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How do you determine if #a_n = (1+1/n^2)^n# converge and find the limits when they exist?

1 Answer

Nov 2, 2017

#lim_(n->oo)a_n = 1#

Explanation:

#a_n = (1+1/n^2)^n = ((1+1/n^2)^(n^2))^(1/n) #

and then

#lim_(n->oo) a_n approx lim_(n->oo) e^(1/n) = 1# and the sequence #a_n# converges.

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