If P (2,3,1) is a point and `L -= x -y -z -2 =0` is a plane then

A ray of light comes along the line L =0 and sirikes the plane mirror kept along the plane P = 0 at B. A (2,1,6) is a point on the line L =0 whose image about P =0 is A'. It is given that L = 0 is (x-2)/(3)= (y-1)/(4) = (z-6)/(5) and P = 0 is x + y - 2z = 3 If L _(1) =0 is the reflected fay, then its equation is

A ray of light comes along the line L =0 and sirikes the plane mirror kept along the plane P = 0 at B. A (2,1,6) is a point on the line L =0 whose image about P =0 is A'. It is given that L = 0 is (x-2)/(3)= (y-1)/(4) = (z-6)/(5) and P = 0 is x + y - 2z = 3 The coordinates of A' are

A ray of light comes along the line L =0 and sirikes the plane mirror kept along the plane P = 0 at B. A (2,1,6) is a point on the line L =0 whose image about P =0 is A'. It is given that L = 0 is (x-2)/(3)= (y-1)/(4) = (z-6)/(5) and P = 0 is x + y - 2z = 3 The coordinates of B are

The reflection of the plane 2x - 3y + 4z - 3=0 in the plane x - y + z -3 =0 is the plane

Equation of a line in the plane pi -= 2x - y + z -4=0 which is perpendicular to the line l whose equation is (x-2)/(1) = (y-2)/(-1) = (z-3)/(--2) and which passes through the point of intersection of l and pi is

The distance from P (1,1,2) to the plane x + 2y + z -1=0 measured parallel to the line (x+1)/(2) = (y)/(1) = z/2 is

The image of the line (x-1)/(3) = (y-3)/(1) = (z-4)/(-5) in the plane 2x - y + z + 3 =0 is the line

The equation of the plane through the line of intersection of the planes x - 2y + 3z - 1=0, 2x + y + z - 2 =0 and the point (1,2,3) is

A plane passes through the point (1,-2,3) and is parallel to the plane 2x - 2y + z=0. The distance of the point (-1, 2, 0) from the plane is