题目:
已知数列{an}满足a1=22,an+1-an=2n,则数列{an}的通项公式为______,
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答案:
由an+1-an=2n得,
an=an-1+2(n-1)
=[an-2+2(n-2)]+2(n-1)
=an-3+2(n-3)+2(n-2)+2(n-1)
=…
=a1+2×1+2×2+…+2(n-1)
=22+2×[1+(n-1)](n-1) 2
=n2-n+22.
所以
=n+an n
-122 n
≥2
-1,等号成立时n=n• 22 n
⇒n=22 n
,22
又因为n为正整数,故n=5,
此时
=5+an n
-1=22 5
.42 5
故答案为:n2-n+22,
.42 5
