A point `P` lies on the axis of a fixed ring of mass `M` and radius `a`, at a distance `a` from its centre `C`. A small particle starts from `P` and reaches `C` under gravitational attraction only. Its speed at `C` will be.

A point `P` lies on the axis of a fixed ring of mass `M` and radius `a

1.	A point `P` lies on the axis of a fixed ring of mass `M` and radius `a`, at a distance `a` from its centre `C`. A small particle starts from `P` and reaches `C` under gravitational attraction only. Its speed at `C` will be.
Answer» Correct Answer - `sqrt((2GM)/(a)(1-(1)/(sqrt(2))))` Potential at the axis of ring `V_(p) = -(GM)/(sqrt(R^(2)+x^(2)))` `V_(p)=-(GM)/(sqrt(a^(2)+a^(2))) rArr V_(p) = -(GM)/(sqrt(2)a) rArr V_(0) = -(GM)/(a)` From energy conservation Loss of potential of particle = Gain of kinetic energy. `U_(i)-U_(f)=K_(f)-K_(i)` `-(GMm)/(sqrt(2)a)-(-(GMm)/(a))-(1)/(2)mv^(2) rArr (GM)/(a) (1-(1)/(sqrt(2)))=(v^(2))/(2)` `v^(2) = (2GM)/(a) (1-(1)/(sqrt(2))) rArr v= sqrt((2GM)/(a)(1-(1)/(sqrt(2))))`

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A point `P` lies on the axis of a fixed ring of mass `M` and radius `a`, at a distance `a` from its centre `C`. A small particle starts from `P` and reaches `C` under gravitational attraction only. Its speed at `C` will be.

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