Problem

An SUV is purchased new for $\$ 31,500$.

(b) Suppose that the vehicle is depreciated so that it holds only $90 \%$ of its value from the previous year. Write an exponential function of the form $y=V_{0} b^{t}$, where $V_{0}$ is the initial value and $t$ is the number of years after purchase.
The model for the value of the vehicle $t$ years after purchase is $y=$

Answer

Expert–verified
Hide Steps
Answer

Final Answer: The model for the value of the vehicle \(t\) years after purchase is \(\boxed{y=31500(0.90)^{t}}\).

Steps

Step 1 :The initial value of the SUV is given as \(V_{0} = \$ 31,500\).

Step 2 :The vehicle is depreciated so that it holds only \(90 \%\) of its value from the previous year. This means the base of the exponential function, \(b\), is \(0.90\).

Step 3 :Therefore, the exponential function that models the value of the vehicle \(t\) years after purchase is: \[y=V_{0} b^{t} = 31500(0.90)^{t}\]

Step 4 :Final Answer: The model for the value of the vehicle \(t\) years after purchase is \(\boxed{y=31500(0.90)^{t}}\).

link_gpt

Popular Problems

Compute $\int_{0}^{\ln (2) / … Solve the triangle. \[ \mathr… QUESTION 2 - 1 POINT Solve th… 5. Suppose you are a computer… Answer the statistical measur… $(-\infty, 2) \cap(-6, \infty… A firm does not pay a dividen… Math 112 Section: 4. Tubercul… Find $y^{\prime}$ if $y=\ln \… 3. (3pts) Cherry trees in a c… More