A particle of mass m carrying a charge `-q_(1)` starts moving around a fixed charge `+q_(2)` along a circulare path of radius r. Find the time period of revolution T of charge `-q_(1)`.

A particle of mass m carrying charge '+q_(1)' is revolving around a fixed charge '-q_(2)' in a circular path of radius r. Calculate the period of revolution.

A particle of mass m carrying charge '+q_(1)' is revolving around a fixed charge '-q_(2)' in a circular path of radius r. Calculate the period of revolution.

A particle of mass m carrying charge '+q_(1)' is revolving around a fixed charge '-q_(2)' in a circular path of radius r. Calculate the period of revolution.

A particle of mass m and carrying charge -q_(1) is moving around a charge +q_(2) along a circular path of radius r period of revolution of the charge -q_(1) about +q_(2) is

A particle of charge q_(1) and mass m is revolving around a fixed negative charge of magnitude q_(2) in a circular path of radius r. Find the time period of revolution.

A paritcle of mass m and carrying charge -q_1 is movign around a charge +q_2 along a circular path of radius r. Prove that period of revolution of the charge -q_1 about + q_2 is given by T = sqrt((16 pi^3 upsilon_0 mr^3)/(q_1q_2))

A charged particle of charge q is moved around a charge +q along a circular path of radius 'r' from A to B.The work done is

Charge q_(2) of mass m revolves around a stationary charge q_(1) in a circulare orbit of radius r. The orbital periodic time of q_(2) would be

Charge q_(2) of mass m revolves around a stationary charge q_(1) in a circulare orbit of radius r. The orbital periodic time of q_(2) would be

Charge q_2 of mass m revolves around a stationary charge - q_1 in a circular orbit of radius r. The orbital periodic time of q_2 would be