【答案】(1)
�;(2)
時(shí)��,
���;
時(shí)��,
��;(3)
.
【解析】分析:(1)利用導(dǎo)數(shù)求函數(shù)的極大值,再解方程f (x)極大值=0得到a的值. (2)利用導(dǎo)數(shù)求函數(shù)的單調(diào)區(qū)間���,再求函數(shù)的最大值. (3) 設(shè)h (x)=f(x)-f ′(x)=2x3-3(a+2)x2
+6ax+3a-2�,先把問(wèn)題轉(zhuǎn)化為h (x)≥0在
有解�,再研究函數(shù)h(x)的圖像性質(zhì)分析出正整數(shù)a的集合.
詳解:(1)因?yàn)?/span>f (x)=2x3-3ax2+3a-2(a>0),
所以f'(x)=6x2-6ax=6x(x-a).
令f'(x)=0�����,得x=0或a.
當(dāng)x∈(-∞�����,0)時(shí),f'(x)>0���,f (x)單調(diào)遞增��;
當(dāng)x∈(0���,a)時(shí),f'(x)<0�,f (x)單調(diào)遞減;
當(dāng)x∈(a�,+∞)時(shí),f'(x)>0���,f (x)單調(diào)遞增.
故f (x)極大值=f (0)=3a-2=0�����,解得a=.
(2)g (x)=f (x)+6x=2x3-3ax2+6x+3a-2(a>0)�,
則g′(x)=6x2-6ax+6=6(x2-ax+1)�,x∈[0,1].
①當(dāng)0<a≤2時(shí),△=36(a2-4)≤0��,
所以g′(x)≥0恒成立�����,g (x)在[0�,1]上單調(diào)遞增,
則g (x)取得最大值時(shí)x的值為1.
②當(dāng)a>2時(shí)����,g′(x)的對(duì)稱(chēng)軸x=
>1,且△=36(a2-4)>0�����,g′(1)=6(2-a)<0�,g′(0)=6>0�,
所以g′(x)在(0,1)上存在唯一零點(diǎn)x0=
.
當(dāng)x∈(0�,x0)時(shí),g′(x)>0�,g (x)單調(diào)遞增,
當(dāng)x∈(x0����,1)時(shí)�����,g′(x)<0���,g (x)單調(diào)遞減,
則g (x)取得最大值時(shí)x的值為x0=.
綜上����,當(dāng)0<a≤2時(shí),g (x)取得最大值時(shí)x的值為1���;
當(dāng)a>2時(shí),g (x)取得最大值時(shí)x的值為.
(3)設(shè)h (x)=f (x)-f ′(x)=2x3-3(a+2)x2+6ax+3a-2�����,
則h (x)≥0在有解.
h′(x)=6[x2-(a+2)x+a]=6
��,
因?yàn)?/span>h′(x)在
上單調(diào)遞減�,
因?yàn)?/span>h′(x)<h′()=-
a2<0�,
所以h (x)在上單調(diào)遞減�,
所以h()≥0����,即a3-3a2-6a+4≤0.
設(shè)t (a)=a3-3a2-6a+4(a>0)����,則t′ (a)=3a2-6a-6���,
當(dāng)a∈(0,1+
)時(shí)��,t′ (a)<0,t (a)單調(diào)遞減�;
當(dāng)a∈(1+,+∞)時(shí)����,t′ (a)>0,t(a)單調(diào)遞增.
因?yàn)?/span>t (0)=4>0��,t (1)=-4<0,所以t (a)存在一個(gè)零點(diǎn)m∈(0��,1)����,
因?yàn)?/span>t (4)=-4<0�,t (5)=24>0���,所以t (a)存在一個(gè)零點(diǎn)n∈(4����,5)���,
所以t (a)≤0的解集為[m��,n]���,
故滿(mǎn)足條件的正整數(shù)a的集合為{1���,2,3�,4}.
,記
為
的導(dǎo)函數(shù).
