Let $\{T_\alpha\}$ be a family of topologies on $X$. Show that there is a unique smallest topology on $X$ containing all the collections $T_\alpha$, and a unique largest topology contained in all $T_\alpha$.
We can check that $\bigcap T_\alpha$ is a topology on $X$, so it is the unique largest topology contained in all $T_\alpha$.
Now, a topology containing all $T_\alpha$ must contain $\bigcup T_\alpha$. It must also contain arbitrary unions and finite intersections of sets in $\bigcup T_\alpha$. Since the union of the sets in $T_\alpha$ is $X$, this is the topology generated by the subbasis $\bigcup T_\alpha$. How can we prove that it is the unique smallest one containing all the collections $T_\alpha$?