【答案】∠BAC=90°
【解析】分析:(1)由平行線的性質(zhì)和角平分線的性質(zhì),推出∠ECB=∠CEO�,∠GCF=∠CFO,∠ECB=∠ECO�,∠GCF=∠OCF�,通過(guò)等量代換即可推出∠CEO=∠ECO�,∠CFO=∠OCF,便可確定OC=OE�,OC=OF,可得OE=OF�;
(2)當(dāng)O點(diǎn)運(yùn)動(dòng)到AC的中點(diǎn)時(shí),四邊形AECF為矩形�,根據(jù)矩形的判定定理(對(duì)角線相等且互相平分的四邊形為矩形),結(jié)合(1)所推出的結(jié)論�,即可推出OA=OC=OE=OF,求出AC=EF后�,即可確定四邊形AECF為矩形;
(3)當(dāng)△ABC是直角三角形時(shí)�,四邊形AECF是正方形,根據(jù)(2)所推出的結(jié)論�,由AC⊥BC�,MN∥BC,確定AC⊥EF�,即可推出結(jié)論.
詳解:(1)∵CE是∠ACB的平分線,∴∠ACE=∠BCE.
∵MN∥BC�,∴∠FEC=∠BCE,∴∠ACE=∠FEC�,∴OE=OC,
同理可證OF=OC�,
∴OE=OF�;
(2)當(dāng)點(diǎn)O運(yùn)動(dòng)到AC中點(diǎn)時(shí)�,四邊形AECF是矩形.
∵OA=OC,OE=OF�,∴四邊形AECF平行四邊形.
∵OE=OC,∴OA=OC=OE=OF�,∴AC=EF,
∴平行四邊形AECF是矩形�;
(3)當(dāng)點(diǎn)O運(yùn)動(dòng)到AC的中點(diǎn),且△ABC滿(mǎn)足∠ACB=90°時(shí)�,四邊形AECF是正方形.理由如下:
∵當(dāng)點(diǎn)O運(yùn)動(dòng)到AC的中點(diǎn)時(shí),AO=CO.
又∵EO=FO�,∴四邊形AECF是平行四邊形.
∵FO=CO,∴AO=CO=EO=FO�,∴AO+CO=EO+FO,即AC=EF�,∴四邊形AECF是矩形.
∵MN∥BC,當(dāng)∠ACB=90°�,則∠AOF=∠COE=∠COF=∠AOE=90°,∴AC⊥EF�,∴四邊形AECF是正方形;
故答案為:∠ACB=90°.
