Suppose
G
G
acts effectively as a group of homeomorphisms of the connected, locally path connected, simply connected, locally compact metric space
X
X
. Let
G
¯
\overline G
denote the closure of
G
G
in
Homeo
(
X
)
{\text {Homeo}}(X)
, and
N
N
the smallest normal subgroup of
G
¯
\overline G
which contains the path component of the identity of
G
¯
\overline G
and all those elements of
G
¯
\overline G
which have fixed points. We show that
π
1
(
X
/
G
)
{\pi _1}(X/G)
is isomorphic to
G
¯
/
N
\overline G /N
subject to a weak path lifting assumption for the projection
X
→
X
/
G
¯
X \to X/\overline G
.