For the line `(x-1)/(1) = (y -2)/(2) = (z-3)/(3),` which one of the following is incorrect ?

The lines (x-2)/(1)=(y-3)/(2)=(z-4)/(0) is

Equation of a plane through the line (x-1)/(2) = (y-2)/(3) = (z-3)/(4) and parallel to a coordinate axis is

The plane containing the line (x-1)/(1) =(y-2)/( 2) =(z-3)/(3) and parallel to the line (x)/(1) =(y)/(1) =(z)/(4) passes through the point

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 point of intersection of the line ( x-1)/( 3) = (y+2)/( 4) = (z-3)/(-2) and plane 2x - y + 3z -1=0 is

The equation of the plane containing the line (x-1)/(2) = (y +1)/(-1) = (z-3)/(4) and perpendicular to the plane x + 2y + z = 12 is

Equation of plane containing the line (x-1)/(-3)=(y-3)/(2)=(z-2)/(1) and the point (0,-3,4) is

If angle theta between the line (x+1)/(1) = (y-1)/(2) = (z-2)/(2) and the plane 2x - y + sqrt lamda z + 4 =0 is such that sin theta = 1/3, the value of lamda is

The line (x-2)/(3) = (y+1)/( 2) = (z-1)/(-1) intersects the curve xy = c ^(2) , z =0 if c =

The line (x+3)/(3)=(y-2)/(-2)=(z+1)/(1) and the plane 4x+5y+3z-5=0 intersect at a point