Answer each question. If the lengths of the sides of a cube are tripled, by what factor will the volume change?

The volume of a cube is calculated using the formula V = s^3, where 's' represents the length of a side. This formula indicates that the volume is directly related to the cube of the side length, meaning that any change in the side length will significantly affect the volume.

A scaling factor is a number that scales, or multiplies, a quantity. In this context, if the side length of a cube is tripled (scaled by a factor of 3), the new volume can be determined by cubing the scaling factor, which illustrates how changes in dimensions affect overall size.

Exponential growth refers to an increase that occurs at a rate proportional to the current value. In the case of the cube's volume, when the side length is tripled, the volume increases by a factor of 3^3, or 27, demonstrating how exponential relationships can lead to significant changes in outcomes.