In this video I go further into L'Hospital's Rule and show that you can easily re-arrange indeterminate differences to get them in the form of an indeterminate quotient so that you can apply L'Hospital's Rule to determine the limit.

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L’Hospital’s Rule – Indeterminant Differences:

Indeterminant Differences: ∞ - ∞

Recap on L'Hospital's Rule

Strategy for Indeterminant Differences

Can re-arrange indeterminant differences by factoring or multiplying by the common denominator, etc., to get an indeterminant quotient (0/0, ∞/∞). From which, we can apply L'Hospital's Rule.

Example