If (-2, 6) is the image of the point (4, 2) with respect to the line L = 0, then L =

The image of the point (4, -13) with respect to the line 5x+y+6=0 is :

Find the image of the point (1, 2, 3) with respect to the plane x-3y-4z+6=0

Let the curve C be the mirror image of the variable point (t^2,2t) with respect to the line x+y+4 =0. If A and B are the point of intersection of C with the line y=-5, then the distance between A and B is

Consider the line L : (x-1)/(2) = (y)/(1) = (z+1)/(-2) and a point A (1,1,1). Let P be the foot of the perpendicular from A on L and Q be the image of the point A in the line L, 'O' being the origin. The distance of the point A from the line L is

Consider the line L : (x-1)/(2) = (y)/(1) = (z+1)/(-2) and a point A (1,1,1). Let P be the foot of the perpendicular from A on L and Q be the image of the point A in the line L, 'O' being the origin. The distance of the origin from the plane passing through the point A and containing the line L is

Consider the line L : (x-1)/(2) = (y)/(1) = (z+1)/(-2) and a point A (1,1,1). Let P be the foot of the perpendicular from A on L and Q be the image of the point A in the line L, 'O' being the origin. The distance of the origin from the point Q is

Let L be the line joing the origin to the point of interesection of the lines represecnted by 2x^(2)-3xy-2y^(2)+10x+5y=0 . If L is perpendicular to the line kx+y+3=0, then k=