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Proving Triangles Similar by AA , SAS, & SSS

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Presentation on theme: "Proving Triangles Similar by AA , SAS, & SSS"— Presentation transcript:

1 Proving Triangles Similar by AA , SAS, & SSS
Section 8.2 & 8.3

2 On my website click on Chapter 8 Explorations:
Similarity Links: On my website click on Chapter 8 Explorations: A Similarity - AA Similarity - AAA Similarity - AAS Similarity - ASA Similarity - S Similarity - SA Similarity - SAS Similarity - SS Similarity - SSA Similarity - SSS Similarity - Given: A (Angle) S (Proportional side length) Can you create triangles that are NOT similar? Yes or No A YES AA NO AAA AAS ASA S SA SAS SS SSA SSS Two polygons are considered similar if a) Corresponding sides are proportional b) Corresponding angles are congruent. Student journal Page 228: Copy this table and answer based on your exploration.

3 Target 8C I CAN Prove that two triangles are similar by Angle-Angle Similarity, Side-Angle-Side Similarity, & Side-Side-Side Similarity.

4 Think about it: Are all isosceles triangles similar?
By using the AA similarity exploration, all isosceles triangles are not always similar. Some angles are obtuse and some are acute.

5 Think about it: Are all equilateral triangles similar?
By using the AA similarity exploration, all equilateral triangles are always similar. All the angles are 60o.

6 Why? How do you know that this works?
Student Journal Page 228 Why? How do you know that this works? If two angles of one triangle are congruent to two angles of another triangle, then the two triangles are similar.

7 Student Journal Page 229

8 Student Journal Page 229

9 Why? How do you know that this works?
Student Journal Page 233 Why? How do you know that this works? If the corresponding side lengths of two triangles are proportional, then the triangles are similar.

10 Why? How do you know that this works?
Student Journal Page 234 Why? How do you know that this works? If two sides and an included angle of one triangle are congruent to two sides and an included angle of another triangle, then the two triangles are similar

11 Student Journal Page 234 1) Write the side lengths of the triangles in order from least to greatest. 2.5, 5, 6

12 Student Journal Page 235 Can you think of another method to use? Try and use RT and HK instead …

13 Student Journal Page 235

14 THE END

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