已知数列{an}中,a1=1,a1+2a2+3a3+...+nan=(n+1)(an)/2 +1(n∈正整数)(1)求数列{an}的通项公式an
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a1+2a2+3a3+...+nan=(n+1)(an)/2 (1)
a1+2a2+3a3+...+nan+ (n+1)a(n+1)=(n+2)a(n+1)/2 (2)
(2)-(1)
(n+1)a(n+1) = (1/2)[ (n+2)a(n+1) -(n+1)an ]
na(n+1) = -(n+1)an
a(n+1)/an = - (n+1)n
an/a(n-1) = - n/(n-1)
an/a1 = (-1)^(n-1) . n
an=(-1)^(n-1) . n
a1+2a2+3a3+...+nan+ (n+1)a(n+1)=(n+2)a(n+1)/2 (2)
(2)-(1)
(n+1)a(n+1) = (1/2)[ (n+2)a(n+1) -(n+1)an ]
na(n+1) = -(n+1)an
a(n+1)/an = - (n+1)n
an/a(n-1) = - n/(n-1)
an/a1 = (-1)^(n-1) . n
an=(-1)^(n-1) . n
追问
(1)求数列{an}的通项公式an
(2)求数列{n²an}的前n项和Tn
(3)若存在n∈正整数,使得an≤(n+1)x,求实数x的最小值
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