【答案】(1)BE+DF=EF���;(2)成立,證明見解析;(3)BE—DF=EF���,證明見解析
【解析】
(1)將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn),使AD與AB重合,得到△ABF,然后求出∠EAF=∠EAF=45°,利用“邊角邊”證明△AEF和△AEF′全等,根據(jù)全等三角形對(duì)應(yīng)邊相等可得EF=EF′,從而得解;
(2)將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn),使AD與AB重合,得到△ABF′,根據(jù)旋轉(zhuǎn)變換的性質(zhì)可得△ADF和△ABF′全等,根據(jù)全等三角形對(duì)應(yīng)角相等可得∠BAF′=∠DAF,對(duì)應(yīng)邊相等可得AF′=AF,BF′=DF,對(duì)應(yīng)角相等可得∠ABF′=∠D,再根據(jù)∠EAF=
∠BAD證明∠EAF′=∠EAF,并證明E�、B����、F′三點(diǎn)共線,然后利用“邊角邊”證明△AEF和△AEF′全等,根據(jù)全等三角形對(duì)應(yīng)邊相等可得EF′=EF,從而得解;
(3)將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn),使AD與AB重合,點(diǎn)F落在BC上點(diǎn)F′處,得到△ABF′,根據(jù)旋轉(zhuǎn)變換的性質(zhì)可得△ADF和△ABF′全等,根據(jù)全等三角形對(duì)應(yīng)角相等可得∠BAF′=∠DAF,對(duì)應(yīng)邊相等可得AF′=AF,BF′=DF,再根據(jù)∠EAF=∠BAD證明∠F′AE=∠FAE,然后利用“邊角邊"證明△F′AE和△FAE全等,根據(jù)全等三角形對(duì)應(yīng)邊相等可得EF=EF′,從而求出EF=BE-DE
(1)如圖1,將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn),使AD與AB重合,得到△ABF′,
∵∠EAF=45°,
∴∠EAF′=∠EAF=45°,
在△AEF和△AEF′中,
∴△AEF≌△AEF′(SAS),
∴EF=EF′
又EF′=BE+BF′=BE+DF
∴EF=BE+DF
(2)結(jié)論EF=BE+DF仍然成立.
理由如下:如圖2,將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn)���,使AD與AB重合�,得到△ABF′���,
則△ADF≌△ABF′����,
∴∠BAF′=∠DAF,AF′=AF����,BF′=DF��,∠ABF′=∠D,
又∵∠EAF=∠BAD���,
∴∠EAF=∠DAF+∠BAE=∠BAE+∠BAF′����,
∴∠EAF=∠EAF′����,
又∵∠ABC+∠D=180°��,
∴∠ABF′+∠ABE=180°�����,
∴F′��、B�、E三點(diǎn)共線,
在△AEF與△AEF′中,
∴△AEF≌△AEF′(SAS),
∴EF=EF′,
又∵EF′=BE+BF′���,
∴EF=BE+DF����;
(3)發(fā)生變化.EF��、BE�、DF之間的關(guān)系是EF=BE-DF.
理由如下:如圖3�����,將△ADF繞點(diǎn)A順時(shí)針旋轉(zhuǎn)���,使AD與AB重合,點(diǎn)F落在BC上點(diǎn)F′處�����,得到△ABF′����,
∴△ADF≌△ABF′,
∴∠BAF′=∠DAF���,AF′=AF����,BF′=DF�,
又∵∠EAF=∠BAD,且∠BAF′=∠DAF���,
∴∠F′AE=∠BAD-(∠BAF′+∠EAD)=∠BAD-(∠DAF+∠EAD)=∠BAD-∠FAE=∠FAE���,
即∠F′AE=∠FAE�����,
在△F′AE與△FAE中,
∴△F′AE≌△FAE(SAS)��,
∴EF=EF′��,
又∵BE=BF′+EF′��,
∴EF′=BE-BF′�,
即EF=BE-DF.
