A particle of mass `0.6g` and having charge of `25 n_(C)` is moving horizontally with a uniform velocity `1.2xx10^(4)ms^(-1)` in a uniform magnetic field, then the value of the magnetic induction is `(g=10ms^(-2))`

An electron is moving northwards with a velocity 3*0xx10^7ms^-1 in a uniform magnetic field of 10T directed eastwards. Find the magnitude and direction of the magnetic force on the electron. (e=1*6xx10^(-19)C)

A particle of mass 2 kg chrge 1 mC is projected vertially with velocity k 10 ms^-1 . There is as uniform horizontal electric field of 10^4N//C, then

A particle of mass 0.5 gm and charge 2.5xx10^(-8) coulomb is moving with velocity 6xx10^(4)m//s , horizontally what should be the value of magnetic field acting on it so that the particle is able to move in a straight line - (g=9.8m//s^(2))

A proton enters a magnetic field with a velocity of 2.5 xx10^(7)ms^(-1) making an angle 30^(@) with the magnetic field. The force on the proton is (B=25T)

A charged particle of charge 1 mC and mass 2g is moving with a speed of 5m/s in a uniform magnetic field of 0.5 tesla. Find the maximum acceleration of the charged particle

A particle of mass 1xx 10^(-26) kg and charge +1.6xx 10^(-19) C travelling with a velocity 1.28xx 10^6 ms^-1 in the +x direction enters a region in which uniform electric field E and a uniform magnetic field of induction B are present such that E_x = E_y = 0, E_z= -102.4 kV m^-1, and B_x = B_z =0, B_y = 8X 10^-2. The particle enters this region at time t=0. Determine the location (x,y,z coordinates) of the particle at t= 5xx10^-6 s. If the electric field is switched off at this instant (with the magnetic field present), what will be the position of the particle at t= 7.45xx10^-6 s ?

A charged particle moves with velocity v in a uniform magnetic field vecB . The magnetic force experienced by the particle is