A body is displaced from position `(hati+hatj+hatk)` m to position `(4hati+5hatj+6hatk)` m under the action of force `(5hati+4hatj-3hatk)` N. The angle between the force and displcement vector is

A particle moves from position r_1=(3hati+2hatj-6hatk) m to position r_2=(14hati+13hatj+9hatk) m under the action of a force (4hati+hatj-3hatk) N , then the work done is

A particle is displaced from a position 2hati-hatj+hatk (m) to another position 3hati+2hatj-2hatk (m) under the action of a force 2hati+hatj-hatk(N) . The work done by the force is

A body moves from a position vec(r_(1))=(2hati-3hatj-4hatk) m to a position vec(r_(2))=(3hati-4hatj+5hatk)m under the influence of a constant force vecF=(4hati+hatj+6hatk)N . The work done by the force is :

If a=4hati+2hatj-hatk and vecb=5hati+2hatj-3hatk find the angle between the vectors veca+vecb and veca-vecb

A particle moves from position 3hati+2hatj-6hatk to 14hati+13hatj+9hatk due to a uniform force of (4hati+hatj+3hatk)N . If the displacement in meters then work done will be

A particle moves from position 3hati+2hatj-6hatk to 14hati+13hatj+9hatk due to a force vecF=(4hati+hatj+3hatk) N. If the displacement is in centimeter then work done will be

The position vector of a point is (3hati-2hatj+6hatk)m . The i^(th) component of torque of force (2hati+3hatj-6hatk)N acting at the point about origin in (Nm) is

A force acting on a body displaces it from position vector vec(r_(1))=(2hati-hatj+3hatk)m" to "vec(r_(2))=(5hati-2hatj+4hatk)m . Then find the displacement vector.

Angle between the line vecr=(2hati-hatj+hatk)+lamda(-hati+hatj+hatk) and the plane vecr.(3hati+2hatj-hatk)=4 is

Find the projection of vector veca=5hati-hatj-3hatk on the vector vecb=hati+hatj+hatk .