In Newton's law of universal gravitation, the magnitude of the gravitational force between two point masses is $F=G\frac{m{1}_{\mathrm{}}m{2}_{\mathrm{}}}{r^2}$. Which two factors determine the strength of the gravitational force?

According to Newton's law of universal gravitation, if the distance between two point masses is doubled while the masses remain the same, how does the gravitational force change?

According to Newton's law of universal gravitation, the magnitude of the gravitational force between two point masses is $F=G\frac{m{}_{1}m{}_2}{r^2}$. Which variables determine the value of $F$ (assuming $G$ is constant)?

According to Newton's law of universal gravitation, what is the magnitude of the gravitational force exerted on an object of mass $m$ by a second object of mass $M$ at a center-to-center separation $r$?

In Newton's law of universal gravitation, the magnitude of the gravitational force between two point masses is $F=G\frac{m{}_{1}m{}_2}{r^2}$. Which two factors determine the value of $F$ for a given pair of objects?

In Newton's law of universal gravitation, which two factors determine the magnitude of the gravitational force between two point masses?

According to Newton's law of universal gravitation, which two factors determine the magnitude of the gravitational force between two point masses?

In Newton's law of universal gravitation, $F=G\frac{m{m}_1{m}_2}{r^2}$, which two factors determine the magnitude of the gravitational force between two objects?

In the context of Newton's law of universal gravitation, what type of force is gravity between two masses?