f?x0?x??f?x0?x?f?t?4x??f?t??limx?0x?0xx ?4limf??t??4limf??x0?3x??4f??x0?.limx?0x?0因为题中只设f(x)在x0可导,没说在x0及其邻域内可导,更没假定f??x?在x0点连续,所以上面的做法是无根据的.
?1?11ln?1?x????28.C 29.A 提示:y???expln?1?x????1?x?x??. ?2xx???x?1?x??30.B 31.A
二、解答题
dy12?3x?2?3?3x?2??3?3x?2??3x?2?1.?f???arcsin????,dx?3x?2?2?3x?2?2?3x?2??3x?2?2所以dydx?3arcsin1?x?03?.2
2.方法一dx1dydyt2?,由2??y?2ty?e?0得:2dt1?tdtdt
dyy2?et1?t2?.dt2?1?ty?????方法二 由于x?arctant则t?tanx,将其代入题目中第二式得:2y?y2tanx?etanx?5,
两边对x求导得:2dydy?2y?tanx?y2sec2x?etanx?sec2x?0. dxdxdyy2?etanx1?tan2x解得?.
dx2?1?ytanx?3.设??x??4x3?18x2?27,则???x??12x?x?3?,于是当0 ????3????x 0?x?,??3??232故在[0,2]上??x?为单调减少,而??0??27,????0,??2???13,所以f?x??|4x?18x?27|???2?????x? 3?x?2. ?2??3??3??3?在?0,?为单调减少,在?,2?为单调增加,因而在[0,2]上f(x)的最大值f(0)=27,最小值f???0. ?2??2??2?lnx的定域为?0,??? x1?lnx?3?2lnx??y??,y?令y??0,得惟一的驻点x=e,y???0,得x?e3/2,下面求渐近线方程.由23xxlnxlnxlim???,lim?0,可知x=0为垂直渐近线,y=0为水平渐近线,无斜渐近线,在各部分区间内f??x?,f???x?x?0xx??x4.函数y?的符号,相应曲线弧的升降及凹凸,以及极值点和拐点等列表如下: 函数图形如图3-25. 5.(1)定义域为???,0???0,???.y??1?8,得驻点x?2,不可导点x?0. x3 所以,区间(-∞,0),(2,+∞)为增区间,(0,2)为减区间,x=2为极小点,极小值为y=3. (2)y???24?0,区间???,0?,?0,???为下凹区间,无拐点; 4x?x3?4?x3?4x3?4???0,(3)lim所以x=0为垂直渐近线,y=x为斜渐近线. ???,a?lim?1,b?lim?x222??x?0x??x??xxx??描点作图(如图3-26).