Oblique Asymptotes
CK-12
Mark Spong
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AUTHORS
CK-12
Mark Spong
EDITOR
Kaitlyn Spong
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Printed: September 24, 2015
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Chapter 1. Oblique Asymptotes
C HAPTER
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Oblique Asymptotes
Here you will extend your knowledge of horizontal and vertical asymptotes and learn to identify oblique (slanted)
asymptotes. You will also be able to apply your knowledge of polynomial long division.
When the degree of the numerator of a rational function exceeds the degree of the denominator by one then the
function has oblique asymptotes. In order to find these asymptotes, you need to use polynomial long division
and the non-remainder portion of the function becomes the oblique asymptote. A natural question to ask is: what
happens when the degree of the numerator exceeds that of the denominator by more than one?
Watch This
MEDIA
Click image to the left or use the URL below.
URL: http://www.ck12.org/flx/render/embeddedobject/60901
http://www.youtube.com/watch?v=W8ASTRfEMVo James Sousa: Determining Slant Asymptotes of Rational Functions
Guidance
The following function is shown before and after polynomial long division is performed.
f (x) =
x4 +3x2 +2x+14
x3 −3x2
2
= x + 3 + 12xx3+2x+14
−3x2
Notice that the remainder portion will go to zero when x gets extremely large or extremely small because the power
of the numerator is smaller than the power of the denominator. This means that while this function might go haywire
with small absolute values of x, large absolute values of x are extremely close to the line y = x + 3.
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Oblique asymptotes are these slanted asymptotes that show exactly how a function increases or decreases without
bound.
Example A
Identify the oblique asymptotes of the following rational function.
f (x) =
x3 −x−33
x2 +3x−4
12x−45
= x − 3 + (x−1)(x+4)
Solution: Since this function has been rewritten after long division has been performed, the oblique asymptote is
the line that remains:
y = x−3
Example B
Identify the vertical and oblique asymptotes of the following rational function.
f (x) =
x3 −x2 −x−1
(x−3)(x+4)
Solution: After using polynomial long division and rewriting the function with a remainder and non-remainder
portion it looks like this:
13x−25
f (x) = x − 2 + x13x−25
2 +x−12 = x − 2 + (x−3)(x+4)
The oblique asymptote is y = x − 2. The vertical asymptotes are at x = 3 and x = −4 which are easier to observe in
last form of the function because they clearly don’t cancel to become holes.
Example C
Identify the oblique asymptotes of the following rational function.
f (x) =
(x2 −4)(x+3)
10(x−1)
Solution: The degree of the numerator is 3 so the slant asymptote will not be a line. However when the graph is
observed, there is still a clear pattern as to how this function increases without bound as x approaches very large and
very small numbers.
f (x) =
1
12
2
10 (x + 4x) − 10(x−1)
As you can see, this looks like a parabola with a remainder. This rational function has a parabola backbone. This
is not technically an oblique asymptote because it is not a line.
Concept Problem Revisited
When the numerator exceeds the denominator by more than one, the function develops a backbone as in Example C
that can be shaped like any polynomial. Oblique asymptotes are always lines.
Vocabulary
Oblique asymptotes are asymptotes that occur at a slant. They are always lines.
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Chapter 1. Oblique Asymptotes
A horizontal asymptote is a flat dotted line that indicates where a function goes as x get infinitely large or infinitely
small.
End behavior is a term that asks you to describe the horizontal asymptotes.
A vertical asymptote is a dashed vertical line that indicates that as a function approaches, it shoots off to positive or
negative infinity without ever actually touching the line.
A rational function is a function with at least one rational expression.
A rational expression is a ratio of two polynomial expressions.
Guided Practice
1. Find the asymptotes and intercepts of the function:
f (x) =
x3
x2 −4
2. Create a function with an oblique asymptote at y = 3x − 1, vertical asymptotes at x = 2, −4 and includes a hole
where x is 7.
3. Identify the backbone of the following function and explain why the function does not have an oblique asymptote.
f (x) =
5x5 +27
x3
Answers:
1. The function has vertical asymptotes at x = ±2.
After long division, the function becomes:
f (x) = x + x24−4
This makes the oblique asymptote at y = x
2. While there are an infinite number of functions that match these criteria, one example is:
(x−7)
f (x) = 3x − 1 + (x−2)(x+4)(x−7)
3. While polynomial long division is possible, it is also possible to just divide each term by x3 .
f (x) =
5x5 +27
x3
=
5x5
x3
+ 27
= 5x2 + 27
x3
x3
The backbone of this function is the parabola y = 5x2 . This is not an oblique asymptote because it is not a line.
Practice
1. What is an oblique asymptote?
2. How can you tell by looking at the equation of a function if it will have an oblique asymptote or not?
3. Can a function have both an oblique asymptote and a horizontal asymptote? Explain.
For each of the following graphs, sketch the graph and then sketch in the oblique asymptote if it exists. If it doesn’t
exist, explain why not.
4.
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Chapter 1. Oblique Asymptotes
Find the equation of the oblique asymptote for each of the following rational functions. If there is not an oblique
asymptote, explain why not and give an equation of the backbone of the function if one exists.
9. f (x) =
x3 −7x−6
x2 −2x−15
10. g(x) =
x3 −7x−6
x4 −3x2 −10
11. h(x) =
x2 +5x+6
x2 +2x+1
12. k(x) =
x4 +9x3 +21x2 −x−30
x2 +2x+1
13. Create a function with an oblique asymptotes at y = 2x − 1, a vertical asymptote at x = 3 and a hole where x is
7.
14. Create a function with an oblique asymptote at y = x, vertical asymptotes at x = 1, −3 and no holes.
15. Does a parabola have an oblique asymptote? What about a cubic function?
References
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CK-12 Foundation.
CK-12 Foundation.
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CK-12 Foundation.
CK-12 Foundation.
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