Physics
Grade-10
Easy
Question
A coil is moved towards a stationary magnet. The voltage induced in the coil depends on_________.
- Area of the coil.
- The speed with which the coil is moved towards the bar magnet.
- The number of turns in the coil.
- All the above.
Hint:
The coil with respect to the magnet, create a current of which the voltage depends on the area of the coil, the number of turns in the coil, and the speed at which the coil is taken towards the magnet.
The correct answer is: All the above.
A coil is moved towards a stationary magnet. The voltage induced in the coil depends on all of the above.
- When a coil is moving toward a resting magnet, it creates an electromagnetic induction.
- The voltage of the current depends on the strength of the magnetic field and the structure of the coil.
- The voltage depends on the speed of the coil that moves towards the magnet, the area of the coil, and the number of turns in the coil.
Related Questions to study
Physics
A magnet is allowed to fall through a metal ring. During the fall:
A magnet is allowed to fall through a metal ring. During the fall:
PhysicsGrade-10
Physics
When a magnet M is pushed in and out of a circular coil C connected to a very sensitive galvanometer G as shown in fig.
![](data:image/png;base64,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)
When a magnet M is pushed in and out of a circular coil C connected to a very sensitive galvanometer G as shown in fig.
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
In the phenomenon of electromagnetic induction, _____________ energy of the coil or magnet is converted to ___________ energy.
In the phenomenon of electromagnetic induction, _____________ energy of the coil or magnet is converted to ___________ energy.
PhysicsGrade-10
Physics
A magnet and a coil are taken. In which of the following cases, emf is not induced in the coil?
A magnet and a coil are taken. In which of the following cases, emf is not induced in the coil?
PhysicsGrade-10
Physics
The process of Inducing current in a coil of wire by placing it in a region of changing magnetic field is:
The process of Inducing current in a coil of wire by placing it in a region of changing magnetic field is:
PhysicsGrade-10
Physics
What is that instrument which can detect the presence of electric current in a circuit?
What is that instrument which can detect the presence of electric current in a circuit?
PhysicsGrade-10
Physics
The phenomenon of electromagnetic induction is:
The phenomenon of electromagnetic induction is:
PhysicsGrade-10
Physics
What will happen when a magnet is taken towards a circular coil?
What will happen when a magnet is taken towards a circular coil?
PhysicsGrade-10
Physics
Two solenoids P and Q are taken. The coil in solenoid P is wound over a cylindrical wooden core and the coil in solenoid Q is wound over a soft iron core.
In which solenoid is the magnetic field stronger?
Two solenoids P and Q are taken. The coil in solenoid P is wound over a cylindrical wooden core and the coil in solenoid Q is wound over a soft iron core.
In which solenoid is the magnetic field stronger?
PhysicsGrade-10
Physics
A soft iron bar is inserted inside a current-carrying solenoid. The magnetic field inside the solenoid:
A soft iron bar is inserted inside a current-carrying solenoid. The magnetic field inside the solenoid:
PhysicsGrade-10
Physics
Which of the following has a magnetic field like that of a bar magnet?
Which of the following has a magnetic field like that of a bar magnet?
PhysicsGrade-10
Physics
The magnetic field is not associated with
The magnetic field is not associated with
PhysicsGrade-10
Physics
The magnetic field intensity produced due to a current-carrying coil is maximum at:
The magnetic field intensity produced due to a current-carrying coil is maximum at:
PhysicsGrade-10
Physics
The strength of magnetic field due to a straight current-carrying conductor, at a given distance, increases with increase in the:
The strength of magnetic field due to a straight current-carrying conductor, at a given distance, increases with increase in the:
PhysicsGrade-10
Physics
The magnetic lines of force around a current-carrying straight conductor are in the form of:
The magnetic lines of force around a current-carrying straight conductor are in the form of:
PhysicsGrade-10