Answer:
Explanation:
Expected return of the portfolio is weighted average of the return of the components.
E(R) = w1 * R1 + w2 * R2
E(R) = 65% * 18% + 35% * 6%
E(R) = 11.70% + 2.10%
Expected Return, E(R) = 13.80%
Standard deviation of portfolio is mathematically represented as:
[tex]\sigma =\sqrt{w_1^2\sigma _1^2+w_2^2\sigma _2^2+2w_1w_2p_{1,2}\sigma_1\sigma_2}[/tex]
where
w1 = the proportion of the portfolio invested in Asset 1
w2 = the proportion of the portfolio invested in Asset 2
σ1 = Asset 1 standard deviation of return
σ2 = Asset 2 standard deviation of return
For risk free money market fund, standard deviation = 0 and its correlation with risky portfolio = 0
[tex]\sigma =\sqrt{ (0.65 * 0.30)^2 + (0.35 * 0)^2 + (2 * 0.65 * 0.30*0.35 *0*0)} \\\\= \sqrt{0.038025 +0+0} \\\\ = 0.195[/tex]
Standard deviation = 19.50%
