(1)△=m²-4(2m-4)
=m²-8m+16
=(m-4)²
显然(m-4)²≧0
即:△≧0
所以,不论m为任何实数时,抛物线与x轴总有交点.
(2)设A(x1,0),B(x2,0),由题意得:x10
则:OA=-x1,OB=x2
则:-x1:x2=2:1
即:x1=-2x2
则:x1+x2=-x2,x1*x2=-2x2²
x1,x2是方程x²-mx+2m-4=0的根
由韦达定理:x1+x2=m,x1*x2=2m-4
所以:
-x2=m
-2x2²=2m-4
把x2=-m代入2式得:-2m²=2m-4
2m²+2m-4=0
m²+m-2=0
(m+2)(m-1)=0
m1=-2,m2=1
m=-2时,方程x²-mx+2m-4=0为:x²+2x-8=0,易得:x1=-4,x2=2,满足题意OA:OB=2:1;
m=1时,方程x²-mx+2m-4=0为:x²-x-2=0,易得:x1=-1,x2=2,OA:OB=1:2,舍去;
所以,m的值为-2