1. 8.3 Similar Polygons

2. Identifying Similar Polygons

3. Similar polygons If ABCD ~ EFGH, then A B C D E F G H *Statement of Proportionality— a proportion extended to show the ratios of all corresponding sides. *

4. Similar polygons Given ABCD ~ EFGH, solve for x. A B C D E F GH 2 4 6 x 2x = 24 x = 12

5. Is ABC ~ DEF? Explain. A B C D E F 10 12 13 5 6 7 ?? yes no ABC is not similar to DEF since corresponding sides are not proportional.

6. Similar polygons Given ABCD ~ EFGH, solve for the variables. A B C D E F GH 2 6 5 x 10 y 2:6 as 5:x as 10:y 2/6 = 5/x2/6 = 10/y 30 = 2x60= 2y X = 1530 = y

7. If two polygons are similar, then the ratio of the lengths of two corresponding sides is called the scale factor. Ex: Scale factor of this triangle is 1:2 3 6 9 4.5 3/6 or 4.5/9 = 1/2

8. Quadrilateral JKLM is similar to PQRS. Find the value of z. J KL M P Q R S 10 15 z 6 15z = 60 z = 4

9. Theorem If two polygons are similar, then the ratio of their perimeters is equal to the ratios of their corresponding side lengths. If KLMN ~ PQRS, then Ratio of Perimeters Statement of Proportionality

10. Given ABC ~ DEF, find the scale factor of ABC to DEF and find the perimeter of each polygon. A B CD E F 4 6 10 8 12 20 CORRESPONDING SIDES 4 : 8 1 : 2 P = 4 + 6 + 10 = 20 P = 8 + 12 + 20 = 40

11. Homework 8.3 B—6 – 13 All; C—1-15 All.