\displaystyle\frac{{735}}{{748}} Explanation: The required value can be found by adding two sums \displaystyle{S}_{{1}}=\frac{{1}}{{{1}\times{2}}}+\frac{{1}}{{{2}\times{3}}}+\ldots+\frac{{1}}{{{10}\times{11}}} ...

Note, the general term a_n, n\geq 1 is \begin{align*} a_n=\frac{1\cdot 3\cdot 5\cdots (2n-1)}{4\cdot8\cdot 12\cdots (4n)} =\frac{1\cdot 3\cdot 5\cdots (2n-1)}{(1\cdot 2\cdot 3\cdots n)\cdot 4^n} ...

\frac1{(3r-1)(3r+2)}=\frac13\frac{(3r+2)-(3r-1)}{(3r+2)(3r-1)}=\frac13\left(\frac1{3r-1}-\frac1{3r+2}\right) You have missed the \dfrac13

In the inductive step you have 2\times4\times6\times\cdots\times(4(k+1)-2)=2\times4\times6\times\cdots\times(4k-2)\times(4(k+1)-2)\\ \ \\=\frac{(2k)!(4(k+1)-2)}{k!} =\frac{(2k)!(4k+2)}{k!} =\frac{2(2k)!(2k+1)}{k!} =\frac{2(2k+1)!}{k!} =\frac{2(2k+2)!}{k!(2k+2)} =\frac{(2k+2)!}{k!(k+1)} =\frac{(2k+2)!}{(k+1)!}

Note that \frac1{F_n}-\frac1{F_{n+1}}=\frac{F_{n+1}-F_n}{F_nF_{n+1}}=\frac{F_{n-1}}{F_nF_{n+1}}, hence \frac1{F_{n-1}F_n}-\frac1{F_nF_{n+1}}=\frac1{F_{n-1}F_{n+1}} and your sum turns into \frac1{1\cdot 3}+\frac1{3\cdot 8}+\frac1{8\cdot 21}+\ldots ...

The difference is in the prior expectation. The pure frequentists doesn't make any. Suppose I show you a coin. Before I even toss it, what would you expect the bias to be? The pure frequentist ...