Section 2.7 Parent Functions and Transformations.
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Section 2.7 Parent Functions and Transformation s
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Transcript of Section 2.7 Parent Functions and Transformations.
Section 2.7 Parent Functions and Transformations
• A family of graphs is a group of graphs that display one or more similar characteristics. The parent graph, which is the graph of the parent function, is the simplest of the graphs in a family. This is the graph that is transformed to create other members in a family of graphs.
• Example 1: Identify the type of function represented by the graph.
a) b) c) d)
a) b) c) d)
• Example 2: Using your calculator, graph the following, in this order:
• a) Y1 = |x|
• b) Y2 = |x| + 2, what do you notice?
• c) Y2 = |x| – 2, what do you notice?
• d) Y2 = |x + 2|, what do you notice?
• e) Y2 = |x – 2|, what do you notice?
• Example 3: Using your calculator, graph the following, in this order:
• a) Y1 = |x|
• b) Y2 = –|x|, what do you notice?
• c) Y2 = |3x|, what do you notice?
• d) Y2 = , what do you notice?
• Transformations of a parent graph may appear in a different location, flip over an axis, or appear to have been stretched or compressed. The transformed graph may resemble the parent graph, or it may not.
• • A translation moves a figure up, down, left, or right.• • *When a constant k is added to or subtracted from a parent
function, the result f(x) ± k is a translation of the graph up or down.
• *When a constant h is added to or subtracted from x before evaluating a parent function, the result f(x ± h), is a translation left or right.
• A reflection flips a figure over a line called the line of reflection.
• *When a parent function is multiplied by –1, the result –f(x) is a reflection of the graph in the x-axis.
• *When a parent function is multiplied by –1, the result f(–x) is a reflection of the graph in the y-axis.
• A dilation shrinks or enlarges a figure proportionally. When the variable in a linear parent function is multiplied by a nonzero number, the slope of the graph changes.
• *When a nonlinear parent function is multiplied by a nonzero
number, the function is stretched or compressed vertically.
• *Coefficients greater than 1 cause the graph to be stretched vertically, and coefficients between 0 and 1 cause the graph to be compressed vertically.
• Example 4: Describe the transformation in y = (x + 1)2. Then graph the function
• Example 5: Describe the transformation in y = |x| – 4. Then graph the function.
• Example 6: Describe the transformation in y = –|x|. Then graph the function.
• Example 7: Describe the transformation on y = |x|. Then graph the function.
• Example 8: Describe all transformations on y = 2|x – 3|+ 1. Then graph the function.
• Example 9: 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) translates f(x) = |x| across the x-axis
• d) +4 translates f(x) = |x| left 4 units.
