【答案】解(Ⅰ)令t=log3x+m,∵ 
�����,∴t∈[m﹣1����,m+1],
從而y=f(t)=t2﹣2t+3=(t﹣1)2+2���,t∈[m﹣1����,m+1]
當(dāng)m+1≤1,即m≤0時(shí)�, 
,
解得m=﹣1或m=1(舍去)����,
當(dāng)m﹣1<1<m+1�,即0<m<2時(shí),ymin=f(1)=2����,不合題意,
當(dāng)m﹣1≥1���,即m≥2時(shí)����, 
���,
解得m=3或m=1(舍去)��,
綜上得����,m=﹣1或m=3,
(Ⅱ)不妨設(shè)x1<x2���,易知f(x)在(2���,4)上是增函數(shù),故f(x1)<f(x2)���,
故|f(x1)﹣f(x2)|<k|x1﹣x2|可化為f(x2)﹣f(x1)<kx2﹣kx1�,
即f(x2)﹣kx2<f(x1)﹣kx1(*)����,
令g(x)=f(x)﹣kx,x∈(2�����,4)����,即g(x)=x2﹣(2+k)x+3,x∈(2��,4),
則(*)式可化為g(x2)<g(x1)�,即g(x)在(2,4)上是減函數(shù)�����,
故 
�,得k≥6,
故k的取值范圍為[6�,+∞)
【解析】(Ⅰ)令t=log3x,(﹣1≤t≤1)���,則y=(t+m﹣1)2+2,由題意可得最小值只能在端點(diǎn)處取得���,分別求得m的值����,加以檢驗(yàn)即可得到所求值�;(Ⅱ)判斷f(x)在(2,4)遞增�����,設(shè)x1>x2,則f(x1)>f(x2)�,原不等式即為f(x1)﹣f(x2)<k(x1﹣x2),即有f(x1)﹣kx1<f(x2)﹣kx2�����,由題意可得g(x)=f(x)﹣kx在(2�,4)遞減.由g(x)=x2﹣(2+k)x+3,求得對稱軸�����,由二次函數(shù)的單調(diào)區(qū)間���,即可得到所求范圍
【考點(diǎn)精析】掌握二次函數(shù)的性質(zhì)是解答本題的根本��,需要知道增減性:當(dāng)a>0時(shí)���,對稱軸左邊,y隨x增大而減��������;對稱軸右邊��,y隨x增大而增大�;當(dāng)a<0時(shí),對稱軸左邊����,y隨x增大而增大;對稱軸右邊���,y隨x增大而減�����。
