Consider, for all n\in\mathbb{N}: u_n=\int_0^1(1-(1-t^n)^{1/n})dt Does the series \sum_{n\geq1}u_n converges ?

Zeenat Horn

Zeenat Horn

Answered question

2022-02-23

Consider, for all nN:
un=01(1(1tn)1n)dt
Does the series n1un converges ?

Answer & Explanation

mastifo5h

mastifo5h

Beginner2022-02-24Added 6 answers

We have
(1tn)1n=e1nlog(1tn)
1+1nlog(1tn)
from which
01(1tn)1ndt1+1n01log(1tn)dt
=1+1n201log(1t)tt1ndt
1+1n201log(1t)tdt
=1π26n2
Hence,
001(1(1tn)1n)dtπ26n2
By the comparison test, the series converges.

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