Physics
Grade-7
Easy
Question
What can you say about the gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
- GPEA = GPEB
- GPEA < GPEB
- GPEA > GPEB
- GPEA <= GPEB
Hint:
The gravitational potential energy can be represented as GPEA > GPEB when the A is higher than B.
The correct answer is: GPEA > GPEB
- The gravitational potential energy increases as the height of the body increase.
- When object A is higher than object B, the GPE will be more in object A.
- This can be represented as GPEA > GPEB
Related Questions to study
Physics
Which object has less gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
Which object has less gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
Which object has more gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
Which object has more gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
Which object has less gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
Which object has less gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
Which object has more gravitational potential energy when both have the same mass?
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)
Which object has more gravitational potential energy when both have the same mass?
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)
PhysicsGrade-7
Physics
Which of the statements is correct for the graph between gravitational potential energy and the height of the body when the object is falling down?
Which of the statements is correct for the graph between gravitational potential energy and the height of the body when the object is falling down?
PhysicsGrade-7
Physics
What kind of graph is the graph between gravitational potential energy and the height of the body when the object is thrown up?
What kind of graph is the graph between gravitational potential energy and the height of the body when the object is thrown up?
PhysicsGrade-7
Physics
As the height of a body decreases, gravitational potential energy ______.
As the height of a body decreases, gravitational potential energy ______.
PhysicsGrade-7
Physics
As the height of a body increases, its gravitational potential energy _______.
As the height of a body increases, its gravitational potential energy _______.
PhysicsGrade-7
Physics
A body of mass of 100 Kg has gravitational potential energy of 2000 J. What will be its new gravitational potential energy if it moves at the height of 100 m?
A body of mass of 100 Kg has gravitational potential energy of 2000 J. What will be its new gravitational potential energy if it moves at the height of 100 m?
PhysicsGrade-7
Physics
A car is on a hilltop at the height of 300 m and has a mass of 1120 Kg. How much gravitational potential energy does the car have?
A car is on a hilltop at the height of 300 m and has a mass of 1120 Kg. How much gravitational potential energy does the car have?
PhysicsGrade-7
Physics
A baby carriage is sitting at the top of a hill that is 21 m high. The carriage with the baby weighs 12 N. What is the gravitational potential energy of the carriage?
A baby carriage is sitting at the top of a hill that is 21 m high. The carriage with the baby weighs 12 N. What is the gravitational potential energy of the carriage?
PhysicsGrade-7
Physics
You serve a volleyball with a mass of 2.1 Kg. The ball leaves your hand with a speed of 30 m/s and is in the air above the Earth's surface at the height of 10 m. How much gravitational potential energy does the ball have?
You serve a volleyball with a mass of 2.1 Kg. The ball leaves your hand with a speed of 30 m/s and is in the air above the Earth's surface at the height of 10 m. How much gravitational potential energy does the ball have?
PhysicsGrade-7
Physics
Calculate the missing term. Take g as 10m/s2
m =?, h = 10000cm, GPE = 350 J (Take g = 10 m/s2)
Calculate the missing term. Take g as 10m/s2
m =?, h = 10000cm, GPE = 350 J (Take g = 10 m/s2)
PhysicsGrade-7
Physics
Calculate the missing term. Take g as 10m/s2
m = 250kg, h = 10 m, GPE =? (Take g = 10 m/s2)
Calculate the missing term. Take g as 10m/s2
m = 250kg, h = 10 m, GPE =? (Take g = 10 m/s2)
PhysicsGrade-7
Physics
Calculate the missing term. Take g as 10m/s2
m = 10kg, h =?, GPE = 200 J (Take g = 10 m/s2)
Calculate the missing term. Take g as 10m/s2
m = 10kg, h =?, GPE = 200 J (Take g = 10 m/s2)
PhysicsGrade-7