【答案】(1) m=-1.拋物線的解析式為y=x2-3x+2.
(2)x>3或x<1.
(3)當2a-2<0,即a<1時�����,y1>y2;
當2a-2=0,即a=1時���,y1=y2;
當2a-2>0,即a>1時,y1<y2.
【解析】試題分析:(1)分別把點A(1��,0)���,B(3��,2)代入直線y=x+m和拋物線y=x2+bx+c��,利用待定系數(shù)法解得y=x﹣1�,y=x2﹣3x+2;
(2)根據(jù)題意列出不等式�����,直接解二元一次不等式即可����,或者根據(jù)圖象可知,x2﹣3x+2>x﹣1的圖象上x的范圍是x<1或x>3�;
(3)直接根據(jù)函數(shù)圖象即可得出結(jié)論.
試題解析:解:(1)∵把點A(1,0)��,B(3���,2)分別代入直線y=x+m和拋物線y=x2+bx+c得:
0=1+m���, 
,∴m=﹣1�,b=﹣3,c=2��,∴y=x﹣1���,y=x2﹣3x+2�;
(2)由函數(shù)圖象可知,當x<1或x>3時���,不等式x2+bx+c>x+m的解集�;
(3)將M(a�����,y1)���,N(a+1����,y2)兩點代入y=x2﹣3x+2�����,得:
y1=a2﹣3a+2���,y2=(a+1)2﹣3(a+1)+2=a2﹣a.
則y1﹣y2=a2﹣3a+2﹣(a2﹣a)=2﹣2a.
①當2﹣2a>0,即a<1時���,y1>y2����;
②當2﹣2a=0,即a=1時����,y1=y2;
③當2﹣2a<0�,即a>1時,y1<y2����;
所以當a<1時,y1>y2��;當a=1時�����,y1=y2�;當a>1時,y1<y2���;
