Find the distance of a point `(2,5,-7)` from the plane `vecr.(6hati-3hatj+2hatk)=4`

Let (P (3,2,6) be a point in space and Q be point on the line vecr = (hati - hatj+ 2hatk) + mu (-3 hati + hatj+ 5 hatk). Then the value of mu for which the vector vec(PQ) is parallel to the plane x - 4y+ 3z =1 is :

Find the distance between the lines vecr=hati+2hatj-4hatk+lambda(2hati+3hatj+6hatk) and vecr=3hati+3hatj-5hatk+mu(2hati+3hattj+6hatk) .

Find the shortest distance betweenn the lines. vecr=hati+hatj+lamda(2hati-hatj+hatk) vecr=2hati+hatj-hatk+mu(3hati-5hatj+2hatk) .

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

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

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