Answer:
$44.87
Explanation:
Use Dividend Discount Model to solve this question;
First, find the dividend per year;
First year's dividend ; D1 = D0(1+g)
D1 = 1.32 (1.30) = 1.716
Second year's dividend ; D2 = 1.716 (1.10) = 1.8876
Third year's dividend ; D3 = 1.8876 (1.05) = 1.9820
Next, find the present value of each dividend at 9% required return;
PV (D1) = 1.716 / (1.09) = 1.5743
PV (D2) = 1.8876 /(1.09²) = 1.5888
PV (D3 onwards) = [tex]\frac{\frac{1.9820}{0.09-0.05} }{1.09^{2} } \\ \\ = \frac{47.19}{1.1881}[/tex]
= PV (D3 onwards) = 41.7052
Sum up the PVs to find the current market value of the stock;
= 1.5743 + 1.5888 + 41.7052
= 44.8683
Therefore the value is $44.87
