How do I prove that \(\displaystyle{\left({v}_{{n}}\right)}\), defined

Beckham Short

Beckham Short

Answered question

2022-04-13

How do I prove that (vn), defined by
vn=1n2+1+1n2+2++1n2+n,
is convergent?

Answer & Explanation

entreblogsmc2j

entreblogsmc2j

Beginner2022-04-14Added 10 answers

nn2+n=1n2+n+1n2+n++1n2+n
1n2+1+1n2+2++1n2+n
1n2+1n2++1n2=nn2=1
The inequalities hold since bigger denominators make smaller fractions and obviously: n2+nn2+in2 for i=1,,n
Next, limnnn2+n=1. So your summation is squeezed between 1 and 1. Thus its limit is 1.

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