r=-\frac{2e^{8i\theta }}{5\left(e^{iϕ+5i\theta }+e^{iϕ+11i\theta }-e^{iϕ+7i\theta }-e^{iϕ+9i\theta }+e^{5i\theta -iϕ}+e^{11i\theta -iϕ}-e^{7i\theta -iϕ}-e^{9i\theta -iϕ}\right)}

5e^{iϕ+7i\theta }+5e^{iϕ+9i\theta }-5e^{iϕ+5i\theta }-5e^{iϕ+11i\theta }+5e^{7i\theta -iϕ}+5e^{9i\theta -iϕ}-5e^{5i\theta -iϕ}-5e^{11i\theta -iϕ}\neq 0\text{ and }e^{iϕ+5i\theta }+e^{iϕ+11i\theta }-e^{iϕ+7i\theta }-e^{iϕ+9i\theta }+e^{5i\theta -iϕ}+e^{11i\theta -iϕ}-e^{7i\theta -iϕ}-e^{9i\theta -iϕ}\neq 0\text{ and }e^{-8i\theta }\left(e^{iϕ+5i\theta }+e^{iϕ+11i\theta }-e^{iϕ+7i\theta }-e^{iϕ+9i\theta }+e^{5i\theta -iϕ}+e^{11i\theta -iϕ}-e^{7i\theta -iϕ}-e^{9i\theta -iϕ}\right)\neq 0\text{ and }\nexists n_{1}\in \mathrm{Z}\text{ : }ϕ=\pi n_{1}+\frac{\pi }{2}

r=\frac{1}{40\cos(\theta )\cos(ϕ)\left(\sin(\theta )\right)^{2}}

\nexists n_{1}\in \mathrm{Z}\text{ : }ϕ=\pi n_{1}+\frac{\pi }{2}\text{ and }\nexists n_{2}\in \mathrm{Z}\text{ : }\theta =\frac{\pi n_{2}}{2}