Reflecting Graphs
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Transcript of Reflecting Graphs
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Reflecting Graphs
Reflections in the coordinate axes of the graph of y = f(x) are represented by:
1. Reflection in the x-axis: h(x) = -f(x)2. Reflection in the y-axis: h(x) = f(-x)
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Class Opener:
g is related to one of the parent functions. Identify the parent function, describe the sequence of transformation from f to g.
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Reflecting graphs
Use a graphing utility to graph the three functions in the same viewing window. Describe the graphs of g and h relative the graph of f.
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Reflections and Shifts
Compare the graph of each function with the graph of f(x) = alegebraically
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Non-rigid Transformations Horizontal, vertical, and reflection
shifts are all call rigid transformations. These transformations only change the position of the graph in the coordinate plane
Non-rigid transformations are those that cause distortion of the graph.
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Non-rigid Vertical Stretch & Shrink A non-rigid transformation of the
graph y= f(x) is represented by y = cf(x), where the transformation is a vertical stretch if c > 1 and a vertical shrink if 0 < c< 1.
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Non-rigid Horizontal Stretch & Shrink Another non-rigid transformation of
the graph y = f(x) is represented by h(x) = f(cx), where the transformation is a horizontal shrink if c > 1 and a horizontal stretch if 0<c<1
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Compare the Graphs
Write a few sentences comparing the graphs shown above.
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Quiz:
You may form into groups of 2-3 to complete the following quiz.
Each member of your group must show all work in order to receive credit.
After you have finished quiz, please be sure to answer the short answer question(on your own paper)
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Short Answer:
Given the three following functions:
1. Identify the parent function of f. 2. Describe the graphs of g and h relative to the graph of f. Justify your answer by sketching the graphs of each functions. Label the graph appropriatly.
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Arithmetic Combinations of Functions Just as real numbers can be
combined by the operations of addition, subtraction, multiplication, and division to form other real numbers, two functions can be combined to create a new function.
This is known as an arithmetic combination of functions.
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Arithmetic Functions
The domain of an arithmetic combination of functions f and g consists of all real numbers that are common to the domains of f and g.
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Example:
State the domain of the following combination:
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Combinations
Sum:
Difference:
Product:
Quotient:
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Finding the Sum of Two Different Functions Given the two functions find (f + g)
(x):
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Difference of Two Functions Given:
Evaluate the difference of the two functions. Then evaluate the difference when x = 2
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Product of Two Functions Given:
Find the product of the two functions then evaluate the product when x = 4.
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Quotient of two functions Given
Find the quotient of the functions Find the domain of each function.
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Partner Practice:
Pg. 58 # 5 – 26