a_n=\frac{1}{4}\sum_{k=1}^n\left(\frac{1}{4k-3}-\frac{1}{4k+1}\right)= =\frac{1}{4}\left(1-\frac{1}{5}+\frac{1}{5}-\frac{1}{9}+...+\frac{1}{4n-3}-\frac{1}{4n+1}\right)= =\frac{1}{4}\left(1-\frac{1}{4n+1}\right)=\frac{n}{4n+1}

You just have to expand y=x/2 as a Fourier series: {x\over2}=\sin (x)-\frac{1}{2} \sin (2 x)+\frac{1}{3} \sin (3 x)-\frac{1}{4} \sin (4x)+\frac{1}{5} \sin (5 x)+\ldots and put here x=\pi/2.

For convenience I will use a slightly different notation. Meissel-Mertens second theorem gives for the sum over primes p \leq n that \lim_{n \rightarrow \infty} \left( \sum_{p \leq n} \frac{1}{p} - \ln(\ln n)\right) = M ...

When in doubt, draw a table! \begin{array}&& \text{By Volume} \\ \hline \bf\text{Antifreeze}&\bf\text{Water}&\bf\text{Total}\\ \hline \frac 12 &\frac 12 &1\\ \frac 14 &0 &\frac 14\\ \hline \frac 34 &\frac 12&\frac 54\\ \hline \end{array} ...

Your approach was fine and mostly correct however you made a mistake in building your expression. In the hypergeometric distribution we have some number of objects, N , some number of objects of ...

your answer seems ok to me. my back-of-the-envelope calc using Landau's "big-O" was: n \sin (2\pi e n) = n \sin(2\pi E_n +2\pi e_n) = n \sin 2\pi e_n \\ = n \sin \left(\frac{2\pi}{n+1} + O(n^{-2})\right) = 2\pi (1+n^{-1})^{-1} + nO(n^{-2}) \\ = 2\pi + O(n^{-1})