Answer to Question #292525 in Algebra for jose

For The given problem, The initial value of the car is 23700 dollars.

After one year, the price of the car depreciates by 13.5% per year. So , the new price of car after one year becomes:

Again, taking P₁ as base price, the price of the car now depreciates by 13.5% per year. So , the new price (in dollars) of car after second year becomes:

"P_2\n=P_1-{P_1\\cdot(13.5\/100)} \n= {P_1\\cdot(1-13.5\/100)}\n= 23700\\cdot (1-13.5\/100)\\cdot (1-13.5\/100)\n= 23700\\cdot (1-13.5\/100)^2 dollars"

Following the same, the new price of car after third year becomes:

"P_3\n=P_2-{P_2\\cdot(13.5\/100)} \n= {P_2\\cdot(1-13.5\/100)}\n= 23700\\cdot (1-13.5\/100)^2\\cdot (1-13.5\/100)\n= 23700\\cdot (1-13.5\/100)^3 dollars"

And, so on as we continue to move to tenth year, the new price of car at the end of tenth year becomes:

"P_{10}=23700\\cdot (1-13.5\/100)^{10} = 23700\\cdot (1-0.135)^{10}=23700\\cdot 0.865^{10} = (23700\\cdot 0.2345098) dollars = (23700\\cdot 0.2345098\\cdot100) cents = 555788 cents"

So the value of the car to the nearest cent after 10 years becomes 555788 cents.