Sides And Angles Of A Triangle

Theorem 3

Math

Theorem 3

Prove that: The sum of the lengths of any two sides of a triangle is greater than the length of the third side.

Given: $\triangle ABC$

To prove: $\text{i. }m\angle \overline{AB}+\overline{AC}$ > $m \overline{BC}$
$\text{ii. }m\angle \overline{AB}+\overline{BC}$ > $m \overline{CA}$ $\text{iii. }m\angle \overline{AC}+\overline{BC}$ > $m \overline{AB}$

Construction: Produce $\overrightarrow{BA}$ to $D$ , making $\overline AD \cong \overline{AC}$ Draw $\overline{DC}$ .

Explanation

To prove that the sum of the lengths of any two sides of a triangle is greater than the length of the third side, we start by considering triangle $\triangle ABC$ . First we will extend side $\overline{AB}$ to $D$ such that $\overline{AD}\cong\overline{AC}$ , which implies that $\angle1$ and $\angle2$ are congruent, since they are opposite to these sides.
We also have $\angle BCD = \angle BCA + \angle 1$ . Now, since $\angle BCD$ is an exterior angle of triangle $\triangle ABC$ , it is greater than the non-adjacent interior angle $\angle 1$ . Therefore, we have $\angle BCD$ > $\angle 2$ , by transitivity of inequality.
This implies that in triangle $\triangle BDC$ , the side opposite to the greater angle $\angle BCD$ is longer. Thus, we have $m\overline{BD}$ > $m\overline{BC}$ . However, we know that $\overline{BD}=\overline{AB}+\overline{AD}$ . Substituting the value of $\overline{AD}$ from the construction, we get $\overline{BD}=\overline{AB}+\overline{AC}$ .
Therefore, we have $m\overline{AB}+m\overline{AC}$ > $m\overline{BC}$ , since $m\overline{BD}$ > $m\overline{BC}$ . Similarly, we can show that $m\overline{AB}+m\overline{BC}$ > $m\overline{AC}$ and $m\overline{BC}+m\overline{AC}$ > $m\overline{AB}$ using the same process.
Hence, we have shown that the sum of the lengths of any two sides of a triangle is greater than the length of the third side.