lim(1/(n^3+1) + 4/(n^3+4)+...+n^2/(n^3+n^2)) n->∞计算机软件求解是1/3,
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lim(1/(n^3+1) + 4/(n^3+4)+...+n^2/(n^3+n^2)) n->∞计算机软件求解是1/3,
lim(1/(n^3+1) + 4/(n^3+4)+...+n^2/(n^3+n^2)) n->∞
计算机软件求解是1/3,
lim(1/(n^3+1) + 4/(n^3+4)+...+n^2/(n^3+n^2)) n->∞计算机软件求解是1/3,
用夹逼定理
1/(n³+n²)+2²/(n³+n²)+…+n²/(n³+n²)≤1/(n³+1)+2²/(n³+2²)+…+n²/(n³+n²)≤1/(n³+1)+2²/(n³+1)+…+n²/(n³+1)
(1+2²+…+n²)/(n³+n²)≤1/(n³+1)+2²/(n³+2²)+…+n²/(n³+n²)≤(1+2²+…n²)/(n³+n²)
n(n+1)(2n+1)/[6(n³+n²)]≤1/(n³+1)+2²/(n³+2²)+…+n²/(n³+n²)≤n(n+1)(2n+2)/[6(n³+n²)]
limn(n+1)(2n+1)/[6(n³+n²)]=1/3
limn(n+1)(2n+2)/[6(n³+n²)]=1/3
所以lim1/(n³+1)+2²/(n³+2²)+…+n²/(n³+n²)=1/3
无解
可以用两边夹法则:
因为
1^2/(n^3+1)+2^2/(n^3+2)+...+n^2/(n^3+n) (把分母放缩成n^3+1)
<=1^2/(n^3+1)+2^2/(n^3+1)+...+n^2/(n^3+1)
(利用1^2+...+n^2=1/6*n(n+1)(2n+1))
=[...
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可以用两边夹法则:
因为
1^2/(n^3+1)+2^2/(n^3+2)+...+n^2/(n^3+n) (把分母放缩成n^3+1)
<=1^2/(n^3+1)+2^2/(n^3+1)+...+n^2/(n^3+1)
(利用1^2+...+n^2=1/6*n(n+1)(2n+1))
=[1/6*n(n+1)(2n+1)]/(n^3+1) (1)
另一方面,
1^2/(n^3+1)+2^2/(n^3+2)+...+n^2/(n^3+n) (把分母放缩成n^3+n)
>=1^2/(n^3+n)+2^2/(n^3+n)+...+n^2/(n^3+n)
=[1/6*n(n+1)(2n+1)]/(n^3+n) (2)
注意到n趋于无穷时,(1)(2)两式的极限都是1/3, 所以原式的极限就是1/3.
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