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TEXAS TECH UNIVERSITY
RAWLS COLLEGE OF BUSINESS AREA OF FINANCE
FIN 4328 – 001– 62167 – International Finance Dr. Danışoğlu
Homework #5
Due on Tuesday, August 7, 2012
SECOND SUMMER 2012
1. Suppose that Zimbabwe has a choice of two possible $100 million, five-year Eurodollar loans. The first loan is offered at LIBOR + 1% with a 2.5% syndication fee, whereas the second loan is priced at LIBOR + 1.5% and a 0.75% syndication fee. Assuming that Zimbabwe has a 9% cost of capital, which loan is preferable? Hint: View this as a capital budgeting problem.
The dollar cash flows associated with these two spread-syndicate fee combinations are as follows:
Loan Option Fee Interest Spread (Years 1-5)
Loan 1 (2.5% fee, 1% spread) $2,500,000 $1,000,000 Loan 2 (0.75% fee, 1.5% spread) $750,000 $1,500,000
Using a 9% discount rate, we can compare the present values of these two combinations: 5 $1,000,000
$2,500,000 + = $6,389,651 t
t=1(1.09)
Based on these comparisons, we can see that at a 9% discount rate, the first loan fee-spread combination is the least expensive one.
5
$1,500,000
$750,000 + = $6,584,477
t
t=1(1.09)
2. During 1997, the Korean Stock Exchange’s composite index fell by 42%, while the won lost half its value against the dollar. What was the combined effect of these two declines on the dollar return associated with Korean stocks during 1997?
According to these data, the dollar return on the Korean Stock Exchange during 1997 was -71%:
R$ = (1 - 0.42)(1 - 0.5) - 1 = -71%
3. Suppose over a ten-year period the annualized peseta return of a Spanish bond has been 12.1%. If a comparable dollar bond has yielded an annualized return of 8.3%, what cumulative devaluation of the peseta over this period would be necessary for the return on the dollar bond to exceed the dollar return on the Spanish bond?
The answer to this question can be found by solving the following equation: (1.121)10(1 - d) = (1.083)10
In this equation, d is the cumulative peseta devaluation over the ten-year period. That is, the dollar return on investing in the Spanish bond equals the dollar return on investing in the comparable dollar-denominated bond. The solution to this equation is d = 0.2917, or a cumulative peseta devaluation of 29.17%.
4. The standard deviations of U.S. and Mexican returns over the period 1989-1993 were 12.7% and 29.7%, respectively. In addition, the correlation between the U.S. and Mexican markets over this period was 0.34. Assuming that these data reflect the future as well, what is the Mexican market beta relative to the U.S. market?
Using the formula presented in the text, and substituting in the numbers in the problem, we have the following: Standard deviation
Mexican marketCorrelation withof Mexican market0.297 = x = 0.34 x = 0.80
betaU.S. marketStandard deviation of U.S. market0.127
In other words, despite the much greater riskiness of the Mexican market relative to the U.S. market, the low correlation between the two markets led to a Mexican market beta (0.80) which is lower than the U.S. market beta (1.00).
5. In an attempt to diversify your portfolio internationally, you must decide how to invest in Brazil. You can invest in an index fund that replicates the Brazilian stock market, or you can buy shares of the Brazil Fund traded on the New York Stock Exchange. The correlation between the dollar returns on the index fund and the S&P 500 is 0.285; the correlation between the dollar returns on the Brazil Fund and the S&P 500 is 0.40; the standard deviation of the S&P 500 index is 0.19, the standard deviation of the index fund is 0.38, the standard deviation of the Brazilian fund is 0.4085. Also, the beta of the Brazil Fund with respect to the Brazilian index is 0.90. In addition, the Brazil Fund and the Brazilian index are expected to yield annual dollar returns of 21% and 19%, respectively, in contrast to expected annual returns of 18% from investing in the S&P 500. Assume that the U.S. Treasury bill rate is 5%. Ignoring other considerations, should you buy the Brazil Fund or the Brazilian index fund?
To answer this question, we need to determine which investment provides a better risk-return trade-off in the context of the U.S. market, which is represented here by the S&P 500. This means that we must calculate the beta for the Brazilian index with respect to the S&P 500, ßBrazilian index, and the corresponding beta for the Brazil Fund, ßBrazil Fund (the Brazil Fund’s beta relative to the Brazilian index is irrelevant).
By definition, ßBrazilian index = (0.285)(0.38)/0.19= 0.57, and ßBrazil Fund = (0.40)(0.4085)/0.19 = 0.86.
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2022-04-08
