5 Must Know Facts For Your Next Test

1. Infinite limits can indicate the presence of vertical asymptotes in rational functions, where the denominator approaches zero while the numerator remains non-zero.
2. When analyzing limits at infinity, functions can either approach a specific finite value or diverge to infinity, which reflects their long-term behavior.
3. If a limit approaches positive infinity, it suggests that the function grows without bound as the input nears a certain point.
4. In some cases, infinite limits can lead to different one-sided limits; for instance, the left-hand limit may approach positive infinity while the right-hand limit approaches negative infinity.
5. Understanding infinite limits is essential for sketching graphs of functions since it provides insights into their asymptotic behavior and potential points of discontinuity.

Review Questions

• How do infinite limits relate to vertical asymptotes in functions?
  • Infinite limits are directly connected to vertical asymptotes because they occur when a function approaches infinity or negative infinity as the input nears a specific value. When the denominator of a rational function approaches zero while the numerator does not, the limit can become infinite, indicating a vertical asymptote at that point. Recognizing these behaviors helps in identifying critical points on graphs and understanding how functions behave near discontinuities.
• Explain how to determine whether a function has an infinite limit as it approaches positive or negative infinity.
  • To determine if a function has an infinite limit as it approaches positive or negative infinity, you should analyze the end behavior of the function by substituting increasingly large positive or negative values into the function. If the output continues to grow without bound (approaching positive or negative infinity), then the limit is classified as infinite. This analysis often involves simplifying rational functions and understanding how terms behave as they increase in magnitude.
• Evaluate the implications of infinite limits on the continuity and differentiability of functions at specific points.
  • Infinite limits indicate that a function is not continuous at specific points where these limits are approached. This lack of continuity means that there will be no defined value for the function at that point, and consequently, differentiability cannot be established either. When analyzing functions with infinite limits, one must recognize that these discontinuities affect overall behavior and shape how we understand derivatives and integrals around those points.

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