Infinite Limits; Vertical Asymptotes - Concept

Concept Concept (1)

When a Calculus limit decreases or increases without bound near certain values for the independent variables, we call these infinite limits. In general, a fractional function will have an infinite limit if the limit of the denominator is zero and the limit of the numerator is not zero. The infinite limit can be either positive or negative and is determined by the sign of the quotient of the numerator and the denominator.

Sample Sample Problems (3)

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Infinite Limits; Vertical Asymptotes - Problem 1
Problem 1
Finding vertical asymptotes by finding one-sided limits.
Infinite Limits; Vertical Asymptotes - Problem 2
Problem 2
How to calculate one-sided limits of a rational function to find a vertical asymptote.
Infinite Limits; Vertical Asymptotes - Problem 3
Problem 3
How to find a vertical asymptote for the graph of a logarithmic function by calculating one-sided limits.
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