题目内容
已知正项数列{an}的前n项和为Sn,
是
与(an+1)2的等比中项.
(1)求证:数列{an}是等差数列;
(2)若b1=a1,且bn=2bn-1+3,求数列{bn}的通项公式.
| Sn |
| 1 |
| 4 |
(1)求证:数列{an}是等差数列;
(2)若b1=a1,且bn=2bn-1+3,求数列{bn}的通项公式.
分析:(1)要证明数列{an}为等差数列,需证明an-an-1=d,由已知条件可得(an-an-1-2)(an+an-1)=0,即可得出结论;
(2)证明数列{bn+3}是以4为首项,2为公比的等比数列,即可求数列{bn}的通项公式.
(2)证明数列{bn+3}是以4为首项,2为公比的等比数列,即可求数列{bn}的通项公式.
解答:(1)证明:∵
是
与(an+1)2的等比中项,
∴Sn=
(an+1)2,
∴n≥2时,Sn-1=
(an-1+1)2,
两式相减可得an=
(an+1)2-
(an-1+1)2,
化简可得(an-an-1-2)(an+an-1)=0,
∵an+an-1>0,
∴an-an-1=2,
∵S1=
(a1+1)2,∴a1=1,
∴数列{an}以1为首项,以2为公差的等差数列;
(2)解:∵bn=2bn-1+3,
∴bn+3=2(bn-1+3),
∵b1=a1=1,∴b1+3=4,
∴数列{bn+3}是以4为首项,2为公比的等比数列,
∴bn+3=4•2n-1=2n+1,
∴bn=2n+1-3.
| Sn |
| 1 |
| 4 |
∴Sn=
| 1 |
| 4 |
∴n≥2时,Sn-1=
| 1 |
| 4 |
两式相减可得an=
| 1 |
| 4 |
| 1 |
| 4 |
化简可得(an-an-1-2)(an+an-1)=0,
∵an+an-1>0,
∴an-an-1=2,
∵S1=
| 1 |
| 4 |
∴数列{an}以1为首项,以2为公差的等差数列;
(2)解:∵bn=2bn-1+3,
∴bn+3=2(bn-1+3),
∵b1=a1=1,∴b1+3=4,
∴数列{bn+3}是以4为首项,2为公比的等比数列,
∴bn+3=4•2n-1=2n+1,
∴bn=2n+1-3.
点评:本题考查等差数列、等比数列的证明,考查学生的计算能力,求解的关键是要把握递推公式的转化.
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