Transformations For each slide choose the correct answer from the list of choices using the mouse cursor. All slide transitions and animations use a left.

Slides:

Advertisements

Similar presentations

Transforming graphs of functions

Advertisements

Order of function transformations

Instruction: Use mouses left button. Use mouses left button. If mouse buttons dont work, use arrow keys of keyboard for slide show. If mouse buttons dont.

Instruction: Use mouses left button. Use mouses left button. If mouse buttons dont work, use arrow keys of keyboard for slide show. If mouse buttons dont.

Your Transformation Equation y = - a f(-( x ± h)) ± k - a = x-axis reflection a > 1 = vertical stretch 0 < a < 1 = vertical compression -x = y-axis reflection.

Slides, Flips, and Turns CLICK HERE TO BEGIN THE GAME!!

Functions: Transformations of Graphs Vertical Translation: The graph of f(x) + k appears as the graph of f(x) shifted up k units (k > 0) or down k units.

Basic Skills in Higher Mathematics Robert Glen Adviser in Mathematics Mathematics 1(H) Outcome 2.

We need to sketch the graph of y = 3sin(5t+90)

Quiz By: Steven Hancock Click START to begin the quiz. ALGEBRA.

Test Your Knowledge By Catherine Phipps. x + 3 =6 a.5 b.4 c.3 d.2.

3.6 Graph Rational Functions Part II. Remember Rational functions have asymptotes To find the vertical asymptote, set the denominator = 0 and solve for.

Identifying Graphs Quiz -threw-them-curve.html.

1.6 Shifting, Reflecting and Stretching Graphs How to vertical and horizontal shift To use reflections to graph Sketch a graph.

2.4 Use Absolute Value Functions and Transformations

Apply rules for transformations by graphing absolute value functions.

Test Your Knowledge. x + 3 =6 a.5 b.4 c.3 d.2 y - 11= 78 a. 69 b. 89 c. 87 d. 68.

WHICH TRANSFORMATIONS DO YOU KNOW? ROTATION WHICH TRANSFORMATIONS DO YOU KNOW? ROTATION.

TRANSFORMATION OF FUNCTIONS FUNCTIONS. REMEMBER Identify the functions of the graphs below: f(x) = x f(x) = x 2 f(x) = |x|f(x) = Quadratic Absolute Value.

 How would you sketch the following graph? ◦ y = 2(x – 3) 2 – 8  You need to perform transformations to the graph of y = x 2  Take it one step at a.

Quiz Title DIRECTIONS: Read each question and click on the correct answer. If you get it wrong use the arrow button to go back to the question and try.

5.3 Transformations of Parabolas Goal : Write a quadratic in Vertex Form and use graphing transformations to easily graph a parabola.

Review of Transformations and Graphing Absolute Value

1. g(x) = -x g(x) = x 2 – 2 3. g(x)= 2 – 0.2x 4. g(x) = 2|x| – 2 5. g(x) = 2.2(x+ 2) 2 Algebra II 1.

EXAMPLE 1 Compare graph of y = with graph of y = a x 1 x 1 3x3x b. The graph of y = is a vertical shrink of the graph of. x y = 1 = y 1 x a. The graph.

Objectives: Be able to graph a quadratic function in vertex form Be able to write a quadratic function in vertex form (2 ways)

Algebra 2 5-R Unit 5 – Quadratics Review Problems.

THE MOUSE Left Click THE MOUSE Right Click.

Transforming Linear Functions

Graphing Technique; Transformations

Transformations of Quadratic Functions (9-3)

Warm-Up 1. On approximately what interval is the function is decreasing. Are there any zeros? If so where? Write the equation of the line through.

Unit 5 – Quadratics Review Problems

Absolute Value Functions

Choice 1 Choice 2 Choice 3 Choice 4

CLICK HERE TO BEGIN THE GAME!!

Section 2.5 Transformations.

Lesson 5.3 Transforming Parabolas

Who Wants to Be a Transformation Millionaire?

Transformations of exponential functions

True or False: Suppose the graph of f is given

Transformation Notes 6.07.

Graphing Exponential Functions

Unit 1 Recall HW 8.2 HW 3.1 HW 3.2 HW 3.4 HW 3.5.

Graph Transformations

8.4 - Graphing f (x) = a(x − h)2 + k

Graphical Transformations

y = x2 Translations and Transformations Summary

2.7 Graphing Absolute Value Functions

Lesson 5.3 Transforming Parabolas

Transformation rules.

1.5b Combining Transformations

4.2 – Translations of the Graphs of the Sine and Cosine Functions

3.2 Transformations of the Graphs of Functions

Parent Function Transformations

2.7 Graphing Absolute Value Functions

2.1 Transformations of Quadratic Functions

Functions and Transformations

6.4a Transformations of Exponential Functions

The vertex of the parabola is at (h, k).

1.5b Combining Transformations

Choose the correct translation from pre-image to image B

6.4c Transformations of Logarithmic functions

Maps one figure onto another figure in a plane.

Vertical Stretch and Compression

15 – Transformations of Functions Calculator Required

SOL 8.8 Students will be using the 8.8 Transformation Chart for Notes

Replacing with and (2.6.2) October 27th, 2016.

Warm up honors algebra 2 3/1/19

Presentation transcript:

Transformations For each slide choose the correct answer from the list of choices using the mouse cursor. All slide transitions and animations use a left mouse click. To see an animation again use the left arrow on the keyboard followed by the right. You will be asked to try again if you are incorrect

y = x 2 becomes y = (x - 2) 2 Click on the transformation Vertical translation of +2 Horizontal translation of +2 Horizontal stretch of factor 2 Vertical stretch of factor 2 The next slide shows the transformation

y = x 2 becomes y = (x - 2) 2 Horizontal translation of +2 Next transformation

y = x 2 becomes y = x Click on the transformation Horizontal translation of +3 Horizontal stretch of factor 3 Vertical stretch of factor 3 Vertical translation of +3 The next slide shows the transformation

y = x 2 becomes y = x Vertical translation of +3 Next transformation

y = x 2 becomes y = (  x) 2 Click on the transformation Vertical stretch of factor 2 Vertical translation of +  Horizontal translation of +  Horizontal stretch of factor 2 The next slide shows the transformation

y = x 2 becomes y = (  x) 2 Horizontal stretch of factor 2 Next transformation

y = sinx becomes y = 2sinx Click on the transformation Vertical translation of +2 Vertical stretch of factor 2 Horizontal stretch of factor  Horizontal translation of +2 The next slide shows the transformation

y = sin(x) becomes y =2sin(x) Vertical stretch of factor 2 Next transformation

y = sinx becomes y = -sinx Click on the transformation 0 Y axis reflection X axis reflection The next slide shows the transformation

y = sinx becomes y = -sin(x) X axis reflection Next transformation

y = x 3 becomes y = (-x) 3 Click on the transformation Y axis reflection X axis reflection The next slide shows the transformation

y = x 3 becomes y = (-x) 3 Y axis reflection Next transformation

Quick Quiz y = x 2 → y = ax 2 Vertical translation of +a Horizontal translation of +a Horizontal stretch of factor a X axis reflection Y axis reflection Vertical stretch of factor a Next question

Quick Quiz y = x 3 → y = (x - a) 3 Vertical translation of +a Horizontal stretch of factor a Vertical stretch of factor a X axis reflection Y axis reflection Horizontal translation of +a Next question

Quick Quiz y = sinx → y = sin(-x) Vertical translation of +a Horizontal translation of +a Horizontal stretch of factor a Vertical stretch of factor a X axis reflection Y axis reflection Next question

Quick Quiz y = x 2 → y = ( 1 / a x) 2 Vertical translation of +a Horizontal translation of +a Vertical stretch of factor a X axis reflection Y axis reflection Horizontal stretch of factor a Next question

Quick Quiz y = x 4 → y = x 4 + a Horizontal translation of +a Horizontal stretch of factor a Vertical stretch of factor a X axis reflection Y axis reflection Vertical translation of +a Next question

Quick Quiz y = sinx → y = -sinx Vertical translation of +a Horizontal translation of +a Horizontal stretch of factor a Vertical stretch of factor a Y axis reflection X axis reflection