You can afford a \( \$ 200 \) per month car payment. You've found a 5 year loan at \( 5 \% \) interest. How big of a loan can you afford?

We start with the formula for the monthly payment \( M \) on a loan amount \( P \) with a monthly interest rate \( r \) over \( n \) payments: \[ M = P \cdot \frac{r}{1 - (1+r)^{-n}} \] In this problem we are given: - Monthly payment: \( M = 200 \) - Annual interest rate: \( 5\% = 0.05 \) - Monthly interest rate: \[ r = \frac{0.05}{12} \] - Loan term: \( 5 \) years, so the number of monthly payments is: \[ n = 5 \times 12 = 60 \] We need to solve for \( P \). Rearranging the formula for \( P \): \[ P = M \cdot \frac{1 - (1+r)^{-n}}{r} \] Substitute the given values: \[ P = 200 \cdot \frac{1 - \left(1+\frac{0.05}{12}\right)^{-60}}{\frac{0.05}{12}} \] Let’s break down the computation step by step. 1. Calculate the monthly interest rate: \[ r = \frac{0.05}{12} \approx 0.00416667 \] 2. Compute \( 1 + r \): \[ 1 + r \approx 1.00416667 \] 3. Calculate \( \left(1 + r\right)^{-60} \): \[ \left(1.00416667\right)^{-60} \approx \frac{1}{(1.00416667)^{60}} \] We first compute \( (1.00416667)^{60} \). Using the exponential approximation: \[ (1.00416667)^{60} \approx e^{60 \cdot \ln(1.00416667)} \approx e^{60 \cdot 0.00415888} \approx e^{0.249533} \approx 1.283 \] Thus, \[ \left(1.00416667\right)^{-60} \approx \frac{1}{1.283} \approx 0.779 \] 4. Compute the numerator: \[ 1 - 0.779 \approx 0.221 \] 5. Divide by \( r \): \[ \frac{0.221}{0.00416667} \approx 53.04 \] 6. Multiply by the monthly payment: \[ P \approx 200 \times 53.04 \approx 10\,608 \] Thus, you can afford a loan of approximately \( \$10\,608 \).