The dollar value \( v(t) \) of a certain car model that is \( t \) years old is given by the following exponential function. \[ v(t)=27,500(0.92)^{t} \] Find the initial value of the car and the value after 11 years. Round your answers to the nearest dollar as necessary. Initial value: Value after 11 years:

The initial value of the car is found by evaluating \( v(0) \). By substituting \( t = 0 \) into the equation \( v(t) \), we get: \[ v(0) = 27,500(0.92)^{0} = 27,500 \times 1 = 27,500 \] So, the initial value of the car is $27,500. To find the value after 11 years, substitute \( t = 11 \): \[ v(11) = 27,500(0.92)^{11} \approx 27,500 \times 0.2961 \approx 8,154.25 \] Rounding to the nearest dollar, the value after 11 years is approximately $8,154. Initial value: $27,500 Value after 11 years: $8,154