题目内容
(9分)已知二次函数
的图象与x轴相交于A、B两点(A左B右),与y轴相交于点C,顶点为D.
1.(1)求m的取值范围;
2.(2)当点A的坐标为
,求点B的坐标;
【小题】(3)当BC⊥CD时,求m的值.
1.(1)∵二次函数
的图象与x轴相交于A、B两点
∴b2-4ac>0,∴4+4m>0,························································································· 2分
解得:m>-1··············································································································· 3分
2.(2)解法一:
∵二次函数的图象的对称轴为直线x=-=1································ 4分
∴根据抛物线的对称性得点B的坐标为(5,0)···························································· 6分
解法二:
把x=-3,y=0代入中得m=15···························································· 4分
∴二次函数的表达式为
令y=0得
·························································································· 5分
解得x1=-3,x2=5
∴点B的坐标为(5,0)
3.(3)如图,过D作DE⊥y轴,垂足为E.∴∠DEC=∠COB=90°,
当BC⊥CD时,∠DCE +∠BCO=90°,
∵∠DEC=90°,∴∠DCE +∠EDC=90°,∴∠EDC=∠BCO.
∴△DEC∽△COB,∴=.·················································································· 7分
由题意得:OE=m+1,OC=m,DE=1,∴EC=1.∴ =.
∴OB=m,∴B的坐标为(m,0).··············································································· 8分
将(m,0)代入得:-m 2+2 m + m=0.
解得:m1=0(舍去), m2=3.··················································································· 9分
解析:略
阅读快车系列答案A、y=
| ||
B、y=-
| ||
C、y=-
| ||
D、y=
|
已知二次函数的图象与x轴交于点A(-1,0)和点B(3,0),且与直线y=kx-4交y轴于点C.