feat: implement barebone zola templates

themes/emily_zola_theme/content/post/mathjax_support.md

@@ -0,0 +1,30 @@
++++
+title = "MathJax Support"
+date = 2021-01-03
+[taxonomies]
+categories = ["math"]
+tags = ["Euler's identity"]
+[extra]
+math = true
++++
+
+**Please add the following lines in the front matter when using MathJax.**
+
+```
+[extra]
+math = true
+```
+
+---
+
+#### Euler's identity
+
+$e^{i\pi }+1=0$
+
+#### Geometric interpretation
+
+Any complex number $z=x+iy$ can be represented by the point $(x,y)$ on the complex plane. This point can also be represented in polar coordinates as $(r,\theta )$, where $r$ is the absolute value of $z$ (distance from the origin), and $\theta$  is the argument of $z$ (angle counterclockwise from the positive x-axis). By the definitions of sine and cosine, this point has cartesian coordinates of $(r\cos \theta ,r\sin \theta )$, implying that $z=r(\cos \theta +i\sin \theta )$. According to Euler's formula, this is equivalent to saying $z=re^{i\theta}$.
+
+Euler's identity says that $-1=e^{i\pi }$. Since $e^{i\pi }$ is $re^{i\theta }$ for $r$ = 1 and $\theta =\pi$ , this can be interpreted as a fact about the number −1 on the complex plane: its distance from the origin is 1, and its angle from the positive x-axis is $\pi$ radians.
+
+[Euler's identity \- Wikipedia](https://en.wikipedia.org/wiki/Euler%27s_identity)