1.4 Shifting, Reflecting, and Sketching Graphs Students will recognize graphs of common functions such as: Students will use vertical and horizontal shifts.

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1.4 Shifting, Reflecting, and Sketching Graphs Students will recognize graphs of common functions such as: Students will use vertical and horizontal shifts and reflections to graph functions. Students will use nonrigid transformations to graph functions.

Vertical and Horizontal Shifts Experiment with the following functions to determine how minor changes in the function alter the graphs:

Student Example If, make a guess and check with the calculator. Give the function that would move f(x): a)down 4 units b)left 3 units c)right 2 units and up 5 units

Vertical and Horizontal Shifts Let c be a positive real number. Vertical and horizontal shifts in the graph of y=f(x) are represented as follows: 1. Vertical shift c units upwards:h(x)=f(x)+c Ex. Moves up 2 units from 2. Vertical shift c units downward: h(x)=f(x)-c Ex.Moves down 2 units from 3. Horizontal shift c units to the right: h(x)=f(x-c) Ex.Moves right 2 units from 4. Horizontal shift c units to the left: h(x)=f(x+c) Ex.Moves left 2 units from

Example 1: Compare the graphs of each function with the graph of

Example 2 The graph of is shown in Figure Each of the graphs in Figure 1.45 is a transformation of the graph of f. Find an equation for each function. y=g(x)y=h(x)

Student Example: What must be done to the point (x,y) to reflect over the x-axis and the y-axis. y » (x,y). » x

Reflections in the Coordinate Axes Reflections in the coordinate axes of the graph of y = f(x) are represented as follows. 1.Reflection in the x – axis:h(x) = -f(x) 2.Reflection in the y – axis:h(x) = f(-x)

Student Example Find an equation that will: a)reflect f(x) over the x-axis. b)Reflect f(x) over the y-axis.

Example 3 The graph of is shown. Each graph shown is a transformation of the graph of f. Find an equation for each function. f(x)y=g(x)y=h(x)

Example 4 Compare the graph of each function with the graph of a.b.c.

Example 5: Nonrigid Transformations Compare the graph of each function with the graph of a.b.

Example 6 Compare the graph of with the graph of

Tuition has risen at private colleges. The table lists the average tuition for selected years. Use a non-rigid transformation of a linear function to best fit the data: Use the function to predict the cost of tuition during your freshmen year of college. Does it seem accurate? Year Tuition$3,617$6,121$9,340$12,432

Year Fatalities from AIDS ,59361,911120,811196,283270,533

Use a non-rigid transformation to adjust a quadratic to best fit the data: Year Fatalities from AIDS ,59361,911120,811196,283270,533 Use the function to predict the number of AIDS fatalities in 2010.

Year Fatalities from AIDS ,59361,911120,811196,283270,533

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