The document provides examples of using proportions to solve problems involving similar triangles formed by objects and their shadows. It includes two examples: 1) Finding the length of one side of a similar triangle where the other sides are given. The length is found to be 12 feet. 2) Finding the height of a tree using the height and shadow length of a building and the shadow length of the tree. The height of the tree is found to be 14 feet. It also includes a practice problem to check understanding.
5. Sometimes, distances cannot be measured directly. One way to find such a distance is to use indirect measurement , a way of using similar figures and proportions to find a measure.
6. Additional Example 1: Geography Application Triangles ABC and EFG are similar. Triangles ABC and EFG are similar. Find the length of side EG . B A C 3 ft 4 ft F E G 9 ft x
7. Additional Example 1 Continued = Set up a proportion. Substitute 3 for AB, 4 for AC, and 9 for EF. 3 x = 36 Find the cross products. The length of side EG is 12 ft. x = 12 Triangles ABC and EFG are similar. Find the length of side EG. = = Divide both sides by 3. AB AC EF EG 3 4 9 x 3 x 3 36 3
8. Check It Out! Example 1 Triangles DEF and GHI are similar. Triangles DEF and GHI are similar. Find the length of side HI . 2 in E D F 7 in H G I 8 in x
9. Check It Out! Example 1 Continued = Set up a proportion. Substitute 2 for DE, 7 for EF, and 8 for GH. 2 x = 56 Find the cross products. The length of side HI is 28 in. x = 28 = = Divide both sides by 2. Triangles DEF and GHI are similar. Find the length of side HI . DE EF GH HI 2 7 8 x 2x 2 56 2
10. A 30-ft building casts a shadow that is 75 ft long. A nearby tree casts a shadow that is 35 ft long. How tall is the tree? Additional Example 2: Problem Solving Application The answer is the height of the tree. List the important information: • The length of the building’s shadow is 75 ft. • The height of the building is 30 ft. • The length of the tree’s shadow is 35 ft. 1 Understand the Problem
11. Additional Example 2 Continued Use the information to draw a diagram . Draw dashed lines to form triangles. The building with its shadow and the tree with its shadow form similar right triangles. 2 Make a Plan Solve 3 h 35 feet 75 feet 30 feet
12. 30 75 = h 35 Corresponding sides of similar figures are proportional. 75 h = 1050 Find the cross products. The height of the tree is 14 feet. h = 14 = Divide both sides by 75. Additional Example 2 Continued Solve 3 75h 75 1050 75
13. Since = 2.5, the building’s shadow is 2.5 times its height. So, the tree’s shadow should also be 2.5 times its height and 2.5 of 14 is 35 feet. Look Back 75 30 Additional Example 2 Continued 4
14. A 24-ft building casts a shadow that is 8 ft long. A nearby tree casts a shadow that is 3 ft long. How tall is the tree? Check It Out! Example 2 The answer is the height of the tree. List the important information: • The length of the building’s shadow is 8 ft. • The height of the building is 24 ft. • The length of the tree’s shadow is 3 ft. 1 Understand the Problem
15. Use the information to draw a diagram . Draw dashed lines to form triangles. The building with its shadow and the tree with its shadow form similar right triangles. Check It Out! Example 2 Continued 2 Make a Plan Solve 3 h 3 feet 8 feet 24 feet
16. 24 8 = h 3 Corresponding sides of similar figures are proportional. 72 = 8 h Find the cross products. The height of the tree is 9 feet. 9 = h = Divide both sides by 8. Check It Out! Example 2 Continued Solve 3 72 8 8 h 8
17. Since = , the building’s shadow is times its height. So, the tree’s shadow should also be times its height and of 9 is 3 feet. Look Back 8 24 1 3 1 3 1 3 1 3 Check It Out! Example 2 Continued 4
18. 1. Vilma wants to know how wide the river near her house is. She drew a diagram and labeled it with her measurements. How wide is the river? 2. A yardstick casts a 2 ft shadow. At the same time, a tree casts a shadow that is 6 ft long. How tall is the tree? Lesson Quiz 7.98 m 9 ft w 7 m 5 m 5.7 m