Physics
Grade-7
Easy
Question
Direction :Which energy is being used by the following appliance initially?
Stoves
- Electrical energy
- Chemical energy
- Sound energy
- Muscular energy
Hint:
The stoves use chemical energy in liquid or gas forms.
The correct answer is: Chemical energy
- The stoves use chemical energy to burn.
- The chemical energy is converted into thermal energy.
- The thermal energy gives up the heat required for cooking.
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Which object has more gravitational potential energy when the mass is constant?
![](data:image/png;base64,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)
Which object has more gravitational potential energy when the mass is constant?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
The height of an object is ____ proportional to its gravitational potential energy.
The height of an object is ____ proportional to its gravitational potential energy.
PhysicsGrade-7
Physics
What can you say about the gravitational potential energy when both have the same mass?
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)
What can you say about the gravitational potential energy when both have the same mass?
![](data:image/png;base64,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)
PhysicsGrade-7