Unit 1 – Day 2 Introduction to Transformations And Translations

Slides:

Advertisements

Similar presentations

Translations on the Coordinate Plane

Advertisements

Holt Geometry 1-7 Transformations in the Coordinate Plane Warm Up 1.Which describes a translation? a) Turnb) Flipc) Slide 2. Which describes a rotation?

Ms. Taormina Website: staorminaKHS.pbworks.com My Tutoring Hours Tuesdays 3:15pm to 4:15pm Room 2626 Math Department Tutoring.

9.1 – Translate Figures and Use Vectors. Transformation: Moves or changes a figure Preimage: Original figure Image: Transformed figure Isometry: A congruent.

9.1 – Translate Figures and Use Vectors

Transformations on the Coordinate Plane: Translations and Rotations.

GEOMETRY UNIT 1 Transformations.

Introduction The word transform means “to change.” In geometry, a transformation changes the position, shape, or size of a figure on a coordinate plane.

Geometry Unit 1 - Transformations. Welcome to Geometry! As you enter the room, please grab a colored Student Info sheet from the front desk under “Daily.

INTRODUCTION TO TRANSFORMATIONS AND TRANSLATIONS Unit 7 – Day 1.

INTRODUCTION TO TRANSFORMATIONS AND TRANSLATIONS PLEASE COMPLETE THE STUDENT INFORMATION SHEET ON YOUR DESK. Unit 1 – Day 1.

1.4 Rigid Motion in a plane Warm Up

1-7 transformations on the coordinate plane

GEOMETRY – HONORS Ms. Wilson. Welcome to Geometry Honors  My website:  All course information will be posted there.  Check.

Translations Unit 2 Section 1. What is a translation? Moving a shape, without rotating or flipping it. "Sliding". The shape still looks exactly the same,

Chapter Transformations Part 1. Objective: Use a translation, a reflection, and a rotation Describe the image resulting from a transformation.

Introduction to Transformations / Translations. By the end of this lesson, you will know… Transformations in general: A transformation is a change in.

Introduction to Transformations. What does it mean to transform something?

Topic 1: Transformations and Congruence & Geometry Notation

TRANSFORMATIONS in the Coordinate Plane

The original figure is called the preimage.

4.1 Vocabulary Transformation Preimage Image Isometry

Introduction to Transformations & Translations

3B Reflections 9-2 in textbook

Objectives Identify reflections, rotations, and translations.

Math II: Unit 1: Transformations

9-1 Translations.

Do Now A function f(x) is defined as f(x) = −8x2. What is f(−3)?

Geometry Honors Day 2: Reflections

Warm Up Tell whether the ratios form a proportion. Find the missing number.

Transformations Learning Target: I will be able to translate, reflect, rotate, and dilate figures.

Warm Up Suppose triangle ABC has the coordinates A(-1,2), B(4,-3), and C(3,5). Find the coordinates of the image after a translation three units to the.

1.3 RIGID MOTIONS.

Transformations: Translations and Reflections

Graphing & Describing “Translations”

A movement of a figure in a plane.

Warm Up Write one net rule for the following composition of motion:

Chapter 9: Transformation and Congruency

Unit 1: Transformations Day 3: Rotations Standard

TRANSFORMATIONS in the Coordinate Plane

Unit 1 – Day 2 Reflections.

Translations Lesson #4 Pg. 39.

Translations Lesson #4 Pg. 39.

Unit 1 – Day 3 Rotations.

Translations 1 Nomenclature 2 Translations 3 Practice Problems.

Introduction to Course Transformations and Translations

Warm Up Graph each point and label with

Geometry PreAP, Revised ©2013 1–7 and 12–1: Transformations

Reflections in Coordinate Plane

Translation (slide) TRANSLATION a slide without turning.

Warm- Up #2 #1.

Bell work Find the value of the missing length.

Geometry Honors Day 2: Reflections

Transformations Lesson 13.1.

transformations (Reflections)

Welcome to Ms. Samara’s Common Core II Class!

Unit 1: Transformations Day 3: Reflections Honors

Unit 1 – Day 2 Reflections.

Chapter 2: Transformations

Translations on the Coordinate Plane

TRANSFORMATIONS in the Coordinate Plane

Happy Tuesday!!! Take out your homework assignment and be ready to turn it in when the bell rings. Take out paper to write notes.

9.1 Translations By Brit Caswell.

TRANSFORMATIONS in the Coordinate Plane

Translations Lesson #4 Pg. 39.

Maps one figure onto another figure in a plane.

What is the intersection of two planes? What about two lines?

11.2 translations Essential Question: What does it mean to translate a shape?

Warm Up Read the article on page 4 of the scholastic magazine.

Presentation transcript:

Unit 1 – Day 2 Introduction to Transformations And Translations Please complete the student information sheet on your desk.

Warm Up – Matching Card Game Each of you has been handed a card with a figure plotted on a coordinate plane. Find your classmate who has the “matching” figure. Once you find your “match”, sit together and write a quick description of how your figures have been changed. Be as descriptive as possible! WRITE YOUR DESCRIPTIONS ON A PIECE OF NOTEBOOK PAPER TO TURN IN! Solid is original, dotted is the new image. Once all matches have been found, a few will share a few.

Unit 1: Transformations Essential Questions: 1.23.2014 Why are only four types of transformations needed to describe the motion of a figure? How can coordinates be used to describe a sliding motion or translation?

Transformations Definition: A Transformation is a change in the position, size, or shape of a geometric figure.

Think About The Situation – Page 196 B and C only

Investigation In this lesson, you will learn how coordinates can be used to transform shapes. You will investigate coordinate representation of rigid transformations that provide a way to reposition figures in a plane without changing the shape or the size of the figures.

Translation Definition: A Translation (slide) is a transformation that moves points the same distance and in the same direction. A translation in the coordinate plane is described by a vector.

Preimage and Image The preimage is the original figure. Denoted as A The image is the figure after a transformation. Denoted as A’ or “A prime” (This is called Prime Notation)

Group Work A translation, or sliding motion, is determined by distance and direction. By looking carefully at a simple shape and its translated image, you can discover patterns relating the coordinates of the shape and the coordinates of its image. Work with your partner to complete the questions in 15 minutes Problem 2 and 3 in your textbook. Page 198 and 199

Question 2 v

Question 2 v

General Rule Compare the transformation rules you developed for Part d of Problem 2 and for Parts c and e of Problem 3. In pairs, write a general rule that tells how to take any point (x, y) and find its translated image if the preimage is moved horizontally h units and vertically k units. Compare your rule with other pairs and resolve any differences.

**General Rule for Translations** (x, y)  (x + h, y + k) Describes a translation of h horizontal units (+ Right, - Left) k vertical units (+ Up, - Down)

Example Write a description and rule for the following translation *Hint: the Translated Image is Always has the Prime notation

Vector Notation Vector notation is another way to write rules of translations. A vector is written as h = left/right k = up/down

Homework Complete the assigned worksheet on Translations First Test: Friday, 2.7 Project Due: Monday, 2.10