There is an infinite line of uniform linear density of charge `+lamda`. A particle of charge `-q` and mass 'm' is projected with initial velocity `v_(0)` at an angle `theta` with the line of charge at a distance 'a' from it. The speed of the particle is found to be minimum when its distance from the line of charge is `ae^((n pi mepsilon_(0)v_(0)^(2)sin^(2)theta//q lamda))`. Find the value of `n`. Neglect gravity

There is an infinite line of uniform linear density of charge +lamda . A particle of charge -q & mass m is projected with initial velocity v_(0) at an angle theta with the line of charge from a distance a from it. The point charge moves in plane containing line charge and point of projection The speed of the particle of found to be minimum when it's distance from the line of charge is ae^((npimepsilon_(0)^(2)//qlamda)) . The value of n is (ingnore gravity)

A particle of charge q is projected from point P with velocity v as shown. Choose the correct statement from the following.

Two infinite long wires, each carrying current I, are lying along x- and y-axis, respectively. A charged particle, having a charge q and mass m, is projected with a velocity u along the straight line OP. The path of the particle is (neglect gravity)

A particle of charge q and mass m is moving with a velocity -v hati (v ne0) towards a large screen placed in the Y-Z plane at a distance d. If there is a magnetic field vecB = B_0 hatk , the minimum value of v for which the particle will not hit the screen is :

A particle of mass 100 gm and charge 2muC is released from a distance of 50 cm from a fixed charge of 5muC . Find the speed of the particle when its distance from the fixed charge becomes 3 m.

In the figure shown there is a large sheet of charge of uniform surface charge density 'sigma' .A charge particle of charge '-q' and mass 'm' is projected from a point A on the sheet with a speed 'u' with the angle of projection such that it lands at maximum distance from A on the sheet. Neglecting gravity, find the time flight

A particle of charge q and mass m is projected from the origin with velocity v=v_0 hati in a non uniformj magnetic fiedl B=-B_0xhatk . Here v_0 and B_0 are positive constants of proper dimensions. Find the maximum positive x coordinate of the particle during its motion.

A long straight wire carries a charge with linear density lamda . A particle of mass m and a charge q is released at a distance r from the the wire. The speed of the particle as it crosses a point distance 2r is

A positive charge is released from rest at a distance r_(0) from a positive line charge with uniform density . The speed (v) of the point charge , as a function of instantaneous distance r from line charge, is proportional to:

A charge particle of mass m and charge q is projected with velocity v along y-axis at t=0. Find the velocity vector and position vector of the particle vec v (t) and vec r (t) in relation with time.