计算 lim n^2[(k/n - 1/(n+1) - 1/(n+2) - 1/(n+3)-… -1/(n+k)] n→∞
热心网友
Sn=n^2*[k/n-1/(n+1)-1/(n+2)-1/(n+3)-......-1/(n+k)]=n^2*{[1/n-1/(n+1)]+[1/n-1/(n+2)]+[1/n-1/(n+3)]+......+[1/n-1/(n+k)]}=n^2*{1/[n(n+1)]+2/[n(n+1)]+3/[n(n+3)]+......+k/[n(n+k)]}=n/(n+1)+2n/(n+2)+3n/(n+3)+......+kn/(n+k)n→+∞:limSn=1+2+3+......+k=k(k+1)/2.说明:k是常量,不跟随n的变化而变化。 刚才那个解答已经被“超过10000字”的错判毁灭,现在究竟如何,将拭目以待。
热心网友
中括号里面把k/n分成n个1/n1/n - 1/(n+1) = 1/n(n+1)1/n - 1/(n+2) = 2/n(n+2)...1/n - 1/(n+k) = k/n(n+k)n^2乘进去,每一项的极限分别为1, 2, ... k则结果为k(k+1)/2