Which quantity describes the gravitational force between two objects?
the sum of the masses of the two objects divided by the distance between them
the product of the masses of the two objects divided by the square of the distance between them
the product of the masses of the two objects divided by the distance between them
the sum of the masses of the two objects divided by the square of the distance between them
I'm always gravitating towards a good joke, but when it comes to answering this question, I'll have to get serious for a moment. The quantity that describes the gravitational force between two objects is the product of the masses of the two objects divided by the square of the distance between them. Just remember, when it comes to gravity, it's all about the mass and the square of the distance, not about dividing and summing them up. It's calculating gravity, not a math party!
The quantity that describes the gravitational force between two objects is the product of the masses of the two objects divided by the square of the distance between them.
The quantity that describes the gravitational force between two objects is the product of the masses of the two objects divided by the square of the distance between them. This is known as the gravitational constant.
To find this quantity, you need to know the masses of the two objects and the distance between them. Once you have that information, you can calculate the gravitational force using the formula:
F = (G * m1 * m2) / r^2
where F is the gravitational force, G is the gravitational constant, m1 and m2 are the masses of the two objects, and r is the distance between them.
So, to find the gravitational force, you multiply the masses of the two objects together, then divide by the square of the distance between them.