高三 数学 数列。。急！！！ 请详细解答,谢谢! (6 11:54:22)

Sn=2^n+p
S(n-1)=2^(n-1)+p
an=Sn-S(n-1)=2^n - 2^(n-1) =2^(n-1)
a1=2^(1-1)=1
an=a1 * q^(n-1)=q^(n-1)=2^(n-1) ==> q=2

Sn=a1*(1-q^n)/(1-q)=2^n-1 = 2^n +p
==> p=-1

bn=log 2 an=n-1

Tn= b1^2-b2^2 + b3^2 - b4^2 + ...+ bn^2 * (-1)^(n+1)

n为偶数时 b(n-1)^2 - bn^2 = 3-2n
b1^2 - b2^2= 3 - 2*2
b3^2 - b4^2= 3 - 2*3
...
b(n-1)^2 - bn^2 = 3-2*n
2 边相加
Tn= 3*(n/2) - 2* (n/2) * (n+2)/2
=n(1-n)/2
n为奇数时
T(n+1)=n(1-n)/2 + b(n+1)^2
=n*(n+1)/2
Tn=(n-1)*((n-1)+1)/2
=n*(n-1)/2

a1 = S1 = 2 + p ，a2 = S2 - S1 = 4 + p - (2 + p) = 2 ，a3 = S3 - S2 = 8 + p - (4 + p) = 4 ，公比q = a3/a2 = 2 = a2/a1 ，∴易得q = 0 ，∴an = 2·q^(n-1) = 2^n ，∴bn = log2an = n 。
n是偶数时：
Tn = (b1^2 + b2^2 + b3^2 +···+ b(n-1)^2) - [b2^2 + b4^2 +···+ bn^2] = [n(n-1)(2n-1)/6] - [b2^2 + b4^2 +···+ bn^2] = [n(n-1)(2n-1)/6] - 2·[1^2 + 2^2 + 3^2 +···+ (n/2)^2] = [n(n-1)(2n