The two factors are the energy-moment,'L' and the distance form origin.
The energy-moment for masses is mGM and the potential energy = - mGM/r.
For photons the energy moment is hc and the potential energy = -hc/r.
For electric charges the energy moment is e2zc and
the potential energy = -e2zc/2r = -ahc/r where a is the fine structure constant.
Notice the e2/2 indicates that e is an rms charge or effective charge.
The three factors that determine the amount of potential energy are the object's mass, the height it is lifted to, and the acceleration due to gravity. These factors combine to determine the gravitational potential energy of an object.
Weight and height
The factors that determine gravitational potential energy are the object's mass, the acceleration due to gravity, and the height the object is raised to. Gravitational potential energy is directly proportional to the mass of the object and the height it is raised, and is also affected by the strength of the gravitational field.
The factors that determine the gravitational potential energy of an object are its mass, the acceleration due to gravity, and its height above a reference point. The gravitational potential energy of an object increases with mass, height, and strength of gravity.
PE=mgh. Potential energy is the product of mass x gravity x height.
The three factors that determine the amount of potential energy are the object's mass, the height it is lifted to, and the acceleration due to gravity. These factors combine to determine the gravitational potential energy of an object.
Weight and height
The factors that determine gravitational potential energy are the object's mass, the acceleration due to gravity, and the height the object is raised to. Gravitational potential energy is directly proportional to the mass of the object and the height it is raised, and is also affected by the strength of the gravitational field.
The factors that determine the gravitational potential energy of an object are its mass, the acceleration due to gravity, and its height above a reference point. The gravitational potential energy of an object increases with mass, height, and strength of gravity.
Height above the ground, and mass of the object itself.
PE=mgh. Potential energy is the product of mass x gravity x height.
Its weight and the height Thank you....
-- the object's mass -- its height above some reference level
The two factors are Force and distance, e.g. mgh or f.r or mv2 = (mv2/r) r
To determine the velocity of an object using its potential energy, you can use the principle of conservation of energy. By equating the potential energy of the object to its kinetic energy, you can calculate the velocity of the object. The formula to use is: Potential Energy Kinetic Energy 1/2 mass velocity2. By rearranging this formula, you can solve for the velocity of the object.
Here are some potential energy questions that can help deepen our understanding of the concept: How does the height of an object affect its potential energy? What factors determine the amount of potential energy stored in an object? How does potential energy change as an object moves in a gravitational field? Can potential energy be converted into other forms of energy? If so, how? How is potential energy related to the concept of work and energy conservation?
The two factors, assuming in our earth planet, are object mass and its height away from the earth ground or any selected zero level.