HINT: For the first question, \left(1+\dfrac1{2n+1}\right)\left(1-\dfrac1{2n+2}\right)=1 \prod_{r=1}^n\left(1-\dfrac1{2^r}\right)=\dfrac{\prod_{r=1}^n(2^r-1)}{2^{1+2+\cdots+n}}

This looks like a geometric series , which is a series of the form \sum_{n=0}^\infty a r^n In your case a = \frac{1}{2} and r = \frac{1}{2}.

I think the issue in both of these is the same. In the first part, your solution assumed the question meant "exactly one", and the other solution assumed it meant "at least one". (Here I think the ...

The rearrangement \begin{align*} &(k(1), k(2), k(3) \cdots) \\ &\hspace{3em} = ( \underbrace{1, 2, 4, 6, 8}, \ \underbrace{3, 10, 12, 14, 16}, \ \cdots, \ \underbrace{2k-1, 8k-6, 8k-4, 8k-2, 8k}, \ ...

There are some typos in your derivation. Specifically the correct form of (2) is: u=(I+\lambda_0 A)^{-1} \left[\frac{\lambda_0}\lambda f\right]+(I+\lambda_0 A)^{-1}\left[(1-\frac{\lambda_0}\lambda)u\right]. ...

What did I do wrong here? You are computing P(HH)=P(H)P(H), which assumes the events are independent, but actually they aren't. (They only are when conditioned on the picked coin!). The correct (and ...