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(2018·南京)如圖����,在矩形ABCD中,AB=5����,BC=4,以CD為直徑作⊙O.將矩形ABCD繞點(diǎn)C旋轉(zhuǎn)�����,使所得矩形A′B′CD′的邊A′B′與⊙O相切���,切點(diǎn)為E�����,邊CD′與⊙O相交于點(diǎn)F�,則CF的長(zhǎng)為 . 【分析】連接OE���,延長(zhǎng)EO交CD于點(diǎn)G�����,作OH⊥B′C�����,由旋轉(zhuǎn)性質(zhì)知∠B′=∠B′CD′=90°、AB=CD=5�����、BC=B′C=4�,從而得出四邊形OEB′H和四邊形EB′CG都是矩形且OE=OD=OC=2.5,繼而求得CG=B′E=OH=根號(hào)(OC2-CH2)=2���,根據(jù)垂徑定理可得CF的長(zhǎng). 【解答】解:連接OE�,延長(zhǎng)EO交CD于點(diǎn)G,作OH⊥B′C于點(diǎn)H���, 則∠OEB′=∠OHB′=90°�����, ∵矩形ABCD繞點(diǎn)C旋轉(zhuǎn)所得矩形為A′B′C′D′�����, ∴∠B′=∠B′CD′=90°����,AB=CD=5����、BC=B′C=4, ∴四邊形OEB′H和四邊形EB′CG都是矩形�����,OE=OD=OC=2.5����, ∴B′H=OE=2.5�����, ∴CH=B′C﹣B′H=1.5�����, ∴CG=B′E=OH=根號(hào)(OC2-CH2)=2��, ∵四邊形EB′CG是矩形�, ∴∠OGC=90°���,即OG⊥CD′���, ∴CF=2CG=4, 故答案為:4.
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