题文
若f(n)=1+2+3+…+n(n∈N*),则limn→+∞f(n2)[f(n)]2=______. 题型:未知 难度:其他题型答案
由题意,f(n)=1+2+3+…+n=n(n+1)2∴f(n2)[f(n)]2=n2(n2+1)2n2(n+1)24=2(n2+1)n2+2n+1=2(1+1n2)1+2n+1n2
∴limn→+∞f(n2)[f(n)]2=2
故答案为2
解析
n(n+1)2考点
据考高分专家说,试题“若f(n)=1+2+3+…+n(n∈N*.....”主要考查你对 [数列的极限 ]考点的理解。 数列的极限数列的极限定义(描述性的):
如果当项数n无限增大时,无穷数列![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Frw_dzXzM4ytXplRMp09ESZSI4SD.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
的项an无限地趋近于某个常数a(即![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FrxXe8xA7-melnVYoWewx3QfR5F7.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
无限地接近于0),a叫数列
的极限,记作![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FlFf8nXq5VVVlBF_RlglWxuM5m8S.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
,也可记做当n→+∞时,an→a。
数列的极限严格定义:
即ε-N定义:对于任何正数ε(不论它多么小),总存在某正数N,使得当n>N时,一切an都满足![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FvfsML0W2-_Jvv1MOcps3Oe4Gt-5.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
,a叫数列
的极限。
数列极限的四则运算法则:
若![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fkdq3t9uwjLN2Ra_s-_LALXxwVar.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
,则
(1)![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fia-ZT9kNQPajp6W3d0tfucDhHtH.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FjN-7yntWD0No_lJp9UGfqf38nt7.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;
(2)![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FjN_D7gtoaswtg5cS8bY6_dUskK7.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FhxKTiBIfqQTosa3Q7gMBn1qaW65.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;
(3)![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FlwPfRFmQir5g1cLSwOoPr_FuzTp.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
。
前提条件:(1)各数列均有极限,(2)相加减时必须是有限个数列才能用法则。
an无限接近于a的方式有三种:
第一种是递增的数列,an无限接近于a,即an是在常数a的左边无限地趋近于a,如n→+∞时,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FpfyA2yqdQxPdE-0y56yhvalUZsm.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;
第二种是递减数列,an无限地趋近于a,即an是在常数a的右边无限地趋近于a,如n→+∞时,是![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FuC3PLh8t7vWLg6Y0xet4TOvK1B9.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;
第三种是摆动数列,an无限地趋近于a,即an是在无限摆动的过程中无限地趋近于a,如n→+∞时,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FgNG7T2utEaFbxeif8GSWkXyN5LF.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
。
一些常用数列的极限:
(1)常数列A,A,A,…的极限是A;
(2)当![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fi8rZ5-0FQRawTarQWwQFZvTjt9f.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
时,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FnyvNSab7WfGO-2zjR4eoeUKHiue.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;
(3)当|q|<1时,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FiJcIQXXrcJK1YNBhLNt5iVoemuw.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
;当q>1时,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fv0bhVFliUL641ntGL7WfEwL_nBW.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
不存在;
(4)![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/FnLohlfa17cRFDokmXh0IV4R0Ynq.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
不存在,![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fmrsl4MgdF4sS6JM7kvWz22txIsK.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
。
(5)无穷等比数列{an}中,首项a1,公比q,前n项和Sn,各项之和S,则![若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.](https://www.mshxw.com/file/tupian/20210920/Fr29_x2LjOcroaqh0hOILSn4kZkd.gif "若f=1+2+3+…+n,则limn→+∞f(n2)[f(n)]2=______.")
(只有在0<|q|<1时)。
