Answer:
$9.687
Explanation:
Given:
Year 3 dividend = $1.00
Year4&5 growth rate = 17%
Constant rate = 7%
Required return rate = 16%
Year 4 dividend wil be:
D4 = 1.00 * 1+growth rate
= 1.00 * (1+0.17)
= $1.17
Year 5 dividend=
D5 = $1.17 * (1+0.17)
= $1.3689
Value of stock after year 5 will be given as:
[tex] \frac{D5 * (1+growth rate)}{required return - growth rate} [/tex]
[tex] = \frac{1.3689*(1+0.07)}{0.16-0.07}[/tex]
= $16.2747
For the current value of stock, we have:
Cv= Fd* Pv of discounting factor
Where Cv = current value of stock
Fd = future dividend
Pv = Present value of discounting factor
Therefore,
[tex] C_v = \frac{1.00}{1.16^3} + \frac{1.17}{1.16^4} + \frac{1.3689}{1.16^5} + \frac{16.2746}{1.16^5} [/tex]
=$9.6871382455
≈ $9.687
The value of stock today =
$9.687
