A charged particle of specific charge `alpha` moves with a velocity `vecv=v_0hati` in a magnetic field `vecB=(B_0)/(sqrt2)(hatj+hatk)`. Then (specific charge=charge per unit mass)

A proton is fired from origin with velocity vecv=v_0hatj+v_0hatk in a uniform magnetic field vecB=B_0hatj .

A charged particle of unit mass and unit charge moves with velocity vecv=(8hati+6hatj)ms^-1 in magnetic field of vecB=2hatkT . Choose the correct alternative (s).

A charged particle of unit mass and unit charge moves with velocity vecv=(8hati+6hatj)ms^-1 in magnetic field of vecB=2hatkT . Choose the correct alternative (s).

A charged particle of unit mass and unit charge moves with velocity vecv=(8hati+6hatj)ms^-1 in magnetic field of vecB=2hatkT . Choose the correct alternative (s).

An electron is moving with an initial velocity vecv=v_0hati and is in a magnetic field vecB=B_0hatj . Then its de-Broglie wavelength

A charge q moves with a velocity 2m//s along x- axis in a unifrom magnetic field B=(hati+2hatj+3hatk) tesla.

A charge q moves with a velocity 2m//s along x- axis in a unifrom magnetic field B=(hati+2hatj+3hatk) tesla.

A particle of specific charge 'alpha' is projected from origin at t=0 with a velocity vec(V)=V_(0) (hat(i)-hat(k)) in a magnetic field vec(B)= -B_(0)hat(k) . Then : (Mass of particle =1 unit)

A charged particle of specific charge (charge/mass) alpha released from origin at time t=0 with velocity vec v = v_0 (hat i + hat j) in uniform magnetic field vec B = B_0 hat i. Coordinates of the particle at time t= pi//(B_0 alpha) are