又f(x)在区间(1,??)上只有一个极小值点记为x1,
且x?(1,x1)时,f?(x)?0,函数f(x)单调递减,x?(x1,??)时,f?(x)?0,函数f(x)单调递增,
由题意可知:x1即为x0. ??????????9分
?22?f(x0)?03?x0??alnx0?0∴?,∴?消去可得:, 2lnx?1?x003x0?13?f?(x0)?0?2x?ax?2?000?即2lnx0?(1?3)?0 3x0?13(x?1),则t(x)在区间(1,??)上单调递增 3x?133731?2?0.6973?1??2??1????0 又∵t(2)?2ln2?1?37107352?133323t(3)?2ln3?1?3?2?1.099?1??2?1?1???0
2626263?1令t(x)?2lnx?1?由零点存在性定理知 t(2)?0,t(3)?0
∴2?x0?3 ∴[x0]?2 . ??????12分 10、解:(1) 当x<-3时,
??????????1分
, 当-3 ,当x>0时, ??3分 所以函数f(x)在(-∞,-3)上为单调递减函数,在(-3,0)上为单调递增函数 在(0,+∞)上为单调递减函数??????????4分 因此函数f(x)在x=0处有极大值f(0)=5 ??????????5分 (2)由(1)得函数f(x)在(-∞,-3)上为单调递减函数,在(-3,0)上为单调 递增函数所以函数f(x)在x=-3处有最小值f(-3)= ?????????7分 (3)??????????9分 由(2)得函数f(x)在区间(-∞,0]上有最小值当x>0时,f(x)>0 ??????????11分 所以函数f(x)在定义域中的最小值为 ,所以 ??????????10分 即a的取值范围为(-∞, ] ??????????12分 11、解: (1)f(x)?ex?ax?1,f?(x)?ex?a ①当a?0时,f?(x)?0(不恒为0),f(x)在R上单调递增,又f(0)?0,所以当x?(??,0),f(x)?0,不合题意,舍去; ②当a?0时,x?(??,lna),f?(x)?0,f(x)单调递减, x?(lna,??),f?(x)?0,f(x)单调递增,f(x)min?f(lna)?a?alna?1,则需a?alna?1?0恒成立. 令g(a)?a?alna?1,g?(a)??lna,当a?(0,1)时,g?(a)?0,g(a)单调递增, 当 a?(1,??)时,g?(a)?0,g(a)单调递减,而g(1)?0,所以a?alna?1?0恒成立.所以a的取值 1. ??????????????????????7分 集合为??(2)由(1)可得ex?x?1?0(x?0),x?ln(x?1)(x?0),令x? 1 ,则 n 11n?1?ln(?1)?ln?ln(n?1)?lnn,所以 nnn1111??????(ln2?ln1)?(ln3?ln2)???(ln(n?1)?lnn)?ln(n?1)(n?N?) 23n??????????????????????????????12分 2x32x12、.解:(Ⅰ)当a?0,b??3时,f?x??x?x?3?e?x?3xe, ??f??x???3x2?6x?ex?ex?x3?3x2??exx3?6x?xexx?6当x???,?增; 当x?0,6时,f??x???,f?x?单调递减;当x?故函数f?x?的单调递增区间为?6,0,???6?时,f??x???,f?x?单调递减;当x???????x?6? 6,0?时,f??x??0,f?x?单调递???6,??时,f??x??0,f?x?单调递增. ???6,??,单调递减区间为??,?6,0,6. ?????2x(Ⅱ)(ⅰ)当a?0时,f?x??x?x?b?e, xxx2f??x??2x?x?b?ex?x2??e?e?x?b????xe??x??3?b?x?2b??, 令g?x??x??3?b?x?2b, 2???b?3??8b??b?1??8?0, 故g?x??0有两根?,?,不妨设???, 22 当?与?有一个为零时,x?a?0不是f?x?的极值点,故?与?均不为0; 当????0或????0时,x?a?0是函数f?x?的极小极点,不合题意; 当??????0时,x?a?0是函数f?x?的极大值. ∴????,即?b??,∴b??.?b的取值范围为(??,0). ( ⅱ ) 2f??x??ex?x?a??x???3?a?b?x?2b?ab?a??,令 g1?x??x2??3?a?b?x?2b?ab?a, ???3?a?b??4?2b?ab?a???a?b??2?a?b??1?8??a?b?1??8?0,因此,g1222?a2?b2?2ab?2a?2b?9??x2?,又因为?,不妨设x1?x??0有两根x1?,x2??a?x2?,??a?x2?,所以f?x?的三个极值点分别为x1且x1则x1?,a,x2?是x1,x2,x3x?a为极大值点, 的一个排列,其中x1??a?b?3??a?b?1?22?8??,x2a?b?3??a?b?1?22?8, ??x2???a,即?a?a?3?b也即b??a?3时有:①若x1?,a,x2?或x2?,a,x1?成等差数列即x1??a?x4或 2x1??a?a?b?3???a?x4,所以x4?2x12x2??a?a?b?3?或x4?2x2??a?b?1?2?8?a?a?26, ???a?b?1?2?8?a?a?26; ??,a,x2?不成等差数列,则需:x2??a?2?a?x1??或a?x1??2?x2??a?, ②若x1??a?2?a?x1??时,x4?当x23?a?b?3????a?x2??x2??,于是3a?2x1, 222即???3?a?b?3?,故a?b?3??时,?a?b?1??9?a?b?1??17?0, a?b?1??9?137?13?b??a?22,此时, x4??2a????a?x2?2??a???3?b1??a?43, 1a332b??2?x2??a?时, b??a?同理当a?x17?131?13,x4?a?. 22 综上所述:当b??a?3时,x4?a?26;当b??a?7?131?13时,x4?a?; 22当b??a? 7?131?13时,x4?a?. 22