Physics
Grade-8
Easy
Question
Sonam wrote these points.
A) They cause a change in the speed and position of an object.
B) They are not equal in magnitude.
C) They cause a change in the shape and the size of an object.
D) She forgot to write the heading. Choose an apt heading for the same.
- Applied force
- Balanced force
- Unbalanced force
- None of the above
Hint:
Unbalanced force.
The correct answer is: Unbalanced force
If two individual forces are of equal magnitude and opposite direction, then the forces are said to be balanced. An object is said to be acted upon by an unbalanced force only when there is an individual force that is not being balanced by a force of equal magnitude and in the opposite direction.
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)
What was concluded from the observation of the following experiment?
![](data:image/png;base64,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)
PhysicsGrade-8
Physics
Three people of the same mass are moving in the opposite directions. They will have _____.
Three people of the same mass are moving in the opposite directions. They will have _____.
PhysicsGrade-8
Physics
Which of the following solid objects will have more inertia if they have the same volumes?
Which of the following solid objects will have more inertia if they have the same volumes?
PhysicsGrade-8