1. Bell Work 1) A) Write a similarity statement for the similar figures below: B) What is the similarity ratio? C) Solve for x and y 2) Simplify the following ratios: A) B) 3) Write a statement of proportionality for the figures below:

2. Agenda 1) Bell Work 2) IP Check 3) Outcomes 6) 8.4 Notes 7) IP – Assessment #11

3. Outcomes I will be able to: 1) Use ratios and proportions to find missing side lengths of similar figures 2) Determine if triangles are similar 3) Use similarity shortcuts to determine if triangles are similar

4. Similar Triangle Activity 1. Look at Triangle ABC and Triangle DEF:  A (1, 1) and D (1, -1)  B (4, 1) E (7, -1)  C (4, 5) F (7, -9) 2. Look at Triangle JKL and Triangle MNO:  J (1, 2) and M (-1, -1)  K (5, 2) N (-3, -1)  L (3, -2) O(-2, -3) 3. Look at Triangle PQR and Triangle STV:  P (-2, 0) and S (-1, 1)  Q (0, 4) T (0, 3)  R (2, 0) V (1, 1) Are these triangles similar? Yes/No Why? Similarity Statement: ____________________ Statement of Proportionality? __________________ What pieces did we need to determine similarity?

5. Results 1. Look at Triangle ABC and Triangle DEF where: A (1, 1) and D (1, -1) B (4, 1) E ((7, -1) C (4, 5) F (7, -9) AB = ______ DE = ______ m ∠ A = ___, m ∠ D= ____ AC = _____ DF = ______ Are these triangles similar? Yes/No Why? Similarity Statement: ____________________ Statement of Proportionality? __________________ What pieces did we need to determine similarity?

6. Results 2. Look at Triangle JKL and Triangle MNO where: J (1, 2) and M (-1, -1) K (5, 2) N (-3, -1) L (3, -2) O (-2, -3) Are these triangles similar? Yes/No Why? Similarity Statement: ____________________ Statement of Proportionality? __________________ What pieces did we need to determine similarity?

7. Results 3. Look at Triangle PQR and Triangle STV where: P (-2, 0)and S (-1, 1) Q (0, 4) and T (0, 3) R (2, 0) and V (1, 1) PQ = ____ ST =_____ QR = ____ TV = ____ RP = _____ VS= ____ Are these triangles similar? Yes/No Why? Similarity Statement: ____________________ Statement of Proportionality? __________________ What pieces did we need to determine similarity?

8. Why? What did we find during this activity? Did we need to look at every single angle and every single side to determine if the triangles were similar? No, so there are triangle similarity shortcuts just as there were triangle congruence shortcuts.

9. Shortcuts Just as when looking at triangle congruence, there are shortcuts to help us determine if triangles are *similar.

10. Similar Triangles If Two angles of one triangle are congruent to two angles in another triangle, then the two triangles are similar. Similarity Statement: Why do we only need two angles?

11. Examples 1) Explain why the triangles are similar and write a similarity statement Angle A is congruent to Angle D Angle C is congruent in both triangles because of vertical angles So, by AA B A C D E

12. Examples 2) Are the following triangles similar? So, yes by the AA similarity postulate Sometimes you may have to solve for a piece that isn’t given to us in order to determine if they are similar. x x + 40 + 88 = 180 x = 52

13. On Your Own 3. Explain why the triangles are similar and write a similarity statement ΔRQP ~ ΔVUP by the AA postulate because: Suppose RP = 15, RQ = 10 and UV = 7 Find VP and RV What is the scale factor? Write a proportion to solve: x 7 10 15

14. Similarity Theorems If all the lengths of the corresponding sides of two triangles are proportional, then the triangles are similar. If an angle of one triangle is congruent to an angle of a second triangle and the lengths of the sides including these angles are proportional, then the triangles are similar 10 14 18 5 7 9 *Check the side ratios: 6 12 8 16 95 ° *Check the side ratios and the angle between them

15. Examples 6 18 4 12 What should we do first? 1. Label everything What do we need to do next? 2. Look at what pieces of each triangle we actually have We have two sides from each so we can compare side ratios So, we know two side ratios are the same. What else do we know? Both triangles have Angle A, so it is congruent So, these triangles are similar by SAS similarity shortcut

16. On Your OWN

17. Examples 60 48 40 52 65 x 1. Label what we know 2. Set up a proportion to find the missing piece. What do we have to make sure we do? Compare pieces of the small triangle with pieces of the big triangle 48x = 4320 x = 90m

18. Examples 1. Label what we know 2. What can we check? ***Be sure to create a proportion in which the corresponding parts line up

19. On Your Own