Answer:
the approximately equivalent function with a monthly growth rate would be:
g(x) = 35000(1 + 0.002041)^12x
Explanation:
The given function f(x) = 35000(1.025)^x represents the balance of Mia's student loan during her deferment, where x is the number of years since the deferment began.
To calculate an approximately equivalent function with a monthly growth rate, we need to convert the annual growth rate (1.025) to a monthly growth rate.
To find the monthly growth rate, we need to divide the annual growth rate by the number of compounding periods in a year. Since there are 12 months in a year, the monthly growth rate is calculated as follows:
Monthly growth rate = (1 + Annual growth rate)^(1/number of compounding periods) - 1
In this case, the monthly growth rate is approximately:
Monthly growth rate = (1 + 0.025)^(1/12) - 1 ≈ 0.002041
Therefore, the approximately equivalent function with a monthly growth rate would be:
g(x) = 35000(1 + 0.002041)^12x
Note that this new function assumes that the growth rate remains constant over each month.