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Warm up Rotate P(-4, -4) 180 Rotate Q(-1, -3) 90 CCW

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Presentation on theme: "Warm up Rotate P(-4, -4) 180 Rotate Q(-1, -3) 90 CCW"— Presentation transcript:

1 Warm up Rotate P(-4, -4) 180 Rotate Q(-1, -3) 90 CCW
How many lines of symmetry do the following shapes have?

2 Warm up Part 2 Reflect C(-5, -3) over the y-axis.
Reflect D(2, -4) over the x-axis. Reflect E(-12, 4) over y = -x.

3 Review Homework

4 Skills Check

5 Dilations NOT an isometry.
Dilations are a resizing of the image. They change the lengths of the segments but NOT the ANGLES.

6 Use the given scale factor to find the coordinates of the vertices of the image of the polygon.

7 Use the given scale factor to find the coordinates of the vertices of the image of the polygon.

8 Use the given scale factor to find the coordinates of the vertices of the image of the polygon.

9 Glide Reflections and Compositions

10 Compositions When two or more transformations are combined to produce a single transformation The composition of 2 (or more) isometries is an isometry.

11 Glide Reflections Combining a translation with a reflection
If the line of reflection is parallel to the direction of translation, then it does not matter which you do first. Otherwise, order is important. In the long run, just do the first one first and the second one second.

12 1. Finding the Image of a Composition
Perform the Glide Reflection on A(–3, 5). A’(–6, 2) A’’(2, –6)

13 2. Finding the Image of a Composition
Perform the following composition on C(2, 0), D(3, 3) C’(2, 0), D’(3, –3) C’’(0, –2), D’’(–3, –3)

14 3. Finding the Image of a Glide Reflection
Use the information below to sketch the image of QRS after a glide reflection. Q(2, –3), R(4, –4), and S(5, –1) Q’’(-2, 2), R’’(-4, 1), & S’’(-5, 4)

15 4. Describing the composition
Rotation of 180° around the origin Reflection across y = 1

16 Rotational Symmetry of Objects
What type of rotational symmetry do the figures have? You must determine the number of degrees. Spin it until it looks the same. Count how many times you can do this. Divide 360 degrees by that number.

17

18 Combinations of Transformations Practice WS
Class Work Combinations of Transformations Practice WS

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