Reflections.

Slides:

Advertisements

Similar presentations

Two or more angles whose measures add up to 90 degrees 30 x.

Advertisements

Rotations. Rotate 90  Clockwise about the Origin (Same as 270  Counterclockwise) Change the sign of x and switch the order.

Warm up 1.A function is even. Point A(-3, 4) is on the even function. Name another point. 2.A function is even. Point B(9, 2) is on the even function.

W arm UP Translate (x – 9, y + 8) 1.B (-9, 12) 2.A (-12, -4) 3.T (22, -19) B’ (-18, 20) A’ (-21, 4) T’ (13, -11)

Warm Up Draw an example of a reflection: Draw an example of a figure that has one or more lines of symmetry: Find the new coordinates of the image after.

Lesson Rotations Standard G.2.4.

Symmetry Reflectional Rotational G. CO. 3 Given a rectangle, parallelogram, trapezoid, or regular polygon, describe the rotations and reflections that.

Line of Symmetry- a line on which a figure can be folded so that both sides match exactly.

Geometric Transformations. Symmetry Rotation Translation Reflection.

5-1: Transformations English Casbarro Unit 5.

Symmetry Rotation Translation Reflection.

GEOMETRY (HOLT 9-5) K. SANTOS Symmetry. A figure has symmetry if there is a transformation (change) of the figure such that the image coincides with the.

Unit 5: Geometric Transformations.

Symmetry Figures are identical upon an operation Reflection Mirror Line of symmetry.

Reflections Students will be able to reflect figures across the x and y axis.

Warm up Translate (x – 9, y + 8) 1.B (-9, 12) 2.A (-12, -4) 3.T (22, -19) B’ (-18, 20) A’ (-21, 4) T’ (13, -11)

Reflections. Reflect across the x-axis Change the sign of the y-value.

Warm up Translate (x – 9, y + 8) 1.B (-9, 12) 2.A (-12, -4) 3.T (22, -19) B’ (-18, 20) A’ (-21, 4) T’ (13, -11)

Warm up What type of transformation is shown? Write the algebraic representation. Write the coordinates of the original triangle after reflection over.

Symmetry TRANSFORMATIONS Rotation Translation Reflection Dilation HOMEWORK: Symmetry WS.

Symmetry Rotation Translation Reflection. Symmetry.

Math 10 Geometry Unit Lesson (1) Properties of a Regular Polygon.

Warm up 1.A function is even. Point A(-3, 4) is on the even function. Name another point. 2.A function is even. Point B(9, 2) is on the even function.

Module 6 Mid-Chapter Test Review. Describe the Transformation from the Given Pre-Image to the Given Image 1. Pre-Image: Shape 1 Image: Shape 4 1. Answer:

REGULAR SHAPE SIDES Lines of Symmetry

Warm up Translate (x – 9, y + 8) 1.B (-9, 12) 2.A (-12, -4) 3.T (22, -19) B’ (-18, 20) A’ (-21, 4) T’ (13, -11)

WARM UP Translate by (x – 9, y + 8) 1.B (-9, 12) 2.A (-12, -4) 3.T (22, -19) B’ (-18, 20) A’ (-21, 4) T’ (13, -8)

Review Homework. EOC Review Question of the Day Reflections.

Lesson 10-5: Transformations 1 Lesson 10-5 Transformations.

Symmetry Rotation Reflection.

7.6 Rotations & Rotational

Find the coordinates of A(3, 2) reflected across the x-axis.

Algebra 4-2 Transformations on the Coordinate Plane

Rotations Teacher Twins©2014.

3.1 Symmetry and Coordinate Graphs

Find the coordinates of A(3, 2) reflected across the x-axis.

R90 (x,y)  Rotate the point (x, y) 90 counterclockwise

Find the coordinates of A(3, 2) reflected in the line y = 1.

Rotations Teacher Twins©2014.

Transformations.

Unit 1 Transformations in the Coordinate Plane

Fill out Translations Portion of Foldable!

Math Topic 15 Congruence and Symmetry

Find the coordinates of A(3, 2) reflected across the x-axis.

Warm up A function is even. Point A(-3, 4) is on the even function. Name another point. A function is even. Point B(9, 2) is on the even function.

Representing and Combining Transformations

Algebraic Representations of Transformations

Mr. Pearson Inman Middle School January 25, 2011

Name each of the following angles in 4 ways

Unit 1 Transformations in the Coordinate Plane

REFLECTION RIGID MOTIONS PT. 2.

Warm up Reflect C(-5, -3) over the y-axis.

Unit 1 Transformations in the Coordinate Plane

Symmetry Rotation Translation Reflection.

Lesson 9.1 – Symmetry and Reflections

Section 4.3 Rotations Student Learning Goal: Students will identify what a rotation is and then graph a rotation of 90, 180 or 270 degrees on a coordinate.

Lesson Rotations Standard G.2.4.

Warm-Ups A _____________ is a change in a figure’s position or size

Unit 1 Transformations in the Coordinate Plane

Transformations.

Warm up B’ (-18, 20) A’ (-21, 4) T’ (13, -11)

Let’s start an intro unit to Geometry!!

TRANSLATE Horizontally -5

Trashketball EOCT Review Unit 5.

Presentation transcript:

Reflections

Reflect across the x-axis

Reflect across the x-axis Change the sign of the y-value

Reflect across the x-axis

Reflect across the y-axis

Reflect across the y-axis Change the sign of the x-value

Reflect across the y-axis

Reflect across y = x

Reflect across y = x Swap x and y

Reflect across y = x

Reflect across y = -x

Reflect across y = -x Swap and change both signs

Reflect across y = -x

Lines of Symmetry A line of symmetry is a line you can use to fold a figure so that both halves match up perfectly. This means the figure is symmetrical (balanced/matching) on both sides of the line.

Lines of Symmetry How many lines of symmetry does the polygon have? 3

Lines of Symmetry How many lines of symmetry does the shape have? 2

Lines of Symmetry How many lines of symmetry does the shape have? 5

Rotations Rotations Link

Rotate 90 Clockwise about the Origin (Same as 270 Counterclockwise) Change the sign of x and switch the order

Rotate 90° clockwise about the origin

Rotate 90° clockwise about the origin

Rotate 180 about the Origin ONLY Change the signs

Rotate 180° about the origin

Rotate 180° about the origin

Rotate 270 Clockwise about the Origin (Same as 90 Counterclockwise) Change the sign of y and switch the order

Rotate 270° clockwise about the origin

Rotate 90° counterclockwise about the origin

Homework Practice Worksheet