4.1. Triangle Sums http://www.ck12.org
Triangle Sum Theorem:The interior angles of a triangle add up to 180◦.
Example 1:What is them^6 T?
Solution:From the Triangle Sum Theorem, we know that the three angles add up to 180◦. Set up an equation to
solve for^6 T.
m^6 M+m^6 A+m^6 T= 180 ◦
82 ◦+ 27 ◦+m^6 T= 180 ◦
109 ◦+m^6 T= 180 ◦
m^6 T= 71 ◦Investigation 4-1 is one way to show that the angles in a triangle add up to 180◦. However, it is not a two-column
proof. Here we will prove the Triangle Sum Theorem.
Given: 4 ABCwith
←→
AD||BC
Prove:m^61 +m^62 +m^63 = 180 ◦
TABLE4.1:
Statement Reason- 4 ABCabove with
←→
AD||BC Given2.^61 ∼=^64 ,^62 ∼=^65 Alternate Interior Angles Theorem
3.m^61 =m^64 ,m^62 =m^65 ∼=angles have = measures
4.m^64 +m^6 CAD= 180 ◦ Linear Pair Postulate
5.m^63 +m^65 =m^6 CAD Angle Addition Postulate
6.m^64 +m^63 +m^65 = 180 ◦ Substitution PoE
7.m^61 +m^63 +m^62 = 180 ◦ Substitution PoE
Example 2:What is the measure of each angle in an equiangular triangle?