The distance of the point (2,1,-3) parallel to the vector `(2hati+3hatj-6hatk)` from the plane `2x+y+z+8=0` is

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

Equation of the plane passing through the point (1, -1, 3) , parallel to the vector hati+2hatj+4hatk and perependicular to the plane x-2y+z=6 is given by ax+by+cz+8=0 , then the value of 2a-5b+7c is equal to

Let a plane passing through point (-1 ,1 ,1) is parallel to the vector 2hati+3hatj-7hatk and the line barr=(hati-2hatj-hatk)+lamda(3hati-8hatj+2hatk) . The vector equation of plane is

Find the equation of the plane through the point (3,4,-5) and parallel to the vectors 3hati+hatj-hatk and hati-2hatj+hatk .

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

The distance from the point -hati+2hatj+6hatk to the straight line through the point (2,3,-4) and parallel to the vector 6hati+3hatj-4hatk , is

The distance of the point having position vector -hati+ 2 hatj + 6 hatk from the straight line passing through the point (2,3,-4) and parallel to the vector, 6 hati+ 3 hatj -4 hatk is :