Answer:
b. Stock X has the higher dividend yield.
Explanation:
We solve for the cost of equity of each stock using CAMP then, with the gordon model we determinate the price ofthe share expressed in Dividends.
Stock X
[tex]Ke= r_f + \beta (r_m-r_f)[/tex]
risk free = 0.046
market rate = 0.09
premium market = (market rate - risk free) 0.05
beta(non diversifiable risk) = 1.5
[tex]Ke= 0.046 + 1.5 (0.05)[/tex]
Ke 0.12100
Dividend grow model:
D/(r-g) = Value of the share
0.121 - 0.06 = 0.061
D/0.061 = 16.39D
Stock Y
[tex]Ke= r_f + \beta (r_m-r_f)[/tex]
risk free = 0.046
market rate = 0.09
premium market = (market rate - risk free) 0.05
beta(non diversifiable risk) = 0.5
[tex]Ke= 0.046 + 0.5 (0.05)[/tex]
Ke 0.07100
Dividend grow model:
D/(r-g) = Value of the share
0.071 - 0.06 = 0.011
D / 0.011 = 90.90D
The stock X is value 16.39 times his dividends
while stock Y is valued 90.90 times his dividends
Thus, being Dividend Yield the Dividend per share over the price of the share it will be higher on stock X than stock Y
