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5 Feb 2021
Consider the graph of
shown below. Find
.
![](data:image/png;base64,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)
Consider the graph of shown below. Find
.
Skill
Find one-sided limits and infinity
18 May 2024
Rozalliene HomigopLv10
5 Feb 2021
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