What is the value of: \lim_{n \to \infty} \sum_{r=1}^{n-1}\frac{\cot^2(r\pi/n)}{n^2}

Branden Valentine

Branden Valentine

Answered question

2022-01-27

What is the value of: limnr=1n1cot2(rπn)n2

Answer & Explanation

ebbonxah

ebbonxah

Beginner2022-01-28Added 15 answers

It would be naïve and incorrect to proceed as follows
k=1n1cot2(πkn)n2WRONG!1n1n11ncot2(πx)dx
=1n(x1πcot(πx))1n11n
=2n21n+2nπcot(πn)
2π2
Instead, we use cot2(x)=csc2(x)1 to write
k=1n1cot2(πkn)n2=1n1n2+k=1n11n2,sin2(πkn)
=1n1n2+2k=1|n/2|11n2sin2(πk/n)
Next, we note that for π2>x>0,  (x16x3)2sin2(x)x2 Hence, we have
2π2k=1|n2|11k22n2k=1|n2|11n2,sin2(πkn)2π2

coolbananas03ok

coolbananas03ok

Beginner2022-01-29Added 20 answers

By applying Vieta's formulas to Chebyshev polynomials of the second kind we have
r=1n1cot2(πrn)=(n1)(n2)3
(compare Cauchy's proof of ζ(2)=π26 in his Cours d'Analyse) hence the wanted limit is clearly 13

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