Rotations Rotations Rotations Rotations Rotations Rotations Rotations Ch 9-3 Rotations Rotations Rotations Rotations
Draw rotated images using the angle of rotation. rotation center of rotation angle of rotation rotational symmetry invariant points direct isometry indirect isometry Identify figures with rotational symmetry. Standard 22.0 Students know the effect of rigid motions on figures in the coordinate plane and space, including rotations, translations, and reflections. (Key) Lesson 3 MI/Vocab
Rotations A transformation in which a figure is turned about a fixed point. The fixed point is the Center of Rotation Rays drawn from the center of rotation to a point and its image form an angle called the Angle of Rotation.
Watch when this rectangle is rotated by a given angle measure. Center of Rotation
Angle of Rotation Hi Center of Rotation
A. For the following diagram, which description best identifies the rotation of triangle ABC around point Q? A. 20° clockwise B. 20° counterclockwise C. 90° clockwise D. 90° counterclockwise A B C D Lesson 3 CYP1
Rotations A composite of two reflections over two intersecting lines The angle of rotation is twice the measure of the angle b/t the two lines of reflection Coordinate Plane rotation Rotating about the origin
Reflections in Intersecting Lines Find the image of parallelogram WXYZ under reflections in line p and then line q. First reflect parallelogram WXYZ in line p. Then label the image W'X'Y'Z'. Next, reflect the image in line q. Then label the image W''X''Y''Z''. Answer: Parallelogram W''X''Y''Z'' is the image of parallelogram WXYZ under reflections in line p and q. Lesson 3 Ex2
In the following diagram, which triangle is the image of ΔABC under reflections in line m and then line n. A. blue Δ B. green Δ C. neither A B C Lesson 3 CYP2
Coordinate Plane Rotation Rotating about the origin Clockwise vs.Counterclockwise 90o Quarter turn 180o Half turn (clockwise or counterclockwise) 270o Three quarter turn Big Hint!!! If you need to rotate a shape about the origin, TURN THE PAPER Write down the new coordinates Turn the paper back and graph the rotated points.
Example #1 Rotate ABC 90o clockwise about the origin. Turn the paper Write the new coordinates C’ B’ A’ (2, 4) B’ (4, 1) C’ (-1, 3) Turn the paper back and graph the rotated points
Example #2 Rotate ABC 180o about the origin. Turn the paper (180o) Write the new coordinates C’ A’ (4, -2) B’ (1, -4) C’ (3, 1) A’ B’ Turn the paper back and graph the rotated points
Rotational Symmetry A figure has rotational symmetry if it can be mapped onto itself by a rotation of 180º or less. Equilateral Triangle Square Most regular polygons A B C D
The equilateral triangle has rotational symmetry of order = 3. There are 3 rotations (<360 degrees) where the triangle maps onto itself. The equilateral triangle has rotational symmetry of order = 3. magnitude of symmetry An equilateral triangle maps onto itself every 120 degrees of rotation.
An regular pentagon has an order of 5. 1 2 3 4 5 1 2 3 4 5 1 2 3 4 5 1 2 3 4 5 1 2 3 4 5 1 2 3 4 5 magnitude of symmetry
Homework Chapter 9-3 Pg 513 3, 4, 9, 13 – 20, 39, 41 – 47
A. Rotate quadrilateral RSTV 45° counterclockwise about point A. Draw a Rotation A. Rotate quadrilateral RSTV 45° counterclockwise about point A. Draw a segment from point R to point A. Use a protractor to measure a 45° angle counterclockwise with as one side. Extend the other side to be longer than AR. Locate point R' so that AR = AR'. Repeat this process for points S, T, and V. Connect the four points to form R'S'T'V'. Lesson 3 Ex1
Draw a Rotation Quadrilateral R'S'T'V' is the image of quadrilateral RSTV under a 45° counterclockwise rotation about point A. Answer: Lesson 3 Ex1
First draw ΔDEF and plot point G. Draw a Rotation B. Triangle DEF has vertices D(–2, –1), E(–1, 1), and F(1, –1). Draw the image of DEF under a rotation of 115° clockwise about the point G(–4, –2). First draw ΔDEF and plot point G. Draw a segment from point G to point D. Use a protractor to measure a 115° angle clockwise with as one side. Draw Use a compass to copy onto Name the segment Repeat with points E and F. Lesson 3 Ex1
Draw a Rotation ΔD'E'F' is the image of ΔDEF under a 115° clockwise rotation about point G. Answer: Lesson 3 Ex1
B. Triangle ABC has vertices A(1, –2), B(4, –6), and C(1, –6) B. Triangle ABC has vertices A(1, –2), B(4, –6), and C(1, –6). Draw the image of ΔABC under a rotation of 70° counterclockwise about the point M(–1, –1). A. B. C. D. A B C D Lesson 3 CYP1