Find the equation of the two lines through the origin which intersects the line `(x-3)/2 = (y-3)/1 = z/1` at angles of `pi/3` each.

Find the equations of the two lines through the origin which intersect the line (x-3)/(2)=(y-3)/(1)=(z)/(1) at angle of (pi)/(3) each.

Find the equation of line through the origin and a point where line (x-1)/2=(y-2)/4=(z-3)/4 . Cuts the z-axis.

Find the equation of the plane passing through (1,2,0) which contains the line (x+3)/3=(y-1)/4=(z-2)/(-2)

Find the equation of the plane passing through (1,2,0) which contains the line (x+3)/3=(y-1)/4=(z-2)/(-2)

Find the equation of the lines through the point (3,2) which make an angle of 45^(@) with the line x-2y=3

Joint equation of two lines through the origin, each making angle of 45^(@) with line 3x-y=0 is

Find the equation of the line through the intersection of the lines 2x-3y+1=0 and x+y-2=0 and drawn parallel to y-axis.

Find the equation of the line through point (1,2,3) and parallel to line x-y+2z5,3x+y+z=6 .

Find the equation of the line passing through A(0,1,2) and perpendicular to line (x-1)/2=(y+1)/2=(z-1)/3