1.

A unit positive point charge of mass m is projected with a velocity V inside the tunnel as shown. The tunnel has been made inside a uniformly charged nonconducting sphere. The minimum velocity with which the point charge should be projected such that it can reach the opposite end of the tunnel is equal to

Answer»

`[ rho R^2// 4m epsilon_0]^(1//2)`
`[rho R^2//24m epsilon_0]^(1//2)`
`[rho R^2//6m epsilon_0]^(1//2)`
zero because the initial and the fianl points are at same potential.

Solution :If we THROW the charged particle just right of the center of the tunnel, the particle will cross the tunnel. Hence, applying conservation of momentum between start point and center of tunnel we get
`Delta K + Delta U = 0`
or `(0 + (1)/(2) mv^2) + q (V_f - V_i) = 0`
or `V_f = (V_s)/(2) (3 - (r^2)/(R^2)) = (rho R^2)/(6 epsilon_0)(3 - (r^2)/(R^2))`
Hence `r = (R)/(2)`
`V_f = (rho R^2)/(6 epsilon_0)(3 - (R^2)/(4 R^2)) = (11 rhoR^2)/(24 epsilon_0) , V_i = (rho R^2)/(3 epsilon_0)`
`(1)/(2) m v^2 = 1[(11 rho ^2 R^2)/(24 epsilon_0) - (rho R^2)/(3 epsilon_0)]= (rho R^2)/(epsilon_0) [(11)/(24) - (1)/(3)] = (rho R^2)/(8 epsilon_0)`
or `V = ((rho R^2)/(4 m epsilon_0))^(1//2)`
Hence velocity should be SLIGHTLY greater than `V`.


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