I've met the following. Set b n </msub> := <msubsup> &#x222B;<!-- ∫ --> 0

Roland Waters

Roland Waters

Answered question

2022-06-23

I've met the following. Set
b n := 0 π / 2 cos 2 n + 1 ( x ) d x .

Answer & Explanation

podesect

podesect

Beginner2022-06-24Added 20 answers

First your recursion should yield
j = 1 n ( 2 j 2 j + 1 )
Now note that
b n = j = 1 n ( 2 j 2 j + 1 ) = j = 1 n ( j j + 1 / 2 ) = j = 1 n j j = 1 n ( j + 1 / 2 ) = π 2 Γ ( n + 1 ) Γ ( 3 / 2 ) j = 1 n ( j + 1 / 2 )
Recall that
Γ ( z + 1 ) = z Γ ( z )  and  Γ ( 3 / 2 ) = π / 2
= π 2 Γ ( n + 1 ) Γ ( n + 3 / 2 )
Once you have this you should be able to get the limit by looking at the asymptotics of Γ ( z ). You could either do by say, Stirling's formula (or) make use of the fact that for large enough z Γ ( z + α ) Γ ( z ) z α
where α R

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