等比数列{an}的前n项和为Sn,已知对任意(n属于正整数),
点(n,Sn)均在函数y=(2的x次方)-1的图像上,记bn=(n+1)/4an,求{bn}的前n项和...
点(n,Sn)均在函数y=(2的x次方)-1的图像上,记bn=(n+1)/4an,求{bn}的前n项和
展开
2个回答
展开全部
点(n,Sn)均在函数y=(2的x次方)-1的图像上
则Sn=2^n-1,所以a1=S1=1,S(n-1)=2^(n-1)-1
an=Sn-S(n-1)
=2^n-1-[2^(n-1)-1]
=2^(n-1)
bn=(n+1)/(4an)=(n+1)/[4*2^(n-1)]
=(n+1)/[2^(n+1)]
其前n项和Tn= 2/2^2+3/2^3+4/2^4+5/2^5+……+n/2^n+(n+1)/[2^(n+1)]
2Tn=2/2+3/2^2+4/2^3+5/2^4+…… +(n+1)/2^n
后式减去前式得
Tn=1/2+[1/2+1/2^2+1/2^3+1/2^4+……+1/2^n]-(n+1)/[2^(n+1)]
=1/2+1/2(1-1/2^n)/(1-1/2)-(n+1)/[2^(n+1)]
=1/2+1-1/2^n-(n+1)/[2^(n+1)]
=3/2-(n+3)/2^(n+1)
则Sn=2^n-1,所以a1=S1=1,S(n-1)=2^(n-1)-1
an=Sn-S(n-1)
=2^n-1-[2^(n-1)-1]
=2^(n-1)
bn=(n+1)/(4an)=(n+1)/[4*2^(n-1)]
=(n+1)/[2^(n+1)]
其前n项和Tn= 2/2^2+3/2^3+4/2^4+5/2^5+……+n/2^n+(n+1)/[2^(n+1)]
2Tn=2/2+3/2^2+4/2^3+5/2^4+…… +(n+1)/2^n
后式减去前式得
Tn=1/2+[1/2+1/2^2+1/2^3+1/2^4+……+1/2^n]-(n+1)/[2^(n+1)]
=1/2+1/2(1-1/2^n)/(1-1/2)-(n+1)/[2^(n+1)]
=1/2+1-1/2^n-(n+1)/[2^(n+1)]
=3/2-(n+3)/2^(n+1)
本回答由提问者推荐
已赞过
已踩过<
你对这个回答的评价是?
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
