Answer:
The present intrinsic value of the share is 94.79 dollars
Explanation:
We need to discount the future dividends at the required rate of return
[tex]\left[\begin{array}{ccc}Year&Cashflow&Discounted\\0&5.85&\\1&16.6&14.82\\2&27.35&21.8\\3&38.1&27.12\\4&48.85&31.05\\TOTAL&&94.79\\\end{array}\right][/tex]
Each year is discount according to the lump sum formula
[tex]\frac{cashflow}{(1 + rate)^{time} } = PV[/tex]
being rate 12% --> 0.12
[tex]\frac{16.6}{(1 + 0.12)^{1} } = 14.82[/tex]
[tex]\frac{27.35}{(1 + 0.12)^{2} } = 21.8[/tex]
and so on
Answer: $94.79
Explanation:
Given the following ;
Current dividend = $5.85 per share
Yearly increment in dividend = $10.75 per share
Number of years = 4
Time (t) = 1-4
Internal rate of return = 12%
Calculate the present value of share given the above details
Cashflow over four years
Year1 = $5.85 + $10.75 =$16. 60
Year2 = $16.60 + $10.75 = $27.35
Year3 = $27.35 + $10.75 = $38.10
Year 4 = $38.10 + $10.75 = $48.85
Present value (PV) =
Cashflow÷(1+IRR) + cashflow÷(1+IRR)^t + cashflow÷(1+IRR)^t + cashflow÷(1+IRR)^t
Present value (PV) =
Year1÷(1+IRR) + year2÷(1+IRR)^2 + Year3÷(1+IRR)^3 + Year4÷(1+IRR)^4
PV = $16.60/(1.12) + ($27.35)/(1.12)^2+ $38.10/(1.12)^3 + $48.85/(1.12)^4 = $94.79
