【答案】2
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【解析】
作梯形ABCD關(guān)于AB的軸對(duì)稱(chēng)圖形�����,將 QC'繞點(diǎn)C'逆時(shí)針旋轉(zhuǎn)60°,點(diǎn)Q的對(duì)應(yīng)點(diǎn)為F'�,連接F'M���,交C' D'于點(diǎn)G��,交AB與點(diǎn)E',延長(zhǎng)QE'交CD于點(diǎn)F,��,則有GE'=FE',P與Q是關(guān)于AB的對(duì)稱(chēng)點(diǎn)��,當(dāng)點(diǎn)F'、G、P三點(diǎn)在一條直線(xiàn)上時(shí),△FEP的周長(zhǎng)最小即為F'G+GE'+E'P���,此時(shí)點(diǎn)P與點(diǎn)M重合�,F'M為所求長(zhǎng)度����;過(guò)點(diǎn)F'作F'H⊥BC'�,M是BC中點(diǎn)����,則Q是BC'中點(diǎn),由已知條件∠B=90°�,∠C=60°�����,BC=2AD=4�����,可得C'Q=F'C'=2,∠F'C'H=60°�,所以F'H=
��,HC'=7,在Rt△MF'H中�����,F'M=2.
解:作梯形ABCD關(guān)于AB的軸對(duì)稱(chēng)圖形��,將 QC'繞點(diǎn)C'逆時(shí)針旋轉(zhuǎn)60°,點(diǎn)Q的對(duì)應(yīng)點(diǎn)為F'�,連接F'M���,交C' D'于點(diǎn)G,交AB與點(diǎn)E',延長(zhǎng)QE'交CD于點(diǎn)F����,
則有GE'=FE'�����,P與Q是關(guān)于AB的對(duì)稱(chēng)點(diǎn)�,
∴PF=GQ,
又∵GF'=GQ���,
∴當(dāng)點(diǎn)F'�、G��、P三點(diǎn)在一條直線(xiàn)上時(shí),△FEP的周長(zhǎng)最小即為F'G+GE'+E'P�����,
此時(shí)點(diǎn)P與點(diǎn)M重合����,
∴F'M為所求長(zhǎng)度;
過(guò)點(diǎn)F'作F'H⊥BC'�����,
∵M是BC中點(diǎn),
∴Q是BC'中點(diǎn)��,
∵∠B=90°,∠C=60°����,BC=2AD=4�,
∴C'Q=F'C'=2,∠F'C'H=60°����,
∴F'H=�,HC'=7����,
在Rt△MF'H中���,F'M=2�;
∴△FEP的周長(zhǎng)最小值為2�����;
故答案為2;
