Answer:
Ans. The firm’s value of operations, in millions is $82.61 millions
Explanation:
Hi, we need to bring to present value all cash flows, so we need to bring the -10 million to present and the perpetuity value too, the full equation to use is as follows.
[tex]PresentValue=\frac{CF(1)}{(1+WACC)^{1} } +\frac{CF(2)*(1+g)}{(WACC-g)} *\frac{1}{(1+WACC)^{1} }[/tex]
Where:
CF(1)= -10
CF(2)=10
WACC=weighted average cost of capital
g= Constant growth rate
It should look like this.
[tex]PresentValue=\frac{-10}{(1+0.15)^{1} } +\frac{10*(1+0.05)}{(0.15-0.05)} *\frac{1}{(1+0.15)^{1} }= 82,61[/tex]
the constant growth rate is found by the second part of the equation
[tex]PerpetuityValue=\frac{CF(2)*(1+g)}{(WACC-g)}[/tex]
And that brings all the future cash flows to 1 period before its first cash flow, but there is still one period to go in order to take it to present value, so we discounted with.
[tex]\frac{1}{(1+WACC)^{1} }[/tex]
so the answer is $82.61 millions.
Best of luck.
