Proving (BC) by Contradiction

How do we prove that BC is true using a proof by contradiction method?

Proving (BC) by Contradiction

To prove that BC is true using a proof by contradiction method, we start by assuming that BC is not true, i.e., B is connected to some point other than C. Let's name this point as E, so that BE and EC exist.

Next, we consider two triangles ΔADE and ΔBCE. We know that:

  • AD = BC [Given]
  • AE = BE + AD [Triangle inequality]
  • AC = AE + EC [Triangle inequality]
  • BC = EC + BE [Triangle inequality]

By analyzing the relationships between the sides of these triangles and the collinearity of points A, B, and C, we can arrive at a contradiction. This contradiction ultimately proves that BC is indeed true.

← A higher tpi saw blade makes smoother cuts Understanding the traffic signal ahead sign what it indicates →