n=1
8a1=(a1+2)^2
(a1)^2-4a1+4=0
a1=2
8S(n-1)=(a(n-1)+2)^2 (2)
(1)-(2)
8an=(an+2)^2 -(a(n-1)+2)^2
(an)^2- [a(n-1)]^2 - 4[an+a(n-1)] =0
[an+a(n-1)] .[an-a(n-1)-4]=0
an-a(n-1)-4=0
an-a1=4(n-1)
an =4n-2= 2(2n-1)
bn=4/[an.a(n+1)]
=1/[(2n-1)(2n+1)]
= (1/2)[ 1/(2n-1)- 1/(2n+1) ]
Tn=b1+b2+...+bn
=(1/2)[ 1- 1/(2n+1)]
Tn同学,嗯,我疑问的地方还没给我解释,最后的那部分,前面我都懂bn=4/[an.a(n+1)]
=1/[(2n-1)(2n+1)]
= (1/2)[ 1/(2n-1)- 1/(2n+1) ]
Tn=b1+b2+...+bn
=(1/2)[ 1- 1/(2n+1)]
max Tn =1/2
Tn
min m=10