1.集合A={(x,y)｜x∧2+mx-y+2=0},集合B={(x,y)｜x-y+1=0,且0≤X≤2}
又A∩B≠空集,求實數(shù)m的取值范圍
2.當x=__時,函數(shù)f(x)=(x-a1)∧2+(x-a2)∧2+……+(x-an)∧2取得最小值
3.對于任意函數(shù),函數(shù)f(x)=(5-a)x∧2-6x+a+5恒為正值,求a的取值范圍
4.已知函數(shù)y=f(x)的圖像關于直線x=-1對稱,且當x屬于（0,+∞）時,有f(X)=1/x ,則當x屬于(-∞,-2)時,f(x)的解析式
A -1/x B.-1/(x-2) C.1/(x+2) D.-1/(x+2)