A proton of mass `1.67 × 10^(-27)` kg and charge `1.6 × 10^(-19)`C is shot a uniform magnetic field, and perpendicular to the field with a velocity `5 × 10^(6) m//s`. If the magnetic induction of the field is 1 tesla, find
(ii) The frequency of revolution.

A proton of mass 1.67 xx 10^(-27) kg and charge 1.6 xx 10^(-19) C is shot a uniform magnetic field, and perpendicular to the field with a velocity 5 xx 10^(6) m//s . If the magnetic induction of the field is 1 tesla, find (i) The radius of the circular path

A proton (mass = 1.67xx10^(-27) kg and charge 1.6xx10^(-19) C) enters perpendicular to a magentic field of intensity 2 weber//m^(2) with a speed of 2.6xx10^(7) m//sec . The acceleration of the proton should be

A charge q , and mass m , is fired perpendicular to a magnetic field (B) with a velocity v . The frequency of revolution of the charge is

A particle of mass m = 1.6 X 10^(27) kg and charge q = 1.6 X 10^(-19) C moves at a speed of 1.0 X10^7 ms^(-7) . It enters a region of uniform magnetic field at a point E, as shown in The field has a strength of 1.0 T. (a) The magnetic field is directed into the plane of the paper. The particle leaves the region of the filed at the point F. Find the distance EF and the angle theta. (b) If the field is coming out of the paper, find the time spent by the particle in the regio the magnetic feld after entering it at E .

A particle of mass m=1.6xx10^-27 kg and charge q=1.6xx10^-19C enters a region of uniform magnetic field of stregth 1 T along the direction shown in figure. The speed of the particle is 10^7 m//s a. The magnetic field is directed along the inward normal to the plane of the paper. The particle leaves the region of the fiedl at the point F . Find the distasnce EF and the angle theta. b. If the direction of the field is along the outward normal to the plane of the paper find the time spent by the particle in the regin of the magnetic field after entering it at E .

A particle of mass 6.4xx10^(-27) kg and charge 3.2xx10^(-19)C is situated in a uniform electric field of 1.6xx10^5 Vm^(-1) . The velocity of the particle at the end of 2xx10^(-2) m path when it starts from rest is :