What are the criteria for using L'Hopital's rule?

Question

mini · Answer

0/0

mini · Answer

0*inf

mini · Answer

uh 0 - inf

anonymous · Answer

the limit must exist

anonymous · Answer

As Mini was saying, it cannot be an indeterminate form.

mini · Answer

0/0 is the easiest one to see, then u can just do it on top and bottom, but dont confuse it with the quotient rule! thatll suck!

anonymous · Answer

er Scratch what I said last:

    \lim_{x	o c}{f(x)} = \lim_{x	o c}g(x) = 0

or

    \lim_{x	o c}{f(x)} = \pm\lim_{x	o c}{g(x)} = \pm\infty.

And suppose that

    \lim_{x	o c}{\frac{f'(x)}{g'(x)}} = L.

Then

    \lim_{x	o c}{\frac{f(x)}{g(x)}}=L.

mini · Answer

thats so confusing to try to read on this

mini · Answer

qriy just post the equation it might be easier

anonymous · Answer

Does Limit of (x-4)/(x+4)^2 with x->-4 fit the criteria for L'Hopital?

anonymous · Answer

Some of the situations that call for Lhopital$$\infty/ \infty$$$$\infty-\infty$$$$1^{\infty}$$$$\infty ^{0}$$$$0^{\infty}$$$$0\infty$$