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Similar Triangles Table of Contents Similar Triangles ............................................................................................................................................ 2 Problem 1: Use Similar Triangles - Using Shadow to find Height of Store (Easy) .................................... 5 Problem 2: Use Similar Triangles -Using Mirror to find Height (Medium)............................................... 5 Problem 3: Use Similar Triangles - Using Shadow to find Height of Building (Easy)................................. 6 Answers ......................................................................................................................................................... 7 Geometry 1 Similar Triangles Similar Triangles Similar Triangles have the save shape. Similar Triangles have the same shape, but can be different sizes.Corresponding angles are the same and Corresponding sides are all in the same proportion How to prove if triangles are similar A triangle is defined by six measures (three sides, three angles). Triangles are similar if: AAA (angle angle angle) All three pairs of corresponding angles are the same. SSS in same proportion (side side side) All three pairs of corresponding sides are in the same proportion SAS (side angle side) Two pairs of sides in the same proportion and the included angle equal. Geometry 2 Parallel Theorem: Similar Triangles 1. If two parallel lines are transected by a third, the alternate interior angles are the same size. 2: If two parallel lines are transected by a third, the alternate exterior angles are the same size. 3: If two parallel lines are cut by a transversal, the interior angles on the same side of the transversal are supplementary. Definitions: Transversal is a line that intersects two or more lines (in the same plane). Geometry 3 Similar Triangles Problem: Jack stands 6 feet tall and cast a shadow of 5 feet. The light pole cast a shadow of 30 feet. How tall is the light pole? 6 ft x 5 ft 30 feet 30 ft The two triangles are similar because their angles are equal. Therefore, their sides are proportional. 6/x = 5/30 6 = (1/6)x 36 = x Geometry 4 Similar Triangles Problem 1: Use Similar Triangles - Using Shadow to find Height of Store (Easy) Jackie stands 5 feet tall and cast a shadow of 4 feet. The grocery store cast a shadow of 40 feet. a. How tall is the store? Problem 2: Use Similar Triangles -Using Mirror to find Height (Medium) Buddy is 2 m tall. He is standing in front of a tree. His friend Carol places a mirror on the ground and moves it until Bill can see the top of the tree. The mirror is 3m from Bill and 16m from the tree. a. How tall is the tree? Geometry 5 Similar Triangles Problem 3: Use Similar Triangles - Using Shadow to find Height of Building (Easy) Will stands 7 feet tall and cast a shadow of 6 feet. The school building cast a shadow of 44 feet. a. How tall is the school? Geometry 6 Answers Similar Triangles 1a: 48 feet 2a: 10.67 m 3a: 51.33 feet Geometry 7
