Answer:
The number of days needs to be found is 39 days
Explanation:
The number of days per year the machine is used that brings the Snow Valley Ski Resort to break-even for the two alternative ways given in the question is the number of days that equalized the net present value of the two alternatives being discounted at MARR 12%.
Net Present value of alternative 1 : Buying the machine ; calculated as below
Cost of buying the machine + annual cost of operating and maintaining = -27,000 - (7,000/12%) x (1-1.12^-6) = $-55,779.85
Net Present value of alternative 2: Renting the machine; which is the present value of annual renting cost for 6 years period. Annual renting cost is denoted as $(350 x n) with n is the number of days in use. Thus, net present value is calculated as: (-350n/ 0.12) / ( 1 - 1.12^-6)
As explained above, the number of days to bring to break-even point is:
(350n/ 0.12) x ( 1 - 1.12^-6) = 55,779.85 <=> 350n = 13,567.1 <=> n = 39 days.
