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    • 在数列{an}中a1=0,an+1+an=n平方+2n求通项公式

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    第1个回答  推荐于2016-09-02
    a(n+1)+an=n^2+2n
    let
    a(n+1) + k1(n+1)^2+k2(n+1) + k3 = -( an + k1n^2+k2n+k3)
    coef. of n^2
    -2k1= 1
    k1 = -1/2

    coef. of n
    -2k2- 2k1 =2
    -2k2+1=2
    k2= -1/2

    coef. of constant
    -2k3-k1-k2=0
    -2k3+1/2+1/2=0
    k3= 1/2

    ie
    a(n+1) -(1/2)(n+1)^2-(1/2)(n+1) +1/2 = -( an -(1/2)n^2-(1/2)n+1/2 )
    =>{an -(1/2)n^2-(1/2)n+1/2} 是等比数列, q=-1
    an -(1/2)n^2-(1/2)n+1/2 = (-1)^(n-1) .(a1 -1/2-1/2+1/2)
    =(-1)^n .(1/2)
    an =(1/2)n^2+(1/2)n-1/2 +(-1)^n .(1/2)本回答被提问者采纳
    第2个回答  2014-10-14
    通向公式是什么,解释?
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