New posts in indeterminate-forms

Why is 1 raised to the power of infinity undefined? [duplicate]

calculus real-analysis analysis infinity indeterminate-forms

Why can we resolve indeterminate forms?

limits indeterminate-forms

Find $\lim_{n \to \infty} \left[\frac{(n+1)^{n + 1}}{n^n} - \frac{n^{n}}{(n-1)^{n-1}} \right]$ (a question asked at trivia)

limits indeterminate-forms

An indeterminate expression when calculating derivative.

calculus derivatives indeterminate-forms

Question about the derivative definition

limits derivatives definition indeterminate-forms

Why is infinity multiplied by zero considered zero here?

sequences-and-series limits proof-explanation power-series indeterminate-forms

Why is $\frac{\ln\infty}{\infty}$ equal to $\frac\infty\infty$?

calculus limits infinity indeterminate-forms

I got the answer for $\lim \limits_{x \to \infty} {\left({3x-2 \over3x+4}\right)}^{3x+1}$, but only by a mistake - how do I solve correctly?

calculus indeterminate-forms

What exactly does it mean that a limit is indeterminate like in 0/0? [duplicate]

limits indeterminate-forms

Why is $0^0$ also known as indeterminate? [duplicate]

exponentiation convention indeterminate-forms

Why doesn't using the approximation $\sin x\approx x$ near $0$ work for computing this limit?

calculus limits trigonometry limits-without-lhopital indeterminate-forms

Evaluate $\mathop {\lim }\limits_{x \to 0} \left( {{1 \over {{{\sin }^2}x}} - {1 \over {{x^2}}}} \right)$

calculus limits trigonometry indeterminate-forms

Why does L'Hôpital's rule work for sequences?

calculus real-analysis limits convergence-divergence indeterminate-forms

Clarification about $0^0$ [duplicate]

real-analysis analysis indeterminate-forms

Is $0^\infty$ indeterminate?

calculus limits indeterminate-forms

Why don't I get $e$ when I solve $\lim_{n\to \infty}(1 + \frac{1}{n})^n$? [duplicate]

calculus limits exponential-function indeterminate-forms

Why is the limit of $\frac{1}{1-e^x}$ when $x$ approaches $0^+$ equal to $-\infty$? [closed]

calculus algebra-precalculus limits indeterminate-forms

Is it wrong to tell children that $1/0 =$ NaN is incorrect, and should be $∞$?

terminology arithmetic indeterminate-forms

What's wrong with this reasoning that $\frac{\infty}{\infty}=0$?

real-analysis infinity fake-proofs indeterminate-forms

I have learned that 1/0 is infinity, why isn't it minus infinity?

infinity indeterminate-forms