an=n²+n=n(n+1)
1/an=1/[n(n+1)]=1/n -1/(n+1)
Sn=1/a1+1/a2+...+1/an=1/1-1/2+1/2-1/3+...+1/n-1/(n+1)=1- 1/(n+1)=n/(n+1)
bn=n-33 Sn=n/(n+1)
bnSn=(n-33)n/(n+1)
=(n²-33n)/(n+1)
=(n²+n-34n-34+34)/(n+1)
=[n(n+1)-34(n+1)+34]/(n+1)
=n +34/(n+1) -34
=(n+1)+34/(n+1) -35
由均值不等式得(n+1)+34/(n+1)≥2√34,当且仅当n=√34-1时取等号,又n为正整数,n=5时
(n+1)+34/(n+1)有最小值35/3,此时bnSn有最小值(bnSn)min=35/3 -35=-70/3
觉得不太对劲啊。。。你确定题是这样???
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