Difference between Gravitational Potential Energy and Elastic Potential Energy
Last Updated : 15 Mar, 2025
Potential energy is defined as the energy stored in a body due to its physical properties like the mass of the object or position of the object. It is the force that a body could potentially develop when it is put into motion.
There are different forms of potential energy, such as elastic potential energy, gravitational potential energy, electric (electromagnetic) potential energy, and nuclear potential energy. The potential energy of an object is directly proportional to the mass, height, or vertical position of the object.
What is Gravitational Potential Energy?
The gravitational potential energy of a particle at a point is defined as the work done by an external agent in moving the object from infinity to that point against the gravitational field. It is equal to the product of potential at the point due to the body and mass of the body.
For example, An object placed on a flat surface exhibits gravitational potential energy due to its position above the surface.
Formula of Gravitational Potential Energy
Consider an object of mass m is lifted in a uniform gravitational field, through a height of h.
Therefore, the weight of the object, in this case, is given as,
w = mg
where m is the mass of the object and g is the acceleration due to gravity.
Now, if the body is lifted with a uniform speed such that this work done required to lift the object up is provided to the object as gravitational potential energy (Eg). Also, as the object is lifted with uniform speed so both the lifting forces and normal forces are balanced by each other. This implies:
F = mg
Since the object is lifted to the height h therefore the work done is given as:
W = mgh
Also, the body is raised up at constant speed so the work done required to lift the body up is equal to the gain in gravitational potential energy of the body due to its rise.
Hence, the gravitational potential energy is,
Eg = mgh
Therefore,
- The SI unit of gravitational potential energy is J/kg (Joule-per-Kilogram).
- The dimensional formula of gravitational potential energy is [M0L2T-2].
What is Elastic Potential Energy?
When an object is physically deformed, it gains elastic potential energy. The molecules that make up a material are pushed to move away from their equilibrium positions when an object is stretched. If the material is elastic, the molecules will attempt to return to their original positions. This allows the object to work effectively.
As a result, we say that an elastic material has elastic potential energy when it is deformed. When a spring or rubber band is stretched, for example, it gains elastic potential energy.
Since the force required to stretch a spring with the spring constant k to a displacement x is given by,
F = kx
Then the elastic potential energy in the spring system is,
U = ½ kx2
Therefore, The SI unit of Elastic Potential energy is Joule (J).
Gravitational Potential Energy vs. Elastic Potential Energy
| Gravitational Potential Energy | Elastic Potential Energy |
|---|
| The gravitational potential energy of a particle at a point is defined as the work done by an external agent in moving the object from infinity to that point against the gravitational field. It is equal to the product of potential at the point due to the body and mass of the body. | Elastic Potential Energy is the energy stored in an object that is used to stretch or compress the object. It is the ability of an object to return to its original shape after all the external forces are removed. It is known that the force required to stretch an elastic rod is proportional to the length of the rod. The proportionality constant is known as the spring constant and is denoted by U. |
Mathematically it is defined as, Eg = mgh. Where m is the mass, g is the acceleration due to gravity, and h is the height. | The formula to calculate Elastic Potential Energy is, U = ½ kx2. Where K is the spring constant and x is the elongation. |
| It depends on the mass of the object. | It does not depend on the mass of the object. |
| It is due to gravitational force. | It is due to electrostatic force. |
| It depends on the masses and the distance between the objects. | It only depends on the spring constant and the length stretched depends on the nature of the material. |
| It is always a negative | It is always a positive |
| It is maximum at the surface of the object | It is maximum the mass at the minimum height |
Related Reads,
Practice Problems of Gravitational and Elastic Potential Energy
Question 1: What is the gravitational potential energy of an object with a mass of 6.25 kgs? The distance between the objects is 340 m.
Solution:
Given that,
The mass of object m = 6.25 kg,
Height, h = 340 m.
Since,
Eg = mgh
= 6.25 × 9.8 × 340
= 18.375 J
Question 2: Two objects with masses 6 × 1020 kg and 3 × 109 kg are kept at a distance of 1200 km away from each other. Find the gravitational potential energy.
Solution:
Given that,
The mass of object 1 M = 6 × 1020 kg
The mass of object 2 m = 3 × 109 kg
The distance between them r = 1200 km
Since,
F = - GMm/r
= - 6.67 × 10-11 × 6 × 1020 × 3 × 109/1200000
= 10 × 1013
= 1014 J
Question 3: Let a spring be elongated to 20 cm by an applied force from its equilibrium position with spring constant k = 0.1 N/m. Find the potential energy stored in spring.
Solution:
Given that,
Spring elongated x = 20 cm = 0.2 m
Spring constant k = 0.1 N/m
Potential energy stored in the spring is
U = 1/2 kx2
= 1/2 × 0.1 × (0.2)2
= 0.1 × 0.1 × 0.2
= 0.002 J
Question 4: James stretches a spring with a spring constant of 150 N/m. He stretches the spring to 50 cm. What will be the elastic potential energy in the spring?
Solution:
Given that,
Spring elongated x = 50 cm = 0.5 m
Spring constant k = 150 N/m
Elastic Potential energy of the spring is
U = 1/2 kx2
= 1/2 × 150 × 0.5 × 0.5
= 18.75 J
Question 5: A wire is elongated from its original length of 4m to 6m with a spring constant of 200 N/m. Find the elastic potential energy stored in the spring.
Solution:
Given that,
Spring elongated x = 6 m - 4 m = 2 m
Spring constant k = 200 N/m
Potential energy stored in the spring is,
U = 1/2 kx2
= 1/2 × 200 × 2 × 2
= 400 J
Similar Reads
Difference between the Gravitational Potential Energy and Gravitational Potential Potential energy is defined as the energy stored in a body due to its physical properties like the mass of the object or the position of the object. It is the force that a body could potentially develop when it is put into motion. There are different forms of potential energy, such as elastic potent
4 min read
Difference between Kinetic Energy and Potential Energy The capacity to do work is called energy. This energy can be stored in various forms. Energy is one of the physical quantities because it is proportional to the mass of an object. The body's ability to push or pull a natural force, such as gravity, determines what that energy is. Energy is ubiquitou
8 min read
Difference Between Electric Potential and Potential Difference The flow of electric charges is known as electricity, and it is responsible for producing electric current. An important word associated with electricity is electric potential. A potential difference is required to create the flow of electrons and hence, produce electricity. Before understanding the
7 min read
Difference between Voltage Drop and Potential Difference When studying electric circuits, terms like 'voltage drop' and 'potential difference' often come up, and it's easy to assume they mean the same thing since both are measured in volts. However, while they might seem similar, there are key differences that set them apart. Here, we'll explore how volta
6 min read
Difference between Gravitational Force and Electrostatic Force Force is just defined as a push or pull of an object with the mass that causes it to change its velocity. It is an external agent that is capable of changing the state of a particular body neither in a rest position nor in motion. It has both magnitude and direction. It can be measured using a sprin
5 min read