神马作文网{An},A1=1 A [n+1]=An+2n+1 求{an}通项式?
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{An},A1=1 A [n+1]=An+2n+1 求{an}通项式?
A [n+1]=An+2n+1 是 A [n+1]=An+2n-1 打错了
A [n+1]=An+2n+1 是 A [n+1]=An+2n-1 打错了
![{An},A1=1 A [n+1]=An+2n+1 求{an}通项式?](/uploads/image/z/15504771-3-1.jpg?t=%7BAn%7D%2CA1%3D1+A+%5Bn%2B1%5D%3DAn%2B2n%2B1+%E6%B1%82%7Ban%7D%E9%80%9A%E9%A1%B9%E5%BC%8F%3F)
那么根据题中条件有:
方法一:a1=1
a2=a1 + 2×1 - 1
a3=a2 + 2×2 - 1
……
an=a(n-1) + 2×(n-1)-1 . (n≥2)
上面各式两端分别相加得:
S(n)=1 + S(n-1) + 2×[1+2+3…+(n-1)] - (n-1)
则 an=S(n)-S(n-1)=1 + 2×[1+2+3…+(n-1)] - (n-1)= n^2 - 2n + 2 .
即 an=n^2 - 2n + 2 .
经检验,a1=1 也满足此通项式.
方法二:an+1-an=2n-1
an-an-1=2n-3
.
.
.
a3-a2=3
a2-a1=1
将上面式子左右分别相加,得
an+1-a1=n^2
an+1=n^2+1
则通项公式an=(n-1)^2+1=n^2 - 2n + 2
方法一:a1=1
a2=a1 + 2×1 - 1
a3=a2 + 2×2 - 1
……
an=a(n-1) + 2×(n-1)-1 . (n≥2)
上面各式两端分别相加得:
S(n)=1 + S(n-1) + 2×[1+2+3…+(n-1)] - (n-1)
则 an=S(n)-S(n-1)=1 + 2×[1+2+3…+(n-1)] - (n-1)= n^2 - 2n + 2 .
即 an=n^2 - 2n + 2 .
经检验,a1=1 也满足此通项式.
方法二:an+1-an=2n-1
an-an-1=2n-3
.
.
.
a3-a2=3
a2-a1=1
将上面式子左右分别相加,得
an+1-a1=n^2
an+1=n^2+1
则通项公式an=(n-1)^2+1=n^2 - 2n + 2
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