【答案】(1)(1,2)(2)當(dāng)x>-
時(shí)��,y2>y1����;當(dāng)x=-時(shí)�����,y2=y1�;當(dāng)x<-時(shí)��,y2<y1�;(3)2≤c≤1+
或1-≤c≤0
【解析】
(1)把點(diǎn)A代入拋物線解析式求出c的值 ,得到拋物線的解析式進(jìn)行配方即可得到M的坐標(biāo)���;
(2)先確定拋物線的對(duì)稱軸����,再將點(diǎn)B與點(diǎn)C分三種位置關(guān)系討論求解即可����;
(3)分別求出∠MON=45°時(shí)和∠MON=60°時(shí)c的值,即可求出45°≤∠MON≤60°時(shí)�����,c的取值范圍.
把A(2����,3)代入拋物線得4-4+c=3,
解得c=3��,
∴y=x2-2x+3=(x-1)2+2
∴M(1,2)���;
(2)∵y=x2-2x+c����,
∴對(duì)稱軸為:x=1�����,
∴當(dāng)x≤1時(shí)��,y隨x的增大而減小��,當(dāng)x≥1時(shí)�,y隨x的增大而增大,
①當(dāng)B��、C都在對(duì)稱軸左側(cè)時(shí)�,x1+3≤1即x1≤-2時(shí),y1>y2�����;
②當(dāng)B、C都在對(duì)稱軸右側(cè)時(shí)��,x1≥1時(shí)�����,y1<y2��;
③當(dāng)B在對(duì)稱軸左側(cè)����、C在對(duì)稱軸右側(cè)時(shí),x1<1且x1+3>1���,
∴-2<x1<1
點(diǎn)B關(guān)于x=1的對(duì)稱點(diǎn)為(2-x1���,y1)
當(dāng)2-x1<x1+3時(shí),x1>-��,y1<y2����,
當(dāng)2-x1>x1+3時(shí),x1<-����,y1>y2,
當(dāng)2-x1=x1+3時(shí)�,x1=-,y1=y2��,
綜上所述��,
當(dāng)x>-時(shí)�,y2>y1;當(dāng)x=-時(shí)����,y2=y1;當(dāng)x<-時(shí)���,y2<y1�����;
(3)∵y=x2-2x+c=(x-1)2+c-1,
∴頂點(diǎn)坐標(biāo)為M(1,c-1),
∵對(duì)稱軸與x軸交于點(diǎn)N�,
∴N(1,0)
∴ON=1,
當(dāng)∠MON=45°時(shí)����,在Rt△MON中���,
,
∴|c-1|=1,
∴c=2或c=0;
當(dāng)∠MON=60°時(shí),在Rt△MON中��,
,
∴|c-1|=,
∴c=+1或c=1-,
∴當(dāng)45°≤∠MON≤60°時(shí)�����,2≤c≤1+或1-≤c≤0.
