【答案】
(1)
解:當(dāng)y=0時(shí)�����,(m﹣1)x2﹣(3m﹣4)x﹣3=0�,
解得x1= 
�,x2=3,即A( ��,0)B(3��,0)��,
由A�����,B關(guān)于x=1對(duì)稱�����,得
=﹣1,解得m=2��,
即A(﹣1����,0),
函數(shù)解析式為y=x2﹣2x﹣3����;
(2)
解:由四邊形ABPQ是平行四邊形,得
PQ∥AB�,PQ=AB=4,
當(dāng)PQ=4�,即x=4時(shí),y=5�����,即P(4��,5)���;
當(dāng)x=﹣4時(shí)��,y=21�,即P(﹣4,21)���,
綜上所述:四邊形ABPQ是平行四邊形P(4����,5)�����,(﹣4����,21)�;
(3)
解:如圖
,
過(guò)P作PQ⊥x軸于Q�����,交CB延長(zhǎng)線于R����,過(guò)P作PH⊥BC于H���,
設(shè)P(m,m2﹣2m﹣3)�����,
∵拋物線y=x2﹣4x+3與坐標(biāo)軸交于A���,B����,C三點(diǎn)�,
∴x=0,則y=﹣3�;
y=0,則0=x2﹣4x+3���,
解得:x1=﹣1����,x2=3�����,
故A(﹣1,0)���,B(3����,0)��,C(0�,﹣3),
設(shè)直線BC的解析式為:y=kx+b����,
則 
���,
解得: 
�����,
故直線BC解析式:y=x﹣3�,
∴R(m�����,m﹣3),PR=m2﹣2m﹣3﹣(m﹣3)=m2﹣3m�,
∵OB=OC=3,
∴∠CBQ=135°���,
∴∠HPR=45°��,
∵CO=OB�����,
∴∠OCR=45°�,
∴CR= 
OQ= m�����,
∴PH=RH=PR÷ = 
m(m﹣3)����,
又CR= OQ= m,
∴CH= m+ m(m﹣3)
= m(m+1)
由tan∠PCB= 
= 
= 
���,
解得:m=7���,
則m2﹣2m﹣3=32�����,
故P(7����,32).
【解析】(1)根據(jù)自變量與函數(shù)值得對(duì)應(yīng)關(guān)系��,可得關(guān)于x的方程���,根據(jù)解方程�����,可得A,B點(diǎn)坐標(biāo)���,根據(jù)函數(shù)值相等的點(diǎn)關(guān)于對(duì)稱軸對(duì)稱�����,可得m的值�����;(2)根據(jù)平行四邊形的對(duì)邊平行且相等��,可得PQ的長(zhǎng)����,根據(jù)解方程,可得P點(diǎn)的橫坐標(biāo)����,根據(jù)自變量與函數(shù)值得對(duì)應(yīng)關(guān)系,可得答案����;(3)根據(jù)題意首先得出直線BC的解析式,進(jìn)而利用PR的長(zhǎng)結(jié)合tan∠PCB=2得出P點(diǎn)橫坐標(biāo)����,進(jìn)而求出答案.
【考點(diǎn)精析】通過(guò)靈活運(yùn)用二次函數(shù)的圖象和二次函數(shù)的性質(zhì),掌握二次函數(shù)圖像關(guān)鍵點(diǎn):1���、開口方向2�、對(duì)稱軸 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)稱軸左邊����,y隨x增大而減小����;對(duì)稱軸右邊,y隨x增大而增大���;當(dāng)a<0時(shí)��,對(duì)稱軸左邊,y隨x增大而增大�����;對(duì)稱軸右邊,y隨x增大而減小即可以解答此題.
