Find the unit vector perpendicular to the plane `vecr*(2hati+hatj+2hatk)=5`.

Find the direction cosines of the unit vector perpendicular to the plane vecr cdot (6hati- 3hatj -2hatk)=3, passing through origin.

Find the direction cosines of the unit vector perpendicular to the plane vecr cdot (6hati- 3hatj -2hatk)=3, passing through origin.

Find the direction cosines of the unit vector perpendcular to the plane vecr.(2hati+2hatj-3hatk)=5 and vecr.(3hati-3hatj+5hatk)=3

Find the direction cosines of the unit vector perpendcular to the plane vecr.(2hati+2hatj-3hatk)=5 and vecr.(3hati-3hatj+5hatk)=3

Find the direction cosines of the unit vector perpendicular to the plane. vecr(6hati-3hatj-2hatk)+1=0

Find the direction cosines of the unit vector perpendicular to the plane vecr.(2hati+3hatj-6hatk)-21=0 , through the origin.

Find the direction cosines of the unit vector perpendicular to the plane vecr.(6hati-3hatj-2hatk)+1=0 passing through the origin.

Find the direction cosines of the unit vector perpendicular to the plane vecr cdot(6hati-3hatj-2hatk) +1 = 0 passing through the origin.

Find the unit vector perpendicular to the vectors vecA=(hati+2hatj-3hatk)andvecB=(-hati+hatj-hatk)

Find the unit vector perpendicular to the vectors vecA=(hati+2hatj-3hatk)andvecB=(-hati+hatj-hatk)