In: Finance
Stock A has an expected return of 15% and a standard deviation of 26%. Stock B has an expected return of 15% and a standard deviation of 12%. The risk-free rate is 4% and the correlation between Stock A and Stock B is 0.5. Build the optimal risky portfolio of Stock A and Stock B. What is the standard deviation of this portfolio? Round answer to 4 decimal places
To find the fraction of wealth to invest in Stock A that will result in the risky portfolio with maximum Sharpe ratio | |||||
the following formula to determine the weight of Stock A in risky portfolio should be used | |||||
w(*d)= ((E[Rd]-Rf)*Var(Re)-(E[Re]-Rf)*Cov(Re,Rd))/((E[Rd]-Rf)*Var(Re)+(E[Re]-Rf)*Var(Rd)-(E[Rd]+E[Re]-2*Rf)*Cov(Re,Rd) | |||||
Where | |||||
Stock A | E[R(d)]= | 15.00% | |||
Stock B | E[R(e)]= | 15.00% | |||
Stock A | Stdev[R(d)]= | 26.00% | |||
Stock B | Stdev[R(e)]= | 12.00% | |||
Var[R(d)]= | 0.06760 | ||||
Var[R(e)]= | 0.01440 | ||||
T bill | Rf= | 4.00% | |||
Correl | Corr(Re,Rd)= | 0.5 | |||
Covar | Cov(Re,Rd)= | 0.0156 | |||
Stock A | Therefore W(*d)= | -0.0236 | |||
Stock B | W(*e)=(1-W(*d))= | 1.0236 | |||
Expected return of risky portfolio= | 15.00% | ||||
Risky portfolio std dev (answer Risky portfolio std dev)= | 11.9882% | ||||
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 |