THE RECIPROCAL FUNCTION FAMILY Section 9.2. PA Assessment Standard Match the graph of a given function to its table or equation.

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Presentation transcript:

THE RECIPROCAL FUNCTION FAMILY Section 9.2

PA Assessment Standard Match the graph of a given function to its table or equation.

LEQ How do you graph a translation of an inverse variation graph?

Using Graphs of Inverse Variations: Definition 1: Functions that model inverse variations belong to a family whose parent is the reciprocal function. Definition 2: The graph below shows the function y = 5/x. Notice that the graph has two parts. Each part is called a branch. Definition 3: The vertical asymptote of a graph are lines the graph approaches.

Using Graphs of Inverse Variations: What is the equation of the vertical asymptote? What is the equation of the horizontal asymptote? Graph y = 1/x. Sketch the graph. Clear your screen and graph y = -1/x. Sketch the graph. Compare the two sketches. How does the negative sign affect the graph? Describe the asymptotes of the two graphs. Graph y = 1/x 2. Sketch the graph. Compare the sketch with the graph of y = 1/x from part iii. How does squaring x affect the graph? Describe the asymptotes of the two graphs.

Example 1: Relating to the Real World: Music: A musical pitch is measured in vibrations per second, or Hertz (Hz). The pitch y produced by a panpipe varies inversely with the length of the pipe x, measured in feet. The equation y = 564/x models the inverse variation. Find the length of the pipe that produces a pitch of 277 Hz.  Pitches of 247 Hz, 311 Hz, and 370 Hz form a musical chord. Find the length of pipe that will produce each pitch.  The asymptotes of y = 264/x are x = 0 and y = 0. Explain why this makes sense in terms of the panpipe.

Graphing Translations of Inverse Variation: The graphs below show the function y = 4/x, y = 4/x + 2, and y = 4/x – 4. What is the vertical asymptote of each graph? The horizontal asymptote? How are the graphs of y = 4/x and y = 4/x + c related?

Graphing Translations of Inverse Variation: The graphs below show the functions y = 4/x, y = 4/(x – 2), and y = 4/(x + 4). What is the vertical asymptote of each graph? The horizontal asymptote? How are the graphs of y = 4/x and y = 4/(x – b) related?

Translation of Inverse Variation: The graph of y = k/(x – b) + c is a translation of y = k/x that has moved b units horizontally and c unit vertically. It has a vertical asymptote at x = b and a horizontal asymptote at y = c.

Examples Sketch the graphs of the following functions. Identify the vertical and horizontal asymptotes.

Example 8: Writing Equations: Write an equation for a translation of y = 5/x that has asymptotes at x = -2 and y = 3.

TOTD Sketch the asymptotes and the graph of the following equation.