For this time using Fourier expansion, we want to compute zeta 4.
To do that first briefly mention Fourier expansion of function f(x)
This technique is freuqently used in many science and engineering fields. From the shape of function f(x), we have some special properties. For example when f(x) is even, from parity, b_n=0, and for f(x) is odd, again from parity, a_n=0, and so on.
To compute zeta 4, our choice of f(x) is
which is even function.
Note that the first few terms are integration over polynomial on x, so we can easily compute. Then how about the later terms?
Leibniz integral Rule
Using Leibniz integral Rule we can compute integral easily.
For example
Generalized
Now using this equation, by plugging we have
Plugging
and re-ordering we have
ohhh muy interesante la funsión de Fourier
Saludos :)
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It is very difficult for me, athletes)
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