a1=2
Sn=4/3an-(1/3)*(2^(n+1))+2/3,
Sn-1=4/3a（n-1）-(1/3)*(2^n)+2/3,
相減得
an=4/3an-4/3a（n-1）-(1/3)*(2^n)
an=4a(n-1)+2^n
4an-1=4^2*a(n-2)+4*2^(n-1)
...
4^(n-2)a2=4^(n-1)*a1+4^(n-2)*2^2
以上疊加
an=4^(n-1)*a1+2^n+4*2^(n-1)+...+4^(n-2)*2^2
=2^(2n-1)+2^n*[2^（n-1）-1]
=2^(2n)-2^n
2)設(shè)Tn=(2^n)/Sn
Sn=4/3[2^(2n)-2^n]-(1/3)*(2^(n+1))+2/3
=4/3*2^(2n)-2^(n+1)+2/3
Tn=(2^n)/Sn
=1/[4/3*2^n-2+2/(3*2^n)]
=3/2*【1/（2^(n+1)+1/2^n-3）】
Tn<3/2n
放縮T1+T2+T3+…Tn