【答案】(1)
�����;
(2)E(﹣
����,﹣
);
���;
(3)(1�,
)或(1��,
)或Q(1��,2)或Q(1,﹣
).
【解析】
(1)將點(diǎn)C���、D的坐標(biāo)代入拋物線表達(dá)式��,即可求解����;
(2)當(dāng)△AOC∽△AEB時�����,
求出yE=-��,由△AOC∽△AEB得:
即可求解�;
(3)如圖2��,連接BF��,過點(diǎn)F作FG⊥AC于G�,當(dāng)折線段BFG與BE重合時,CF+BF取得最小值�,①當(dāng)點(diǎn)Q為直角頂點(diǎn)時,由Rt△QHM∽Rt△FQM得:QM2=HMFM�;②當(dāng)點(diǎn)H為直角頂點(diǎn)時,點(diǎn)H(0,2)��,則點(diǎn)Q(1�,2);③當(dāng)點(diǎn)F為直角頂點(diǎn)時�,同理可得:點(diǎn)Q(1,-).
(1)由題可列方程組:
�����,解得:
∴拋物線解析式為:y=
x2﹣
x﹣2����;
(2)由題意和勾股定理得,∠AOC=90°��,AC=
���,AB=4�,
設(shè)直線AC的解析式為:y=kx+b�,則
,
解得:
���,
∴直線AC的解析式為:y=﹣2x﹣2����;
當(dāng)△AOC∽△AEB時
=(
)2=(
)2=
,
∵S△AOC=1�,
∴S△AEB=
,
∴
AB×|yE|=�,AB=4,則yE=﹣��,
則點(diǎn)E(﹣�,﹣);
由△AOC∽△AEB得:
∴
�����;
(3)如圖2���,連接BF,過點(diǎn)F作FG⊥AC于G����,
則FG=CFsin∠FCG=CF,
∴CF+BF=GF+BF≥BE��,
當(dāng)折線段BFG與BE重合時��,取得最小值,
由(2)可知∠ABE=∠ACO
|y|=OBtan∠ABE=OBtan∠ACO=3×=���,
∴當(dāng)y=﹣時���,即點(diǎn)F(0,﹣)�����,CF+BF有最小值��;
①當(dāng)點(diǎn)Q為直角頂點(diǎn)時(如圖3) F(0��,﹣)���,
∵C(0�,﹣2)
∴H(0�����,2)設(shè)Q(1���,m)�����,過點(diǎn)Q作QM⊥y軸于點(diǎn)M.
則Rt△QHM∽Rt△FQM∴QM2=HMFM�,
∴12=(2﹣m)(m+),
解得:m=
,則點(diǎn)Q(1,)或(1���,)
當(dāng)點(diǎn)H為直角頂點(diǎn)時:點(diǎn)H(0�,2),則點(diǎn)Q(1�,2);當(dāng)點(diǎn)F為直角頂點(diǎn)時:
同理可得:點(diǎn)Q(1�����,﹣)�;
綜上����,點(diǎn)Q的坐標(biāo)為:(1,)或(1�����,)或Q(1,2)或Q(1��,﹣).
