Lines `(x)/(1)=(y-2)/(2)=(z+3)/(3)" and "(x-2)/(2)=(y-6)/(3)=(z-3)/(4)` are

The equation of the plane containing lines (x)/(1)=(y-2)/(2)=(z+3)/(3)" and "(x-2)/(2)=(y-6)/(3)=(z-3)/(4) is

The lines (x-1)/(3)=(y-2)/(4)=(z-3)/(5) and (x-1)/(2)=(y-2)/(3)=(z-3)/(4) are intersecting lines?? Also, give the point of intersection.

The lines (x-1)/(1)=(y-1)/(2)=(z-1)/(3) and (x-4)/(2)=(y-6)/(3)=(z-7)/(3) are coplanar. Their point of intersection is

The lines (x-2)/(1)=(y-3)/(2)=(z-4)/(3) and (x-1)/(-5)=(y-2)/(1)=(z-1)/(1) are

The equation of the plane through the point (2,-1,-3) and parallel to the lines (x-1)/(3)=(y+2)/(2)=(z)/(-4) and (x)/(2)=(y-1)/(-3)=(z-2)/(2) is

The lines (x-2)/(1)=(y-3)/(1)=(z-4)/(-k) and (x-1)/(k)=(y-4)/(2)=(z-5)/(1) are coplanar, if

The lines (x-2)/(1)=(y-3)/(1)=(z-4)/(-k) and (x-1)/(k)=(y-4)/(2)=(z-5)/(1) are coplanar, if

If the lines (x-1)/(2)=(y-1)/(lambda)=(z-3)/(0) and (x-2)/(1)=(y-3)/(3)=(z-4)/(1) are perpendicular, then lambda is

If lines (x+l)/(3)=(y+3)/(5)=(z+5)/(7) and (x-2)/(1)=(y-4)/(3)=(z-6)/(5) are coplanar, then l is equal to