BackLimits at Infinity and Asymptotes: A Calculus Study Guide
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Limits at Infinity and Asymptotes
Introduction
This study guide covers the concepts of limits at infinity, infinite limits, and asymptotes, which are fundamental in understanding the end behavior of functions in calculus. These topics are essential for analyzing graphs, determining asymptotic behavior, and evaluating limits involving rational and trigonometric functions.
Limits at Infinity
Definition and Notation
Limit at Infinity describes the value that a function approaches as the independent variable (usually x) increases or decreases without bound.
Notation: means as becomes arbitrarily large, approaches .
Similarly, for becoming arbitrarily negative.
Horizontal Asymptotes
A horizontal asymptote is a horizontal line that the graph of approaches as or .
If or , then is a horizontal asymptote.
Examples
For :
Thus, is a horizontal asymptote.
Infinite Limits and Vertical Asymptotes
Definition and Notation
Infinite Limit occurs when increases or decreases without bound as approaches a finite value .
Notation: or .
One-sided limits: (from the right), (from the left).
Vertical Asymptotes
A vertical asymptote is a vertical line where increases or decreases without bound as approaches .
If or , then is a vertical asymptote.
Examples
For :
Thus, is a vertical asymptote.
Comparing Infinite Limits and Limits at Infinity
Infinite Limit | Limit at Infinity |
|---|---|
Dependent variable approaches infinity as independent variable approaches a finite number. | Independent variable approaches infinity; dependent variable approaches a finite number. |
End Behavior of Polynomials
Even and Odd Degree Polynomials
For :
If is even:
If is odd:
Limits of Rational Functions at Infinity
General Form
For a rational function , where and are polynomials:
If degree of numerator < degree of denominator:
If degree of numerator = degree of denominator: , where and are leading coefficients.
If degree of numerator > degree of denominator: (sign depends on leading coefficients and direction).
Examples
Finding Vertical Asymptotes
Vertical asymptotes occur at values of where the denominator of a rational function is zero and the numerator is nonzero.
For , set denominator to find .
Practice Problems and Applications
Evaluate : As , denominator approaches , so the limit is .
Evaluate : As , denominator approaches , numerator approaches $1+\infty$.
Evaluate : As , denominator approaches , numerator approaches $1+\infty$.
Evaluate : Since both one-sided limits are , the two-sided limit is .
Special Trigonometric Limits
Evaluate :
So, for
Thus, the limit is $1$.
Summary Table: Asymptotes of Rational Functions
Degree of Numerator | Degree of Denominator | Horizontal Asymptote | Oblique Asymptote | Vertical Asymptote |
|---|---|---|---|---|
Less than | Greater than | None | Set denominator = 0 | |
Equal | Equal | None | Set denominator = 0 | |
Greater than | Less than | None | Possible (if degree is one more) | Set denominator = 0 |
Key Terms
Limit at Infinity: The value a function approaches as becomes very large or very small.
Infinite Limit: The function increases or decreases without bound as approaches a finite value.
Horizontal Asymptote: A horizontal line that the graph approaches as .
Vertical Asymptote: A vertical line where the function increases or decreases without bound.
Additional info:
Oblique (slant) asymptotes occur when the degree of the numerator is exactly one more than the degree of the denominator.
For rational functions, always reduce to lowest terms before determining asymptotes.
