1. Rigor Classify triangles by their angle measures and side lengths.
Use triangle classification to find angle measures and side lengths.

2. Classifying Triangles Review
By side lengths
Scalene – no sides congruent
Isosceles – at least 2 sides congruent
Equilateral – all 3 sides congruent
By angle measures
Acute – all 3 angles 0o < x < 90o
Obtuse – 1 angle 90o < x < 180o
Right – 1 angle is 90o
Equiangular – all angles are congruent
Remember!
When you look at a figure, you cannot assume segments are congruent based on appearance. They must be marked as congruent.

3. Example 1: Classify BDC, BDA, and ADC by their angle measures.

4. Example 2: Find the side lengths of isosceles JKL and equilateral FGH.

5. Example 3: Application
A steel mill produces roof supports by welding pieces of steel beams into equilateral triangles. Each side of the triangle is 18 feet long. How many triangles can be formed from 420 feet of steel beam?

6. Workbook Examples: Use Pythagorean Theorem to Classify Triangles
Complete example 1 on page 137
Highlight formulas at the bottom of page 137
Complete example 2 on page 138

7. You Try!
Workbook Page 138 Practice Problems #1 & 3
CHANGE DIRECTIONS: Classify triangles by sides AND angles.
You don’t need to calculate perimeter
You must use Pythagorean theorem to justify your answer.

8. 4-2 Honors Assignments
Primary Assignment: join.quizizz.com
Codes:
Period 1: Due Monday
Period 5: Due Monday
Period 6: Due Wednesday
Secondary Assignment:
Textbook pg #9 – 19, 33, 34

9. 4-2 Standard Assignments
Primary Assignment: join.quizizz.com
Codes:
Period 2: Due Tuesday
Period 4: Due Tuesday
Period 7: Due Tuesday
Secondary Assignment:
Textbook pg #9 – 19, 32, 34

10. Rigor Find the measures of interior and exterior angles of triangles.
Apply theorems about the interior and exterior angles of triangles.

11. Highlight this theorem and complete the proof in your workbook on page 142.

12. Example 4: Find mXYZ, mYWZ, and mYXW.

13. Example 5: Astronomy
An asterism is a group of stars that is easier to recognize than a constellation. The Summer Triangle is composed of the stars Deneb, Altair, and Vega.
What is the measure of each angle in the Summer Triangle?

14. A corollary is a theorem whose proof follows directly from another theorem. Here are two corollaries to the Triangle Sum Theorem.

15. Example 6
The measure of one of the acute angles in a right triangle is 63.7°. What is the measure of the other acute angle?

16. Interior Angle Sum Theorem
Divide the polygons into triangles and use the Triangle Angle Sum Theorem to calculate the sum of the interior angles of the polygons.
What equation could be used to calculate the sum of any polygon’s interior angles, given the number of sides n?

17. Read and Highlight important information on workbook page 143, including remote interior angles and the Exterior Angles Theorem.
We will prove the Exterior Angles Theorem together

18. Example 7:
Find mB
Find mACD

20. Example 8: Find mP.

21. 4-3 Assignments
Primary assignment:
Workbook page 145 #2, 5 – 9, 12 (Honors also #4 & 11); page 146 #1 – 4, 7 – 9
Due Wednesday for all classes
Secondary assignment:
Textbook pg 236 #15 – 23, 26