sinlimn???n?sin2??...?sin?n1????2???n?lim????sin?sin?...?sin???n??n?1?n?1nn???n???sin?sin?...?sin? ?lim????n???nn???n?1???2??
?1???0sinxdx?2?,
类似地 limsin?n?sinn??2??...?sin?n 1n?nn21????2???2??sin?sin?...?sin? ?lim????, n??n2?1??nnn?????由夹逼准则知
?2???sinsin?n?...?sin???2 . lim?n?n??11??n?1?n?n??2n??注:在此式的求解中用到了放缩法和迫敛性. 2.7 Stoltz公式法 Stoltz公式,nlim???nyny?yn?1?a?limn.在求某些极限时非常方便,尤其n???x?xxnnn?1是当yn??ak时特别有效.
k?1例2.7.1 同例2.1.2,定理1.2.4(1)式证明. 证明:前面用??N定义法证明,现用Stoltz公式证明. 令yn?a1?a2?...?an,xn?n,则由Stoltz公式得到
11
a1?a2?...?ann??n
a1?a2?...?an???a1?a2?...?an?1???limn??n??n?1?lim ?liman?liman?a. n??1n??1k?2k?...?nk例2.7.2 求nlim. ???nk?11k?2k?...?nknk?limk?1解: nlim (Stoltz公式) k?1k?1???n???nn??n?1? =nlim??? =
nkCn?Cn1kk?12k?1k?1?...???1?k?1 (二项式定理)
11?. 1Ckk?1?12.8 几何算术平均收敛公式法
上面我们用Stoltz公式已得出定理1.2.4,下面我们通过例子会发现很多n*,类型的数列极限可以用此方法来简化其求法. 例2.8.1 同例2.1.1一样求limna,其中a?0.
n??*n解:令a1?a,a2?a3?...?an?1,由定理1.2.4(2)知 limna?liman?1.
n??n??例2.8.2 同例2.3.2一样求limnn. n??n?n?2,3,...?,由定理1.2.4(2)知 n?1nn limn?liman?lim?1. n??n??n??n?1解:令a1?1,an?例2.8.3 同例2.6.1相似求limn??n1??n?1?解:令an??,则 1????nn?n?nnn. n! 12
n?1??213243 a1?a2????an?1?22?33????nn
n =所以
?n?1?n!nnn?n?1???. n!nnn na1?a2????an?也即nnn?1, ?nnn!nn,而由定理1.2.4(2)知 ?na1?a2????an?n?1n!n?1?na?a????a?lima?lim1? lim12nn???e. n??n??n??n??故
limn??nnnn?limna1?a2????an??e?lim?e. n??n??n?1n?1n!1?2?33?...?nn例2.8.3 求lim. n??n解:令an?nn,?n?1,2,3...?,则由定理1.2.4(1)知
1?2?33?...?nn?liman?limnn?1. limn??n??n??n2.9 级数法
若一个级数收敛,其通项趋于0(n?0),我们可以应用级数的一些性质来求数列极限,我们来看两个实例来领会其数学思想.
cn例2.9.1 用级数法求例2.1.3注lim?c?0?. n??n!cn解:考虑级数?,由正项级数的比式判别法,因
n! 13
cn?1cnc/?lim?0?1, limn???n?1?!n!n??n?1cncn?0?c?0?. 故级数?收敛,从而limn??n!n!nk例2.9.2 用级数法求例2.3.3,即设a?1及k?N,求lim. n??an*nk解:考虑正项级数?n,由正项级数的比式判别法,因
a n???n?1?liman?1knk1?n?1?1/n?lim????1, ?n??aa?n?aknknk?0. 故正项级数?n收敛,所以limn??ana?111?例2.9.3 求极限lim?2?. ?...?22?n??n?n?1??2n?????解: 因级数?1收敛,由级数收敛的柯西准则知,对???0,存在N?0, 2n?1n?使得当n?N时,
1n?11 ?2??2??,
k?1kk?1k2n此即
111??...???, 222n?n?1??2n?所以
?111? lim?2??...??0. 22?n??n?n?1??2n??????例2.9.4 求极限lim??n??1?a2n??...???a?1?. a2an??1解:令x?,所以x?1.考虑级数 ?nxn,
an?1 14
n?1?x?an?1?lim因为limn??an??nxnn?nn?1?x?1,所以此级数收敛.
??令 s?x???nx,则s?x??x??nxn?1n?1n?1.再令f?x???nxn?1,
n?1?x0f?t?dt???ntn?10?xn?1dt??xn?n?1?x. 1?x所以
1?x?? f?x???. ??2?1?x??1?x?而 s?x??x?f?x??所以
x?1?x?2?a?1?1?a??12,
n?a?1?12 lim??2?...?n??s?x??. 2n??a?1aa???1?a?2.10 其它方法
除去上述求数列极限的方法外,针对不同的题型可能还有不同的方法,我们可以再看几个例子. 例2.10.1 求limsin2?n2?n.
n??解:对于这个数列极限可用三角函数的周期性. limsin2?n2?n?limsin2?n2?n?n?
n??n??2 =limsinn????????n?n?n?n2?limsin2n???1?1?1n
=sin2?2?1.
2ccan例2.10.2 设0?c?1,a1?,an?1??,
222 15