证明:
(1) $\because \overset{\frown}{AC}=\overset{\frown}{AC},$$\therefore ∠ B=∠ E。$
$\because ∠ B=∠ D,$$\therefore ∠ E=∠ D。$
$\because CE// AD,$$\therefore ∠ D + ∠ ECD=180°,$
$\therefore ∠ E + ∠ ECD=180°,$
$\therefore AE// CD,$
$\therefore$ 四边形AECD为平行四边形。
(2) 连接$OE,$$OB。$
$\because$ 四边形AECD为平行四边形,$\therefore AD=EC。$
$\because AD=BC,$$\therefore EC=BC。$
又$\because OC=OC,$$OE=OB,$
$\therefore △ COE ≌ △ COB \ (\mathrm{SSS}),$
$\therefore ∠ OCE=∠ OCB,$即$CO$平分$∠ BCE。$
