查人人中国名人网南京本科大学:请用数学归纳法证明:
来源:百度文库 编辑:查人人中国名人网 时间:2024/05/02 08:56:58
1/n+1/(n+1)+……+1/(2n^2)>=3/2
n=1时,显然成立.
n=k时,1/n+1/(n+1)+……+1/(2n^2)>=3/2
n=k+1时,1/(n+1)+1/(n+2)+...+1/(2(n+1)^2)-(1/n+1/(n+1)+……+1/(2n^2))=(1/((2n)^2+1)+...+1/(2(n+1)^2))-1/(n+1)=(1/((2n)^2+1)+...+1/(2(n+1)^2))-(4n+1)/(n+1)(4n+1)=(1/((2n)^2+1)-(4n+1)/(n+1)(4n+1))+...+(1/(2(n+1)^2)-(4n+1)/(n+1)(4n+1))>0
所以1/(n+1)+1/(n+2)+...+1/(2(n+1)^2)-(1/n+1/(n+1)>=3/2