【答案】(Ⅰ)∠DAO=60°,DE=2; (Ⅱ)①GH=6��,DG=﹣3+
;②F(﹣5﹣
��,0).
【解析】解:(Ⅰ)∵A(﹣2,0)��,D(0��,2
)∴AO=2����,DO=2
�,∴tan∠DAO=
=
����,
∴∠DAO=60°����,∴∠ADO=30°��,∴AD=2AO=4�,∵點E為線段AD中點,∴DE=2;
(Ⅱ)①如圖2�,
過點E作EM⊥CD����,∴CD∥AB�,∴∠EDM=∠DAB=60°,∴EM=DEsin60°=
�,∴GH=6����,
∵CD∥AB,∴∠DGE=∠OFE,
∵△OEF′是△OEF關于直線OE的對稱圖形�,∴△OEF′≌△OEF,∴∠OFE=∠OF′E,
∵點E是AD的中點����,∴OE=
AD=AE,
∵∠EAO=60°��,∴△EAO是等邊三角形��,∴∠EOA=60°,∠AEO=60°,
∵△OEF′≌△OEF����,∴∠EOF′=∠EOA=60°�,
∴∠EOF′=∠AEO��,∴AD∥OF′��,∴∠OF′E=∠DEH��,∴∠DEH=∠DGE�,
∵∠DEH=∠EDG��,∴△DHE∽△DEG����,∴
��,∴DE2=DG×DH�,
設DG=x,則DH=x+6�,∴4=x(x+6),∴x1=﹣3+
�,x2=﹣3﹣
,∴DG=﹣3+
.
②如圖3�,
過點E作EM⊥CD,∴CD∥AB����,∴∠EDM=∠DAB=60°�,∴EM=DEsin60°=,∴GH=6�,
∵CD∥AB,∴∠DHE=∠OFE��,
∵△OEF′是△OEF關于直線OE的對稱圖形�,∴△OEF′≌△OEF��,∴∠OFE=∠OF′E����,
∵點E是AD的中點��,∴OE=AD=AE��,
∵∠EAO=60°�,∴△EAO是等邊三角形,∴∠EOA=60°�,∠AEO=60°,
∵△OEF′≌△OEF�,∴∠EOF′=∠EOA=60°,∴∠EOF′=∠AEO����,∴AD∥OF′,
∴∠OF′E=∠DEH��,∴∠DEG=∠DHE����,
∵∠DEG=∠EDH,∴△DGE∽△DEH����,∴
����,∴DE2=DG×DH�,
設DH=x,則DG=x+6��,∴4=x(x+6)�,∴x1=﹣3+
,x2=﹣3﹣
��,
∴DH=﹣3+
.∴DG=3+
∴DG=AF=3+
����,∴OF=5+
,∴F(﹣5﹣
�,0).
