(1)当α=1时,an+1=f(an)=,两边取倒数,得-=1,----(2分)
故数列{}是以=2为首项,1为公差的等差数列,=n+1,an=,n∈N*.--------------(4分)
(2)证法1:由(1)知an=,故对k=1,2,3…akak+1ak+2==[-]-------------(6分)
∴a1a2a3+a2a3a4+…+anan+1an+2
=[(-)+(-)+…+-]
=[-]=.------------------------------(9分).
[证法2:①当n=1时,等式左边==,
等式右边==,左边=右边,等式成立;-------------------------(5分)
②假设当n=k(k≥1)时等式成立,
即a1a2a3+a2a3a4+…+akak+1ak+2=,
则当n=k+1时a1a2a3+a2a3a4+…+akak+1ak+2+ak+1ak+2ak+3=+
=| k(k+5)(k+4)+12 |
| 12(k+2)(k+3)(k+4) |
=| k3+9k2+20k+12 |
| 12(k+2)(k+3)(k+4) |
=| k2(k+1)+4(k+1)(2k+3) |
| 12(k+2)(k+3)(k+4) |
=| (k+1)(k+2)(k+6) |
| 12(k+2)(k+3)(k+4) |
=| (k+1)[(k+1)+5] |
| 12[(k+1)+2][(k+1)+3] |
这就是说当n=k+1时,等式成立,----------------------------------------(8分)
综①②知对于∀n∈N*有:a1a2a3+a2a3a4+…+anan+1an+2=.----(9分)]
(3)当α=2时,an+1=f(an)=则an+1-an=-an=an(1-an),-------------------(10分)
∵0<an<1,
∴an+1-an=an(1-an)≤()2•--------------------------------(11分)=•=•≤•=.--------------------(13分)
∵an=1-an与an+1=不能同时成立,∴上式“=”不成立,
即对∀n∈N*,an+1-an<.-----------------------------------------------------------(14分)
证法二:当α=2时,an+1=f(an)=,
则an+1-an=-an=----------------------------------------------------(10分)
又0<an<1,∴=>1,
∴an+1>an,∴an∈[,1),n∈N*------------------------------------------------(11分)
令g(x)=,x∈[,1),则g′(x)=,--------------------------(12分)
当x∈[,1),g′(x)<0,所以函数g(x)在[,1)单调递减,故当x∈[,1),g(x)≤=<,所以命题得证------------------(14分)
所以命题得证-----------------------------------------(14分)
