The vector equation of the plane which is at a distance of `3//sqrt(14)` from the origin and the normal from the origin is `2hati-3hatj+hatk` is

The vector equation of the plane which is at a distance (3)/(sqrt(14)) from the origin and the normal from the origin is 2hati + -3hatj + hatk is

Find the vector equation of a plane which is at a distance of 8 units from the origin and which is normal to the vector 2 hat i+ hat j+2 hat kdot

Find the vector and cartesian equations of the plane that passes through the points (1,4,6) and the normal vector to the plane is hati-2hatj+hatk .

Find the distance of A(2 +sqrt(3),2-sqrt(3)) from origin .

Find the magnitude of vector vecA=2hati-3hatj+4hatk

Find the torque of a force 7hati + 3hatj – 5hatk about the origin. The force acts on a particle whose position vector is hati – hatj + hatk .

A force vecF=(5hati+3hatj+2hatk)N is applied over a particle which displaces it from its origin to the point vecr=(2hati-hatj) m. The work done on the particle in joules is :

Find the projection of the vector hati+3hatj+hatk on the vector 7hati-hatj+8hatk

The position vectors of the points P and Q with respect to the origin O are veca = hati + 3hatj-2hatk and vecb = 3hati -hatj -2hatk , respectively. If M is a point on PQ, such that OM is the bisector of POQ, then vec(OM) is