(2)f?(x)?3x2?2ax?4的图象为开口向上且过点(0,-4)的抛物线,有条件可得
?4a?8?0 所以 -2?a?2 .所以a的取值范围为??2,2? f?(?2)?0,f?(2)?0即?8?4a?0?a(x2?b)?ax(2x)ax8.(1)已知函数f(x)=2,. ……………………2分 ?f?(x)?22(x?b)x?b?a(1?b)?2a?0,?f?(1)?0,??a?4,又函数f(x)在x=1处取得极值2,??即?a …4分 ??f(1)?2,b?1.?2????1?b4(x2?1)?4x(2x)(41?x2)当a=4,b=1, ?f?(x)?, ?2222(x?1)(x?1)当?1?x?1时,f?(x)?0,x?1时,f?(x)?0,?f(x)在x?1处取得极值. ?f(x)?4x. …………………6分 x?124(x2?1)?4x(2x)(2)由f?(x)??0?x??1. …………………8分
(x2?1)2x f?(x) f(x) (??,?1) ?1 0 极小值-2 (-1,1) + 1 0 极大值2 (1,??) - - ? ? ? 所以f(x)?4x的单调增区间为[?1,1]. …………………10分 2x?1?m??1,?若(m,2m?1)为函数f(x)的单调增区间,则有?2m?1?1, 解得?1?m?0.
?2m?1?m,?即m?(?1,0]时,(m,2m?1)为函数f(x)的单调增区间. ………………………12分 4(x2?1)?4x(2x)4x(3)?f(x)?2,?f?(x)?.
(x2?1)2x?1设切点为P(x0, y0),则直线l的斜率为
4(x02?1)?8x0221k?f?(x0)??4[?]. ………………………14分
(x02?1)2(x02?1)2x02?1令
1?t,t?(0,1],则直线l的斜率k?4(2t2?t),t?(0,1], 2x0?11?k?[?,4]. …………16分
29.解:(1)y?x3?3px2?3px?1, y??3x2?6px?3p,
若该函数能在x??1处取到极值,则y?|x??1?3?6p?3p?0,
即p?1,此时,y??3x2?6x?3?3(x?1)2?0,函数为单调函数,这与
11
该函数能在x??1处取到极值矛盾,则该函数不能在x??1处取到极值. (2)若该函数在区间(?1,??)上为增函数,
则在区间(?1,??)上,y??3x2?6px?3p?0恒成立,
?p??1?① ??p?1;
?f(?1)?3?6p?3p?0??p??1?② ??0?p?1, 2?f(?p)?3p?3p?0?综上可知,0?p?1.则p的取值范围是?0,1?
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10.解:(Ⅰ)由题意:f(x)的定义域为(0,??),且f?(x)?1ax?a??2. xx2x
(4分)
?a?0,?f?(x)?0,故f(x)在(0,??)上是单调递增函数.
(Ⅱ)由(1)可知:f?(x)?x?a 2x① 若a??1,则x?a?0,即f?(x)?0在[1,e]上恒成立,此时f(x)在[1,e]上为增函数,
?f?x??min?f?1???a?2
(6分)
. ?a??2(舍去)
② 若a??e,则x?a?0,即f?(x)?0在[1,e]上恒成立,此时f(x)在[1,e]上为减函数,
??f?x??min?f?e??1?所以,a??e
a?2 e
(10分)
③ 若?e?a??1,令f?(x)?0得x??a,
当1?x??a时,f?(x)?0,?f(x)在(1,?a)上为减函数, 当?a?x?e时,f?(x)?0,?f(x)在(?a,e)上为增函数,
?f?x??min
?f??a??ln(?a)?1?2
(13分)
12
a??e(舍去),
综上可知: a??e (六)
(14分)
1.解:(I)f?(x)?x?2(1?a)x?4a?(x?2)(x?2a)
由a?1知,当x?2时,f?(x)?0,故f(x)在区间(??,2)是增函数; 当2?x?2a时,f?(x)?0,故f(x)在区间(2,2a)是减函数; 当x?2a时,f?(x)?0,故f(x)在区间(2a,??)是增函数。
综上,当a?1时,f(x)在区间(??,2)和(2a,??)是增函数,在区间(2,2a)是减
函数。
(II)由(I)知,当x?0时,f(x)在x?2a或x?0处取得最小值。
21(2a)3?(1?a)(2a)2?4a?2a?24a 3432 ??a?4a?24a
3 f(2a)? f(0)?24a 由假设知
?a?1,?a?1?4??f(2a)?0, 即???a(a?3)(a?6)?0, 解得 1
w.w.w..s.5.u.c.o.m 3222.解:(1)f(x)?x?ax?x?1求导得f?(x)?3x?2ax?1
当a?3时,??0,f?(x)?0,f(x)在R上递增;
2?a?a2?3当a?3,f?(x)?0求得两根为x?,
32???a?a2?3?a?a2?3??a?a2?3?即f(x)在???,,?递增,??递减,
????333??????a?a2?3?,???递增。 ???3????内是减函数,所以当x???,??时f??x??0恒(2)因为函数f(x)在区间??,13
?2?31?3??2?31?3???2??f???3??0???成立,结合二次函数的图像可知?解得a?2.
?f???1??0?????3?
3.(1)当a?2时,f(x)?22 ?xlnx,f'(x)??2?lnx?1,f(1)?2,f'(1)??1,
xx所以曲线y?f(x)在x?1处的切线方程为y??x?3; ???? 4分
(2)存在x1,x2?[0,2],使得g(x1)?g(x2)?M成立
等价于:[g(x1)?g(x2)]max?M,
考察g(x)?x?x?3,g'(x)?3x2?2x?3x(x?),
3
222x 0 (0,) (,2] 322
3332 g'(x) g(x) 0 ? 递减 0 极(最)小值?? 85递增 27?3 231 由上表可
知:g(x)min?g()??
85,g(x)max?g(2)?1, 27112, 27[g(x1)?g(x2)]max?g(x)max?g(x)min?所以满足条件的最大整数M?4; ???? 9分
121等价于:在区间[,2]上,函数f(x)的最小值不小于g(x)的最大值,
21 由(2)知,在区间[,2]上,g(x)的最大值为g(2)?1。
21f(1)?a?1,下证当a?1时,在区间[,2]上,函数f(x)?1恒成立。
21a1当a?1且x?[,2]时,f(x)??xlnx??xlnx,
2xx11记h(x)??xlnx,h'(x)??2?lnx?1, h'(1)?0
xx11当x?[,1),h'(x)??2?lnx?1?0;当x?(1,2],
2x(3)对任意的s,t?[,2],都有f(s)?g(t)成立
14
1?lnx?1?0, x211所以函数h(x)??xlnx在区间[,1)上递减,在区间(1,2]上递增,
x2h'(x)??h(x)min?h(1)?1,即h(x)?1,
所以当a?1且x?[,2]时,f(x)?1成立,
即对任意s,t?[,2],都有f(s)?g(t)。 ???? 15分 4.解:
(Ⅰ)f?(x)?3ax?6x?3x(ax?2).
因为x?2是函数y?f(x)的极值点,所以f?(2)?0,即6(2a?2)?0,因此a?1. 经验证,当a?1时,x?2是函数y?f(x)的极值点. ···················································· 4分 (Ⅱ)由题设,g(x)?ax?3x?3ax?6x?ax(x?3)?3x(x?2). 当g(x)在区间[0,2]上的最大值为g(0)时,
322221212g(0)≥g(2),
即0≥20a?24.
6. ························································································································· 9分 56反之,当a≤时,对任意x?[0,2],
56g(x)≤x2(x?3)?3x(x?2)
53x?(2x2?x?10) 53x?(2x?5)(x?2) 5故得a≤≤0,
而g(0)?0,故g(x)在区间[0,2]上的最大值为g(0).
综上,a的取值范围为???,?. ······················································································ 12分
15
??6?5?