an international trader and analyst with Canyon Trading, wants to use the international Fisher relation to determine his trading strategies. In analyzing expected inflation rates, he wants to correlate the expected rates to nominal interest rates. In doing so, he discovers that the international Fisher relation could approximate nominal interest rates by:
A)
multiplying real interest rates by expected inflation rates.
B)
adding real interest rates to expected inflation rates.
C)
subtracting real interest rates from expected inflation rates.


The nominal interest rate, r, is the compounded sum of the real interest rate, real r, and the expected rate of inflation, E(i), over an estimation horizon. The domestic version of the Fisher relation is stated as:


Exact methodology: (1 + r) = (1 + real r) × (1 + E(i))


    Where:
    r = nominal interest rate
    real r = real interest rate
    E(i) = expected inflation


Note that for the exact methodology, 1 must be added to each rate before they are multiplied.
The relationship can also be approximated by adding real interest rates to expected inflation rates: linear approximation: r = real r + E(i)

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George Canyon, CFA, an international trader and analyst with Canyon Peak Trading, is considering trading in the Chinese yuan. Canyon is considering the use of the international Fisher relation in his analysis of China. One concern that Canyon should consider is that the international Fisher relation assumes that:
A)
nominal interest rates are stable across time and international borders.
B)
real exchange rates are stable across time and international borders.
C)
real interest rates are stable across time and international borders.



The international Fisher relation specifies that the interest rate differential between two countries should be equal to the expected inflation differential. This means countries with higher expected inflation will have higher nominal interest rates. The condition assumes that real interest rates are stable over time and equal across international borders.

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Simon Peak, CFA, an international trader and economist with Canyon Peak Trading, is analyzing the inflation and interest rates trends for China. Peak is interested in taking a trading position in interest rate sensitive instruments. If Peak is to assume that the differences in inflation rates are substantially similar to the differences in interest rates, which theory does he prescribe to?
A)
Relative purchasing power parity.
B)
Asset markets approach.
C)
International Fisher relation.



The international Fisher relation specifies that the interest rate differential between two countries should be equal to the expected inflation differential. This means countries with higher expected inflation will have higher nominal interest rates.

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Donna Ackerman, CFA, is an analyst in the currency trading department at State Bank. Ackerman is training a new hire, Fred Bos, a recent college graduate with a BA in economics.
Ackerman asks Bos to attempt to estimate the inflation rate in the U.S. based on the following data:
  • the spot exchange rate between the GBP and the USD is $0.500.
  • the forward exchange rate is $0.520.
  • the British rate of inflation is 4%.

Bos calculates the rate of U.S. inflation as:
A)

0%.
B)

8.2%.
C)

4.2%.



According to the Interest Rate Parity, Purchasing Power Parity, and the International Fisher Relationship, the interest rate differential must equal the inflation differential, and we assume that the forward rate is an unbiased estimator of the future spot rate.
1 + US inflation = (0.520 / 0.500)(1.04) = 1.082, thus US inflation = 8.2%.


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George Canyon, CFA, an international trader and analyst with Canyon Trading, wants to use the international Fisher relation to determine his trading strategies for the Chinese yuan. Based on his analysis, the expected inflation rate is 7% and the real interest rate is 3%. In order to determine a price for certain corporate debt Canyon is interested in buying, he will use the exact method of the international Fisher relation. Therefore, the nominal interest rate that he should use is:
A)
4.0%.
B)
10.0%.
C)
10.2%.


Using the international Fisher relation: (1 + r) = (1 + real r) × (1 + E (i))

Where:
r = nominal interest rate
real r = real interest rate
E (i) = expected inflation
The nominal interest rate is:
(1 + r) = (1 + 0.03) × (1 + 0.07)
(1 + r) = (1.102)
r = 0.102 or 10.2%

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George Canyon, CFA, an international trader and analyst with Canyon Trading, wants to use the international Fisher relation to determine his trading strategies for the Chinese yuan. Based on his analysis, the expected inflation rate is 7% and the real interest rate is 3%. In order to determine a price for certain corporate debt Canyon is interested in buying, he will use the exact method of the international Fisher relation. Therefore, the nominal interest rate that he should use is:
A)
4.0%.
B)
10.0%.
C)
10.2%.


Using the international Fisher relation: (1 + r) = (1 + real r) × (1 + E (i))

Where:
r = nominal interest rate
real r = real interest rate
E (i) = expected inflation
The nominal interest rate is:
(1 + r) = (1 + 0.03) × (1 + 0.07)
(1 + r) = (1.102)
r = 0.102 or 10.2%

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If the expected inflation is 100% and the real required rate of return is 6%, the nominal interest rate according to the exact form of the Fisher effect is closest to:
A)
12.0%.
B)
6.0%.
C)
112.0%.



According to the Fisher effect, the relationship between the nominal interest rate and the real interest rate and the expected inflation rate is (1 + r) = (1 + real r)[1 + E(i)]; therefore, the problem yields 1 + r = (1.06)(2) = 2.12, or r = 112%.

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Jennifer Nance has recently been hired as an analyst at the Central City Bank in the currency trading department. Nance, who recently graduated with a degree in economics, will be working with other analysts to determine if there are profit opportunities in the foreign exchange market.
Nance has the following data available:

US Dollar ($)

UK Pound (£)

Euro (€)


Expected inflation rate

6.0%

3.0%

7.0%


One-year nominal interest rate

10.0%

6.0%

9.0%

Market Spot Rates


US Dollar ($)

UK Pound (£)

Euro (€)


US Dollar ($)

$1.0000

$1.6000

$0.8000


UK Pound (£)

0.6250

1.0000

2.0000


Euro (€)

1.2500

0.5000

1.0000


Market 1-year Forward Rates
US Dollar ($)UK Pound (£)Euro (€)
US Dollar ($)$1.0000$1.6400$0.8082
UK Pound (£)0.60981.00002.0292
Euro (€)1.23730.49281.0000
Using the same data above, Nance wishes to determine the order of the real interest rate levels implied by the Fisher Effect in the United States, the United Kingdom and Europe. What is the order of real interest rate levels, ranked from highest to lowest?
A)
United States, Europe, United Kingdom.
B)
United Kingdom, United States, Europe.
C)
United States, United Kingdom, Europe.



The Fisher Effect implies that the real interest rate is equal to [(1 + nominal interest rate) / (1 + inflation rate)] − 1.
The implied real rates, ranked in order from highest to lowest, are:
United States: [(1.10) / (1.06)] − 1 = 3.8%.
United Kingdom: [(1.06) / (1.03)] − 1 = 2.9%.
Europe: [(1.09) / (1.07)] − 1 = 1.9%.



Using the same data above, Nance determines that the highest estimate of the expected $/£ spot rate in one year is implied by:
A)
purchasing power parity (PPP).
B)
uncovered interest rate parity (IRP).
C)
the Fisher effect.



Uncovered IRP: expected 1 − year spot rate = $1.6000(1.10) / (1.06) − 1 = $1.6604.
PPP: expected 1 − year spot rate = $1.6000(1.06) / (1.03) − 1 = $1.6466.
The Fisher effect does not imply a forecast of the expected future spot rate.

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The Asian Spec Fund, managed by Jonathan Khamal, CFA, engages in currency speculation for its clients. Khamal believes that there is an opportunity to speculate on the Malaysian Ringgit. He believes that the international Fisher relation holds for most currencies on the assumption that real interest rates are constant among developed and emerging countries, but may not hold for Malaysia. The Malaysian nominal interest rate is 7.6% and the annual inflation rate is 4.5%. According to his calculations, the Malaysian real interest rate is:
A)
2.97%.
B)
3.50%.
C)
3.97%.



According to the international Fisher relation:
(1 + Nominal interest rate) = (1 + real interest rate) × (1 + inflation rate)

By substituting, solve for the real interest rate:
(1 + 0.076) = (1 + r) × (1 + 0.045)
(1 + r) = 1.076/1.045
(1 + r) = 1.0297
r = 2.97%

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