Physics
Grade-10
Easy
Question
Which of the following does not have a unit as Joule?
- Work done
- Kinetic energy
- Potential energy
- Force
The correct answer is: Force
The correct answer is (d) force
The SI unit of force is newton(N)
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In the S.I. system, the unit of P.E. is:
In the S.I. system, the unit of P.E. is:
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In the S.I. system, the unit of K.E. is:
In the S.I. system, the unit of K.E. is:
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Potential energy depends on:
Potential energy depends on:
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Kinetic energy depends on:
Kinetic energy depends on:
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When we stretch a spring, the elastic potential energy of the spring:
When we stretch a spring, the elastic potential energy of the spring:
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The displacement of a body as a function of time is shown in the figure. The figure shows that:
![](data:image/png;base64,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)
The displacement of a body as a function of time is shown in the figure. The figure shows that:
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
Which of the following velocity-time graphs represent uniformly accelerated motion?
Which of the following velocity-time graphs represent uniformly accelerated motion?
PhysicsGrade-10
Physics
A stone thrown vertically up with a speed of 25 m/s from the ground reaches a maximum height in time 10sec calculate the maximum height attained by the stone. Take g = 10 m/s2
A stone thrown vertically up with a speed of 25 m/s from the ground reaches a maximum height in time 10sec calculate the maximum height attained by the stone. Take g = 10 m/s2
PhysicsGrade-10
Physics
An object is thrown vertically upwards and rises to a height of 90 m. Calculate the velocity with which the object was thrown upwards? Take g = 9.8 m/s2
An object is thrown vertically upwards and rises to a height of 90 m. Calculate the velocity with which the object was thrown upwards? Take g = 9.8 m/s2
PhysicsGrade-10
Physics
Two objects of different masses falling freely on the surface of the moon would:
Two objects of different masses falling freely on the surface of the moon would:
PhysicsGrade-10
Physics
A stone released from the top of the tower touches the ground in 4 sec. The height of the tower is about: Take g = 10 m/s2
A stone released from the top of the tower touches the ground in 4 sec. The height of the tower is about: Take g = 10 m/s2
PhysicsGrade-10
Physics
A ball is released from the top of a building which takes 10 s to reach the ground. What is the height of the building?
A ball is released from the top of a building which takes 10 s to reach the ground. What is the height of the building?
PhysicsGrade-10
Physics
When a ball bounces up it executes___________ motion.
When a ball bounces up it executes___________ motion.
PhysicsGrade-10
Physics
An apple falling under gravity is an example of:
An apple falling under gravity is an example of:
PhysicsGrade-10
Physics
When a ball is thrown vertically upwards, it attains a height of 19.6 m; find the initial velocity of the ball and the time taken by it to rise to the highest point. (Acceleration due to gravity, g=9.8 m/s2)
When a ball is thrown vertically upwards, it attains a height of 19.6 m; find the initial velocity of the ball and the time taken by it to rise to the highest point. (Acceleration due to gravity, g=9.8 m/s2)
PhysicsGrade-10