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Before: March 30, 2016 During: Proving Triangles Similar OBJECTIVE: TO USE THE AA ~ POSTULATE AND THE SAS ~ AND SS ~ THEOREMS. TO USE SIMILARITY TO FIND INDIRECT MEASUREMENTS. Postulate 7 – 1 You can show that two triangles are similar when you know the relationships between only two or three pairs of corresponding parts. Angle-Angle Similarity (AA ~) Postulate Postulate If two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar. If… Then… Problem 1: Using the AA ~ Postulate “I Do” Are the two triangles similar? How do you know? A. Triangle RSW and Triangle VSB B. Triangle JKL and Triangle PQR Problem 1: Using the AA ~ Postulate “We Do” Are the two triangles similar? How do you know? Problem 1: Using the AA ~ Postulate “You Do” Are the two triangles similar? How do you know? Theorem 7 – 1 and Theorem 7 - 2 Side – Angle – Side Similarity (SAS ~ ) Theorem Theorem If… Then… If an angle of one triangle is congruent to an angle of a second triangle, and the sides that include the two angles are proportional, then the triangles are similar. Side – Side – Side Similarity (SSS ~ ) Theorem Theorem If the corresponding sides of two triangles are proportional, then the triangles are similar. If… Then… Problem 2: Verifying Triangle Similarity “I Do” Are the triangles similar? If so, write a similarity statement for the triangles. Problem 2: Verifying Triangle Similarity “We Do” Are the triangles similar? If so, write a similarity statement for the triangles. Problem 2: Verifying Triangle Similarity “You Do” Are the triangles similar? If so, write a similarity statement for the triangles. Sometimes you can use similar triangles to find lengths that cannot be measured easily. You can use indirect measurement to find lengths that are difficult to measure directly. One method of indirect measurement uses the fact that light reflects off a mirror at the same angle at which it hits the mirror. Problem 4: Finding Lengths in Similar Triangles “I Do” Before rock climbing, Darius wants to know how high he will climb. He places a mirror on the ground and walks backward until he can see the top of the cliff in the mirror. What is the height of the cliff? Problem 4: Finding Lengths in Similar Triangles “We Do” Benjamin places a mirror 40 ft from the base of an oak tree. When he stands at a distance of 5 ft. from the mirror, he can see the top of the tree in the reflection. If Benjamin is 5 ft. 8 in. tall, what is the height of the oak tree? After: Lesson Check Are the triangles similar? If yes, write a similarity statement and explain how you know they are similar. Are the Triangles Similar? Activity OBJECTIVE: PROVE THAT 2 TRIANGLES ARE SIMILAR USING AA~, SAS~, AND SSS~. Homework: PAGE 455, #8 – 12, 15, AND 16