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Mathematical analysis
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Consider the following calculation of a limit using l'Hôpital's rule:
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Consider the following calculation of a limit using l'Hôpital's rule:
Select correct option.
Consider the following calculation of a limit using l'Hôpital's rule:
Select correct option.
What can be concluded about properties of ?
What is a derivative of at 1?
Which of the following functions is continuous at zero but does not have a derivative at zero?
If is continuous at , it is differentiable at .
If is differentiable at , it is continuous at .
Let and be continuous differentiable functions on and let .
Which of the following equals to the derivative of a product of and at , i.e.. ?
Using the formula derived during the last lecture, calculate the derivative of at point .