Two rings having masses `M` and `2M` respectively, having the same radius are placed coaxially as shown in the figure. If the mass distribution on both the rings is non-uniform, then the gravitational potential at point `P` isA. `-(GM)/R[1/(sqrt(2))+2/(sqrt(5))]`B. `-(GM)/R[1+2/2]`C. zeroD. cannot be determined from given information

Two rings having masses `M` and `2M` respectively, having the same rad

1.	Two rings having masses `M` and `2M` respectively, having the same radius are placed coaxially as shown in the figure. If the mass distribution on both the rings is non-uniform, then the gravitational potential at point `P` isA. `-(GM)/R[1/(sqrt(2))+2/(sqrt(5))]`B. `-(GM)/R[1+2/2]`C. zeroD. cannot be determined from given information
Answer» Correct Answer - A As all the point on the periphery of either ring are at same distance from point `P`, the potential at point `P` due to whole ring can be calculate as `V=-(GM)//(sqrt(R^(2)+x^(2)))` where `x` is axial distance from the centre of the ring. This expression is independent of the fact whether the distribution of mass is uniform or non-uniform. So, `V` at `P` is `V=-(GM)/(sqrt(2)R)-(Gxx2M)/(sqrt(5)R)` `=-(GM)/R[1/(sqrt(2))+2/(sqrt(5))]`.

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