The direction cosines of normal to the plane `barr.(2hati-3hatj+hatk)+9=0`

The direction cosines of any normal to the plane XY-plane are

The direction cosines of the normal to the plane x + 2y - 3z + 4 = 0 are

The direction cosines of the vector 3hati+4hatk are

The line of intersection of the planes barr.(3hati-hatj+hatk)=1" and " barr.(hati+4hatj-2hatk)=2 is parallel to the vector

The distance of the point (2,3,4) from the plane barr*(3hati-2hatj+6hatk)=5 is

If the line barr=hati+lambda(2hati-mhatj-3hatk) is parallel to the plane barr.(mhati+3hatj+hatk)=0 , then m is equal to

The vector equation of the plane passing through the intersection of the planes barr.(hati-hatj+2hatk)=3" and "barr.(3hati-hatj-hatk)=4 is

The vector parallel to the line of intersection of the planes vecr.(3hati-hatj+hatk) = 1 and vecr.(hati+4hatj-2hatk)=2 is : a) -2hati-7hatj+13hatk b) 2hati+7hatj-13hatk c) 2hati+7hatj+13hatk d) -2hati+7hatj+13hatk

The equation of the plane through the intersection of the planes barr*(hati+2hatj+3hatk)= -3,barr*(hati+hatj+hatk)=4 and the point (1,1,1) is