| An asymptote for a function f(x) is a straight line which is approached but never reached by f(x). |
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Vertical Asymptotes |
| These are the vertical lines near which the function f(x) becomes infinite. If the denominator of a rational function has factors of the type (x - a) in the numerator, then the rational function will have a vertical asymptote at x = a for each (x-a). |
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Horizontal Asymptotes |
| A horizontal asymptote is a line y = a, such that the values of f(x) get increasingly close to the number a as x gets large in either the positive or negative direction. Rational functions have horizontal asymptotes when the degree of the numerator is the same as the degree of the denominator. |
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Oblique Asymptotes |
| An oblique asymptote is an asymptote of the form y = ax + b with ‘a’ being non-zero. Rational functions have oblique asymptotes if the degree of the numerator is one more than the degree of the denominator. |
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| Use quotients of polynomials to describe the graphs of rational functions. |
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To draw the graph of a rational function, we must find the asymptotes, the intercepts and a few points and then plot them on the graph. Once you get known to the things, rational functions are actually very easy to graph. |
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Try these problems |
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- Find the horizontal and vertical asymptotes of the rational function in question 15 above.
- y=1 and x= -5, respectively
- x=1 and y= -5, respectively
- y=3 and x = -5, respectively
- y=-1 and x= 5, respectively
Answer: 1
Explanation:
| The simplified rational function is |
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- The vertical asymptote occurs where the denominator is zero, i.e. at x = -5.
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| For the horizontal asymptote , x= |
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| Y= |
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= 1 |
- Find the horizontal and vertical asymptotes of the rational function given below:
- Vertical asymptotes: x= -5 , x=2 ; Horizontal asymptote: y = 1
- Vertical asymptotes: x= -5 ; Horizontal asymptote: y = 1
- Vertical asymptote: x= -5 ; Horizontal asymptote: y = -2
- Vertical asymptotes: x= -5, x=2 ; Horizontal asymptote: y = 4
Answer: 2
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