Section 1.4 Shifting, Reflecting, and Stretching Graphs

1. Section 1.4 Shifting, Reflecting, and Stretching Graphs Students will know how to identify and graph shifts, reflections, and non-rigid transformations of functions.

2. Six important functions: Graph ?? ?? =?? ?? ?? =?? ?? ?? = ?? ?? ?? = ?? 2 ?? ?? = ?? 3 ?? ?? = ??

3. Use a graphing utility to graph Y1 = f(x) = x2. Then, on the same viewing screen, graph Y2 = (x � 4)2 Y3 = (x + 4)2 Y4 = x2 + 4 Y5 = x2 � 4.

4. Vertical and Horizontal Shifts Let c be a positive real number. The following changes in the function y = f(x) will produce the stated shifts in the graph of y = f(x). 1. h(x) =f(x � c) Horizontal shift c units to the right 2. h(x) =f(x + c) Horizontal shift c units to the left 3. h(x) =f(x) � c Vertical shift c units downward 4. h(x) =f(x) + c Vertical shift c units upward

5. Example 1. Given f(x) = ?? 3 , describe the shifts in the graph of f generated by the following functions. g(x) = (??+1) 3 +2 h ?? = (??-4) 3

6. Reflecting Graphs On your calculator graph ?? 1 = f(x) = (??-2) 3 . Graph ?? 1 = f(x) = -(??-2) 3 . Graph ?? 1 = f(x) = (-??+2) 3 .

7. The following changes in the function y = f(x) will produce the stated reflections in the graph of y = f(x). h(x) = �f(x) Reflection in the x-axis 2. h(x) = f(�x) Reflection in the y-axis

8. Example 2. Given f(x) = x3 + 3, describe the reflections in the graph of f generated by the following functions. a) g(x) = �x3 + 3. b) h(x) = �x3 � 3.

9. Example 3. Below is the graph of y = f(x). Graph y = �f(x). b) Graph y = f(�x) + 1