【答案】(1)b=4���;(2)y2=x2-4x+3���;(3) t=-1��,或
<t≤11.
【解析】
試題分析:(1)把A(-3�,0)代入y1=x2+bx+3求出b的值即可���;
(2)將y1變形化成頂點(diǎn)式得:y1=(x+2)2-1����,由平移的規(guī)律即可得出結(jié)果����;
(3)求出拋物線y2的對稱軸和頂點(diǎn)坐標(biāo),求出與坐標(biāo)軸的交點(diǎn)坐標(biāo)E(1�,0),F(3��,0)��,D(0��,3)����,由題意得出直線y=kx+k-1過定點(diǎn)(-1�����,-1)得出當(dāng)直線y=kx+k-1與圖象G有一個公共點(diǎn)時���,t=-1,求出當(dāng)直線y=kx+k-1過F(3��,0)時和直線過D(0�,3)時k的值�����,分別得出直線的解析式��,得出t的值���,再結(jié)合圖象即可得出結(jié)果.
試題解析:(1)把A(-3���,0)代入y1=x2+bx+3得:9-3b+3=0,
解得:b=4���,
∴y1的表達(dá)式為:y=x2+4x+3���;
(2)將y1變形得:y1=(x+2)2-1
據(jù)題意y2=(x+2-4)2-1=(x-2)2-1=x2-4x+3��;
∴拋物線y2的表達(dá)式為y=x2-4x+3���;
(3)∵y2=(x-2)2-1,
∴對稱軸是x=2�,頂點(diǎn)為(2,-1)���;
當(dāng)y2=0時���,x=1或x=3,
∴E(1���,0)�,F(3���,0)��,D(0����,3),
∵直線y=kx+k-1過定點(diǎn)(-1��,-1)
當(dāng)直線y=kx+k-1與圖象G有一個公共點(diǎn)時�����,t=-1�����,
當(dāng)直線y=kx+k-1過F(3����,0)時,3k+k-1=0�,
解得:k=�,
∴直線解析式為y=x-
,
把x=2代入=x-�,得:y=-,
當(dāng)直線過D(0�����,3)時,k-1=3�����,
解得:k=4�,
∴直線解析式為y=4x+3,
把x=2代入y=4x+3得:y=11�����,即t=11��,
∴結(jié)合圖象可知t=-1�,或<t≤11.
