APPLICATIONS OF EXPONENTIAL AND APPLICATIONS OF EXPONENTIAL AND 
(Amortization Word Problems)
To solve an exponential or logarithmic word problem, convert the
narrative to an equation and solve the equation.
There is a relationship between the mortgage amount, the number
of payments, the amount of the payment, how often the payment
is made, and the interest rate. The following formulas illustrate
the relationship:
where P = the payment, r = the annual rate, M = the mortgage
amount, t = the number of years, and n = the number of payments
per year.
Problem 2: Suppose you wanted to take out a mortgage for
$100,000 with monthly payments at 9%, but you could only afford
$800 per month payments. How long would you have to make payments to
pay off the mortgage, and how much interest would you pay for this
payment period?
Answer: 371.063 months or 30.92192 years or 30 years and 11
months. You would have 370 payments of $800 and the last payment
would be $850.40. The interest paid over the term of the mortgage
would be $216,850.40.
Solution and Explanations:
substitute $100,000 for M (the mortgage amount), 12 for n (the number of payments per year, $800 for P (the monthly payment), and 9% for r (the annual interest rate)). You are solving for t (the term of the mortgage in years) or 12t( the term of the mortgage in months)
to get
or 371.063064259 or 371 months.
If you would like to work another problem and review the answer and the solution, click on problem.
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