1. Splash Screen

2. Lesson Menu Five-Minute Check (over Lesson 2–6) CCSS Then/Now New Vocabulary Key Concept: Parent Functions Example 1:Identify a Function Given the Graph Example 2:Describe and Graph Translations Example 3:Describe and Graph Reflections Example 4:Describe and Graph Dilations Example 5:Real-World Example: Identify Transformations Concept Summary: Transformations of Functions

3. Over Lesson 2–6 5-Minute Check 1 A.linear B.piecewise-defined C.absolute value D.parabolic Identify the type of function represented by the graph.

4. Over Lesson 2–6 5-Minute Check 2 A.piecewise-defined B.linear C.parabolic D.absolute value Identify the type of function represented by the graph.

5. Over Lesson 2–6 5-Minute Check 3 A.$60 B.$101 C.$102 D.$148

6. CCSS Content Standards F.IF.4 For a function that models a relationship between two quantities, interpret key features of graphs and tables in terms of the quantities, and sketch graphs showing key features given a verbal description of the relationship. F.BF.3 Identify the effect on the graph of replacing f(x) by f(x) + k, k f(x), f(kx), and f(x + k) for specific values of k (both positive and negative); find the value of k given the graphs. Experiment with cases and illustrate an explanation of the effects on the graph using technology. Mathematical Practices 6 Attend to precision.

7. Then/Now You analyzed and used relations and functions. Identify and use parent functions. Describe transformations of functions.

8. Vocabulary family of graphs parent graph parent function constant function identity function quadratic function translation reflection line of reflection dilation

9. Concept

10. Example 1 Identify a Function Given the Graph A. Identify the type of function represented by the graph. Answer: The graph is a V shape. So, it is an absolute value function.

11. Example 1 Identify a Function Given the Graph B. Identify the type of function represented by the graph. Answer: The graph is a parabola, so it is a quadratic function.

12. Example 1 A.absolute value function B.constant function C.quadratic function D.identity function A. Identify the type of function represented be the graph.

13. Example 1 A.absolute value function B.constant function C.quadratic function D.identity function B. Identify the type of function represented be the graph.

14. Example 2 Describe and Graph Translations Describe the translation in y = (x + 1) 2. Then graph the function. Answer: The graph of the function y = (x + 1) 2 is a translation of the graph of y = x 2 left 1 unit.

15. Example 2 A.translation of the graph y = |x| up 4 units B.translation of the graph y = |x| down 4 units C.translation of the graph y = |x| right 4 units D.translation of the graph y = |x| left 4 units Describe the translation in y = |x – 4|. Then graph the function.

16. Example 3 Describe and Graph Reflections Describe the reflection in y = –|x|. Then graph the function. Answer: The graph of the function y = –|x| is a reflection of the graph of y = |x| across the x-axis.

17. Example 3 A.reflection of the graph y = x 2 across the x-axis B.reflection of the graph y = x 2 across the y-axis C.reflection of the graph y = x 2 across the line x = 1. D.reflection of the graph y = x 2 across the x = –1 Describe the reflection in y = –x 2. Then graph the function.

18. Example 4 Describe and Graph Dilations Describe the dilation on Then graph the function. Answer: The graph of is a dilation that compresses the graph of vertically.

19. Example 4 A.dilation of the graph of y = |x| compressed vertically B.dilation of the graph of y = |x| stretched vertically C.dilation of the graph of y = |x| translated 2 units up D.dilation of the graph of y = |x| translated 2 units right Describe the dilation in y = |2x|. Then graph the function.

20. Example 5 Identify Transformations

21. Example 5 Identify Transformations

22. Example 5 Which of the following is not an accurate description of the transformations in the function ? A.+4 translates f(x) = |x| right 4 units B.–2 translates f(x) = |x| down 2 units C. reflects f(x) = |x| across the x-axis D. +4 translates f(x) = |x| left 4 units

23. Concept

24. End of the Lesson