Answer:
= $163, 601; The machine shouldbe purchased
Explanation:
The question is to determine the net present worth of the machine
The net present worth can be calculated using the formula s follows
= The initial cost of the machine + (the yearly benefits / 1.1∧each year for 11 years) + (yearly benefit + Scrap value / 1.1∧12)
This formula can be applied as follows to calculate the present worth of cash flow
$250000 + ($60000/1.1) + ($60000/[tex]1.1^{2}[/tex]) + ($60000/[tex]1.1^{3}[/tex]) + ($60000/[tex]1.1^{4}[/tex])+ ($60000/[tex]1.1^{5}[/tex])+ ($60000/[tex]1.1^{6}[/tex])+($60000/[tex]1.1^{7}[/tex])+($60000/[tex]1.1^{8}[/tex])+($60000/[tex]1.1^{9}[/tex])+($60000/[tex]1.1^{10}[/tex]) + ($60000/[tex]1.1^{11\\[/tex]) + ($60000 + 15,000/[tex]1.1^{1\\2}[/tex])
= $163, 601
Since the net Present worth is greater than 0, meaning it is not negative, then the machine can be purchased
