In: Finance
A pension fund manager is considering three mutual funds. The first is a stock fund, the second is a long-term government and corporate bond fund, and the third is a T-bill money market fund that yields a rate of 8%.
The probability distribution of the risky funds is as follows: Expected Return Standard Deviation Stock fund (S) 17 % 35 % Bond fund (B) 14 18 The correlation between the fund returns is 0.09. a-1. What are the investment proportions in the minimum-variance portfolio of the two risky funds. (Do not round intermediate calculations. Enter your answers as decimals rounded to 4 places.) a-2. What is the expected value and standard deviation of its rate of return? (Do not round intermediate calculations. Enter your answers as decimals rounded to 4 places.)
To find the fraction of wealth to invest in Stock fund that will result in the risky portfolio with minimum variance the following formula to determine the weight of Stock fund in risky portfolio should be used |
Where | ||
Stock fund | E[R(d)]= | 17.00% |
Bond fund | E[R(e)]= | 14.00% |
Stock fund | Stdev[R(d)]= | 35.00% |
Bond fund | Stdev[R(e)]= | 18.00% |
Var[R(d)]= | 0.12250 | |
Var[R(e)]= | 0.03240 | |
T bill | Rf= | 8.00% |
Correl | Corr(Re,Rd)= | 0.09 |
Covar | Cov(Re,Rd)= | 0.0057 |
Stock fund | Therefore W(*d) (answer a-1)= | 0.1862 |
Bond fund | W(*e)=(1-W(*d)) (answer a-1)= | 0.8138 |
Expected return of risky portfolio (answer a-2)= | 14.56% = 0.1456 | |
Risky portfolio std dev (answer a-2)= | 16.56% = 0.1656 |
Where | |||||
Var = std dev^2 | |||||
Covariance = Correlation* Std dev (r)*Std dev (d) | |||||
Expected return of the risky portfolio = E[R(d)]*W(*d)+E[R(e)]*W(*e) | |||||
Risky portfolio standard deviation =( w2A*σ2(RA)+w2B*σ2(RB)+2*(wA)*(wB)*Cor(RA,RB)*σ(RA)*σ(RB))^0.5 |