Using fuzzy $BCC$-ideals, the quotient structure of
$BCC$-algebras is discussed.
We show that (1) If ${\mathfrak f}:G \to H$ is
an onto homomorphism of $BCC$-algebras, and if $\bar B$
is a fuzzy $BCC$-ideal of $H$, then $G/{{\mathfrak f}^{-1}(\bar
B)}$ is isomorphic to $H/{\bar B};$ (2) If $\bar A$ and $\bar B$
are fuzzy $BCC$-ideals of $BCC$-algebras $G$ and $H$,
respectively, then
$\frac{G\times H}{\bar A \times {\bar B}} \cong
G/{\bar A}\times H/{\bar B};$ and
(3) If $\bar A$ is a fuzzy $BCC$-ideal of $G$, and if $J$ is a
$BCC$-ideal of $G$ such that $J/{\bar A}$ is a $BCC$-ideal of
$G/{\bar A}$, then $\frac{G/{\bar A}}{J/{\bar A}}\cong G/J.$