For a rigid body angular momentum `vec L` and `vec omega` have same direction.
For rigid body about a symmetrical axis `vec L` and `vec omega` have same direction.

The angular momentum of a rigid body is

If vec c=3vec a+4vec b and 2vec c=vec a-3vec b show that (i)vec c and vec a have the same direction and |vec c|>|vec a|(ii)vec b and vec c have opposite direction and |vec c|>|vec b|

If vec a and vec b are two collinear vectors, then which of the following are incorrect:(A) vec b=lambda vec a , for some scalar lambda (B) vec a=+- vec b (C) the respective components of vec a and vec b are proportional (D) both the vectors vec a and vec b have same direction, but different magnitudes.

Angular momentum of a rigid body rotating about a fixed Axis with angular velocity vec omega

The angular velocity of a rigid body about any point of that body is same :

Figure shows a rigid body that is mirror symmetric about a plane and rotates about an axis perpendicular to that plane. Statement-1: Angular momentum of above mentioned rigid body can be expressed by vec(L)=vec(Iomega) where I is moment of inertia about rotation axis. Statement-2: vec_(L)=I vec(omega) can be applied only for those rigid bodies that have rotational symmetry about an axis and rotate about that symmetry axis.

Two rigid bodies have the same angular momentum about their axes of symmetry. If the same torque is applied about their axes, then the ratio of the time after which they will be stopped

When same torque acts on two rotating rigid bodies to stop them, which have same angular momentum,

A particle having a mass of 10^(-2) kg carries a charge of 5 xx 10^(-8) C . The particle is given an initial horizontal velocity of 10^(5) msec^(-1) in the presence of electric field vec(E) and magnetic field vec(B) . To keep the particle moving in a horizontal direction, it is necessary that A. vec(B) should be perpendicular to the direction of velocity and vec(E) should be along the direction of velocity B. Both vec(B) and vec(E) should be along the direction of velocity C. Both vec(B) and vec(E) are mutually perpendicular and perpendicular to the direction of velocity D. vec(B) should be along the direction of velocity and vec(E) should be perpendicular to the direction of velocity

Two particle are initially moving with angular momentum vec(L)_(1) and vec(L)_(2) in a region of space with no external torque. A constant external torque vec( tau) then acts on one particle, but not on the other particle, for a time interval Delta t . What is the chargne in the total angular momentum of the two particles ?