Let's use some elementary methods. \begin {matrix} S&=& \;&\;&\dfrac 12&+&\dfrac 14 &+& \dfrac 28&+&\dfrac 3{16}&+&\dfrac 5{32}&+&\dfrac 8{64}&+&\cdots\\ 2S&=&1&+&\dfrac 12&+&\dfrac 24&+&\dfrac 38&+&\dfrac 5{16}&+&\dfrac 8{32}&+&\dfrac {13}{64}&+&\cdots \\ S&=&1&+&0&+&\dfrac 14&+&\dfrac 18&+&\dfrac 2{16}&+&\dfrac 3{32}&+&\dfrac 5{64}&+&\cdots \end {matrix} \tag*{} ...

It is not trivial, but your series is a telescopic one. Let a_n=\frac{1}{4^n}\binom{2n}{n}. We have: a_{n}-a_{n+1} = \frac{1}{4^n}\binom{2n}{n}-\frac{1}{4^{n+1}}\binom{2n+2}{n+1} =\frac{a_n}{2n+2} ...

I just read that there is a partial converse to Raabe's test that if \frac{a_{n+1}}{a_n}\geq 1-p/n for p\leq 1, then the series diverges. So I think that settles that it diverges.

The product converges. Here's a proof: Take 4 consecutive terms, beginning with 4k+1 for some integer k. The binary expansion of these 4 terms will be some sequence of bits, followed by ...

There are \binom{47}{2} ways for the manager to select two of the forty-seven guests in the hotel. In order to select two guests from the same room, the manager must select both guests from a ...

The sum of the first two is \dfrac1{5n+1}+\dfrac1{5n+2} \lt \dfrac{2}{5n} and the sum of the last 3 is \dfrac1{5n+3}+\dfrac1{5n+4}+\dfrac1{5n+5} \gt \dfrac{3}{5n+5} . Therefore \begin{array}\\ \dfrac1{5n+1}+\dfrac1{5n+2} -(\dfrac1{5n+3}+\dfrac1{5n+4}+\dfrac1{5n+5}) &\lt \dfrac{2}{5n}-\dfrac{3}{5n+5}\\ &=\dfrac{2 - n}{5 n (n + 1)}\\ &=\dfrac{2}{5 n (n + 1)}-\dfrac{1}{5 (n + 1)}\\ \end{array} ...