A particle of specific charge alpha enters a uniform magnetic field `B=-B_0hatk` with velocity `v=v_0hati` from the origin. Find the time dependence of velocity and position of the particle.

A particle of spectfic charge alpha enters a uniform magnetic field B=-B_(0)hatk with velocity V=v_(0)hati from the origin Find the time dependence of velocity and position of the particle

A particle of specific charge alpha is projected from origin with velocity v=v_0hati-v_0hatk in a uniform magnetic field B=-B_0hatk . Find time dependence of velocity and position of the particle.

A particle of specific charge alpha is projected from origin with velocity v=v_0hati-v_0hatk in a uniform magnetic field B=-B_0hatk . Find time dependence of velocity and position of the particle.

A particle of mass m and charge q is projected into a uniform magnetic field underset(B)to=-B_(0)hatK with velocity underset(V)to-V_(0)hati from origin. The position vector of the particle at time t is underset(r)to . Find the impulse of magnetic force on the particle by the time underset(r)to.underset(V)to becomes zero for the first time.

A charge particle enters a magnetic field with velocity v in a direction perpendicular to the field. Find the expression for the redius of the circular path of the particle.

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

A charge praticule of sepeific charge (charge/ mass ) alpha is realsed from origin at time t=0 with velocity v= v_(0)(hati+hatj) in unifrom magnetic fields B= B_(0)hati . Co-ordinaties of the particle at time t = (pi)/(B_(0)alpha) are

A charge praticule of sepeific charge (charge/ mass ) alpha is realsed from origin at time t=0 with velocity v= v_(0)(hati+hatj) in unifrom magnetic fields B= B_(0)hati . Co-ordinaties of the particle at time t = (pi)/(B_(0)alpha) are

Assertion: A charged particle enters in a magnetic field B=B_0hati with velocity v=v_0hati+v_0hatj, then minimum speed of charged particle may be v_0 . Reason: A variable acceleration particle may be v_0 .