Q is the image of point P(1, -2, 3) with respect to the plane `x-y+z=7`. The distance of Q from the origin is :

Find the image of the point (2,-3,4) with respect to the plane 4x+2y-4z+3=0

Let P be the image of the point (3, 1, 7) with respect to the plane x-y+z=3 . The equation of the plane passing through P and parallel to x-2y+3z=7 is

Let P be the image of the point (3, 1, 7) with respect to the plane x-y+z=3 . Then, the equation of the plane passing through P and containing the straight line (x)/(1)=(y)/(2)=(z)/(1) is

Find the image of the point P (3, 5, 7) in the plane 2x + y + z=0 .

the mirror image of point (3,1,7) with respect to the plane x-y+z=3 is P . then equation plane which is passes through the point P and contains the line x/1=y/2=z/1 .

A plane P = 0 passing through the point (1, 1, 1) is perpendicular to the planes 2x-y+2z=5 and 3x+6y-2z=7 . If the distance of the point (1, 2, 3) from the plane P = 0 is k units, then the value of 34k^(2) is equal to

A plane passes through thee points P(4, 0, 0) and Q(0, 0, 4) and is parallel to the Y-axis. The distance of the plane from the origin is

Find the distance of the plane 2x + 5y + sqrt7z + 12= 0 from the origin.

Show that the relation R in the set A of points in a plane given by R = {(P , Q) : distance of the point P from the origin is same as the distance of the point Q from the origin}, is an equivalence relation. Further, show that the set o

Show that the relation R on the set A of points in a plane, given by R={(P ,\ Q): Distance of the point P from the origin is same as the distance of the point Q from the origin}, is an equivalence relation. Further show that the set of all points related to a point P!=(0,\ 0) is the circle passing through P with origin as centre.