A solid sphere of radius $R$ carries a charge $(Q+q)$ distributed uniformly over its volume. A very small point like piece of it of mass $m$ gets detached from the bottom of the sphere and falls down vertically under gravity. This piece carries charge $q.$ If it acquires a speed $v$ when it has fallen through a vertical height $y$ (see figure), then :

(assume the remaining portion to be spherical).

Q: A solid sphere of radius $R$ carries a charge $(Q+q)$ distributed uniformly over its volume. A very small point like piece of it of mass $m$ gets detached from the bottom of the sphere and falls down vertically under gravity. This piece carries charge $q.$ If it acquires a speed $v$ when it has fallen through a vertical height $y$ (see figure), then : (assume the remaining portion to be spherical).

a $\frac{ kQq }{ R }+ mgy$ $=\frac{ kQq }{ R + y }+\frac{1}{2} mv ^{2}$ $v ^{2}=2 gy +\frac{2 kQqy }{ mR ( R + y )}$

Question

A solid sphere of radius $R$ carries a charge $(Q+q)$ distributed uniformly over its volume. A very small point like piece of it of mass $m$ gets detached from the bottom of the sphere and falls down vertically under gravity. This piece carries charge $q.$ If it acquires a speed $v$ when it has fallen through a vertical height $y$ (see figure), then :

(assume the remaining portion to be spherical).

A$v^{2}=2 y\left[\frac{q Q}{4 \pi \in_{0} R(R+y) m}+g\right]$
B$v^{2}=y\left[\frac{q Q}{4 \pi \in_{0} R^{2} y m}+g\right]$
C$v^{2}=2 y\left[\frac{q Q R}{4 \pi \in_{0}(R+y)^{3} m}+g\right]$
D$v^{2}=y\left[\frac{q Q}{4 \pi \in_{0} R(R+y) m}+g\right]$

JEE MAIN 2020, Diffcult

Download our app
and get started for free

Similar Questions

Download our appand get started for free

Similar Questions

Download our app
and get started for free