已知数列an满足a1+a2+…+an=n2(n∈N*).(1)求数列an的通项公式;(2)对任意给定的k∈N*,是否存在p
(1)当n=1时,a1=1;
当n≥2,n∈N*时,a1+a2++an-1=(n-1)2,
所以an=n2-(n-1)2=2n-1;
综上所述,an=2n-1(n∈N*).(3分)
(2)当k=1时,若存在p,r使
| 1 |
| ak |
| 1 |
| ap |
| 1 |
| ar |
| 1 |
| ar |
| 2 |
| ap |
| 1 |
| ak |
| 3?2p |
| 2p?1 |
因为p≥2,所以ar<0,与数列an为正数相矛盾,因此,当k=1时不存在;(5分)
当k≥2时,设ak=x,ap=y,ar=z,则
| 1 |
| x |
| 1 |
| z |
| 2 |
| y |
| xy |
| 2x?y |
令y=2x-1,得z=xy=x(2x-1),此时ak=x=2k-1,ap=y=2x-1=2(2k-1)-1,
所以p=2k-1,ar=z=(2k-1)(4k-3)=2(4k2-5k+2)-1,所以r=4k2-5k+2;
综上所述,当k=1时,不存在p,r;
当k≥2时,存在p=2k-1,r=4k2-5k+2满足题设.(10分)
(3)作如下构造:an1=(2k+3)2,?an2=(2k+3)(2k+5),an3=(2k+5)2,其中k∈N*,
它们依次为数列an中的第2k2+6k+5项,第2k2+8k+8项,第2k2+10k+13项,(12分)
显然它们成等比数列,且an1<an2<an3,an1+an2>an3,所以它们能组成三角形.
由k∈N*的任意性,这样的三角形有无穷多个.(14分)
下面用反证法证明其中任意两个三角形A1B1C1和A2B2C2不相似:
若三角形A1B1C1和A2B2C2相似,且k1≠k2,则
| (2k1+3)(2k1+5) |
| (2k1+3)2 |
| (2k2+3)(2k2+5) |
| (2k2+3)2 |
整理得
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