【答案】(1)①(﹣
���,﹣1)���;②A;(2)當(dāng)﹣2≤x≤6時(shí)��,﹣5≤b′≤2��;(3)s關(guān)于t的函數(shù)解析式為s=t2+1(t≥1)����,s的取值范圍是s≥2.
【解析】
(1)①直接根據(jù)限變點(diǎn)的定義直接得出答案;
②點(diǎn)(-1�����,-2)在反比例函數(shù)圖象上,點(diǎn)(-1����,-2)的限變點(diǎn)為(-1,2)��,據(jù)此得到答案���;
(2)根據(jù)題意可知y=-x+3(x≥-2)圖象上的點(diǎn)P的限變點(diǎn)Q必在函數(shù)y=
的圖象上��,結(jié)合圖象即可得到答案�����;
(3)首先求出y=x2-2tx+t2+t頂點(diǎn)坐標(biāo)�,結(jié)合t與1的關(guān)系確定y的最值���,進(jìn)而用m和n表示出s���,根據(jù)t的取值范圍求出s的取值范圍.
(1)①根據(jù)限變點(diǎn)的定義可知點(diǎn)點(diǎn)(﹣,1)的限變點(diǎn)的坐標(biāo)為(﹣��,﹣1);
②(﹣1�,﹣2)限變點(diǎn)為(﹣1,2)����,即這個(gè)點(diǎn)是點(diǎn)A.
(2)依題意,y=﹣x+3(x≥﹣2)圖象上的點(diǎn)P的限變點(diǎn)Q必在函數(shù)y=的圖象上.
當(dāng)x=﹣2時(shí)����,y=﹣2﹣3=﹣5,
當(dāng)x=1時(shí)����,y=﹣1+3=2��,
當(dāng)x=6時(shí)���,y=﹣6+3=﹣3��,
∴當(dāng)﹣2≤x≤6時(shí)��,﹣5≤b′≤2�����;
(3)∵y=x2﹣2tx+t2+t=(x﹣t)2+t�,
∴頂點(diǎn)坐標(biāo)為(t,t).
若t<1���,b′的取值范圍是b′≥m或b′<n��,與題意不符.
若t≥1��,當(dāng)x≥1時(shí)����,y的最小值為t����,即m=t;
當(dāng)x<1時(shí)�����,y的值小于﹣[(1﹣t)2+t]�����,即n=﹣[(1﹣t)2+t].
∴s=m﹣n=t+(1﹣t)2+t=t2+1.
∴s關(guān)于t的函數(shù)解析式為s=t2+1(t≥1)�,
當(dāng)t=1時(shí)�����,s取最小值2��,
∴s的取值范圍是s≥2.
