The correct relation between linear velocity `overset rarr(v)` and angular velocity `overset rarr(omega)` of a particle is

The relation between linear velocity and angular velocity of a body moving in circle in vector from is

Establish a relation between linear velocity and angular velocity in a uniform circular motion and explain the direction of linear velocity

Show that the area of the triangle contained between the vector overset rarr(r ) and overset rarr(b) is one half of the magnitude of overset rarr(a) xx overset rarr(b)

A point mass is projected, making an acute angle with the horizontal. If angle between velocity overset(rarr)v and acceleration overset(rarr)g is theta then theta is given by

In nonuniform circular motion, the linear acceleration vec a , the angular acceleration, vec alpha , the angular velocity vec v the radius vector vec r and the angular velocity vec omega at any instant are related by the vector equation,

The relation between wave velocity and maximum particle velocity is (Where V_(p) = Particle velocity, V = Wave velocity)

The relation between linear speed v, angular speed omega and angular acceleration alpha in circular motion is

Given vector overset(rarr)A=2 hat I +3hatj , the angle between overset(rarr)A and y-axis is :