Let $X,Y$ be complex projective varieties with $X$ irreducible, and let $f:X\dashrightarrow Y$ be a rational map.
If $U\subseteq X$ is the largest open set where $f$ can be defined, is it true that
$\mathrm{codim}_{X}(X\setminus U)\geq 2$.
I know this is true if $X$ is smooth.

Thanks.