chapter 9
DESCRIPTION
Chapter 9. Transformations. 4.8 Transformations. An operation that moves or changes a geometric figure (a preimage ) in some way to produce a new figure (an image). Congruence transformations. changes the position of the figure without changing the size or shape. A Translation. - PowerPoint PPT PresentationTRANSCRIPT
Chapter 9Transformations
An operation that moves or changes a geometric figure (a preimage) in some way to produce a new figure (an image).
4.8 Transformations
changes the position of the figure without changing the size or shape.
Congruence transformations
moves every point of a figure the same distance in the same direction.
Coordinate notation: (x , y) (x + a, y + b)
A Translation
The vertices of ABC are A(4, 4), B(6, 6), and C(7, 4). The notation (x, y) → (x + 1, y – 3) describes the translation of ABC to DEF.
What are the vertices of DEF?
Example
Uses a line of reflection to create a mirror image of the original figure.
Coordinate notation for reflection in the x-axis : (x ,y) (x , -y)
Coordinate notation for reflection in the y- axis: (x , y) (-x, y)
A Reflection
Reflect a figure in the x-axis
Example
Turns a figure about a fixed point called the center of rotation
Rotation
Graph AB and CD. Tell whether CD is a rotation of AB about the origin. If so, give the angle and direction of rotation.
A(–3, 1), B(–1, 3), C(1, 3), D(3, 1)
Examples
Tell whether PQR is a rotation of STR. If so, give the angle and direction of rotation.
Name the type of transformation demonstrated in each picture.
a. b.
Name the type of transformation shown.
A transformation that stretches or shrinks a figure to create a similar figure.
A figure is reduced or enlarged with respect to a fixed point called the center of dilation.
6.7 Dilations
The scale factor of a dilation is the ratio of the side length of the image to the corresponding side length of the original figure
Coordinate notation for a dilation with respect to the origin: (x ,y) ( kx, ky)
Reduction: 0 < k < 1 Enlargement : k > 1
Draw a dilation of quadrilateral ABCD with vertices A(2, 1), B(4, 1), C(4, – 1), and D(1, – 1). Use a scale factor of 2.
Examples
Translation Theorem: A translation is an isometry.
Isometry- a congruence transformation Preimage- original figure Image- new figure
9.1 Translating Figures and Using Vectors
Write a rule for the translation of ABC to A′B′C′. Then verify that the transformation is an isometry.
Name the vector and write its component form.
a.
The vertices of ∆LMN are L(2, 2), M(5, 3), and N(9, 1). Translate ∆LMN using the vector –2, 6.
A boat heads out from point A on one island toward point D on another. The boat encounters a storm at B, 12 miles east and 4 miles north of its starting point. The storm pushes the boat off course to point C, as shown.
Write the component form of AB, BC, and CD.
Matrix- a rectangular arrangement of numbers in rows and columns
Element- each number in the matrix Dimensions- row x column
9.2 Using Properties of Matrices
A reflection in a line (m) maps every point (P) in the plane to a point (P`) so that for each point, one of the following is true:
9.3 Performing Reflections
m m
P̀
P
P`
P
If (a,b) is reflected in the x-axis, its image is (a,-b).
If (a,b) is reflected in the y-axis, its image is (-a,b).
If (a,b) is reflected in the line y = x, its image is (b,a).
If (a,b) is reflected in the line y = -x, its image is (-b,-a).
Rules for Reflections
Examples6
4
2
-2
-4
-6
-10 -5 5 10
You and a friend are meeting on the beach shoreline. Where should you meet to minimize the distance you must both walk?
6
4
2
-2
-4
-6
-10 -5 5 10
Find the reflection of PQR in the x- axis using in matrix multiplication.
P(-3,6) Q(-5,3) R(-1,2)
A rotation is an isometry Center of rotation- a fixed point in which a
figure is turned about Angle of Rotation- the angle formed from
rays drawn from the center of rotation to a point and its image
9.4 Performing Rotations
These rules apply for counterclockwise rotations about the origin
a 90o rotation (a,b) (-b,a) a 180o rotation (a,b) (-a,-b) a 270o rotation (a,b) (b,-a)
Rules for Rotations
Examples6
4
2
-2
-4
-6
-10 -5 5 10
Composition of Transformation- 2 or more transformations are combined to form a single transformation
The composition of 2 (or more) isometries is an isometry.
9.5 Applying Compositions of Transformations
Glide Reflection Example6
4
2
-2
-4
-6
-10 -5 5 10
Example6
4
2
-2
-4
-6
-10 -5 5 10
Reflections in Parallel Lines Theorem
mk
Example
mk
Reflection in Intersecting Lines Theorem
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