题目:
| 设等比数列{an}的前n项和为Sn,已知an+1=2Sn +2(n∈N*) (I)求数列{an}的通项公式; (Ⅱ)在an与an+1之间插人n个数,使这n+2个数组成公差为dn的等差数列,求数列{
|
答案:
(I)由an+1=2Sn +2(n∈N*)可得an=2sn-1+2(n≥2)
两式相减可得,an+1-an=2an
即an+1=3an(n≥2)
又∵a2=2a1+2,且数列{an}为等比数列
∴a2=3a1
则2a1+2=3a1
∴a1=2
∴an=2•3n-1
(II)由(I)知,an=2•3n-1,an+1=2•3n
∵an+1=an+(n+1)dn
∴dn=
=an+1-an n+1 4×3n-1 n+1
Tn=
+2 4•30
+3 4•31
+…+4 4•32 n+1 4•3n-1
Tn=1 3
+2 4•31
+…+3 4•32
+n 4•3n-1 n+1 4•3n
两式相减可得,
Tn=2 3
+2 4•30
+1 4•3
+…+1 4•32
-1 4•3n-1 n+1 4•3n
=
+1 2
×1 4
-
(1-1 3
)1 3n-1 1- 1 3 n+1 4•3n
=
-5 8 2n+5 8•3n
Tn=
-15 16 2n+5 16•3n-1
