题目内容
求下列数列的前n项和Sn:
(1)a,2a2,3a3,…,nan,…;
(2)1×3,2×4,3×5,4×6,…
(1)a,2a2,3a3,…,nan,…;
(2)1×3,2×4,3×5,4×6,…
分析:(1)分a=1,a≠1两种情况求解,当a=1时为等差数列易求;当a≠1时利用错位相减法即可求得;
(2)其通项为an=n(n+2)=n2+2n,根据通项对数列各项进行分组求和,再运用公式即可求得;
(2)其通项为an=n(n+2)=n2+2n,根据通项对数列各项进行分组求和,再运用公式即可求得;
解答:解:(1)当a=1时,Sn=1+2+3+…+n=
;
当a≠1时,Sn=a+2a2+3a3+…+nan,①
aSn=a2+2a3+3a4+…+nan+1,②
①-②得,(1-a)Sn=a+a2+a3+a4+…+an-nan+1=
-nan+1,
所以Sn=
-
.
所以当a=1时,Sn=
;当a≠1时,Sn=
-
.
(2)数列通项an=n(n+2)=n2+2n,
则Sn=1×3+2×4+3×5+4×6+…+n(n+2)
=(12+2×1)+(22+2×2)+(32+2×3)+(42+2×4)+…+(n2+2n)
=(12+22+32+…+n2)+2(1+2+3+4+…+n)
=
+2×
=n2+n.
| n(n+1) |
| 2 |
当a≠1时,Sn=a+2a2+3a3+…+nan,①
aSn=a2+2a3+3a4+…+nan+1,②
①-②得,(1-a)Sn=a+a2+a3+a4+…+an-nan+1=
| a(1-an) |
| 1-a |
所以Sn=
| a(1-an) |
| (1-a)2 |
| nan+1 |
| 1-a |
所以当a=1时,Sn=
| n(n+1) |
| 2 |
| a(1-an) |
| (1-a)2 |
| nan+1 |
| 1-a |
(2)数列通项an=n(n+2)=n2+2n,
则Sn=1×3+2×4+3×5+4×6+…+n(n+2)
=(12+2×1)+(22+2×2)+(32+2×3)+(42+2×4)+…+(n2+2n)
=(12+22+32+…+n2)+2(1+2+3+4+…+n)
=
| n(n+1)(2n+1) |
| 6 |
| n(n+1) |
| 2 |
点评:本题主要考查等差、等比数列的求和公式,考查错位相减法、分组求和法,属中档题,熟记相关方法及有关公式是解决该类问题的基础.
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