【答案】探素發(fā)現(xiàn):(1)①EA=EC,見解析�;②DB′∥AC那就繼續(xù);(2)AB:AD=1:1����,AD:AB=
;(3)仍然有EA=EC�����,DB′∥AC��;拓展應(yīng)用:(4)BC的長(zhǎng)為
或或2或
.
【解析】
(1)①想辦法證明∠EAC=∠ECA即可判斷AE=EC.
②想辦法證明∠ADB′=∠DAC即可證明.
(2)①當(dāng)AB:AD=1:1時(shí)��,符合題意.②當(dāng)AD:AB=時(shí)���,也符合題意�����,
(3)結(jié)論仍然成立����,證明方法類似(1).
(4)先證得四邊形ACB′D是等腰梯形,分四種情形分別討論求解即可解決問題.
解:(1)如圖1中���,
①結(jié)論:EA=EC.
理由:∵四邊形ABCD是矩形,
∴AD∥BC�����,
∴∠EAC=∠ACB�,
由翻折可知:∠ACB=∠ACE,
∴∠EAC=∠ECA����,
∴EA=EC.
②連接DB′.結(jié)論:DB′∥AC.
∵EA=EC,
∴∠EAC=∠ECA����,
∵AD=BC=CB′����,
∴ED=EB′�����,
∴∠EB′D=∠EDB′����,
∵∠AEC=∠DEB′,
∴∠EB′D=∠EAC���,
∴DB′∥AC.
(2)如圖2中����,
①當(dāng)AB:AD=1:1時(shí)�����,四邊形ABCD是正方形�����,
∴∠BAC=∠CAD=∠EAB′=45°,
∵AE=AE���,∠B′=∠AFE=90°����,
∴△AEB′≌△AEF(AAS)�����,
∴AB′=AF��,
此時(shí)四邊形AFEB′是軸對(duì)稱圖形����,符合題意.
②當(dāng)AD:AB=時(shí)���,也符合題意�����,
∵此時(shí)∠DAC=30°�����,
∴AC=2CD�,
∴AF=FC=CD=AB=AB′,
∴此時(shí)四邊形AFEB′是軸對(duì)稱圖形���,符合題意.
(3)如圖3中����,當(dāng)四邊形ABCD是平行四邊形時(shí)�����,仍然有EA=EC�����,DB′∥AC.
理由:∵四邊形ABCD是平行四邊形�����,
∴AD∥BC����,
∴∠EAC=∠ACB,
由翻折可知:∠ACB=∠ACE�����,
∴∠EAC=∠ECA,
∴EA=EC.
∵EA=EC�����,
∴∠EAC=∠ECA�����,
∵AD=BC=CB′��,
∴ED=EB′�,
∴∠EB′D=∠EDB′,
∵∠AEC=∠DEB′���,
∴∠EB′D=∠EAC��,
∴DB′∥AC.
(4)①如圖3﹣1中,當(dāng)∠AB′C=90°時(shí)�����,易證∠BAC=90°�����,
BC=
.
②如圖3﹣2中,當(dāng)∠ADB′=90°時(shí)���,易證∠ACB=90°�,BC=ABcos30°=.
③如圖3﹣3中�����,當(dāng)∠DAB′=90°時(shí)�����,易證∠B=∠ACB=30°���,
BC=2ABcos30°=2.
④如圖3﹣4中��,當(dāng)∠DAB′=90°時(shí)�,易證:∠B=∠CAB=30°�����,
BC=
���,
綜上所述�����,滿足條件的BC的長(zhǎng)為或或2或.
