(1)证明:由题意得,$OM=ON,$$OC=OD,$
$\therefore OC-OM=OD-ON,$即$CM=DN。$
(2)解:$AM=BN,$证明如下:
解法一:连接$OA,$$OB。$
$\because OM=ON,$$OA=OB,$
$\therefore ∠ OMN=∠ ONM,$$∠ A=∠ B,$
$\therefore ∠ OMA=∠ ONB,$
$\therefore △ OMA≌△ ONB,$
$\therefore AM=BN。$
解法二:连接$OA,$$OB,$过点$O$作$OH⊥ AB,$垂足为$H。$
$\because △ OMN$与$△ OAB$都是等腰三角形,
$\therefore MH=NH,$$AH=BH,$
$\therefore AH-MH=BH-NH,$即$AM=BN$
