如图,△ABC内接于⊙O,且AB=AC,D是上一点,AD与BC交于E,AF⊥DB,垂足为F.
(1)求证:∠ADB=∠CDE;
(2)若AF=DC=6,AB=10,求△DBC的面积.
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(1)证明:∵AB=AC,
∴∠ABC=∠BCA=∠ADB,
∵四边形ABCD是圆内接四边形,
∴∠CDE=∠ABC,
∴∠ADB=∠CDE;
(2)解:作AM⊥CD于点M,
∵AB=10,AF=6,
∴BF=8,
∵AD平分∠BDM,AM=AF=6,
∴△ACM≌△ABF,
∴CM=BF=8,
∴DF=DM=CM-CD=2.
∴BD=BF+DF=10=AB.
∴∠BAD=∠ADB=∠ADM,
∴S△DBC=S△ADC=CD×AM=18.
解析分析:(1)根据AB=AC,可得出∠ABC=∠BCA,再根据圆内接四边形的性质可得出∠CDE=∠ABC,从而得出