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4.1: Dilations and Similar Triangles Tonight’s Homework: 4.1 Handout

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1 4.1: Dilations and Similar Triangles Tonight’s Homework: 4.1 Handout
WELCOME Chapter 4: Similarity 4.1: Dilations and Similar Triangles Tonight’s Homework: 4.1 Handout

2 Warm Up Solve the proportions: 1. 2.

3 Chapter 4 Learning Targets

4 Ratios a b = a : b Ratio of a to b = *Simplify when possible*
Relationship between two quantities using the same units. *Simplify when possible* a b = a : b Ratio of a to b =

5 The ratio of the lengths for two corresponding sides
Scale Factor The ratio of the lengths for two corresponding sides ABCD ∼ EFGH E 10in F A 5in B 16in 8in D C H G

6 Congruence Vs. Similarity
D A F E C B

7 Dilation Investigation

8 (0,0)

9

10 Transformation Basics
Figures in a plane can be reflected, rotated, or translated to produce new figures. Pre-image: The original figure Image: The new version of the figure after being transformed Transformation: The operation that maps, or moves, the pre-image onto the image

11 Congruence Vs. Similarity
X D A M F E C B Z S P Y

12 A non rigid transformation where the image and preimage are similar
Dilation A non rigid transformation where the image and preimage are similar F k p F C The image is a dilation of the preimage with scale factor k:p from the center C

13 Reduction vs. Enlargement
0 < k < 1 Enlargement: k > 1

14 Requirements For Dilation
Dilation with center C and scale factor K maps point P to P’, and… If P is not on C, then P’ is on CP. Also Scale factor k = (k>0 and k≠1 ) 2. If P is on C, then P=P’ CP’ CP P’ C P P = P’ C

15 The ratio of the lengths for two corresponding sides
Scale Factor The ratio of the lengths for two corresponding sides ABCD ∼ EFGH E 10in F A 5in B 16in 8in D C H G

16 “ABCD is Similar to EFGH”
Similar Polygons Polygons with all corresponding angles ≌ and all sets of sides proportional B If ∠A ≌ ∠E & ∠B ≌ ∠F ∠C ≌ ∠G & ∠D ≌ ∠H Then “ABCD is Similar to EFGH” F A E H G D C ABCD ∼ EFGH

17 Similar Polygons Polygons with all corresponding angles ≌ and all sets of sides proportional A If ∠A ≌ ∠E & ∠B ≌ ∠F ∠C ≌ ∠G Scale Factor = Then “ABC is Similar to EFG” E G F C B ABC ∼ EFG

18 Dilation on Coordinate Plane
When Dilating on the plane w/ (0,0) Multiply both the x and y value by the scale factor (x,y) -> (kx,ky)

19 Equations that equate two ratios are called proportions.
b c d =

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22 Proportion Practice

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25

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27 = = a x x d x a∙b Geometric Mean
Given two numbers ‘a’ & ‘d’ the geometric mean is the value ‘x’ such that… and a x x d x a∙b = =

28

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