Answer:
Stock D as their expected return matches the Capital Assets Price Models
Explanation:
We have to calcualte the CAPM for each stock and look which matches with the expected rate of return:
[tex]Ke= r_f + \beta (r_m-r_f)[/tex]
risk free = 0.04
market rate = 0.1
premium market = (market rate - risk free) 0.06
Stock A
beta(non diversifiable risk) = 0.85
[tex]Ke= 0.04 + 0.85 (0.06)[/tex]
Ke 0.09100 = 9.1%
Expected return: 7% it would prefer to sale
Stock B
beta(non diversifiable risk) = 0.75
[tex]Ke= 0.04 + 0.75 (0.06)[/tex]
Ke 0.08500 = 8.5%
Expected return: 9% it would prefer to purchase as it offer more
Stock C
beta(non diversifiable risk) = 1.2
[tex]Ke= 0.04 + 1.2 (0.06)[/tex]
Ke 0.11200 = 11.20%
Expected return: 9.5% it would prefer to sale
Stock D
beta(non diversifiable risk) = 1.35
[tex]Ke= 0.04 + 1.35 (0.06)[/tex]
Ke 0.12100 = 12.1%
Expected return: 12.1% Indifferent as it is mathces the CAMP the stock is neither overperforming nor underperforming
Stock E
beta(non diversifiable risk) = 0.5
[tex]Ke= 0.04 + 0.5 (0.06)[/tex]
Ke 0.07000 = 7%
Return = 14% It would prefer to purchase as it offer more
