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7-2: Exploring Dilations and Similar Polygons Expectation: G3.2.1: Know the definition of dilation and find the image of a figure under a dilation. G3.2.2: Given two figures that are images of each other under some dilation, identify the center and magnitude of the dilation.
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Size Changes When we start with one figure and make it bigger or smaller, it is called a size change transformation. The original figure is called the preimage and the resulting figure is called the image.
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The magnitude, k, of a size change is how many times bigger (or smaller) the image is than the preimage.
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Types of Dilations Contraction: reduction: the image is smaller than the preimage: magnitude is greater than 0, but less than 1. Expansion: enlargement: the image is larger than preimage: magnitude is greater than 1.
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Dilations The following terms all indicate a size change: dilation dilitation contraction expansion
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A picture is enlarged by a scale factor of 125% and then enlarged again by the same scale factor. If the original picture was 4” x 6”, how large is the final copy?
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By what scale factor was the original picture enlarged?
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Size Changes With Coordinates To perform a size change of given magnitude on a polygon with known coordinates, multiply the magnitude of the size change by each of the coordinates of the polygon.
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If D(x,y) = (3x,3y), what is the image of the point (-5,8)? What is the scale factor of the dilation?
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A triangle has coordinates A(3,-1), B(4,3) and C(2,5). The triangle will undergo a dilation using a scale factor of 3. Determine the coordinates of the vertices of the resulting triangle.
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Triangle ABC is a dilation of triangle XYZ. Use the coordinates of the 2 triangles to determine the scale factor of the dilation. A(-1, 1), B(-1, 0), C(3,1) X(-3, 3), Y(-3, 0), Z(9, 3)
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Triangle XYZ is a dilation of ΔABC. Use the coordinates of the 2 triangles to determine the scale factor of the dilation. A(-1, 1), B(-1, 0), C(3,1) X(-3, 3), Y(-3, 0), Z(9, 3)
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Size Change Distance Theorem The image of a segment transformed by a dilation with scale factor k is parallel to and |k| times the length of the preimage.
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Before a size change, the slope of AB is 4 and AB = 8. After a size change of magnitude.5, what is the slope of A’B’ and A’B’?
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Center of a Dilation The center of any dilation is where the lines through all corresponding points intersect.
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C C is the center of the dilation mapping ΔXYZ onto ΔLMN Y X Z N M L
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Given two figures which are dilations of each other, how can you find the center of the dilation?
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Determine the center of the dilation.
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Similar Figures Defn: Two figures, F and G, are similar (written F ~ G) iff corresponding angles are congruent and corresponding sides are proportional. Dilations always result in similar figures!!!
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Similar Figures If WXYZ ~ ABCD, then: ∠ W ≅ ∠ A: ∠ X ≅ ∠ B ∠ Y ≅ ∠ C: ∠ Z ≅ ∠ D WX XY YZ WZ AB BC CD AD ===
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If ΔABC is similar to ΔDEF in the diagram below, then m ∠ D = ? A. 80° B. 60° C. 40° D. 30° E. 10° D F E B 80° A C 40°
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Determine whether the triangles are similar. Justify your response! 12 9 5 3.75 13 9.75
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Scale Factor The scale factor (magnitude) between similar figures is the ratio of the lengths of corresponding sides.
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Triangle ABC is similar to triangle DEF. Determine the scale factor of DEF to ABC (be careful – the order is important), then calculate the lengths of the unknown sides. 12 15 y + 3 9 x y - 3 A BC D E F
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In the figure below, ΔABC is similar to ΔDEF. What is the length of DE? A.12 B.11 C.10 D.7⅓ E.6⅔ A 10 B 11 C 12 DF8 E
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Assignment pages 351-353, #13 – 25 (odds), 29 and 41
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