【答案】
(1)
解:當(dāng)y=0時(shí)��,﹣x2﹣2x+3=0,解得x1=1��,x2=﹣3���,則A(﹣3��,0)���,B(1��,0)��;當(dāng)x=0時(shí)�����,y=﹣x2﹣2x+3=3��,則C(0�����,3)�;
(2)
解:拋物線的對(duì)稱軸為直線x=﹣1�����,
設(shè)M(x�,0)���,則點(diǎn)P(x����,﹣x2﹣2x+3)����,(﹣3<x<﹣1),
∵點(diǎn)P與點(diǎn)Q關(guān)于直線=﹣1對(duì)稱���,
∴點(diǎn)Q(﹣2﹣x�,﹣x2﹣2x+3)��,
∴PQ=﹣2﹣x﹣x=﹣2﹣2x�����,
∴矩形PMNQ的周長(zhǎng)=2(﹣2﹣2x﹣x2﹣2x+3)=﹣2x2﹣8x+2=﹣2(x+2)2+10�,
當(dāng)x=﹣2時(shí)�����,矩形PMNQ的周長(zhǎng)最大���,此時(shí)M(﹣2,0)���,
設(shè)直線AC的解析式為y=kx+b���,
把A(﹣3,0)�����,C(0���,3)代入得 
,解得 
��,
∴直線AC的解析式為y=3x+3��,
當(dāng)x=﹣2時(shí)�����,y=x+3=1,
∴E(﹣2�����,1)���,
∴△AEM的面積= 
×(﹣2+3)×1= ���;
(3)
解:當(dāng)x=﹣2時(shí),Q(0��,3)���,即點(diǎn)C與點(diǎn)Q重合���,
當(dāng)x=﹣1時(shí),y=﹣x2﹣2x+3=4�,則D(﹣1,4)���,
∴DQ= 
= 
���,
∴FG=2 DQ=2 × =4����,
設(shè)F(t��,﹣t2﹣2t+3)���,則G(t��,t+3)���,
∴GF=t+3﹣(﹣t2﹣2t+3)=t2+3t,
∴t2+3t=4�����,解得t1=﹣4�����,t2=1���,
∴F點(diǎn)坐標(biāo)為(﹣4�����,﹣5)或(1�����,0).
【解析】(1)解方程﹣x2﹣2x+3=0可得A點(diǎn)和B點(diǎn)坐標(biāo)�����;計(jì)算自變量為0時(shí)的函數(shù)值可得到C點(diǎn)坐標(biāo)����;(2)先確定拋物線的對(duì)稱軸為直線x=﹣1���,設(shè)M(x���,0),則點(diǎn)P(x���,﹣x2﹣2x+3)���,(﹣3<x<﹣1)��,利用對(duì)稱性得到點(diǎn)Q(﹣2﹣x�,﹣x2﹣2x+3)���,PQ=﹣2﹣2x���,所以矩形PMNQ的周長(zhǎng)=2(﹣2﹣2x﹣x2﹣2x+3),利用二次函數(shù)得到當(dāng)x=﹣2時(shí)�,矩形PMNQ的周長(zhǎng)最大,此時(shí)M(﹣2�,0),接著利用待定系數(shù)法確定直線AC的解析式為y=3x+3����,從而得到E(﹣2,1)�,然后根據(jù)三角形面積公式求解;(3)當(dāng)x=﹣2時(shí)得到Q(0�����,3)��,再確定D(﹣1���,4)����,則DQ= ��,所以FG=2 DQ=4���,設(shè)F(t�����,﹣t2﹣2t+3)���,則G(t,t+3)�����,所以GF=t+3﹣(﹣t2﹣2t+3)=t2+3t���,于是得到方程t2+3t=4�����,然后解方程求出t即可得到F點(diǎn)坐標(biāo).
