Physics
Grade-10
Easy
Question
What is the centripetal acceleration for an object of mass 50 Kg with the following specifications moving in a uniform circular motion.
Distance between the object and the axis point is 80 cm. Object’s speed is 60 m/s.
- 0 m/s2
- less than 40 m/s2
- 40 m/s2
- more than 40 m/s2
Hint:
The correct answer is: more than 40 m/s2
Related Questions to study
Physics
What is the centripetal acceleration for an object of mass 50 Kg with the following specifications moving in a uniform circular motion.
Distance between the object and the axis point is 30 m. Object’s speed is 30 m/s. The acceleration of the object is ____.
What is the centripetal acceleration for an object of mass 50 Kg with the following specifications moving in a uniform circular motion.
Distance between the object and the axis point is 30 m. Object’s speed is 30 m/s. The acceleration of the object is ____.
PhysicsGrade-10
Physics
A car travels at a constant speed around a horizontal circular track. Which diagram correctly represents the direction of v and Fc acting on the car at a particular moment?
A car travels at a constant speed around a horizontal circular track. Which diagram correctly represents the direction of v and Fc acting on the car at a particular moment?
PhysicsGrade-10
Physics
Which law determines the direction of an object’s acceleration as it is moving in uniform circular motion?
Which law determines the direction of an object’s acceleration as it is moving in uniform circular motion?
PhysicsGrade-10
Physics
Which law determines the direction of an object’s velocity as it is moving in uniform circular motion?
Which law determines the direction of an object’s velocity as it is moving in uniform circular motion?
PhysicsGrade-10
Physics
When an object experiences uniform circular motion, the direction of the net force is:
When an object experiences uniform circular motion, the direction of the net force is:
PhysicsGrade-10
Physics
An object moves in a circular path at a constant speed. Compare the direction of the object’s velocity and acceleration.
An object moves in a circular path at a constant speed. Compare the direction of the object’s velocity and acceleration.
PhysicsGrade-10
Physics
Which of these is the unit for centripetal force?
Which of these is the unit for centripetal force?
PhysicsGrade-10
Physics
Centripetal acceleration is ___.
Centripetal acceleration is ___.
PhysicsGrade-10
Physics
Centripetal acceleration always points:
Centripetal acceleration always points:
PhysicsGrade-10
Physics
The velocity of an object moving in a circular path is always ________ to the line of a circle.
The velocity of an object moving in a circular path is always ________ to the line of a circle.
PhysicsGrade-10
Physics
Which of the following depicts the speed of the ball moving in a uniform circular path?
![](data:image/png;base64,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)
Which of the following depicts the speed of the ball moving in a uniform circular path?
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
Which represents the acceleration of the ball moving in a uniform circular path.
![](data:image/png;base64,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)
Which represents the acceleration of the ball moving in a uniform circular path.
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
On which factor does the centripetal force not depend?
On which factor does the centripetal force not depend?
PhysicsGrade-10
Physics
What is the angle between the velocity vector and the centripetal force?
What is the angle between the velocity vector and the centripetal force?
PhysicsGrade-10
Physics
Which Newton’s law is responsible for centripetal force?
Which Newton’s law is responsible for centripetal force?
PhysicsGrade-10