A charged particle with charge q enters a region of constant, uniform and mutually orthogonal fields `vecE and vecB` with a velocity `vecv` perpendicular toboth `vecE and vecB`, and comes out without any change in its magnitude or direction. Then

A charged particle with charge q enters a region of constant, uniform and mututally orthogonal fields vec(E) and vec(B) with a velocity vec(v) perpendicular to both vec(E) and vec(B) , and comes out without any change in magnitude or direction of vec(v) . Then

A charged particle having charge q and mass m is projected into a region of uniform electric field of strength vecE_(0) , with velocity vecV_(0) perpendicular to vecE_(0) . Throughout the motion apart from electric force particle also experiences a dissipatice force of constant magnitude qE_(0) and directed opposite to its velocity. If |vecV_(0)|=6m//s , then find its speed when it has turned through an angle of 90^(@) .

A positively charged particle moving due east enters a region of uniform magnetic field directed vertically upwards. The partical will be

A proton of mass m and charge q enters a region of uniform magnetic field of a magnitude B with a velocity v directed perpendicular to the magnetic field. It moves in a circular path and leaves the magnetic field after completing a quarter of a circle. The time spent by the proton inside the magnetic field is proportional to:

A charge particle of mass m and charge q enters in a region of uniform magnetic field as shown in figure.The magnitude of change in linear momentum due to magnetic field will be

A charged particle enters into a uniform magnetic field with velocity v_(0) perpendicular to it , the length of magnetic field is x=sqrt(3)/(2)R , where R is the radius of the circular path of the particle in the field .The magnitude of charge in velocity of the particle when it comes out of the field is

A charged particle of mass m and charge q is projected into a uniform magnetic field of induciton vecB with speed v which is perpendicular to vecB . The width of the magnetic field is d. The impulse imparted to the particle by the field is (dlt lt mv//qB)

A proton with velocity vecv enters a region of uniform magnetic induction vecB , with vecv perpendicular to vecB and describes a circle of radius R. If an alpha - particle enters this region with the same velocity vecv , it describes a circle of radius

A charged particle of mass m and charge q is accelerated through a potential differences of V volts. It enters of uniform magnetic field B which is directed perpendicular to the direction of motion of the particle. The particle will move on a circular path of radius

A charged particle q enters a region of uniform magnetic field B (out of page) and is deflected distance d after travelling a horizontal distance a. The magnitude of the momentum of the particle is