Triangle Basics
TipLearning Objectives
- Classify triangles by angles (acute, right, obtuse) and by sides (scalene, isosceles, equilateral).
- Use the Triangle Angle Sum Theorem.
- Identify key terminology: vertices, interior angles, sides.
- Understand properties of special triangles.
Key Ideas
- A triangle has 3 sides, 3 angles, and the sum of its angles is: \[ 180^\circ \]
- Classifications:
By Angles
- Acute: all angles < 90°
- Right: one angle = 90°
- Obtuse: one angle > 90°
By Sides
- Scalene: all sides different
- Isosceles: two sides equal → base angles equal
- Equilateral: all sides equal → all angles 60°

Common Problem Types
Using Angle Sum
Find missing angle using
\[A + B + C = 180^\circ.\]
Classifying by Angles
Given angle measures → determine type.
Classifying by Sides
Given all side lengths → determine type.
Isosceles Base-Angle Properties
Equal sides → equal base angles.
Checking for Valid Triangles
Triangle Inequality:
\[
a + b > c, \; b + c > a, \; a + c > b.
\]
Strategies
- Draw and label triangles before solving.
- Check whether the triangle is isosceles — base angles often match.
- Use the angle sum as the first step in finding missing angles.
Worked Examples
Example 1 — Angle Sum
Angles are 50° and 65°. Find the third angle. \[ 180 - (50 + 65) = 65^\circ \]
Example 2 — Classifying by Sides
Side lengths: 5, 5, 8 → isosceles.
WarningCommon Mistakes
- Forgetting angle sum = 180°.
- Assuming sides are equal without checking.
- Mixing isosceles with equilateral classifications.
- Violating the triangle inequality.
Practice Problems
- Triangle has angles 40°, 70°, and x°. Find x.
- Sides: 6, 7, 10 → classify by sides.
- Sides: 7, 7, 7 → classify fully.
- Angles: 30°, 30°, 120° → classify by angles.
TipStep-by-Step Solutions
- \(180 - 110 = 70^\circ\)
- Scalene
- Equilateral → 60°, 60°, 60°
- One angle > 90° → obtuse
Summary
- All triangle angles sum to 180°.
- Classify by sides and angles separately.
- Isosceles → equal base angles; equilateral → 60° each.
TipQuick Tips
- Always check triangle inequality.
- For isosceles, mark the equal sides immediately.
- Equilateral is always acute.