【答案】(1)m=2��;(2)M(1�����,﹣1)�����;(3)y2=3x2+12x+10.
【解析】試題分析:(1)把點(diǎn)代入求值.(2)把已知點(diǎn)代入可求得拋物線對(duì)稱軸�,由對(duì)稱性可知△OAM是等腰三角形����,所以可以得到M點(diǎn)坐標(biāo).
(3)利用待定系數(shù)法,結(jié)合已知聯(lián)立方程組求解��,利用代入消元技巧�,可求得拋物線解析式.
試題解析:
(1)∵a1=﹣1���,∴y1=﹣(x﹣m)2+5.
將(1,4)代入y1=﹣(x﹣m)2+5����,得
4=﹣(1﹣m)2+5.
m=0或m=2.∵m>0�,∴m=2.
(2)∵c2=0,∴拋物線y2=a2 x2+b2 x,
將(2��,0)代入y2=a2 x2+b2 x����,得4a2+2b2=0.即b2=﹣2a2,
∴拋物線的對(duì)稱軸是x=1,
設(shè)對(duì)稱軸與x軸交于點(diǎn)N���,根據(jù)拋物線的對(duì)稱性得����,△OAM是等腰三角形�,
∴NA=NO=1,
∵∠OMA=90°,
∴MN=OA=1�����,∴當(dāng)a2>0時(shí),M(1�����,﹣1),
當(dāng)a2<0時(shí)�����,M(1���,1),
∵25>1��,∴M(1��,﹣1).
(3)方法一:∵點(diǎn)(m�,25)在拋物線y2=a2 x2+b2x+c2上���,
∴a2 m 2+b2 m+c2=25①��,
∵y1+y2=(a1+a2)x2+(b2﹣2a1m)x+5+a1m2+c2=x2+16x+13����,
∴a1+a2=1②�,b2﹣2a1m=16③,a1m2+c2=8④�,
由③得����,b2m=16m+2a1m2⑤,由④得����,c2=8a1m2⑥�,
將⑤⑥代入方程①得,a2 m 2+16m+2 m 2 a1+8﹣m 2 a1=25,
整理得���,m 2+16m﹣17=0��,
解得m1=1�����,m2=﹣17�,
∵m>0�,∴m=1,
將m=1代入③得��,b2=16+2a1=12+2(1﹣a2)=18﹣2a2���,將m=1代入④得�,c2=8﹣a1=8﹣(1﹣a2)=7+a2.
∵4a2 c2﹣b22=﹣8a2,∴4a2(7+a2)﹣(18﹣2a2)2=﹣8a2��,
∴a2=3�����,∴b2=18﹣2×3=12��,c2=7+3=10�,
∴拋物線y2=a2x2+b2x+c2的解析式為y=3x2+12x+10.
方法二����,由題意知�,當(dāng)x=m時(shí),y1=5�����;當(dāng)x=m時(shí)��,y2=25���,
∴當(dāng)x=m時(shí)��,y1+y2=5+25=30�����,
∵y1+y2=x2+16 x+13���,∴30=m2+16m+13.
解得m1=1�,m2=﹣17.
∵m>0,∴m=1����,
∵4a2 c2﹣b22=﹣8a2,∴ 
=
=﹣2�����,
∴y2 頂點(diǎn)的縱坐標(biāo)為﹣2���,
設(shè)拋物線y2的解析式為y2=a2 (x﹣h)2﹣2�����,∴y1+y2=a1 (x﹣1)2+5+a2 (x﹣h)2﹣2.
∵y1+y2=(a1+a2)x2﹣2(a1+a2h)x+a1+a2h2+3=x2+16 x+13��,∴a1+a2=1①��,﹣2(a1+a2h)=16②����,a1+a2h2+3=13③,將①代入②③化簡(jiǎn)得��,a2h﹣a2=﹣9④����,a2h2﹣a2=9⑤,聯(lián)立④⑤�����,解得h=﹣2����,a2=3,
∴拋物線的解析式為y2=3(x+2)2﹣2=3x2+12x+10.
方法三、由題意知���,當(dāng)x=m時(shí)����,y1=5���;當(dāng)x=m時(shí)����,y2=25����,
∴當(dāng)x=m時(shí),y1+y2=5+25=30����,
∵y1+y2=x2+16x+13���,∴30=m2+16m+13�,
∴m=1或m=﹣17�,∵m>0,∴m=1,∴y1=a1 (x﹣1)+5����,
∵y1+y2=x2+16x+13,∴y2=x2+16 x+13﹣y1
=x2+16x+13﹣a1 (x﹣1)2﹣5����,
即y2=(1﹣a1)x2+(16+2a1)x+8﹣a1,
∵4a2c2﹣b22=﹣8a2��,∴ 
=
=﹣2����,
∴y2 頂點(diǎn)的縱坐標(biāo)為﹣2,∴ 
=-2��,
∴a1=﹣2��,∴y2=3x2+12x+10.
