(9分)已知二次函數(shù)的圖象與x軸相交于A、B兩點(A

左B右),與y軸相交于點C,頂點為D.

(1)求m的取值范圍;

(2)當點A的坐標為,求點B的坐標;

(3)當BC⊥CD時,求m的值.

 

解:(1)∵二次函數(shù)的圖象與x軸相交于A、B兩點

∴b2-4ac>0,∴4+4m>0,······································································· 2分

解得:m>-1························································································· 3分

(2)解法一:

∵二次函數(shù)的圖象的對稱軸為直線x=-=1························· 4分

∴根據(jù)拋物線的對稱性得點B的坐標為(5,0)··············································· 6分

解法二:

把x=-3,y=0代入中得m=15··············································· 4分

∴二次函數(shù)的表達式為

令y=0得········································································ 5分

解得x1=-3,x2=5

∴點B的坐標為(5,0)··········································································· 6分

(3)如圖,過D作DE⊥y軸,垂足為E.

∴∠DEC=∠COB=90°,

當BC⊥CD時,∠DCE +∠BCO=90°,

∵∠DEC=90°,∴∠DCE +∠EDC=90°,∴∠EDC=∠BCO.

∴△DEC∽△COB,∴.····························································· 7分

由題意得:OE=m+1,OC=m,DE=1,∴EC=1.∴

∴OB=m,∴B的坐標為(m,0).······························································ 8分

將(m,0)代入得:-m 2+2 m + m=0.

解得:m1=0(舍去), m2=3.·································································· 9分

解析:略

 

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