题目内容
设等差数列{an}的公差为d,d>0,数列{bn}是公比为q等比数列,且b1=a1>0.(1)若a3=b3,a7=b5,探究使得an=bm成立时n与m的关系;
(2)若a2=b2,求证:当n>2时,an<bn.
分析:(1)记a1=b1=a,由已知条件得
,解得a=2d,q=
,由此可以推出an=bm.
(2)由题意知q=
=
=
=1+
>1,所以,an-bn=a+(n-1)d-aqn-1,由此能够推导出当n>2时,an<bn.
|
| 2 |
(2)由题意知q=
| b2 |
| b1 |
| a2 |
| a1 |
| a+d |
| a |
| d |
| a |
解答:解:(1)设a1=b1=a,(由已知得
,a=2d,q=
,由题设条件知,an=bm.
则a+(n-1)d=aqm-1,即2d+(n-1)d=2d(
)m-1,所以n+1=(
)m+1.
(2)因为d>0,a>0,所以q=
=
=
=1+
>1,(11分)
n>2时,an-bn=a+(n-1)d-aqn-1=a(1-qn-1)-(n-1)d
=a(1-q)(1+q+q2++qn-2)+(n-1)d<a(1-q)(n-1)+(n-1)d
=((n-1)[a(1-q)+d]=(n-1)(a2-b2)=0
所以,当n>2时,an<bn.
|
| 2 |
则a+(n-1)d=aqm-1,即2d+(n-1)d=2d(
| 2 |
| 2 |
(2)因为d>0,a>0,所以q=
| b2 |
| b1 |
| a2 |
| a1 |
| a+d |
| a |
| d |
| a |
n>2时,an-bn=a+(n-1)d-aqn-1=a(1-qn-1)-(n-1)d
=a(1-q)(1+q+q2++qn-2)+(n-1)d<a(1-q)(n-1)+(n-1)d
=((n-1)[a(1-q)+d]=(n-1)(a2-b2)=0
所以,当n>2时,an<bn.
点评:本题考查数列的性质和应用,解题时要认真审题.
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