In this note, a general result for determining the rational hulls of fibered sets in
C
2
\mathbb {C}^2
is established. We use this to compute the rational hull of Rudin’s Klein bottle, the first explicit example of a totally real nonorientable surface in
C
2
\mathbb {C}^2
. In contrast to its polynomial hull, which was shown to contain an open set by the first author in 2012, its rational hull is shown to be
2
2
-dimensional. Using the same method, we also compute the rational hulls of some other surfaces in
C
2
\mathbb {C}^2
.