【答案】(1)點A��、C的坐標為(﹣3��,0)��、(0,3)��,頂點D(﹣1��,4)��;(2)點E(﹣1��,2)��;(3)MN有最大值
��,此時x=﹣
��,故點N(﹣��,
).
【解析】
(1)y=-x2-2x+3��,令x=0��,則y=3��,令y=0��,則x=-3或1��,即可求解��;
(2)作點C關于函數(shù)對稱軸的對稱點F��,連接FB��,交拋物線的對稱軸于點E��,點E為所求點��,此時△CBE的周長=BC+EC+EB=BC+BE+EF=FB+BC��,即可求解��;
(3)先求出直線AC的解析式��,設點N(x��,-x2-2x+3)��,則點M(x��,x+3)��,則MN=-x2-2x+3-x-3=-x2-3x��,即可求解.
(1)y=﹣x2﹣2x+3,令x=0��,則y=3��,令y=0��,則x=﹣3或1��,
故點A��、B��、C的坐標為(﹣3��,0)��、(1��,0)��、(0��,3)��,
函數(shù)的對稱軸為:x=﹣1��,故頂點D(﹣1��,4)��;
(2)作點C關于函數(shù)對稱軸的對稱點F��,連接FB��,交拋物線的對稱軸于點E��,點E為所求點��,此時△CBE的周長=BC+EC+EB=BC+BE+EF=FB+BC��,
∵BC是常數(shù)��,F��、E��、B共線��,故此時△CBE的周長=FB+BC最小��,
∵(0,3)��,對稱軸為:x=﹣1��,
∴點F(﹣2��,3)��,
設BF的解析式為:y=kx+b��,
將點B��、F的坐標代入一次函數(shù)表達式得:
��,解得:
��,
故直線BF的函數(shù)表達式為:y=﹣x+1��,
當x=﹣1時��,y=2��,故點E(﹣1��,2)��;
(3)將點A、C的坐標代入一次函數(shù)表達式��,
設直線AC的解析式為:y=mx+n��,
把A��、C的坐標代入得
��,解之得
��,
∴直線AC的函數(shù)表達式為:y=x+3��,
設點N(x��,﹣x2﹣2x+3)��,則點M(x��,x+3)��,
則MN=﹣x2﹣2x+3﹣x﹣3=﹣x2﹣3x��,
∵﹣1<0��,故MN有最大值��,此時x=﹣
��,
故點N(﹣��,)
