【答案】(1)a=1�,k=4,b=2 �。2)能 (3)P1(1�,4),Q1(0�,6);P2(﹣1�,﹣4),Q2(0�,﹣6);P3(﹣1�,﹣4),Q3(0�,2).
【解析】(1)如圖1,過(guò)點(diǎn)D做DP⊥y軸于點(diǎn)P�,由△PDE≌△OAE(ASA)�,PD=OA�,求出點(diǎn)D坐標(biāo),即可解決問(wèn)題�;
(2)能�,點(diǎn)C、D繞點(diǎn)O順時(shí)針旋轉(zhuǎn)180度時(shí)�,點(diǎn)C′、D′落在y=
圖象上.或點(diǎn)C�、D關(guān)于原點(diǎn)中心對(duì)稱(chēng)的點(diǎn)在圖象上;
(3)分兩種情形分別求解①當(dāng)AB為邊時(shí)�,如圖1中,若四邊形ABPQ為平行四邊形�,則
=0;如圖2中�,若四邊形ABQP是平行四邊形時(shí),AP=BQ�,且AP∥BQ,求點(diǎn)P坐標(biāo)�,即可解決問(wèn)題;②如圖3中�,當(dāng)AB為對(duì)角線(xiàn)時(shí),AP=BQ�,AP∥BQ,求出點(diǎn)P坐標(biāo)�,即可解決問(wèn)題.
解:(1)如圖1�,過(guò)點(diǎn)D做DP⊥y軸于點(diǎn)P�,
∵點(diǎn)E為AD的中點(diǎn),
∴AE=DE.
又∵DP⊥y軸�,∠AOE=90°,
∴∠DPE=∠AEO.
∵在△PDE與△OAE中�,
∠DPE=∠AOE,PE=OE�,∠PED=∠OEA,
∴△PDE≌△OAE(ASA)�,
∴PD=OA,
∵A(﹣1�,0),
∴PD=1�,
∴D(1,4).
∵點(diǎn)D在反比例函數(shù)圖象上�,
∴k=xy=1×4=4.
∵點(diǎn)C在反比例函數(shù)圖象上,C的坐標(biāo)為(2�,b),
∴b=
=2�,
∴a=1,k=4�,b=2;
(2)能�,點(diǎn)C、D繞點(diǎn)O順時(shí)針旋轉(zhuǎn)180度時(shí)�,點(diǎn)C′�、D′落在y=
圖象上.或點(diǎn)C�、D關(guān)于原點(diǎn)中心對(duì)稱(chēng)的點(diǎn)在圖象上;
(3)∵由(1)可知k=4�,
∴反比例函數(shù)的解析式為y=
,
∵點(diǎn)P在y=
上�,點(diǎn)Q在y軸上,
∴設(shè)Q(0�,y)�,P(x, 
).
①當(dāng)AB為邊時(shí)�,如圖1中,若四邊形ABPQ為平行四邊形�,則
=0,
解得x=1�,此時(shí)P1(1,4)�,Q1(0,6).
如圖2中�,若四邊形ABQP是平行四邊形時(shí),AP=BQ�,且AP∥BQ,
此時(shí)P2(﹣1�,﹣4),Q2(0�,﹣6).
②如圖3中�,當(dāng)AB為對(duì)角線(xiàn)時(shí)�,AP=BQ,AP∥BQ�,
此時(shí)P3(﹣1,﹣4)�,Q3(0,2)�,
綜上所述,滿(mǎn)足條件的P�、Q坐標(biāo)分別為P1(1,4)�,Q1(0,6)�;P2(﹣1,﹣4)�,Q2(0,﹣6)�;P3(﹣1,﹣4)�,Q3(0,2).
“點(diǎn)睛”本題考查的是反比例函數(shù)綜合題�,涉及到用待定系數(shù)法求反比例函數(shù)的解析式、平行四邊形的性質(zhì)�、全等三角形的判定與性質(zhì)等相關(guān)知識(shí),難度較大.
