A particle of mass m rotates with a uniform angular speed `omega`. It is viewed from a frame rotating about the Z-axis with a uniform angular speed `omega_0`. The centrifugal force on the particler is

A particle of mass m is observed from an inertial frame of reference and is found to move in a circle of radius r with a uniform speed v. The centrifugal force on it is

When a particle moves in a circle with a uniform speed

A particle moves on a straight line with a uniform velocity. It's angular momentum

As disc is rotating with angular speed omega . If a child sits on it, what is conserved?

Consider the situation shown in the figure of the previous problem. Suppose the wire connecting O and C has zero resistance but circular loop has a resistance R uniformly distributed along its length. The rod OA is made to rotate with a uniform angular speed omega as shown in the figure. Find the current in the rod when ltAOC = 90^@ .

If I, alpha and tau are MI, angular acceleration and torque respectively of a body rotating about any axis with angular velocity omega , then

Consider a non conducting plate of radius a and mass m which has a charge q distributed uniformly over it, The plate is rotated about its own axis with a angular speed omega . Show that the magnetic moment M and the angular momentum L of the plate are related as (M)/(L)=(q)/(2m) .

A particle of mass m is being rotated on a vertial circle of radius r. If the speed of particle at the highest point be v, then