Physics
Grade-7
Easy
Question
There is a coil of wire in an electric iron. This coil of wire is known as
- Spring
- Element
- Component
- Circuit
Hint:
Element
The correct answer is: Element
The coil of wire used in electric iron is called a heating element. The heating coil of the electric iron transfer the electric energy into heat energy which is made up nichrome.
Related Questions to study
Physics
A fuse is used in an electrical circuit to
A fuse is used in an electrical circuit to
PhysicsGrade-7
Physics
Coils of heating devices are made up of
Coils of heating devices are made up of
PhysicsGrade-7
Physics
The heating effect of electric current is used in
The heating effect of electric current is used in
PhysicsGrade-7
Physics
A fuse wire is made up of alloy
A fuse wire is made up of alloy
PhysicsGrade-7
Physics
How many bulbs are there in the given circuit diagram?
![](data:image/png;base64,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)
How many bulbs are there in the given circuit diagram?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
How many resisters are there in the given circuit diagram?
![](data:image/png;base64,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)
How many resisters are there in the given circuit diagram?
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
Nichrome is used as a coil of heater because
Nichrome is used as a coil of heater because
PhysicsGrade-7
Physics
To make a battery of two cells
To make a battery of two cells
PhysicsGrade-7
Physics
Which one of the following devices is based on the heating effect of electric current?
Which one of the following devices is based on the heating effect of electric current?
PhysicsGrade-7
Physics
Key or switch in the circuit is placed
Key or switch in the circuit is placed
PhysicsGrade-7
Physics
Which one of the following devices is not based on the heating effect of electric current?
Which one of the following devices is not based on the heating effect of electric current?
PhysicsGrade-7
Physics
Why are symbols used for electric components?
Why are symbols used for electric components?
PhysicsGrade-7
Physics
Electric voltage is measured by a device
Electric voltage is measured by a device
PhysicsGrade-7
Physics
When two or more cells are joined together, it forms a
When two or more cells are joined together, it forms a
PhysicsGrade-7
Physics
When excess current flows through the wire, it shows
When excess current flows through the wire, it shows
PhysicsGrade-7