【答案】
(1)
解:由拋物線(xiàn)y=ax-2ax-3a可得它的頂點(diǎn)坐標(biāo)為(1���,-4a).
當(dāng)x=0時(shí),y=3a���,則C(0���,-3a)
當(dāng)y=0時(shí),
則ax-2ax-3a=0���,則x1=-1���,x2=3.
則A(-1,0)���,B(3,0).
即AB=4.
由B(3,0)和C(0,-3a)可得直線(xiàn)BC的解析式為y=ax-3a���,
則M(1,-2a),
則pM=-2a=2���,即a=-1,
所以?huà)佄锞(xiàn)的解析式為y=-x+2x+3.
(2)
解:如圖���,連接KP1���,設(shè)K(m,0)���,m>0���,
則P1(2m-1,4)���,A1(2m+1���,0)���,
當(dāng) P1A⊥P1A1時(shí),KP1=AK���,
則(2m-1-m)2+42=(m+1)2���,
解得m=4.
則K(4,0).
(3)
解:由題可得DG//FH,當(dāng)DG=FH時(shí)���,以點(diǎn)D���、F、G���、H為頂點(diǎn)的四邊形是平行四邊形.
因?yàn)镚是直線(xiàn)AD與拋物線(xiàn)的交點(diǎn)���,則G(-1+t,-(-1+t)2+2(-1+t)+3)���,即(-1+t���,-t2+4t)
同理H(-4+t���,-(-4+t)2+2(-4+t)+3),即H(-4+t���,-t2+10t-21)���,
則DG=|2-(-t2+4t)|=|t2-4t+2|���,
FH=|-t2+10t-21|���,
當(dāng)DG=FH時(shí),
則t2-4t+2=-t2+10t-21或t2-4t+2=-(-t2+10t-21)���,
解得t=
或t=���,
【解析】(1)由拋物線(xiàn)y=ax-2ax-3a可分別求出點(diǎn)P,C���,B���,A的坐標(biāo)���,則可求出AB的值,求出BC的解析式���,從而得到點(diǎn)M的坐標(biāo)���,PM的長(zhǎng)度,由PM=
AB���,可求得a���;
(2)根據(jù)對(duì)稱(chēng)的性質(zhì)得到點(diǎn)P1的坐標(biāo),由當(dāng) P1A⊥P1A1時(shí)���,KP1=AK���,列方程解出m即可;
(3)由題可得DG//FH���,當(dāng)DG=FH時(shí)���,以點(diǎn)D���、F、G���、H為頂點(diǎn)的四邊形是平行四邊形���,則分別求出DG和FH的值,列方程即可解得.
【考點(diǎn)精析】本題主要考查了二次函數(shù)的圖象和二次函數(shù)的性質(zhì)的相關(guān)知識(shí)點(diǎn)���,需要掌握二次函數(shù)圖像關(guān)鍵點(diǎn):1、開(kāi)口方向2���、對(duì)稱(chēng)軸 3���、頂點(diǎn) 4、與x軸交點(diǎn) 5���、與y軸交點(diǎn)���;增減性:當(dāng)a>0時(shí)���,對(duì)稱(chēng)軸左邊,y隨x增大而減������;對(duì)稱(chēng)軸右邊,y隨x增大而增大���;當(dāng)a<0時(shí)���,對(duì)稱(chēng)軸左邊,y隨x增大而增大���;對(duì)稱(chēng)軸右邊���,y隨x增大而減小才能正確解答此題.
