The mass and distance of an object fom another object
The gravitational force that one object exerts on another will decrease in magnitude. In the formula for gravitational force, the force is inversely proportional to the square of distance. This means that reducing the distance between the objects will increase the magnitude of gravitational force.
Gravitational Force = Gravitational Constant x mass of the first object x mass of the second object / distance squared. So what affects the magnitude is the masses of the objects and the distance between them. Gravitational Constant = 6.672 x 10^-11 N x m^2/kg^2 Both masses, and the distance between them.
The magnitude of the gravitational force between two objects depends on-- The product of their two masses-- The distance between their centers of mass
Yes. At a greater distance, the gravitational attraction between two objects is less.
The magnitude of the mutual gravitational forces between two objects is determined by the masses of the objects and the distance between their centers. "Their centers" above seems to hold for spherical objects, but you need to integrate the distances between the masses.
The gravitational force that one object exerts on another will decrease in magnitude. In the formula for gravitational force, the force is inversely proportional to the square of distance. This means that reducing the distance between the objects will increase the magnitude of gravitational force.
Gravitational Force = Gravitational Constant x mass of the first object x mass of the second object / distance squared. So what affects the magnitude is the masses of the objects and the distance between them. Gravitational Constant = 6.672 x 10^-11 N x m^2/kg^2 Both masses, and the distance between them.
Gravitational Force = Gravitational Constant x mass of the first object x mass of the second object / distance squared. So what affects the magnitude is the masses of the objects and the distance between them. Gravitational Constant = 6.672 x 10^-11 N x m^2/kg^2 Both masses, and the distance between them.
The mass of the objects and the distance between them.
Gravitational Force = Gravitational Constant x mass of the first object x mass of the second object / distance squared. So what affects the magnitude is the masses of the objects and the distance between them. Gravitational Constant = 6.672 x 10^-11 N x m^2/kg^2 Both masses, and the distance between them.
The magnitude of gravitational force between two objects is directly proportional to the product of their masses. This means that as the mass of one or both objects increases, the magnitude of the gravitational force between them also increases. In simpler terms, the more massive an object is, the stronger its gravitational pull.
The magnitude of the gravitational force between two objects depends on-- The product of their two masses-- The distance between their centers of mass
Yes. At a greater distance, the gravitational attraction between two objects is less.
The magnitude of the mutual gravitational forces between two objects is determined by the masses of the objects and the distance between their centers. "Their centers" above seems to hold for spherical objects, but you need to integrate the distances between the masses.
mass of the objects and the distance between the objects. gravitational force can be found using: , where G is gravitational constant, m1 is the mass of object 1 (in kg) m2 is the mass of object 2 (in kg) r is the distance between the objects (in meters)
its inversely proportional to the square of the distance between objects.
Distance decreases the gravitational force, F=k/r2.