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Mathematical Expression Editor
We explore functions that “shoot to infinity” at certain points in their domain.
Consider the function
While the does not exist, something can still be said.
If grows arbitrarily large as approaches , we write and say that the limit of
approaches infinity as goes to .
If grows arbitrarily large as approaches and is negative, we write and say that the
limit of approaches negative infinity as goes to .
Which of the following are correct?
, so , so as ,
On the other hand, consider the function
While the two sides of the limit as approaches do not agree, we can still consider the
one-sided limits. We see and .
If at least one of the following hold:
,
,
,
then the line is a vertical asymptote of .
Find the vertical asymptotes of
Start by factoring both the numerator and the denominator:
Using limits, we must investigate when and . Write
Now write
Consider the one-sided limits separately. Since approaches from the right and the
numerator is negative, . Since approaches from the left and the numerator is
negative, .