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In a company's first year in operation, it made an annual profit of $242,500. The profit of the company increased at a constant 22% per year each year. How much total profit would the company make over the course of its first 30 years of operation, to the nearest whole number?

User Vaughn Cato
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1 Answer

22 votes
22 votes

Answer:

total profit = $428,517,224 (nearest whole number)

Explanation:

Use geometric sum formula:


S_n=(a(1-r^n))/(1-r)

where
a is the initial value and
r is the common ratio

We have been told that the initial value is 242500, so
a=242500.

If the company's profit increases by 22% per year, this means each year's profit is 122% of the previous year's profit. 122% = 122/100 = 1.22

Therefore,
r = 1.22

We need to calculate the total profit earned over 30 years, so
n = 30

Inputting these values into the formula:


\implies S_(30)=(242500(1-1.22^(30)))/(1-1.22)=\$428,517,224 \ \textsf{(nearest whole number)}

User Silvia
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