最新3第一讲__数列的极限典型例题汇总
3第一讲__数列的极限典型例题
第一讲
数列的极限
一、内容提要
1.数列极限的定义
?Skip Record If...?,有?Skip Record If...?.
注1 ?Skip Record If...?的双重性.一方面,正数?Skip Record If...?具有绝对的任意性,这样才能有
?Skip Record If...?无限趋近于?Skip Record If...?
另一方面,正数?Skip Record If...?又具有相对的固定性,从而使不等式?Skip Record If...?.还表明数列?Skip Record If...?无限趋近于?Skip Record If...?的渐近过程的不同程度,进而能估算?Skip Record If...?趋近于?Skip Record If...?的近似程度. 注2若?Skip Record If...?存在,则对于每一个正数?Skip Record If...?,总存在一正整数?Skip Record If...?与之对应,但这种?Skip Record If...?不是唯一的,若?Skip Record If...?满足定义中的要求,则取?Skip Record If...?,作为定义中的新的一个?Skip Record If...?也必须满足极限定义中的要求,故若存在一个?Skip Record If...?则必存在无穷多个正整数可作为定义中的?Skip Record If...?.
注3?Skip Record If...??Skip Record If...?的几何意义是:对?Skip Record If...?的预先给定的任意?Skip Record If...?邻域?Skip Record If...?,在?Skip Record If...?中至多除去有限项,其余的无穷多项将全部进入?Skip Record If...?.
注4?Skip Record If...?,有?Skip Record If...?.
2.子列的定义
在数列?Skip Record If...?中,保持原来次序自左往右任意选取无穷多个项所得的数列称为?Skip Record If...?的子列,记为?Skip Record If...?,其中?Skip Record If...?表示?Skip Record If...?在原数列中的项数,?Skip Record If...?表示它在子列中的项数.
注1 对每一个?Skip Record If...?,有?Skip Record If...?.
注2 对任意两个正整数?Skip Record If...?,如果?Skip Record If...?,则?Skip Record If...?.反之,若?Skip Record If...?,则?Skip Record If...?.
注3 ?Skip Record If...?,有?Skip Record If...?.
注4 ?Skip Record If...??Skip Record If...?的任一子列?Skip Record If...?收敛于
?Skip Record If...?.
3.数列有界
对数列?Skip Record If...?,若?Skip Record If...?,使得对?Skip Record If...?,有?Skip Record If...?,则称数列?Skip Record If...?为有界数列.
4.无穷大量
对数列?Skip Record If...?,如果?Skip Record If...?,?Skip Record If...?,有?Skip Record If...?,则称?Skip Record If...?为无穷大量,记作?Skip Record If...?.
注1 ?Skip Record If...?只是一个记号,不是确切的数.当?Skip Record If...?为无穷大量时,数列?Skip Record If...?是发散的,即?Skip Record If...?不存在.
注2 若?Skip Record If...?,则?Skip Record If...?无界,反之不真.
注3 设?Skip Record If...?与?Skip Record If...?为同号无穷大量,则?Skip Record If...?为无穷大量.
注4 设?Skip Record If...?为无穷大量,?Skip Record If...?有界,则?Skip Record If...?为无穷大量.
注5 设?Skip Record If...?为无穷大量,对数列?Skip Record If...?,若?Skip Record If...?,?Skip Record If...?使得对?Skip Record If...?,有?Skip Record If...?,则?Skip Record If...?为无穷大量.特别的,若?Skip Record If...?,则?Skip Record If...?为无穷大量.
5.无穷小量
若?Skip Record If...?,则称?Skip Record If...?为无穷小量.
注1 若?Skip Record If...?,?Skip Record If...?有界,则?Skip Record If...?.
注2 若?Skip Record If...?,则?Skip Record If...?;若?Skip Record If...?,且?Skip Record If...?使得对?Skip Record If...?,?Skip Record If...?,则?Skip Record If...?.
6.收敛数列的性质
(1)若?Skip Record If...?收敛,则?Skip Record If...?必有界,反之不真.
(2)若?Skip Record If...?收敛,则极限必唯一.
(3)若?Skip Record If...?,?Skip Record If...?,且?Skip Record If...?,则?Skip Record If...?,使得当?Skip Record If...?时,有?Skip Record If...?.
注这条性质称为“保号性”,在理论分析论证中应用极普遍.
(4)若?Skip Record If...?,?Skip Record If...?,且?Skip Record If...?,使得当
?Skip Record If...?时,有?Skip Record If...?,则?Skip Record If...?.
注这条性质在一些参考书中称为“保不等号(式)性”.
(5)若数列?Skip Record If...?、?Skip Record If...?皆收敛,则它们和、差、积、商所构成的数列?Skip Record If...?,?Skip Record If...?,?Skip Record If...?,?Skip Record If...?(?Skip Record If...?)也收敛,且有
?Skip Record If...??Skip Record If...??Skip Record If...?,
?Skip Record If...??Skip Record If...??Skip Record If...?,
?Skip Record If...??Skip Record If...?(?Skip Record If...?).
7.迫敛性(夹逼定理)
若?Skip Record If...?,使得当?Skip Record If...?时,有?Skip Record If...?,且?Skip Record If...??Skip Record If...?,则?Skip Record If...?.
8. 单调有界定理
单调递增有上界数列?Skip Record If...?必收敛,单调递减有下界数列?Skip Record If...?必收敛.
9. Cauchy收敛准则
数列?Skip Record If...?收敛的充要条件是:?Skip Record If...?,有?Skip Record If...?.
注Cauchy收敛准则是判断数列敛散性的重要理论依据.尽管没有提供计算极限的方法,但它的长处也在于此――在论证极限问题时不需要事先知道极限值.
10.Bolzano Weierstrass定理
有界数列必有收敛子列.
11.?Skip Record If...?
12.几个重要不等式
(1) ?Skip Record If...? ?Skip Record If...? ?Skip Record If...?
(2)算术-几何-调和平均不等式:
对?Skip Record If...?记
?Skip Record If...? (算术平均值)
?Skip Record If...? (几何平均值)
?Skip Record If...? (调和平均值)
有均值不等式: ?Skip Record If...?等号当且仅当?Skip Record If...?时成立. (3) Bernoulli 不等式: (在中学已用数学归纳法证明过)
对?Skip Record If...?由二项展开式
?Skip Record If...?
?Skip Record If...?
(4)Cauchy-Schwarz 不等式:?Skip Record If...?(?Skip Record If...?),有?Skip Record If...??Skip Record If...??Skip Record If...??Skip Record If...?
(5)?Skip Record If...?,?Skip Record If...?
13.O. Stolz公式
二、典型例题
1.用“?Skip Record If...?”“?Skip Record If...?”证明数列的极限.(必须掌握)
例1用定义证明下列各式:
(1)?Skip Record If...?;
(2)设?Skip Record If...?,?Skip Record If...?,则?Skip Record If...?;(97,北大,10分)
(3)?Skip Record If...??Skip Record If...?
证明:(1)?Skip Record If...?,欲使不等式
?Skip Record If...?
成立,只须?Skip Record If...?,于是,?Skip Record If...?,取?Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...?
即 ?Skip Record If...?.
(2)由?Skip Record If...?,?Skip Record If...?,知?Skip Record If...?,有?Skip Record If...?,则
?Skip Record If...??Skip Record If...?
于是,?Skip Record If...?,有?Skip Record If...??Skip Record If...?,
即?Skip Record If...?.
(3)已知?Skip Record If...?,因为
?Skip Record If...??Skip Record If...??Skip Record If...??Skip Record If...?,
所以,?Skip Record If...?,欲使不等式?Skip Record If...??Skip Record If...??Skip Record If...?成立,只须?Skip Record If...?.
于是,?Skip Record If...?,取?Skip Record If...??Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...??Skip Record If...??Skip Record If...?,
即?Skip Record If...?.
评注1本例中,我们均将?Skip Record If...?做了适当的变形,使得?Skip Record If...?,从而从解不等式?Skip Record If...?中求出定义中的?Skip Record If...?.将?Skip Record If...?放大时要注意两点:①?Skip Record If...?应满足当
?Skip Record If...?时,?Skip Record If...?.这是因为要使?Skip Record If...?,
?Skip Record If...?必须能够任意小;②不等式?Skip Record If...?容易求解.
评注2用定义证明?Skip Record If...??Skip Record If...?,对?Skip Record If...?,只要找到一个自然数?Skip Record If...?,使得当?Skip Record If...?时,有?Skip Record If...?即可.关键证明?Skip Record If...?的存在性.
评注3在第二小题中,用到了数列极限定义的等价命题,即:
(1)?Skip Record If...?,有?Skip Record If...?(?Skip Record If...?为任一正常数).
(2)?Skip Record If...?,有?Skip Record If...??Skip Record If...?.
例2用定义证明下列各式:
(1)?Skip Record If...?;(92,南开,10分)
(2)?Skip Record If...??Skip Record If...?
证明:(1)(方法一)由于?Skip Record If...?(?Skip Record If...?),可令?Skip Record If...?(?Skip Record If...?),则
?Skip Record If...??Skip Record If...?(?Skip Record If...?)
当?Skip Record If...?时,?Skip Record If...?,有
?Skip Record If...??Skip Record If...??Skip Record If...?
即?Skip Record If...?.
?Skip Record If...?,欲使不等式?Skip Record If...??Skip Record If...?成立,只须?Skip Record If...?.
于是,?Skip Record If...?,取?Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...??Skip Record If...?,
即?Skip Record If...?.
(方法二)因为
?Skip Record If...?,
所以?Skip Record If...??Skip Record If...?,
?Skip Record If...?,欲使不等式?Skip Record If...??Skip Record If...?成立,只须?Skip Record If...?.
于是,?Skip Record If...?,取?Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...??Skip Record If...?,
即?Skip Record If...?.
(2)当?Skip Record If...?时,由于?Skip Record If...?,可记?Skip Record If...?(?Skip Record If...?),则
?Skip Record If...??Skip Record If...?(?Skip Record If...?)
当?Skip Record If...?时,?Skip Record If...?,于是有
?Skip Record If...??Skip Record If...?.
?Skip Record If...?,欲使不等式?Skip Record If...? ?Skip Record If...??Skip Record If...?成立,只须?Skip Record If...?.
对?Skip Record If...?,取?Skip Record If...?,当?Skip Record If...?时,有 ?Skip Record If...? ?Skip Record If...??Skip Record If...?.当?Skip Record If...?时,?Skip Record If...?(?Skip Record If...?),而?Skip Record If...??Skip Record If...?.
则由以上证明知?Skip Record If...?,有?Skip Record If...?,即
?Skip Record If...?,
故 ?Skip Record If...?.
评注1在本例中,?Skip Record If...?,要从不等式?Skip Record If...?中解得?Skip Record If...?非常困难.根据?Skip Record If...?的特征,利用二项式定理展
开较容易.要注意,在这两个小题中,一个?Skip Record If...?是变量,一个
?Skip Record If...?是定值.
评注2从第一小题的方法二可看出算术-几何平均不等式的妙处.
评注3第二小题的证明用了从特殊到一般的证法.
例用定义证明:?Skip Record If...?(?Skip Record If...?)(山东大学)
证明:当?Skip Record If...?时,结论显然成立.
当?Skip Record If...?时,欲使?Skip Record If...?成立,
只须?Skip Record If...??Skip Record If...?.于是?Skip Record If...?,取?Skip Record If...??Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...?
即?Skip Record If...?.
例设?Skip Record If...?,用“?Skip Record If...?”语言,证明:?Skip Record If...?.
证明:当?Skip Record If...?时,结论恒成立.
当?Skip Record If...?时,?Skip Record If...?,欲使
?Skip Record If...??Skip Record If...?
只须?Skip Record If...??Skip Record If...?.于是?Skip Record If...?,取?Skip Record If...??Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...??Skip Record If...?
即?Skip Record If...?.
2.迫敛性(夹逼定理)
?Skip Record If...?项和问题可用夹逼定理、定积分、级数来做,通项有递增或递减趋势时考虑夹逼定理.
?Skip Record If...?,?Skip Record If...?,?Skip Record If...??Skip Record If...?有界,但不能说明?Skip Record If...?有极限.使用夹逼定理时,要求?Skip Record If...?趋于同一个数.
例求证:?Skip Record If...?(?Skip Record If...?为常数).
分析:?Skip Record If...?,因?Skip Record If...?为固定常数,必存在正整数
?Skip Record If...?,使?Skip Record If...?,因此,自?Skip Record If...?开始,?Skip Record If...?,?Skip Record If...?,?Skip Record If...?,且?Skip Record If...?时,?Skip Record If...?.
证明:对于固定的?Skip Record If...?,必存在正整数?Skip Record If...?,使
?Skip Record If...?,当?Skip Record If...?时,有
?Skip Record If...??Skip Record If...?,
由于?Skip Record If...??Skip Record If...?,由夹逼定理得?Skip Record If...?,即 ?Skip Record If...?.
评注当极限不易直接求出时,可将求极限的变量作适当的放大或缩小,使放大、缩小所得的新变量易于求极限,且二者极限值相同,直接由夹逼定理得出结果.
例若?Skip Record If...?是正数数列,且?Skip Record If...?,则
?Skip Record If...?.
证明:由?Skip Record If...??Skip Record If...?,知
?Skip Record If...??Skip Record If...?
即?Skip Record If...??Skip Record If...?.
于是,?Skip Record If...??Skip Record If...?,而由已知
?Skip Record If...?及?Skip Record If...??Skip Record If...?
故 ?Skip Record If...??Skip Record If...?
由夹逼定理得 ?Skip Record If...?.
评注1 极限四则运算性质普遍被应用,值得注意的是这些性质成立的条件,即参加运算各变量的极限存在,且在商的运算中,分母极限不为0.
评注2 对一些基本结果能够熟练和灵活应用.例如:
(1)?Skip Record If...?(?Skip Record If...?)(2)?Skip Record If...?(?Skip Record If...?)
(3)?Skip Record If...?(?Skip Record If...?)(4)?Skip Record If...?(5)?Skip Record If...?(?Skip Record If...?)(6)?Skip Record If...??Skip Record If...?
例证明:若?Skip Record If...?(?Skip Record If...?有限或?Skip Record If...?),则
?Skip Record If...?(?Skip Record If...?有限或?Skip Record If...?).
证明:(1)设?Skip Record If...?为有限,因为?Skip Record If...?,则?Skip Record If...?,有?Skip Record If...?.
于是?Skip Record If...??Skip Record If...?
?Skip Record If...??Skip Record If...?
?Skip Record If...?.
其中?Skip Record If...?为非负数.
因为?Skip Record If...?,故对上述的?Skip Record If...?,有?Skip Record If...?.
取?Skip Record If...?当?Skip Record If...?时,有
?Skip Record If...?
即?Skip Record If...?.