Test the convergence of the series sigma_n = 1^infinity n^n/n!

asked Jul 9, 2020 53.7k views

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With
a_n=(n^n)/(n!) , we have

$(a_(n+1))/(a_n)=(((n+1)^(n+1))/((n+1)!))/((n^n)/(n!))=((n+1)n!)/((n+1)!)\left(\frac{n+1}n\right)^n=\left(1+\frac1n\right)^n$

whose limit is (famously)
as
$n\to\infty$ .
e>1 , so the series diverges by the ratio test.

Mreq answered Jul 16, 2020

by Mreq

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