Chris plans to purchase a car that loses it value at rate of 14% per year. If the initial cost of the car is $27,000, which of the following equations should Chris use to determine the value, v, of the car after 4 years?

A car loses it value at a rate of 4.5% annually. If a car is purchased for $24,500, which equation can be used to determine the value of the car, V, after 5 years?

The present value of a car is Rs 400000. If the value of the car decreases by 10% per annum, then find the value of the car after 3 years.

A company purchased a machine valued at $120,000. The value of the machine depreciates by the same amount each year so that after 10 years the value will be $30,000. Which of the following equations gives the value, v, of the machine, in dollars, t years after it was purchased for 0 le t le 10 ?

The cost of a scooter is ₹ 42,000 and the depreciation value for every year is 8% thien the value of scooter after 1 year is____

Mohan purchased a house for Rs 30000 and its value is depreciating at the rate of 25% per year. Find the value of the house after 3 years.

Mohan purchased a house for Rs 30000 and its value is depreciating at the rate of 25% per year. Find the value of the house after 3 years.

A certain car is known to deprecitate at a rate of 20% per year. The equation V(n)=p (x)^(n) can be used to calculate the value of the car, V. after n years where p is the purchase price. If the purchase price of the car is $25,000, to the nearest dollar, howmuch more is the car worth after 2 year than 3 years?

Amol bought a plot of land for 70,000 and a car for 32,000 on the same day. The value of the plot appreciates uniformly at the rate of 10% every year while the value of the car depreciates by 20% for the first year and by 10% for the second year. If Amol sells the plot of land as well as the car after 2 years, what will be the profit or loss on the whole ?

The front of a roller-coaster car is at the bottom of a hill and is 15 feet above the ground. If the front of the roller-coaster car rises at a constant rate of 8 feet per second, which of the following equations gives the height h, in feet, of the front of the roller-coaster car s seconds after it starts up the hill?