【答案】(1)當(dāng)AC平分∠BAD時�,有AD⊥CD,理由見解析�;(2)△OCF面積為12cm2
【解析】
(1)連接OC�����,由等邊對等角得到∠OCA =∠OAC.再由角平分線定義得到∠OAC =∠DAC���,等量代換得到∠OCA = ∠DAC ,根據(jù)內(nèi)錯角相等��,兩直線平行�,得到 OC∥AD.由切線的性質(zhì)及平行線的性質(zhì)即可得出結(jié)論;
(2)先證明AC平分∠BAD��,再根據(jù)角平分線的性質(zhì)得到CD =CE�����,由垂徑定理得到CF的長.在Rt△OEC中����,由勾股定理得到OE的長,根據(jù)三角形的面積公式即可得出結(jié)論.
(1)當(dāng)AC平分∠BAD時���,有AD⊥CD.證明如下:
連接OC.
∵ OA = OC��,∴ ∠OCA =∠OAC.
∵AC平分∠BAD�,∴ ∠OAC =∠DAC,∴ ∠OCA = ∠DAC ��,∴ OC∥AD.
∵ CD切⊙O于C點�,∴ OC⊥CD,∴∠OCD=90°.
∵OC∥AD��,∴∠ADC=180°-∠OCD=90°���,∴AD⊥CD.
(2) 連接OF.
∵ CD切⊙O于C點,∴ OC⊥CD.
∵ AD⊥CD�����,∴ OC∥AD�,∴∠OCA=∠DAC
∵ OA = OC,∴ ∠OCA =∠OAC�,∴∠OAC =∠DAC,∴ AC平分∠BAD�����,∴ CD =CE.
∵ OA =5�����,CD =4,∴OC=OA=5��,CE=4.
∵CF⊥AB �,∴CF = 2CE= 2×4=8,OE=
=
=3.
△OCF面積=CF×OE÷2= 8×3÷2=12.
故△OCF面積為12cm2.
