Physics
Grade-8
Easy
Question
The forces involved in the Newton’s third law acts
- On the same objects
- On different objects
- In same direction
- On five bodies
Hint:
On different objects
The correct answer is: On different objects
- Newton's third law states that every action has an equal and opposite reaction, and the forces act on two different bodies.
- Therefore, the forces involved in the Newton's third law of motion acts on different bodies.
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When one body exerts a force on the other body, the first body experiences a force which is equal in magnitude and in the opposite direction of the force which is exerted. Which law is this?
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Two bodies in contact experience forces in
Two bodies in contact experience forces in
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If the force acting on a body is 50 N, and the mass is 10 Kg, what can be the acceleration of the body?
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If the force acting on a body is 40 N and the acceleration is 4 m/ s2, what can be the mass of the body?
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A loaded cart tends to move at a slower pace than the empty cart. This is because
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What can you say from the diagram?
![](data:image/png;base64,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)
What can you say from the diagram?
![](data:image/png;base64,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)
PhysicsGrade-8
Physics
Why will a car accelerate more than the truck when both are pushed with the same intensity?
Why will a car accelerate more than the truck when both are pushed with the same intensity?
PhysicsGrade-8
Physics
A car and a truck are pushed with the same sufficient force, which one will accelerate more?
A car and a truck are pushed with the same sufficient force, which one will accelerate more?
PhysicsGrade-8
Physics
The unit “Newton” is equivalent to:
The unit “Newton” is equivalent to:
PhysicsGrade-8
Physics
The unit of force is:
The unit of force is:
PhysicsGrade-8
Physics
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “iii”?
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “iii”?
PhysicsGrade-8
Physics
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “ii”?
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “ii”?
PhysicsGrade-8
Physics
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “i”?
Fill in the table for the correct answer.
![](data:image/png;base64,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)
Choose the correct magnitude from the following
What is the value in blank “i”?
PhysicsGrade-8