The electric potential at the centre of two concentric half rings of radii and , having the same linear charge density is:
- A
- B
- C
- D
The electric potential at the centre of two concentric half rings of radii and , having the same linear charge density is:
Correct answer:B
Standard Method
Given: Two concentric half rings have radii and and the same linear charge density .
Find: The electric potential at the centre.
The potential at the center due to a half ring is given by:
For two concentric half rings:
Therefore, the correct option is B.
Using contribution of each half ring
Given: Two half rings of radii and carry the same linear charge density .
Find: Net potential at the common centre.
Potential at centre
For a half ring, charge is
So for one half ring,
This result is independent of radius, so both half rings contribute equally:
Hence,
Thus, the electric potential at the centre is .
Using electric field instead of electric potential. At the centre, field contributions depend on direction, but potential is a scalar and adds directly. Compute potential of each half ring separately and then add.
Assuming the answer depends on or . For a half ring, and dividing by in the potential formula cancels the radius. So each half ring contributes the same potential.
Taking the arc length of a half ring incorrectly. The length of a half ring is , not . Using the full circumference gives the wrong charge and hence the wrong potential.
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