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Such forms are: 1^∞, ∞^0, 0^0, 0/0, ±∞/±∞, 0*∞, ∞ - ∞ For 1^∞, you would think that the limit evaluates to 1 everytime this occurs. 1. Here is an example involving the indeterminate form 0 0: → + = → + ⁡ = → + ⋅ ⁡ = → + (⋅ ⁡). Now the exponent has been "moved down". 0. Indeterminate forms are where plugging in the information does not give you enough information to find the limit. Formula is for evaluate limits which answers are e to the power something. University Math Help. I keep redoing it, and theres no way i come even close to this answer. However, lim (x-->infinity) (1 + 1/n)^n = e and this is in the form 1^∞. Limit of Indeterminate form 1^(infinity) Thread starter InfinitePartsInHarmony; Start date Jul 14, 2008; Tags 1infinity form indeterminate limit; Home. Behavior of the sequences as n tends to infinity. Oh, well. L'Hôpital's rule can be used on indeterminate forms involving exponents by using logarithms to "move the exponent down". I. InfinitePartsInHarmony. It’s just the reciprocal of $1^\infty$ which is an indeterminate form. $\endgroup$ – Harald Hanche-Olsen Mar 3 '13 at 20:24 How to prove this formula. Voted to close. Limit of the form 0 times infinity . It is on the second page when you search for the word “indeterminate”. It is valid to move the limit inside the exponential function because the exponential function is continuous. Forums. Dividing by zero results negative infinity. Oh, well. Unfortunately, this is an indeterminate form, which means a limit can’t be figured out only by looking at the limits of functions on their own so, in other words, you’ll have to do some extra work to really find your answer. Jul 2008 12 6. lim (4x+1)^(cotx) x->0 Ths is an indeterminate form in the form of [1^infinity]. Solving 1 divided by infinity is an excellent example of a problem that doesn’t have an outright answer. 0. Voted to close. Yes, $1^{-\infty}$ is an indeterminate form. Calculus. How can you sketch this limit as n approaches infinity? 0. What is 1 divided infinity? The answer is e^4, but how? How to evaluate a limit of the indeterminate form $(0/0)^0$ 0.