I will give an answer to my own question. The solution was almost right. The question was how to find the intersection points of the normal line with the ellipse. (There can be at most 2 intersection ...

Let \mu_4 = E(X-\mu)^4. Then, the formula for the SE of s^2 is: se(s^2) = \sqrt{ \frac{1}{n}\left(\mu_4 -\frac{n-3}{n-1} \sigma^4\right)} This is an exact formula, valid for any sample size ...

Let \alpha= \angle_{FAD} , \beta= \angle_{EAD} . Then you are given \cos\alpha= AD/AF , and similarly \cos\beta . You can now compute \cos (\alpha+\beta) . As \alpha+\beta = \angle_{CAB} ...

Beginning with the premise that a\left|n\right>=\sqrt{n}\left|n-1\right>\\ a^\dagger\left|n\right>=\sqrt{n+1}\left|n+1\right> we have that the first relation you have is h\left|n\right>=a^\dagger\,a\left|n\right>=\sqrt{n}a\left|n-1\right>=\sqrt{n}\sqrt{(n-1)+1}\left|n-1+1\right>=n\left|n\right> ...

f=e^2l if and only if the ellipse is centered at the origin. But a general ellipse with focus at (f, 0) and line at x=l need not be centered at the origin.

Part A A. This "simple would-be relativistic quantum theory" indeed violates locality, but not for the reason you write. You wrote that the energy i.e. the Hamiltonian is defined as H =\sqrt{p^2+m^2} ...