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Peculiar alternating series
Prove that
![\[\sum_{n=1}^{\infty} \frac{1}{n} \left ( \frac{1}{(-1)^n - 5} \right )^n = \frac{1}{2} \ln \frac{16}{21}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-18ecf86d38a53a54363d32c4bfe9648d_l3.png "Rendered by QuickLaTeX.com")
Solution
We simply note that
Hyperbolic series
Evaluate the series
![\[\mathcal{S} = \sum_{n=1}^{\infty} \frac{1}{\sinh 2^n}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-17baf82125084f6ecb3b4f63660fc7c9_l3.png "Rendered by QuickLaTeX.com")
Solution
We have successively
since by the unique factorization theorem, any positive even integer 
can be written in a unique way as 
with 
and 
.
A logarithmic integral
Let 
. Prove that:
![\[\int_{0}^{\infty} \frac{\arctan \alpha \sin^2 x}{x^2}\, \mathrm{d}x = \frac{\pi}{\sqrt{2}} \cdot \frac{\alpha}{\sqrt{1+ \sqrt{1+\alpha^2}}}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-2bebe1c5c80bb7cf36cc33b50d6f3812_l3.png "Rendered by QuickLaTeX.com")
Solution
Using the known Fourier series 
as well as the known generating function of the Catalan numbers
![\[\sum_{n=0}^{\infty} \mathcal{C}_n x^n = \frac{1- \sqrt{1-4x}}{2x} \Rightarrow \sum_{n=0}^{\infty} \mathcal{C}_{2n} x^{2n} = \frac{\sqrt{1+4x} - \sqrt{1-4x}}{4x}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-2d583830d0aee02ad310f70a6944bd43_l3.png "Rendered by QuickLaTeX.com")
Then, we have successively:
A Gamma summation
Let 
and 
. Prove that
![\[\sum_{n=0}^{\infty} \frac{2}{\Gamma \left ( a + n \right ) \Gamma \left ( a - n \right )} = \frac{2^{2a-2}}{\Gamma \left ( 2a - 1 \right )} + \frac{1}{\Gamma^2 (a)}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-54d5b1546747dc5e4d020ae505412ad6_l3.png "Rendered by QuickLaTeX.com")
Solution
Consider the function
![\[f(x) = \left\{\begin{matrix} \cos^{2a-2} \pi x & , & \left | x \right |< \frac{1}{2} \\ 0 & , & \text{elsewhere} \end{matrix}\right.\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-5a4ab2f0a40170b224a4a159cd45166b_l3.png "Rendered by QuickLaTeX.com")
We easily evaluate that
![\[\hat{f}(y)= \int_{-\infty}^{\infty} f(x) e^{-2i \pi x y} \, \mathrm{d}x = \frac{2^{2-2a} \Gamma(2a-1)}{\Gamma(a+y) \Gamma(a-y)}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-ab34323f0ba66210367cdc06c24c489c_l3.png "Rendered by QuickLaTeX.com")
Hence it follows from Poisson summation formula that
Thus,
The result follows.
Factorial series
Prove that
![\[\sum_{n=0}^{\infty} \frac{(4n)!}{(4n+4)!} = \frac{\ln 2}{4} - \frac{\pi}{24}\]](https://www.math.tolaso.com.gr/wp-content/ql-cache/quicklatex.com-6bd70020630b9b5990f62328b0bd5003_l3.png "Rendered by QuickLaTeX.com")
Solution
We have successively:
