Answer:
P1=$8.43
Explanation:
[tex]D1= 0.5\\D2=0.5\\D3=D2(1+g3) = 0.5(1.05)=0.525\\D4=D3(1+g4) = 0.5(1.05)(1.1) =0.5775\\[/tex]
The value of the stock is equal to the present value of all cash-flows expected from holding the stock. At the end of year 1, the value of the stock is found by calculating the present value of the remaining dividends i.e D2, D3, D4, D5 etc till infinity.
Therefore price equals[tex]P1=\frac{D2}{1+ke} + \frac{D3}{(1+ke)^{2} } +\frac{D4}{(ke-g)(1+ke)^{3} }[/tex]
given the values of Dividends calculated above and ke= 15% :
[tex]P1=\frac{0.5}{1.15^{1} } +\frac{0.525}{1.15^{2}} +\frac{0.5775}{(0.15-0.1)(1.15^{3} } = $8.43[/tex]
