Symmetry Two points, P and P ₁, are symmetric with respect to line l when they are the same distance from l, measured along a perpendicular line to l.

Slides:

Advertisements

Similar presentations

Checking an equation for symmetry

Advertisements

Graphs & Models (P1) September 5th, I. The Graph of an Equation Ex. 1: Sketch the graph of y = (x - 1)

Sullivan Algebra and Trigonometry: Section 2.2 Graphs of Equations Objectives Graph Equations by Plotting Points Find Intercepts from a Graph Find Intercepts.

Copyright © 2012 Pearson Education, Inc. Publishing as Prentice Hall. Section 1.2 Graphs of Equations In Two Variables; Intercepts; Symmetry.

2.2 Graphs of Equations in Two Variables Chapter 2 Section 2: Graphs of Equations in Two Variables In this section, we will… Determine if a given ordered.

Graphs of Polar Coordinates Sections 6.4. Objectives Use point plotting to graph polar equations. Use symmetry to graph polar equations.

Section 6.4 Use point plotting to graph polar equations.

Section 1.1 The Distance and Midpoint Formulas. x axis y axis origin Rectangular or Cartesian Coordinate System.

8.2 Symmetry Graphing Nonlinear Equations BobsMathClass.Com Copyright © 2010 All Rights Reserved. 1 y-axis Symmetry (figure a) A line or curve drawn on.

Symmetry Viviana C. Castellón East Los Angeles College MEnTe Mathematics Enrichment through Technology.

3.1 Symmetry & Coordinate Graphs

Symmetry Viviana C. Castellón East Los Angeles College MEnTe Mathematics Enrichment through Technology.

Symmetries of Graphs of Equations in x and y

Distance and Midpoint Graphing, Symmetry, Circles Solving.

Determine whether a graph is symmetric with respect to the x-axis, the y-axis, and the origin. Determine whether a function is even, odd, or neither even.

Symmetry and Coordinate Graphs Symmetry and Coordinate Graphs Section 3-1 How do we determine symmetry using algebra? How do we classify functions as even.

2.2: Do Now: Determine if the following point is on the graph. 1.) 2.)

Intercepts y-intercept: where the graph crosses the y-axis. Algebraically – set x=0 x-intercept: where the graph crosses the x-axis. Algebraically – Set.

Copyright © 2009 Pearson Education, Inc. CHAPTER 2: More on Functions 2.1 Increasing, Decreasing, and Piecewise Functions; Applications 2.2 The Algebra.

Transformation a change of position, shape or size of a figure Three types of transformation A slide called a translation A flip, called a reflection The.

Lesson 9.9 Line Reflections and Symmetry. Line of Symmetry Divides the figure in two congruent halves.

Getting started.

HPC 1.3 Notes Learning Targets: - Test an equation for symmetry with respect to: x-axis, y-axis, or origin - Know how to graph key equations - Write the.

3.1 Symmetry; Graphing Key Equations. Symmetry A graph is said to be symmetric with respect to the x-axis if for every point (x,y) on the graph, the point.

1.3 Symmetry; Graphing Key Equations; Circles

3-1 Symmetry and Coordinate Graphs Pre Calc A. Point Symmetry Symmetric about the origin: any point in Quadrant I has a point in Quadrant III (rotate.

Symmetry Smoke and mirrors. Types of Symmetry  X-axis symmetry  Y-axis symmetry  Origin symmetry.

Symmetry and Coordinate Graphs

Example: The graph of x = | y | – 2 shown below, is symmetric to x-axis y x 1 2 –323 A graph is symmetric to x- axis if whenever (x, y) is on graph, so.

3-1 Symmetry. Symmetry All Around Us Symmetry at the Beach Symmetry at the Beach Line Symmetry & Rotational Symmetry - All you need to Know + Symmetry.

4.3 Reflecting Graphs; Symmetry

Section 1.2 Graphs of Equations in Two Variables.

3-1 Symmetry & Coordinate Graphs Objective: 1. To determine symmetry of a graph using algebraic tests. 2. To determine if a function is even or odd.

3-1 Symmetry and Coordinate Graphs. Graphs with Symmetry.

Determine if the following point is on the graph of the equation. 2x – y = 6; (2, 3) Step 1: Plug the given points into the given equation. 2(2) – (3)

Reflection Yes No. Reflection Yes No Line 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 (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)

SYMMETRY, EVEN AND ODD FUNCTIONS NOTES: 9/11. SYMMETRY, EVEN AND ODD FUNCTIONS A graph is symmetric if it can be reflected over a line and remain unchanged.

Test an Equation for Symmetry Graph Key Equations Section 1.2.

Section 4- 3 Reflecting Graphs; Symmetry Objective: To reflect graphs and to use symmetry to sketch graphs.

Graphs of Equations Objective: To use many methods to sketch the graphs of equations.

Warm – up #2. Homework Log Thurs 11/19 Lesson 4 – 2 Learning Objective: To determine symmetry & graph by translation Hw: #403 Pg. 228 #1 – 35 odd.

Do now Solve 4x 4 -65x (3, ∞) Write as an inequality Sketch Bound or unbound?

Section 1.2 Graphs of Equations In Two Variables; Intercepts; Symmetry.

Notes Over 1.1 Checking for Symmetry Check for symmetry with respect to both axis and the origin. To check for y-axis symmetry replace x with  x. Sym.

Section 2.4 Symmetry Copyright ©2013, 2009, 2006, 2001 Pearson Education, Inc.

4.3 Symmetry Objective To reflect graphs and use symmetry to sketch graphs. Be able to test equations for symmetry. Use equations to describe reflections.

Section 2.4. X-axis: replace y with –y. Simplify. If you get an equation = to what you started with, the function is symmetric to the x-axis. Y-axis:

WARM UP Evaluate 1. and when and 2. and when and.

AIM: What is symmetry? What are even and odd functions? Do Now : Find the x and y intercepts 1)y = x² + 3x 2) x = y² - 4 (3x + 1)² HW #3 – page 9 (#11-17,

WARM UP Evaluate 1. and when and 2. and when and.

2.1Intercepts;Symmetry;Graphing Key Equations

2.2 Graphs of Equations.

Objective: Test for symmetry in polar equations.

Find the missing coordinate in the ordered pair

Graphs of Equations In Two Variables; Intercepts; Symmetry

Sullivan Algebra and Trigonometry: Section 2.2

Symmetry and Coordinate Graphs Section 3-1

Notes Over 1.1 To check for y-axis symmetry replace x with -x.

A. Symmetry with Respect to the Origin

Section 2.4 Symmetry.

Graphs of Equations Objectives: Find intercepts from a Graph

1.3 Symmetry; Graphing Key Equations; Circles

Section 2.4 Symmetry Copyright ©2013, 2009, 2006, 2001 Pearson Education, Inc.

Graphs of Equations Objectives: Find intercepts from a Graph

Graphing Key Equations

Objective: Test for symmetry in polar equations.

Presentation transcript:

Symmetry Two points, P and P ₁, are symmetric with respect to line l when they are the same distance from l, measured along a perpendicular line to l. Line l is the axis of symmetry.

Reflections Two points symmetric with respect to a line are called reflections of each other across the line. The line is a line of symmetry.

Symmetry a.) A graph with b.) A graph with c.) A graph with x-axis symmetry y-axis symmetry origin symmetry for every (x,y) the for every (x,y) the for every (x,y) the point (x,-y) is also point (-x,y) is also point (-x,-y) is also on the graph. on the graph. on the graph.

Testing for symmetry y = x² + 2 To test for symmetry replace x with –x and y with –y. Check to see if the equation is still equivalent to the original equation. If it is there is symmetry to that axis. Try x² + y² = 2

Point Symmetry Two points, P and P ₁, are symmetric with respect to a point Q when they are the same distance from Q. P ₁ is said to be the image of P.

Symmetric with Respect to Origin Two points are symmetric with respect to the origin if and only if both their x- and y- coordinates are additive inverses of each other. Example: The point symmetric (3, -5) with respect to the origin is (-3, 5) What would it be for point (4, -9)?