已知{an}是各项均为正数的等比数列且a1+a2=2(1/a1+1/a2),a3+a4+a5=64(1/a3+1/a4+1/a5)
问题描述:
已知{an}是各项均为正数的等比数列且a1+a2=2(1/a1+1/a2),a3+a4+a5=64(1/a3+1/a4+1/a5)
1)求{an}的通项公式
2)设{bn}=(an+1/an)^2,求数列{bn}的前n项和Tn
请教步骤
答
1) 设 a1 = x,比值为 q
x + xq = 2(1/x + 1/(xq))
xq^2 + xq^3 + xq^4 = 64(1/(xq^2) + 1/(xq^3) + 1/(xq^4))
q=2
x=1
an = 2^(n -1)
2) bn = (2^(n-1) + 2^(1-n)) ^2
= 2^(2n-2) + 2 + 2^(2-2n)
Tn = (1-2^(2n))/-3 + 2 + (1-2^(-2n))/(3/4)
= (2^(2n) - 2^(-2n+2) ) /3 +3