1. Chapter 8
Similarity

2. Section 5 Proving Triangles are Similar

3. How many attending retreat tomorrow?
Look to the class blackboard for solutions to today’s exit ticket. It will help you with the quiz.
End of quarter is fast approaching. No late work after Friday 3/8.

5. Example 2: Proving that Two Triangles are Similar Color variations in the tourmaline crystal shown lie along the sides of isosceles triangles. In the triangles each vertex angle measures 52°. Explain why the triangles are similar.
The vertex angle measures 52 ° and each triangle is isosceles.
Recall the base angles of an isosceles triangle are congruent.
If the angles at the vertex of each isosceles triangle
are congruent, then the triangles are similar.
In this case 180 – 52 = 128. Remaining angles are 128/2 = 64 °.

7. https://youtu.be/zbjwY1Zz4jo
How?

8. Example 5: Using Scale Factors Find the length of the altitude QS.
∆𝑵𝑷𝑸 ~ ∆ 𝑻𝑸𝑷
∠ RQT ≅∠PQN - vertical angles and
∠NPQ ≅ ∠TQR - opposite angles (MS is perpendicular to
Both NP and TR so the segments are parallel)
By AA ∆𝑵𝑷𝑸 ~ ∆ 𝑻𝑸𝑷
The triangles are similar so the ratio of MQ:QS is proportional to the ration NP:TR.
𝟏𝟐+𝟏𝟐 𝟖+𝟖 = 𝟐𝟒 𝟏𝟔 = 𝟑 𝟐
therefore 𝑴𝑸 𝑺𝑸 = 𝟑 𝟐
𝟔 𝑺𝑸 = 𝟑 𝟐 means SQ = 4

9. GOAL 1: Using Similarity Theorems

11. Example 1: Proof of Theorem 8.2
. PQ Divides RST into two similar triangles. PSQ is congruent to LMN. So LMN ~ RST

12. Example 2: Using the SSS Similarity Theorem Which of the following three triangles are similar?
ABC and FED 12/8 = 9/6 = 6/4 = 3/2

13. Example 3: Using the SAS Similarity Theorem Use the given lengths to prove that ∆𝑅𝑆𝑇 ~ ∆𝑃𝑆𝑄.
SAS: angle S and RS proportional to PS, TS to QS 16/4 = 20/5 = 4

14. GOAL 2: Using Similar Triangles in Real Life Example 4: Using a Pantograph

15. Example 4: Using a Pantograph (continued) a) How can you show that ∆𝑃𝑅𝑄 ~ ∆𝑃𝑇𝑆? b) In the diagram, PR is 10 inches and RT is 10 inches. The length of the cat, RQ, in the original print is 2.4 inches. Find the length of TS in the enlargement.

16. Example 5: Finding Distance Indirectly

17. Example 6: Finding Distance Indirectly
RST ~ RPQ by AA so ST/PQ = TR/QR
QR is distance across river
9/63 = 12/ QT
9QR = 12 x 63
QR = 84
You WILL see this type of problem again

18. .
∆ABC has sides of lengths 4, 2, and 7. The ratios of the lengths of ∆DEF are 6:3:21. Are the triangles similar?
In other words, does 4/6 = 2/3 = 7/21?
You WILL see this type of problem again

19. EXIT SLIP
Now you try with exit slip, Quiz tomorrow