各项均匀为正数的数列﹛an﹜的前n项和为Sn,满足4Sn=a2(n+1)-4n-1,n属于N*,a2,a5,a14构成等比数列.an=2n-1 问证明:对一切正整数n有1/(a1a2)+1/(a2a3)+……+1/(ana(n+1))
来源:学生作业帮助网 编辑:六六作业网 时间:2025/02/03 07:21:39
各项均匀为正数的数列﹛an﹜的前n项和为Sn,满足4Sn=a2(n+1)-4n-1,n属于N*,a2,a5,a14构成等比数列.an=2n-1问证明:对一切正整数n有1/(a1a2)+1/(a2a3)
各项均匀为正数的数列﹛an﹜的前n项和为Sn,满足4Sn=a2(n+1)-4n-1,n属于N*,a2,a5,a14构成等比数列.an=2n-1 问证明:对一切正整数n有1/(a1a2)+1/(a2a3)+……+1/(ana(n+1))
各项均匀为正数的数列﹛an﹜的前n项和为Sn,满足4Sn=a2(n+1)-4n-1,n属于N*,a2,a5,a14构成等比数列.an=2n-1 问证明:对一切正整数n有1/(a1a2)+1/(a2a3)+……+1/(ana(n+1))
各项均匀为正数的数列﹛an﹜的前n项和为Sn,满足4Sn=a2(n+1)-4n-1,n属于N*,a2,a5,a14构成等比数列.an=2n-1 问证明:对一切正整数n有1/(a1a2)+1/(a2a3)+……+1/(ana(n+1))
这叫做:裂项法