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Sect. 7.1 Rigid Motion in a Plane

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Presentation on theme: "Sect. 7.1 Rigid Motion in a Plane"— Presentation transcript:

1 Sect. 7.1 Rigid Motion in a Plane
Goal Identify the three basic rigid transformations Goal Use transformations in real-life situations.

2 Identifying Transformations
Transformation – An operation that maps, or moves, one figure onto another. The original figure is called the preimage and the new figure is called the image.

3 Translations Reflections Rotations
Transformations Operation that maps, or moves, a figure (preimage) onto a new figure (image). Translations Reflections Rotations

4 Use the graph of the transformation.
EXAMPLE 1 Naming Transformations Use the graph of the transformation. Name and describe the transformation. Name the coordinates of the vertices of the image. Is ABC congruent to its image?

5 Use the graph of the transformation below.
EXAMPLE 1 Naming Transformations - Practice Use the graph of the transformation below. Name and describe the transformation. Name the coordinates of the vertices of the image. Name two angles with the same measure.

6 Isometry – transformation that preserves lengths.
Identifying Transformations Isometry – transformation that preserves lengths. Isometries also preserve angle measures, parallel lines, and distances between points. Translations, rotations and reflections are all isometries.

7 Which of the following transformations appear to be isometries?
EXAMPLE 2 Identifying Isometries Which of the following transformations appear to be isometries?

8 Identifying Isometries - Practice
EXAMPLE 2 Identifying Isometries - Practice State whether the transformation appears to be an isometry.

9 EXAMPLE 3 Preserving Length and Angle Measure PQR is mapped onto XYZ. The mapping is a rotation. Given that PQR  XYZ is an isometry, find the length of and the mZ?

10 Preserving Length and Angle Measure - Practice
EXAMPLE 3 Find the value of each variable, given that the transformation is an isometry.

11 Preserving Length and Angle Measure - Practice
EXAMPLE 3 Find the value of each variable, given that the transformation is an isometry.

12 Using Transformations in Real Life

13 Challenge: Skills and Applications
Sketch the image of the given triangle after the given transformation. Given the coordinates of the image. (x, y)  (x + 4 , y – 3) (x, y)  (y, – x )

14 Homework even, 36-39

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