Stock X and Stock Z both have an expected return of 10%. The standard deviation of the expected return is 8% for Stock X, and 12% for Stock Z. Assume that these are the only two stocks available in a hypothetical world.
A. Assume that the correlation between the returns of the two stocks is +1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is +1)?
B. Assume that the correlation between the returns of the two stocks is +0.1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is +0.1)?
C. Assume that the correlation between the returns of the two stocks is â1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is â1)?
D. If the Capital Asset Pricing Model is true, explain why it is possible for the two stocks to have the same expected return even though the standard deviation of the expected return is 8% for Stock X, and 12% for Stock Z. (What must be true about the types of risks facing the two companies for the given numbers to make sense?).
Stock X and Stock Z both have an expected return of 10%. The standard deviation of the expected return is 8% for Stock X, and 12% for Stock Z. Assume that these are the only two stocks available in a hypothetical world.
A. Assume that the correlation between the returns of the two stocks is +1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is +1)?
B. Assume that the correlation between the returns of the two stocks is +0.1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is +0.1)?
C. Assume that the correlation between the returns of the two stocks is â1.
⢠What is the expected return and standard deviation of a portfolio containing 50% X and 50% Z?
⢠What is the optimal amount of Stock Z for an investor to hold in a portfolio (if the correlation is â1)?
D. If the Capital Asset Pricing Model is true, explain why it is possible for the two stocks to have the same expected return even though the standard deviation of the expected return is 8% for Stock X, and 12% for Stock Z. (What must be true about the types of risks facing the two companies for the given numbers to make sense?).
Related questions
- Consider two stocks, A and B.
|
|
Expected return (%) |
Standard deviation (%) |
|
Stock A |
24 |
28 |
|
Stock B |
19 |
23 |
The returns on the two stocks have a positive correlation of 0.6. You are required to calculate the portfolio return and risk.
Suppose that the investor wants to reduce the portfolio risk to 15%. How much should the correlation coefficient be to bring the portfolio risk to the desired level?
