TODOs

docs/math/abstract-algebra/DF-13-fields.md

@@ -16,4 +16,6 @@
 
 **Definition**. If $K$ is generated by $F(\alpha)$, then $K$ is a *simple extension* of $F$.
 
-**Theorem**. Let $F$ be a field, $p(x) \in F[x]$ be irreducible. Then, if $\alpha$ is a root of $p(x)$ and $K$ is an extension of $F$ containing $\alpha$, then $F(\alpha) \cong \frac{F[x]}{(p(x))}$.
+**Theorem**. Let $F$ be a field, $p(x) \in F[x]$ be irreducible. Then, if $\alpha$ is a root of $p(x)$ and $K$ is an extension of $F$ containing $\alpha$, then $F(\alpha) \cong \frac{F[x]}{(p(x))}$.
+
+TODO

docs/physics/electrostatics/6 -polarization-magnetization.md

@@ -0,0 +1,3 @@
+# Chapter 6 - Polarization and Magnetization
+
+TODO

docs/physics/electrostatics/7-time-dependent-em-fields.md

@@ -0,0 +1,3 @@
+# Chapter 7 - Time Dependent Electric and Magnetic Fields
+
+TODO