HI David,
Here is the question 15
A $20 million portfolio is equally invested in two currencies: $10 million in US dollars (USD)
and $10 million in Euros (EUR). The volatility of the Euro (EUR) is 20%; the volatility of the
dollar (USD) is 30%. The two currencies have a correlation of 0.60. What is the beta of the
US dollar (USD) position with respect to the two-asset portfolio that includes the US dollar
position; i.e., beta (USD, Two-asset Portfolio)?
a) 0.75
b) 1.00
c) 1.25
d) 1.50
I am trying to solve this question other way.
Beta (USD, Portfolio) = Covariance(USD, Portfolio)/Variance(Portfolio).
Beta (USD, Portfolio) = Corelation(USD)*Vol(USD)*Vol(Portfolio)/Variance(Portfolio).
Variance (Portfolio) = 0.5^2 * 20%^2 + 0.5^2 * 30%^2 + 2 * 0.5 * 0.5 * 20% * 30% * 0.6
= 0.0505
Vol(portfolio) =.2247
Beta (USD, Portfolio) =.6*.3*.2247/.0505 =0.80
Can you please help why I am not getting right answer 1.25 which is in the solution set.
Thanks,
Here is the question 15
A $20 million portfolio is equally invested in two currencies: $10 million in US dollars (USD)
and $10 million in Euros (EUR). The volatility of the Euro (EUR) is 20%; the volatility of the
dollar (USD) is 30%. The two currencies have a correlation of 0.60. What is the beta of the
US dollar (USD) position with respect to the two-asset portfolio that includes the US dollar
position; i.e., beta (USD, Two-asset Portfolio)?
a) 0.75
b) 1.00
c) 1.25
d) 1.50
I am trying to solve this question other way.
Beta (USD, Portfolio) = Covariance(USD, Portfolio)/Variance(Portfolio).
Beta (USD, Portfolio) = Corelation(USD)*Vol(USD)*Vol(Portfolio)/Variance(Portfolio).
Variance (Portfolio) = 0.5^2 * 20%^2 + 0.5^2 * 30%^2 + 2 * 0.5 * 0.5 * 20% * 30% * 0.6
= 0.0505
Vol(portfolio) =.2247
Beta (USD, Portfolio) =.6*.3*.2247/.0505 =0.80
Can you please help why I am not getting right answer 1.25 which is in the solution set.
Thanks,
