The following advanced exercise use a generalized ratio test to determine convergence of some series that arise in particular applications

ddaeeric

ddaeeric

Answered question

2021-09-30

The following advanced exercise use a generalized ratio test to determine convergence of some series that arise in particular applications, including the ratio and root test, are not powerful enough to determine their convergence. The test states that if $ limna2nan<1/2 then an converges, while if limna2n+1an>1/2 then an  diverges. Let an=nlnn(lnn)n. Show that a2nan0 as n

Answer & Explanation

Jayden-James Duffy

Jayden-James Duffy

Skilled2021-10-01Added 91 answers

Proved, limna2nan=0

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