=4?2???1?4?8??Sn ?n?n?Tn?Sn.
22.解析:本题主要考查函数极值的概念、导数运算法则、导数应用及等差数列等基础知识,
同时考查推理论证能力、分类讨论等综合解题能力和创新意识. (Ⅰ)解:a?0时,f?x??x2?x?b?ex,
?ex?x2x?bex??exx?x2?b?3x?2b?, 2??f??x???xx?b????????????令g?x??x2??b?3?x?2b,????b?3??8b??b?1??8?0,
22?设x1?x2是g?x??0的两个根,
(1)当x1?0或x2?0时,则x?0不是极值点,不合题意;
(2)当x1?0且x2?0时,由于x?0是f?x?的极大值点,故x1?0?x2.
?g?0??0,即2b?0,?b?0.
2x(Ⅱ)解:f??x??ex?x?a????(3?a?b)x?2b?ab?a??,
令g(x)?x?(3?a?b)x?2b?ab?a,
2则?=(3?a?b)2?4(2b?ab?a)?(a?b?1)2?8?0,
于是,假设x1,x2是g?x??0的两个实根,且x1?x2.
由(Ⅰ)可知,必有x1?a?x2,且x1、a、x2是f?x?的三个极值点,
则x1??a?b?3???a?b?1?22?8,x2??a?b?3???a?b?1?22?8 假设存在b及x4满足题意,
(1)当x1,a,x2等差时,即x2?a?a?x1时, 则x4?2x2?a或x4?2x1?a,
于是2a?x1?x2?a?b?3,即b??a?3. 此时x4?2x2?a?a?b?3?
(a?b?1)2?8?a?a?26
2或x4?2x1?a?a?b?3?(a?b?1)?8?a?a?26 (2)当x2?a?a?x1时,则x2?a?2(a?x1)或(a?x1)?2(x2?a)
①若x2?a?2?a?x1?,则x4?a?x2, 2于是3a?2x1?x2?即
3?a?b?3??2?a?b?1?2?8,
?a?b?1?2?8??3?a?b?3?.
2两边平方得?a?b?1??9?a?b?1??17?0,
?a?b?3?0,于是a?b?1??9?13, 2此时b??a?7?13, 2此时x4?a?x22a??a?b?3??3?a?b?3?1?3=??b?3?a?. 242②若(a?x1)?2(x2?a),则x4?a?x1, 2于是3a?2x2?x1?即
3?a?b?3???a?b?1?22?8,
?a?b?1?2?8?3?a?b?3?.
2两边平方得?a?b?1??9?a?b?1??17?0,
?a?b?3?0,于是a?b?1??9?13, 2此时b??a?7?13 2此时x4?a?x12a?(a?b?3)?3(a?b?3)1?13???b?3?a? 242综上所述,存在b满足题意, 当b=-a-3时,x4?a?26,
b??a?7?131?13时,x4?a?, 227?131?13时,x4?a?. 22b??a?