$(a, b] cup [c, d)$ cannot be written as a union of open intervals

Being disconnected is not enough: $(0,1)cup (2,3)$ is a union of open intervals $(0,1)$ and $(2,3)$. But it is disconnected.

In order to show that your $I$ is not a union of open intervals, first you need to know that open intervals are in fact open subsets and thus a union of open intervals is open as well. And so if $I$ is a union of open intervals, then $I$ is open.

We can then utilize the definition of an open subset in $mathbb{R}$: a subset $Usubseteqmathbb{R}$ is open if and only if for any point $xin U$ there is $epsilon >0$ such that $(x-epsilon,x+epsilon)subseteq U$. In other words: a subset of $Usubseteq mathbb{R}$ is open if for any point $xin U$, our subset $U$ contains a small neighbourhood of $x$ as well.

So given $I=(a,b]cup [c,d)$ with $a<b<c<d$ can you see why $I$ is not open? For example: why $I$ does not contain any open neighbourhood of $b$?