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 point Q 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

The foot of the perpendicular drawn from (1,4) to a line L is (2,5), then the equation of L is

The foot of the perpendicular from the point (1,2,3) to the line (x)/(2)=(y-1)/(3)=(z-1)/(3) is

Consider the lines L _(1) : (x +1)/( 3) = (y+2)/(1) = (z+1)/(2), L_(2): (x-2)/(1) = (y+2)/(2) = (z-3)/(3) The unit vector perpendicular to both L _(1) and L _(2) is

A straight line L is perpendicular to the line 5x-y=1 . The area of the triangle formed by the line L and coordinate axes is 5. The equation of the line L is

The foot of the perpendicular of the point (3,-1,11) to the line (x)/(2)=(y-2)/(3)=(z-3)/(4) is

Consider the lines L _(1) : (x +1)/( 3) = (y+2)/(1) = (z+1)/(2), L_(2): (x-2)/(1) = (y+2)/(2) = (z-3)/(3) The distance of the point (1,1,1) from the plance passing through the point (-1,-2,-1) and whose normal is perpendicular to both the lines L _(1) and L _(2) is