Here you go :) It is also clear from what is written in the text alone: If you accept that 1) \exp is injective on the domain B_\epsilon and 2) the inverse \log is continuous, then you get ...

The first approach we take, though correct, is not the best one, and we later describe a better approach. Suppose first that x \ge \theta. By symmetry, the probability that X\le \theta is \frac{1}{2} ...

Since f(x) = \frac{1}{x} continuous for x>0, if a sequence (x_n, y_n) in B converges to (x_0, y_0), from y_n = \frac{1}{x_n} we must have y_0 = \frac{1}{x_0}, Therefore (x_0, y_0) \in B ...

Fundamentally the thinking is right, and the numerical answer is correct. The notation is not so good. One should explicitly condition on which box we drew from. Let random variable Y_1 be the ...

Note that we want to find an upper bound, so your inequalities are facing the wrong way. Given any \varepsilon > 0, let M = \frac{1}{\varepsilon} > 0. Then for all x > M, observe that: ...

Let's make this concrete by using a \text{spin-}\frac 1 2 state in the z direction, where we get to use the Pauli matrices, usually written as\sigma_x = \left[\begin{array}{cc}0&1\\1&0\end{array}\right]; ~~~\sigma_y = \left[\begin{array}{cc}0&-i\\i&0\end{array}\right]; ~~~\sigma_z = \left[\begin{array}{cc}1&0\\0&-1\end{array}\right] ...