If angular velocity of a point object is `vecomega=(hati+hat2j-hatk)` rad/s and its position vector `vecr=(hati+hatj-5hatk)`m then linear velocity of the object will be

For a body, angular velocity (vecomega)=hati-2hatj+3hatk and radius vector (vecr)=hati+hatj+hatk , then its velocity:

For a body, angular velocity vecomega= hati-2hatj+3hatk and radius vector vecr=hati+hatj+hatk , then its velocity (vecv= vecomega xx vecr) is :

The angular velocity of a particle is vec(w) = 4hati + hatj - 2hatk about the origin. If the position vector of the particle is 2hati + 3hatj - 3hatk , then its linear velocity is

If angular velocity of a particle having position vector vec r = (2hati - 2hatj + 2hatk)m about the origin is vec w = (2hati - 2hatj - hatk)rad/s then magnitude of linear velocity of the particle will be

Find the torque of a force vecF=3hati+4hatj+5hatk N about a point O , whose position vector is vecr = hati+hatj+hatk m .

The angular velocity of a body is vecomega=3hati+5hatj+6hatk("radian"//s) . A torque vectau=hati+2hatj+3hatk(Nm) acts on it. The rotational power (in watt) is

If vecomega=2hati-3hatj+4hatk and vecr=2hati-3hatj+2hatk then the linear velocity is