Solve Oblique Asymptote & Graph: f(x)=x^3+3x^2-x-5/x^2-1

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SUMMARY

The discussion focuses on finding the oblique asymptote and graphing the rational function f(x) = (x^3 + 3x^2 - x - 5) / (x^2 - 1). It clarifies the distinction between holes and vertical asymptotes in rational functions. A hole occurs when the function simplifies to a form of 0/0, while a vertical asymptote arises when the function approaches a non-zero value divided by zero. The specific points of interest are x = -1 and x = 1, where the denominator equals zero, indicating vertical asymptotes rather than holes.

PREREQUISITES
  • Understanding of rational functions and their properties
  • Knowledge of limits and asymptotic behavior
  • Familiarity with polynomial long division for finding oblique asymptotes
  • Ability to identify and factor polynomials
NEXT STEPS
  • Study polynomial long division to determine oblique asymptotes in rational functions
  • Learn about the behavior of rational functions near vertical asymptotes
  • Explore the concept of removable discontinuities and how to identify holes in functions
  • Practice graphing rational functions with various asymptotic behaviors
USEFUL FOR

Students studying calculus, particularly those focusing on rational functions, asymptotes, and graphing techniques. This discussion is beneficial for anyone seeking to deepen their understanding of function behavior near critical points.

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Homework Statement


Find the oblique asymptote and sketch the graph

Homework Equations


f(x)=x^3+3x^2-x-5/x^2-1


The Attempt at a Solution



My question is that shouldn't there be a hole in the graph when x=-1 or 1? The denominator would end up being zero.

When should i be using an hole or when do i know it is an asymptote?
 
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If you have a rational function of the form f(x)=\frac{x-b}{x-a} then there doesn't exist a hole in the function at x=a, instead there is a vertical asymptote at that point. You will have a hole in the function when it is of the form f(x)=\frac{(x-a)(x-b)}{x-a} since this simplifies into the linear equation f(x)=x-b but at x=a there is a hole.

So basically, if the fraction is of the form 0/0 at some point x=a, then it could be a hole (since x=a is a zero of both the numerator and denominator, you can factor out x-a from both and then cancel). If it is of the form a/0 for some non-zero a, then it is a vertical asymptote.
 

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