First, let's calculate the critical angle. As you noted, at \theta_1=\theta_c, \sin\theta_2=1, and thus \theta_c=\arcsin(n_2/n_1). Obviously, for a critical angle to exist, we must have n_1>n_2 ...

I think you got it. To get an average angle, do not do \frac{1}{n} \sum_i^n \theta_i but use the atan2() function with the average sine and cosine. This is equivalent to take a scatter plot of ...

I don't know why you think {cos(2nx-2\theta_n)\over2} should converge to -{1\over2}. For typical x that quantity oscillates as n\to\infty. Write cos(2nx-2\theta_n)=\cos(2nx)\cos(2\theta_n)+\sin(2nx)\sin(2\theta_n). ...

Frankly, complex angles just aren't worth the hassle. As the answer you've linked to points out, they're just a complicated way to re-parametrize the evanescent wave e^{i\mathbf k\cdot \mathbf r} = e^{i(k_x,0,i\kappa)\cdot (x,y,z)} =e^{ik_x x}e^{-\kappa z} \ \ \stackrel{\rm as}{=} \ \ e^{ik(\sin(\theta),0,\cos(\theta))\cdot\mathbf r} . ...

I get a different formula. Let me show you how I derived it. Using the following diagram: We can write the following equations by looking at triangles: \begin{align}\frac{x}{L} &= \sin(\theta_1-\theta_2)\\&=\sin\theta_1 \cos\theta_2 - \cos\theta_1\sin\theta_2\\ \frac{d}{L}&=\cos\theta_2\end{align} ...

\begin{eqnarray*}\iint_{(0,1)^2}\sqrt{\frac{xy}{x^2+y^2}}\,dx\,dy&\stackrel{\text{symmetry}}{=}&2\int_{0}^{1}\int_{0}^{x}\sqrt{\frac{xy}{x^2+y^2}}\,dy\,dx\\&\stackrel{y\mapsto x u}{=}&2\int_{0}^{1}\int_{0}^{1}x \sqrt{\frac{x^2 u}{x^2+x^2 u^2}}\,du\,dx\\&\stackrel{\text{Fubini}}{=}&2\int_{0}^{1}x\,dx \int_{0}^{1}\sqrt{\frac{u}{1+u^2}}\,du\\&=&\int_{0}^{1}\sqrt{\frac{u}{1+u^2}}\,du\\&\stackrel{u\mapsto v^2}{=}&\int_{0}^{1}\frac{2v^2}{\sqrt{1+v^4}}\,dv\leq\int_{0}^{1}2v^2\,dv=\frac{2}{3}.\end{eqnarray*} ...