【答案】
(1)解:當(dāng)a=4時(shí)��,f(x)=x|x﹣4|+2x���,
當(dāng)x≥4時(shí)�����,x(x﹣4)+2x≥8����,解得x≥4(x≤﹣2舍去);
當(dāng)x<4時(shí)�,x(4﹣x)+2x≥8,解得2≤x<4.
綜上可得��,f(x)≥8的解集為[2��,+∞)
(2)解:當(dāng)a∈[0�����,3]時(shí)��,f(x)=x(x﹣a)+2x=x2+(2﹣a)x����,
對(duì)稱軸為x= 
∈[﹣1�����, 
]����,
區(qū)間[3�,4]在對(duì)稱軸的右邊����,為增區(qū)間,可得f(3)為最小值����,即為15﹣3a;
當(dāng)a∈(3�����,4]時(shí)�,當(dāng)3<x<a時(shí)f(x)=x(a﹣x)+2x=﹣x2+(2+a)x,
對(duì)稱軸為x= 
∈( 
����,3],區(qū)間(3����,a)在對(duì)稱軸的右邊,為減區(qū)間��;
當(dāng)a≤x≤4時(shí),f(x)=x(x﹣a)+2x=x2+(2﹣a)x�����,
對(duì)稱軸為x= ∈[ ����,1],
區(qū)間[3�,4]在對(duì)稱軸的右邊,為增區(qū)間����,
即有f(a)取得最小值,且為2a.
綜上可得��,a∈[0���,3]時(shí)����,f(x)的最小值為15﹣3a��;
a∈(3����,4]時(shí),f(x)的最小值為2a
(3)解:當(dāng)x<a時(shí)���,f(x)=﹣x2+(2+a)x��,對(duì)稱軸為x=
當(dāng)a∈[0��,2]知a﹣ = ≤0��,可得x<a為增函數(shù)�;
當(dāng)x≥a時(shí)���,f(x)=x2+(2﹣a)x�����,對(duì)稱軸為x= ���,
當(dāng)a∈[0,2]知a﹣ = >0�,可得x≥a為增函數(shù);
則不滿足關(guān)于x的方程f(x)=tf(a)有3個(gè)不相等的實(shí)數(shù)根.
當(dāng)a∈[2����,4]時(shí)���,a> 
+1> ﹣1,
∴y=f(x)在(﹣∞�, +1)上單調(diào)增,在( +1����,a)上單調(diào)減,
在(a����,+∞)上單調(diào)增,
∴當(dāng)f(a)<tf(a)<f( +1)時(shí)�,
關(guān)于x的方程f(x)=tf(a)有三個(gè)不相等的實(shí)數(shù)根;
即2a<t2a<( +1)2����,
∵a∈[2,4]���,∴1<t< (1+ 
+ 
)���,
設(shè)h(a)= (1+ + ),
∵存在a∈[2�,4]使得關(guān)于x的方程f(x)=tf(a)有三個(gè)不相等的實(shí)數(shù)根,
∴1<t<h(a)max����,
又可證h(a)= (1+ + )在[2,4]上單調(diào)增����,
∴h(a)max=h(4)= 
,
∴1<t<
【解析】(1)f(x)=x|x﹣4|+2x�����,討論當(dāng)x≥4時(shí)���,當(dāng)x<4時(shí)��,去絕對(duì)值�����,解不等式��,再求并集即可����;(2)討論當(dāng)a∈[0,3]時(shí)�,當(dāng)a∈(3,4]時(shí)�,去絕對(duì)值,求出對(duì)稱軸�����,判斷單調(diào)性����,可得最小值;(3)討論當(dāng)x<a時(shí)�����,當(dāng)x≥a時(shí)����,取絕對(duì)值,求出對(duì)稱軸�,討論當(dāng)a∈[0,2]���,當(dāng)a∈[2�,4],結(jié)合函數(shù)的單調(diào)性��,求得極值��,可得1<t< (1+ + )�,設(shè)h(a)= (1+ + )���,運(yùn)用單調(diào)性可得h(a)的最大值�,進(jìn)而得到所求t的范圍.
