A torque of magnitude 2000 Nm acting on a body produces an angular acceleration of `20" rad/s"^(2)`, The moment of inertia of the body is

If a torque of magnitude 100 Nm acting on a rigid body produces an angular acceleration of 2 rad//s^(2) , then the moment of inertia of that body will be

The torque acting is 2000 Nm with an angular acceleration of 2rad//s^(2) . The moment of inertia of body is

A torque of magnitude 400 N.m, acting on a body of mass 40 kg, Produces an angular acceleration of 20 rad/ s^(2) . Calculate the moment of inertia and radius of gyration of the body.

A torque of magnitude 500 Nm acts on a body of mass 16 kg and produces and angular acceleration of "20 rad/s"^(2) . The radius of gyration of the body is

A torque of 2.0 xx 10^(-4) Nm is applied to produce an angular acceleration of 4 "rad s"^(-2) in a rotating body. What is the moment of inertia of the body ?

A toraue of magnitude 4000 N-m, acts on a body of mass 2 kg. If the angular acceleration produced in the body is "20 rad/s"^(2) , then the radius of gyration of the body is

The torque needed to produce an angular acceleration of 18rad/ "sec"^2 in a body of moment of inertia 2.5kg- m^2 would be -

A toruque tau produces an angular acceleration in a body rotating about an axis of rotation. The moment of inertia of the body is increased by 50% by redistributing the masses, about the axis of rotation. To maintain the same angular acceleration, the torque is changed to tau' . What is the relation between tau and tau' ?

A constant torque of 31.4 Nm is applied to a pivoted wheel. If the angular acceleration of the wheel is 2pi" rad/s"^(2) , then its moment of inertia is