how is limit(n^(1/n)) = 1?

Determine whether the limit converges or diverges, if it converges, find the limit. an = (1+(4/n))^n

Determine whether the limit converges or diverges, if it converges, find the limit. an = (1+(4/n))^n

1. To test this series for convergence ∞∑n=1 n /√n^3+1 You could use the Limit Comparison...

1. To test this series for convergence ∞∑n=1 n /√n^3+1 You could use the Limit Comparison Test, comparing it to the series ∞∑n=1 1 /n^p where p= 2. Test the series below for convergence using the Ratio Test. ∞∑n=1 n^5/0.5^n The limit of the ratio test simplifies to lim n→∞|f(n)| where f(n)=    The limit is:

Determine the convergence/divergence of the following series using the integral test: a.) ∑= (1)/n(In(n))^2 (Upper limit...

Determine the convergence/divergence of the following series using the integral test: a.) ∑= (1)/n(In(n))^2 (Upper limit of sigma is ∞ ,and the lower limit of sigma is n=2) b.) ∑ (n-4)/(n^2-2n+1) (Upper limit of sigma is ∞ and the lower limit of the sigma is n=2 c.)∑ (n)/(n^2+1) (Upper limit of sigma ∞ and the lower limit sigma is n=1) d.) ∑ e^-n^2 (Upper limit of sigma ∞ and the lower limit sigma is n=1)

Prove 1/4 is not a limit point of 1/n where n is a positive integer.

Prove 1/4 is not a limit point of 1/n where n is a positive integer.

the exponential function that can be described as e^x = (1 + x/n)^n in the limit...

the exponential function that can be described as e^x = (1 + x/n)^n in the limit as n -> infinity through positive integers. calculate approximation to e^(i pi) by choosing n=10. Make sure you write down the values of (i pi)/n and (1 + (i pi)/n) as well as your final answer of (1 + (i pi)/n)n. How close is your answer to -1?

1. Find the limit as n goes to infinity of xn over n factoiral.

1. Find the limit as n goes to infinity of xn over n factoiral.

Prove that a sequence (un such that n>=1) absolutely converges if the limit as n approaches...

Prove that a sequence (un such that n>=1) absolutely converges if the limit as n approaches infinity of n2un=L>0

Write out the first five terms of the sequence with {[(n+8)/n+1)]^n}^inf n=1 and find its limit...

Write out the first five terms of the sequence with {[(n+8)/n+1)]^n}^inf n=1 and find its limit as well as mention if it converges?

Calculate the limit if n approaches Infinity: lim [(5cosn+3sinn+lnn^7)/n - 1/(7^n) - (100^n)/n! ]

Calculate the limit if n approaches Infinity: lim [(5cosn+3sinn+lnn^7)/n - 1/(7^n) - (100^n)/n! ]

Prove directly from the definition of the limit (b) lim (n−2)/(n+12)=1 c) lim n√8 = 1....

Prove directly from the definition of the limit (b) lim (n−2)/(n+12)=1 c) lim n√8 = 1. (Hint: recall the formula for x^n − 1).