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CPM Section 7.1 “The Rational Function”
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In Chapter 4, we discussed the linear function. In Ch. 5, it was the absolute value function and in Chapter 6 the exponential function. Each of these functions have a behavior called continuity. A function is continuous if its graph ____________________________________________. As you will see, rational functions do not have this behavior. A rational function is a function in which ___________________________________. The general form of a rational function is y=_______________. can be traced, in its entirety, w/out lifting your pencil one polynomial is divided by a second
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We will examine how each of the parameters d, e, and f affect the graph later in these notes. For now, lets take an example. The simplest rational function, the parent function is. Graph it.
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X-4-3-201234 Y -.25-.33-.5E1.5.33.25 asymptotes
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A rational function is undefined at all values of the variable x that ___________________________. The graph of the function will have a ____________________ at these values of x. The rational function will be undefined when x = _____. The domain of a rational function is _________________________________________(i.e._____). The parameter f determines _____________________________. The range of the function will be ________________. If the parameter d is negative, then _____________________________________. makes the denominator = 0 vertical asymptote -e All real #’s, except those that make the function undefined -e where the horizontal asymptote occurs the graph flips over the horizontal asymptote
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Let’s look at the function What is our Vertical Asymptote? What is our Horizontal Asymptote? Let’s find the graph on our calculator x = 5 y = 3
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Asymptotes
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What is the RANGE of our graph? All Real #’s, y≠3 What is the DOMAIN of our graph? All Real’s, x≠5 Where is our Y-Intercept? Set x=0, solve for y Y-Int = 2.8 What values of x make y = 0? (This is the zero function) x = 4.67
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For what values of x is our function increasing? None For what values of x is our function decreasing? (-∞, 5) (5, ∞) As x goes to 5 from the right, y goes to what number? Infinity As x goes to 5 from the left, y goes to what number? Negative Infinity
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