Question

A car manufacturer sells a similar, scale model of one of its real cars. (a) The fuel tank of the real car has a volume of 64 liters, and the fuel tank of the model has a volume of 0.125 liters. What is the relationship between the length of the real car and the length of the model car?

a) The length of the real car is 64 times the length of the model car.
b) The length of the model car is 8 times the length of the real car.
c) The length of the real car is 512 times the length of the model car.
d) The length of the model car is 0.125 times the length of the real car.

Answer 1

The length of the real car is 64 times the length of the model car. The correct option is a.

Step-by-step explanation:

To find the relationship between the length of the real car and the length of the model car, we can use the given information about the fuel tank volumes. We are told that the fuel tank of the real car has a volume of 64 liters, and the fuel tank of the model has a volume of 0.125 liters.

Since the scale of the model is given in terms of length, we can assume that the relationship between the volumes of the fuel tanks is the same as the relationship between the lengths of the real car and the model car. This means that the length of the real car is 64 times the length of the model car.

Therefore, the correct answer is (a) The length of the real car is 64 times the length of the model car. The correct option is a.