the formula is F = Gm1m2/r2
r can be represented for distance.
As distance increases, gravitational force decreases.
As distance decreases, graivitational force increases.
does the moon's gravitational force affect the crust of the earth?
Mass and distance. The force decreases with the square of the distance, so mass has a lesser effect on the equation.
mass and distance form an inverse relationship when related to gravity. The larger the mass(es) the greater the gravitational pull. The closer the distance, the greater the gravitational pull.
The larger the mass, the stronger the gravitational force.
The gravitational force then increases by a factor of 4 .
Distance decreases the gravitational force, F=k/r2.
The two things that affect the gravitational force is Mass and Distance.
it is mass and distance
The masses of the two objects and the distance between the two objects affect the gravitational force between them.
Gravitational force decreases as the square of the distance.
More mass --> more gravitational force Greater distance --> less gravitational force
Assuming you mean the force of gravity. As the distance increases, the force of gravity is reduced exponentially. Double the distance between two bodies, the gravitational force is reduced four times.
it decreases the gravitational force.
since gravitational force is inversely propostional to the sq. Root of distance between them. When distance increases the gravitational force decreasses and it is vice versa.
Two primary things:The masses of the two objects in question, andThe distance between them. Your answer would be 5.00e13
-- the product of their individual masses -- the distance between their centers The formula for the gravitational force is given by: force = GMm/r² where G is the gravitational constant, M and m are the masses of the two objects and r is the distance between their centres.
The mass of the object that is exerting the force and the distance between the two objects.