【答案】(1)A的坐標(biāo)為(1,﹣2)�����,C的坐標(biāo)為(2��,0).
(2)二次函數(shù)y=ax2+bx的關(guān)系式為y=﹣2x2+4x.
【解析】試題分析:(1)二次函數(shù)y=ax2+bx的頂點(diǎn)在已知二次函數(shù)拋物線的對(duì)稱軸上���,可知兩個(gè)函數(shù)對(duì)稱軸相等,因此先根據(jù)已知函數(shù)求出對(duì)稱軸.根據(jù)函數(shù)解析式得出頂點(diǎn)A的坐標(biāo)與對(duì)稱軸����,故可得出二次函數(shù)y=ax2+bx關(guān)于x=1對(duì)稱,且函數(shù)與x軸的交點(diǎn)分別是原點(diǎn)和C點(diǎn)����,所以點(diǎn)C和點(diǎn)O關(guān)于直線l對(duì)稱,故可得出點(diǎn)C的坐標(biāo)����;
(2)因?yàn)樗倪呅?/span>AOBC是菱形���,根據(jù)菱形性質(zhì),可以得出點(diǎn)O和點(diǎn)C關(guān)于直線AB對(duì)稱�,點(diǎn)B和點(diǎn)A關(guān)于直線OC對(duì)稱,因此���,可求出點(diǎn)B的坐標(biāo)����,根據(jù)二次函數(shù)y=ax2+bx的圖象經(jīng)過點(diǎn)B(1�,2),C(2���,0)���,將B,C代入解析式得出ab的值��,進(jìn)而得出其解析式.
試題解析:(1)∵y=x2-2x-1=(x-1)2-2���,
∴頂點(diǎn)A的坐標(biāo)為(1��,-2).
∵二次函數(shù)y=ax2+bx的圖象與x軸交于原點(diǎn)O及另一點(diǎn)C�,它的頂點(diǎn)B在函數(shù)y=x2-2x-1的圖象的對(duì)稱軸上.
∴二次函數(shù)y=ax2+bx的對(duì)稱軸為:直線x=1,
∴點(diǎn)C和點(diǎn)O關(guān)于直線x=1對(duì)稱�,
∴點(diǎn)C的坐標(biāo)為(2,0).
(2)因?yàn)樗倪呅?/span>AOBC是菱形���,所以點(diǎn)B和點(diǎn)A關(guān)于直線OC對(duì)稱�,
因此��,點(diǎn)B的坐標(biāo)為(1�,2).
因?yàn)槎魏瘮?shù)y=ax2+bx的圖象經(jīng)過點(diǎn)B(1,2)����,C(2�,0),
所以
解得
����,
所以二次函數(shù)y=ax2+bx的關(guān)系式為y=-2x2+4x.
