50% money market securities; 5% real estate; 45% precious metals
40% money market securities; 10% real estate; 50% foreign securities
90% small-cap domestic equity securities; 10% collectibles
30% domestic equity securities; 30% fixed-income domestic securities; 20% real estate; 20% foreign securities
2
Which of the following definitions of return is false?
Expected return
Realized return
Required return
Anticipated return
3
Which of the following statements concerning the Markowitz efficient frontier is correct?
A portfolio that offers the highest rate of return with the lowest degree of risk is on the efficient frontier.
A portfolio that offers the lowest rate of return for a higher degree of risk is on the efficient frontier.
A portfolio that offers the lowest degree of risk for a given rate of return is above the efficient frontier.
A portfolio that offers the highest rate of return for a given degree of risk is on the efficient frontier.
4
When a company changes its capital structure, what happens?
The Weighted Average Cost of Captial (WACC) changes
The discount rate does not change
Investors buy or sell shares
Investors perceive the firm as having more risk
I, II, III
II, III, IV
I, III, IV
I, II, IV
5
Assume a portfolio has the following four stocks and associated rates of return:
Stock Rate of Return Invested
M 9.2% 50%
N 11.1% 25%
O 4.4% 15%
P 6.9% 10%
Assume that 50% of the portfolio is invested in Stock M, in Stock N, 25%, in Stock O, 15%, and 10% in Stock P. Based on this information, which of the following is the weighted-average rate of return on the portfolio?
8.03%
8.46%
8.73%
9.05%
_____________________________________________________
For questions # 6, 7 and 8 use the following information. Assume the following information concerning a two-stock portfolio:
Stock X Stock Y
Percent of portfolio 75% 25%
Average annual return 11% 9%
Standard deviation of returns 2.0 3.0
Covariance of returns -5
6
What is the correlation coefficient of Stocks X and Y, based on the above information?
-.5000
-.7169
-.8333
-.9981
7
What is the standard deviation of the portfolio based on the above information?
0.9682
1.0061
4.3177
5.0000
8
Which fo the following facts explains why the standard deviation of the portfolio is less than the standard deviation of either of the two stocks that make up the portfolio?
The fact that Stock X has a lower standard deviation than Stock Y
The fact that the portfolio consists of two stocks rather than one
The fact that Stock Y has a lower average annual return than Stock X
The fact that Stocks X and Y have a negative correlation coefficient
9
Which of the following definitions of investor returns is false?
Can be decided for a given level or risk
Can be determined by using “classical” statistical analysis
Have an investment outcome with the lowest expected risk
Are not based on capital appreciation
10
What is the objective of calculating the standard deviation of an investment portfolio?
Achieve an overall standard deviation that is lower than its component parts
Used for analysis of investment averages
Employed to verify the geometric average
Implemented to determine each stock’s beta
Comments
Content
50% money market securities; 5% real estate; 45% precious metals
40% money market securities; 10% real estate; 50% foreign securities
90% small-cap domestic equity securities; 10% collectibles
30% domestic equity securities; 30% fixed-income domestic securities; 20% real estate; 20% foreign securities
2
Which of the following definitions of return is false?
Expected return
Realized return
Required return
Anticipated return
3
Which of the following statements concerning the Markowitz efficient frontier is correct?
A portfolio that offers the highest rate of return with the lowest degree of risk is on the efficient frontier.
A portfolio that offers the lowest rate of return for a higher degree of risk is on the efficient frontier.
A portfolio that offers the lowest degree of risk for a given rate of return is above the efficient frontier.
A portfolio that offers the highest rate of return for a given degree of risk is on the efficient frontier.
4
When a company changes its capital structure, what happens?
The Weighted Average Cost of Captial (WACC) changes
The discount rate does not change
Investors buy or sell shares
Investors perceive the firm as having more risk
I, II, III
II, III, IV
I, III, IV
I, II, IV
5
Assume a portfolio has the following four stocks and associated rates of return:
Stock Rate of Return Invested
M 9.2% 50%
N 11.1% 25%
O 4.4% 15%
P 6.9% 10%
Assume that 50% of the portfolio is invested in Stock M, in Stock N, 25%, in Stock O, 15%, and 10% in Stock P. Based on this information, which of the following is the weighted-average rate of return on the portfolio?
8.03%
8.46%
8.73%
9.05%
_____________________________________________________
For questions # 6, 7 and 8 use the following information. Assume the following information concerning a two-stock portfolio:
Stock X Stock Y
Percent of portfolio 75% 25%
Average annual return 11% 9%
Standard deviation of returns 2.0 3.0
Covariance of returns -5
6
What is the correlation coefficient of Stocks X and Y, based on the above information?
-.5000
-.7169
-.8333
-.9981
7
What is the standard deviation of the portfolio based on the above information?
0.9682
1.0061
4.3177
5.0000
8
Which fo the following facts explains why the standard deviation of the portfolio is less than the standard deviation of either of the two stocks that make up the portfolio?
The fact that Stock X has a lower standard deviation than Stock Y
The fact that the portfolio consists of two stocks rather than one
The fact that Stock Y has a lower average annual return than Stock X
The fact that Stocks X and Y have a negative correlation coefficient
9
Which of the following definitions of investor returns is false?
Can be decided for a given level or risk
Can be determined by using “classical” statistical analysis
Have an investment outcome with the lowest expected risk
Are not based on capital appreciation
10
What is the objective of calculating the standard deviation of an investment portfolio?
Achieve an overall standard deviation that is lower than its component parts
Used for analysis of investment averages
Employed to verify the geometric average
Implemented to determine each stock’s beta