【答案】(1)y=﹣x2﹣2x+3��;(2)①
���;②點(diǎn)M的坐標(biāo)為(0����,3)或(
);(3)EF+EG的和為定值���,該定值為8����,理由見(jiàn)解析
【解析】
(1)由拋物線的頂點(diǎn)坐標(biāo)可設(shè)拋物線對(duì)應(yīng)的函數(shù)表達(dá)式為y=a(x+1)2+4�,代入點(diǎn)B的坐標(biāo)可求出a值,進(jìn)而可得出拋物線對(duì)應(yīng)的函數(shù)表達(dá)式�;
(2)①由點(diǎn)B的坐標(biāo)利用待定系數(shù)法可得出直線OB的函數(shù)表達(dá)式,聯(lián)立直線OB和拋物線的函數(shù)表達(dá)式成方程組��,通過(guò)解方程組可求出直線和拋物線的交點(diǎn)坐標(biāo)���,設(shè)點(diǎn)M的坐標(biāo)為(m���,﹣m2﹣2m+3)(﹣2<m<
),則點(diǎn)N的坐標(biāo)為(
�����,﹣m2﹣2m+3),進(jìn)而可得出MN=
���,再利用二次函數(shù)的性質(zhì)即可解決最值問(wèn)題��;
②由MN∥x軸可知∠ONM≠90°�,分∠OMN=90°和∠MON=90°兩種情況考慮:(i)當(dāng)∠OMN=90°時(shí)�,線段OM在y軸上,利用二次函數(shù)圖象上點(diǎn)的坐標(biāo)特征即可求出點(diǎn)M的坐標(biāo)���;(ii)當(dāng)∠MON=90°時(shí)����,OM⊥OB����,由點(diǎn)B的坐標(biāo)可得出直線OM過(guò)點(diǎn)(3,2)��,進(jìn)而可得出直線OM對(duì)應(yīng)的函數(shù)表達(dá)式���,聯(lián)立直線OM和拋物線的函數(shù)表達(dá)式成方程組���,通過(guò)解方程組可求出點(diǎn)M的坐標(biāo);
(3)利用二次函數(shù)圖象上點(diǎn)的坐標(biāo)特征可求出點(diǎn)C����,D的坐標(biāo),設(shè)點(diǎn)P的坐標(biāo)為(n��,﹣n2﹣2n+3)(﹣1<n<1)���,利用待定系數(shù)法可求出直線CP�����,DP對(duì)應(yīng)的函數(shù)表達(dá)式���,由點(diǎn)A的坐標(biāo)結(jié)合AE∥y軸可得出直線AE對(duì)應(yīng)的函數(shù)表達(dá)式,利用一次函數(shù)圖象上點(diǎn)的坐標(biāo)特征可求出點(diǎn)F���,G的坐標(biāo)�����,進(jìn)而可得出EF�����,EG���,EF+EG的值.
(1)∵拋物線的頂點(diǎn)為A(﹣1�,4)�����,
∴設(shè)拋物線對(duì)應(yīng)的函數(shù)表達(dá)式為y=a(x+1)2+4.
將B(﹣2�,3)代入y=a(x+1)2+4,得:3=a+4��,
解得:a=﹣1��,
∴拋物線對(duì)應(yīng)的函數(shù)表達(dá)式為y=﹣(x+1)2+4�,即y=﹣x2﹣2x+3.
(2)①設(shè)直線OB對(duì)應(yīng)的函數(shù)表達(dá)式為y=kx(k≠0),
將B(﹣2�����,3)代入y=kx����,得:3=﹣2k��,
解得:k=﹣��,
∴直線OB對(duì)應(yīng)的函數(shù)表達(dá)式為y=﹣x.
聯(lián)立直線OB和拋物線的函數(shù)表達(dá)式成方程組�����,得:
,
解得:
.
設(shè)點(diǎn)M的坐標(biāo)為(m����,﹣m2﹣2m+3)(﹣2<m<),則點(diǎn)N的坐標(biāo)為(
m2+
m﹣2���,﹣m2﹣2m+3)�����,
∴MN=m﹣(m2+m﹣2)=﹣m2﹣
m+2=﹣(m+
)2+.
∵﹣<0�,
∴當(dāng)m=﹣時(shí)�����,MN最大���,最大值為.
②∵MN∥x軸�����,
∴∠ONM≠90°��,
∴分兩種情況考慮(如圖3所述):
(i)當(dāng)∠OMN=90°時(shí)�,線段OM在y軸上.
∵當(dāng)m=0時(shí),y=﹣m2﹣2m+3=3��,
∴點(diǎn)M的坐標(biāo)為(0����,3);
(ii)當(dāng)∠MON=90°時(shí)��,OM⊥OB���,
∵點(diǎn)B的坐標(biāo)為(﹣2��,3)��,
∴點(diǎn)(3�,2)在直線OM上�,
∴直線OM對(duì)應(yīng)的函數(shù)表達(dá)式為y=x.
聯(lián)立直線OM和拋物線的函數(shù)表達(dá)式成方程組��,得:
�����,
解得:
(不合題意�,舍去)�,
,
∴點(diǎn)M的坐標(biāo)為().
綜上所述:點(diǎn)M的坐標(biāo)為(0����,3)或().
(3)當(dāng)y=0時(shí)����,﹣x2﹣2x+3=0,
解得:x1=﹣3���,x2=1���,
∴點(diǎn)C的坐標(biāo)為(﹣3,0)���,點(diǎn)D的坐標(biāo)為(1�,0).
設(shè)點(diǎn)P的坐標(biāo)為(n,﹣n2﹣2n+3)(﹣1<n<1).
∵點(diǎn)C的坐標(biāo)為(﹣3����,0),點(diǎn)D的坐標(biāo)為(1����,0),
∴直線CP對(duì)應(yīng)的函數(shù)表達(dá)式為y=(1﹣n)x+3﹣3n�,直線DP對(duì)應(yīng)的函數(shù)表達(dá)式為y=﹣(n+3)x+n+3(可利用待定系數(shù)法求出).
∵點(diǎn)A的坐標(biāo)為(﹣1,4)����,AE∥y軸,
∴直線AE對(duì)應(yīng)的函數(shù)表達(dá)式為x=﹣1.
當(dāng)x=﹣1時(shí)��,y=(1﹣n)x+3﹣3n=2﹣2n�,y=﹣(n+3)x+n+3=2n+6,
∴點(diǎn)F的坐標(biāo)為(﹣1�,2﹣2n),點(diǎn)G的坐標(biāo)為(﹣1�����,2n+6),
∴EF=2﹣2n�����,EG=2n+6�����,
∴EF+EG=8.
∴EF+EG的和為定值����,該定值為8.
