(1)令Y=0 -X²+2X+3=0 得 X=3或X=-1∴A(-1,0)B(3,0)令X=0 则Y=3∴C(0,3)(2)设直线BC:Y=kx+3(k≠0) 3k+3=0 得 k=-1∴直线BC:Y=-X+3设P(X,-X+3)M(X,-X²+2X+3)∴PM=(-X²+2X+3)-(-X+3)=-X²+3X∴S△BCM=S△PMC+S△PMB=1/2PM×(Xp-XC)+1/2PM×(XB-XP)=1/2PM(XB-XC)=3/2PM∴S△BCM=3/2(-X²+3X)=-3/2(X-3/2)²+27/8∴X=3/2时,S△BCM max此时P(3/2,3/2)∴PN=ON=3/2∴BN=OB-ON=3-3/2=3/2∴PB=3√2/2C△BCN=BN+PN+PB=3+3√2/2∴当S△BCM max,△BPN的周长为3+3√2/2(3)抛物线对称轴:X=1在Rt△CNO中,OC=3,ON=3/2∴CN=3√5/2设点D为CN中点,则D(3/4,3/2)CD=ND=3√5/4①若点Q为顶点作Rt△CNO的外接圆⊙D,与抛物线对称轴交于Q1,Q2两点连接Q1D,则Q1D=CD=ND=3√5/4过D作对称轴的垂线,垂足为E则E(1,3/2),Q1E=Q2E,DE=1-3/4=1/4在Rt△Q1DE中 Q1E=√11/2∴Q1(1,(3+√11)/2)Q2(1,(3-√11)/2)②若点N为顶点过点N作NF⊥CN,交对称轴于点Q3,交Y轴于点F易知Rt△NFO∽Rt△CNO则OF/ON=ON/OC 即OF÷(3/2)=3÷(2/3)∴OF=3/4∴F(0,-3/4)又∵N(3/2,0)∴直线FN:Y=1/2X-3/4当X=1时,Y=-1/4∴Q3(1,-1/4)③点C为顶点过点C作Q4C⊥CN,交对称轴于点Q4∵Q4C∥FN∴直线Q4C:Y=1/2X+3当X=1时,Y=7/2∴Q4(1,7/2)综上所述,满足题意的点Q有4个
Q1(1,(3+√11)/2)Q2(1,(3-√11)/2)Q3(1,-1/4)Q4(1,7/2)