Day 5 Book Section 7.8 Get 2 grids for the 2 shift problems!

Slides:

Advertisements

Similar presentations

Graphs of Functions It essential in any higher mathematics to understand the basic shapes of all functions. This section will look at the five most widely.

Advertisements

Basic Functions and Their Graphs

Create a table and Graph:. Reflect: Continued x-intercept: y-intercept: Asymptotes: xy -31/3 -21/2 1 -1/22 xy 1/ /2 3-1/3.

Objective Video Example by Mrs. G Give It a Try Lesson 7.4  Identify and graph parent functions of the following families of functions: Linear Absolute.

Name That Graph…. Parent Graphs or Base Graphs Linear Quadratic Absolute Value Square Root Cubic Exponential Math

EXAMPLE 4 Graph a translated square root function Graph y = –2 x – Then state the domain and range. SOLUTION STEP 1 Sketch the graph of y = –2 x.

6.5 - Graphing Square Root and Cube Root

Given g(x) = 2x 2 +1, find g(3) g(3)=2(3) 2 +1 g(3)=2(9)+1 g(3)=19.

Section 3.4 Basic Functions

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 1 1 Chapter 9 Quadratic Equations and Functions.

Graphing absolute value functions and transformations

7.5 Graphs Radical Functions

2.4 Graphs of Functions The graph of a function is the graph of its ordered pairs.

Section 6.5 Graph Square Root and Cube Root Functions.

1.3 Families of Equations. What families of graphs have your studied? Linear Absolute Value Quadratic Square Root Cubic Cube Root.

Accelerated Math II Polynomial Review. Quick Practice “Quiz” 1. A rectangular sheet of metal 36 inches wide is to be made into a trough by turning up.

October 3, 2012 Parent Functions Warm-up: How do you write a linear function, f for which f(1) = 3 and f(4) = 0? *Hint: y = mx + b HW 1.6: Pg. 71 #1-5,

Graphing Test Review Algebra. Express the relation as a set of ordered pairs and the inverse. xy

Graphing Square Root and Cube Root Functions

8.1-2 – Exponential Functions. Ex. 1 Sketch the graph of y = 2 x. Then state the functions domain & range.

(7.1 & 7.2) NOTES- Exponential Growth and Decay. Definition: Consider the exponential function: if 0 < a < 1: exponential decay if a > 1: exponential.

7-9: Square Root Functions and Inequalities. What You Will Learn  Graph and analyze square root functions.  Graph square root inequalities.

 Graph is a parabola.  Either has a minimum or maximum point.  That point is called a vertex.  Use transformations of previous section on x 2 and -x.

A Library of Parent Functions. The Constant Parent Function Equation: f(x) = c Domain: (-∞,∞) Range: [c] Increasing: None Decreasing: None Constant: (-∞,∞)

By Holly Carlson. Quadratic y = x² General shape: U Domain: (-∞, ∞) Formula: a. Y= A*(x+B)² + C

Chapter 2 Functions and Graphs Copyright © 2014, 2010, 2007 Pearson Education, Inc Transformations of Functions.

Powers and roots. Square each number a) 7 b) 12 c) 20 d) 9 e) 40 a) 49 b) 144 c) 400 d) 81 e) 1600.

Graph Square Root and Cube Root Functions

DOMAIN, RANGE, AND INTERCEPTS NOTES: 9/8. DOMAIN The set of all input values of a function.  x RANGE The set of all output values of a function.  f(x)

Chapter 7 Day 3 Book Section 7.5 Get 2 grids for the 2 shift problems!

Math-3 Lesson 1-3 Quadratic, Absolute Value and Square Root Functions

The #’s 1, 4, 9, 16, 25.…are called. The #’s 1, 4, 9, 16, 25.…are called perfect squares / square numbers.

Math 1111 Test #2 Review Fall Find f ° g.

Chapter 2 Functions and Graphs Copyright © 2014, 2010, 2007 Pearson Education, Inc Transformations of Functions.

Square Root Function Graphs Do You remember the parent function? D: [0, ∞) R: [0, ∞) What causes the square root graph to transform? a > 1 stretches vertically,

Advanced Algebra Notes Section 6.5: Graphing Square Root and Cubic Root Functions The graphs of and are examples_____________________. In this lesson we.

Section 3.5B: Parent Functions

Warm Up Give the coordinates of each transformation of (2, –3). 4. reflection across the y-axis (–2, –3) 5. f(x) = 3(x + 5) – 1 6. f(x) = x 2 + 4x Evaluate.

5-1 Graphing Quadratic Functions Algebra II CP. Vocabulary Quadratic function Quadratic term Linear term Constant term Parabola Axis of symmetry Vertex.

F(x) = x 2 Let’s review the basic graph of f(x) = x xf(x) = x

Warm Up for Lesson 3.5 1)Solve: x 2 – 8x – 20 = 0 2) Sketch the graph of the equation y = 2x – 4.

Graphing Quadratic Functions. The graph of any Quadratic Function is a Parabola To graph a quadratic Function always find the following: y-intercept.

Section P.3 Transformation of Functions. The Constant Function.

PARENT FUNCTIONS Constant Function Linear (Identity) Absolute Value

Unit 2 – Quadratic Functions & Equations. A quadratic function can be written in the form f(x) = ax 2 + bx + c where a, b, and c are real numbers and.

Section 10.1 Day 1 Square Root Functions Algebra 1.

Parent Functions. Learning Goal I will be able to recognize parent functions, graphs, and their characteristics.

Lesson 27 Connecting the parabola with the quadratic function.

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Absolute Value Function

Lesson 13.3 graphing square root functions

QUADRATIC FUNCTION CUBIC FUNCTION

Find the x and y intercepts.

Warm Up Identify the domain and range of each function.

Solve the radical equation

Graph Square Root and Cube Root Functions

Graphing Square Root Functions

Section 1.1 Parent Functions and Transformations

2.1 Graphing Absolute Value Functions

Graph Square Root and Cube Root Functions

Graph Square Root and Cube Root Functions

Parent Functions.

Section 1.2 Introduction to Parent Functions

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

QUADRATIC FUNCTION- Day 1

Parent Functions.

Horizontal shift right 2 units Vertical shift up 1 unit

Worksheet Key 1) (–∞, –4] 2) [–1, ∞) 3) (–4, ∞) 4) (–∞, –2) 5)

Presentation transcript:

Day 5 Book Section 7.8 Get 2 grids for the 2 shift problems!

Domain: Range: Y= Absolute Value Parent Function xy Ex. 1

Domain: Range: y=x 2 Quadratic Parent Function xy Ex. 2

Graph y = Domain: Range: Ex. 3 Square Root Parent Function xy

Domain: Range: y=x 3 Cubic Parent Function Y scale: count by twos xy Ex. 4

Graph y = Domain: Range: Ex. 5 Cube root Parent Function xy

Domain: Range: f(x) = Plot the parent function and shift each point: Shift Left 2 and up 1 xy Shift using parent table and multiplying y values by 2 Ex. 6

Domain: Range: f(x)= Plot the parent function and shift each point: Left 6 and down 4 xy Shift using parent table and multiplying y values by 2 Ex. 7

Shift coordinate: Domain: Range: y-intercept: x-intercept: (3,-4) (-∞,∞) [-4,∞) (0,5) (5,0) y=(0-3) 2 – 4 y=(-3) 2 – 4 y=5 0=(x-3) 2 – 4 4=(x-3) 2 4=x 2 -6x+9 0=x 2 -6x+5 0=(x-5)(x-1) (1,0) Ex. 8

Shift coordinate: Domain: Range: y-intercept: x-intercept: (-4,-4) (-∞,∞) [-4,∞) (0,4) (-2,0) Y= – 4 y=4 0= – 4 4 = 2x+8 = 4 or 2x+8 = -4 x = -2 or x = -6 (-6,0) Y= – 4 Ex. 9

Shift coordinate: Domain: Range: y-intercept: x-intercept: (2,1) (-∞,∞) (0,-7) (1,0) y=(0-2) y=(-2) y= -7 0=(x-2) =(x-2) 3 Take cube root of both sides -1 = x – 2 x = 1 Ex. 10

Shift coordinate: Domain: Range: y-intercept: x-intercept: (1,2) (-∞,∞) (0,1) (-7,0) Ex. 11