Two electromagnetic waves are moving in ...

Two electromagnetic waves are moving in free space whose electric field vectors are given by `vecE_1 =vecE_0 hatjcos(kx -omegat)` & `vecE_2 = vecE_0 hatk cos(ky -omegat)`. A charge `q` is moving with velocity `vecv = 0.8 c hatj`. Find the net Lorentz force on this charge at `t = 0` and when it is at origin

Similar Questions

Explore conceptually related problems

Electric field strength vecE = E_0 hati and vecB = B_0 hati exists in a region. A charge is projected with a velocity vecv = v_0 hatj origin, then

In an electromagnetic wave the electric field vector and magnetic field vector are given as vecE=E_(0)hati and vecB=B_(0)hatk respectively. The direction of propagation of electromagnetic wave is along:

The electric field of a plane electromagnetic wave is given by vecE=E_(0)(hatx+haty)sin(kz-omegat) Its magnetic field will be given by :

The electric field of a plane electromagnetic wave propagating along the x direction in vacuum is vecE = E_0 hatj cos (omegat - kx) . The magnetic field vecB , at the moment t=0 is :

Electric field in space is given by vec(E(t)) = E_0 (i+j)/sqrt2 cos(omegat+Kz) . A positively charged particle at (0, 0, pi/K) is given velocity v_0 hatk at t = 0. Direction of force acting on particle is

The space has electromagnetic field which is given as vecB= -B_(0)hatk and vecE=E_(0)hatk . A charged particle having mass m and positive charge q is given velocity v_(0)hati at origin at t=0sec . The z coordinate of the particle when it passes through the z- axis is (neglect gravity through motion)

Similar Questions

Recommended Questions