Physics
Grade-9
Easy
Question
Which of these is used for the separation of charges to generate electricity?
Hint:
Non-renewable sources are often used to generate electricity.
The correct answer is: ![](data:image/png;base64,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)
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)
Petrol generators are used in the separation of charges to generate electricity.
- Electricity can be produced from various sources that are renewable and non-renewable.
- Non-renewable sources are often used to generate electricity.
- The charges are separated to generate electricity in petrol generators.
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