A force `vec(F)=4hati-5hatj+3hatk` is acting a point `vec(r_(1))=hati+2hatj+3hatk`. The torque acting about a point `vec(r_(2))=3hati-2hatj-3hatk` is

What is the torque of force vec F = (2hati -2hatj - 4hatk) N acting at a point vec r = (3hati + 2hatj) m about the origin?

The scalar triple product of the vectors 2hati,3hatj and -5hatk is

Show that vectors veca= 2hati+5hatj-6hatk and vecb=hati+5/2 hatj -3hatk are parallel.

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

The normal from of the vector equation barr.(3hati-2hatj+2hatk)=12 is

Find the scalar produt of the two vectors vecv_1=hati +2hatj+3hatk and vecv_2 =3hati +4hatj-5hatk

Choose the correct options What is the torque of force f=(2i-3j+4k) acting at a point vecr = (3hati + 2hatj + 3hatk) m about origin?

If vecA =5hati +6hatj+4hatk and vecB =2hati-2hatj+3hatk , determine the angle between vecA and vecB

Equation of a line passing through the point with position vector 2hati-3hatj+4hatk and in the direction of the vector 3hati+4hatj-5hatk is

A force oversetrarrF =(4hati + 2hatj -hatk) N acts on a body at a distance of oversetrarrr = (-hati-3hatj + hatk) m from the origin of an inertial reference frame. Find the torque acting on the body.