Similar Polygons Scale Factor Similar Polygons 1 Corresponding

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Similar Polygons & Scale Factor

Similar Polygons & Scale Factor

Similar Polygons 1. Corresponding angles are congruent 2. Corresponding sides are proportional

Similar Polygons 1. Corresponding angles are congruent 2. Corresponding sides are proportional

Similarity Statement ABC ~ DEF

Similarity Statement ABC ~ DEF

Solve for x and y. L A 10 cm B x 24 cm x

Solve for x and y. L A 10 cm B x 24 cm x = 26 cm y C 5 cm S 13 cm T y = 12 cm

ABCD ~ EFGH. Solve for x. G H D C x A 6 B

ABCD ~ EFGH. Solve for x. G H D C x A 6 B x=9 27 E 18 F

Ex. A tree cast a shadow 18 feet long. At the same time a

Ex. A tree cast a shadow 18 feet long. At the same time a person who is 6 feet tall cast a shadow 4 feet long. How tall is the tree?

12/17/2021 Ratio of Similar Polygons Corresponding Sides : Corresponding Sides Or Perimeter : Perimeter

12/17/2021 Ratio of Similar Polygons Corresponding Sides : Corresponding Sides Or Perimeter : Perimeter A: B

12/17/2021 Ratio of Similar Polygons Area : Area 2 A : 2 B

12/17/2021 Ratio of Similar Polygons Area : Area 2 A : 2 B

12/17/2021 Ratio of Similar Polygons Volume: Volume 3 A : 3 B

12/17/2021 Ratio of Similar Polygons Volume: Volume 3 A : 3 B

The ratio of the perimeters of two similar polygons equals the ratio of any

The ratio of the perimeters of two similar polygons equals the ratio of any pair of corresponding sides. The ratio of the perimeters of CAT to A O DOG is 3: 2 y Find the value of y. 6 4 D C 10 G T y=4

Find the perimeter of the smaller triangle. 12 cm 4 cm Perimeter = 60

Find the perimeter of the smaller triangle. 12 cm 4 cm Perimeter = 60 cm Perimeter = x x = 20 cm

Scale Factor – the ratio of a new image to its original image •

Scale Factor – the ratio of a new image to its original image • The ratio of corresponding sides

Scale Factor • When scale factor is greater than 1, the shape gets bigger

Scale Factor • When scale factor is greater than 1, the shape gets bigger (enlargement). • When scale factor is less than 1, but greater than 0, the shape gets smaller (reduction).

SCALE FACTOR. 6 2 original 14 original 6 new 10 7 new 3 5

SCALE FACTOR. 6 2 original 14 original 6 new 10 7 new 3 5

Find the coordinates of the dilation image for the given scale factor, k. Example

Find the coordinates of the dilation image for the given scale factor, k. Example 1: G(0, -2), H(1, 3), and I(4, 1); k = 2 All you do is multiply k to (x, y). G’( 0 , -4), H’( 2 , 6 ), and I’( 8 , 2 )

Find the coordinates of the dilation image for the given scale factor, k. Example

Find the coordinates of the dilation image for the given scale factor, k. Example 2: L(8, -8), N(0, 16), and M(4, 5); k = 1/4 All you do is multiply k to (x, y). L’( 2 , -2 ), N’( 0 , 4 ), and M’( 1 , 5/4)

k = 1/2

k = 1/2

k=2

k=2

Worksheet

Worksheet