If two lines intersect, they are both in the same place at the same time, so to speak. We don't know what the point is, but because they both meet at the same point, we can put the equations of the lines equal to each other. This will result in simultaneous equations for the parameters. We solve them, then substitute back in to the lines to find the point.
Example:
and
Find if the lines intersect and if they do intersect, find the coordinates of the point of intersection.
Put
Put each component of
equal to the corresponding component of
We obtain
(1)
(2)
(3)
(2)-(3) gives
Substitute
into (1), (2) or (3) to give t=1.
and
Hence both equations meet at the same point
when
If the lines do not intersect at a point then the two points will not be the same or equivalently there will not be values of s ant t that satisfy all three equations simultaneously.
Example:and
We form the same equations as before and perform (2)-(3) to get
but equation (1) is now
anddo not satisfy this equation so these lines do not intersect.