证明0.0999<1/10"+1/11"+1/12"+.+1/1000"<0.111证明:0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000)]<0.111

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证明0.0999<1/10"+1/11"+1/12"+.+1/1000"<0.111证明:0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000

证明0.0999<1/10"+1/11"+1/12"+.+1/1000"<0.111证明:0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000)]<0.111
证明0.0999<1/10"+1/11"+1/12"+.+1/1000"<0.111
证明:0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000)]<0.111

证明0.0999<1/10"+1/11"+1/12"+.+1/1000"<0.111证明:0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000)]<0.111
[1/(10x10)+1/(11x11)+1/(12x12)+.+1(1000x1000)]>[1/(10x11)+1/(11x12)+1/(12x13)+.+1(1000x1001)]=(1/10)-(1/11)+(1/11)-(1/12)+.+(1/1000)-(1/1001)=
(1/10)-(1/1001)=0.099
[1/(10x10)+1/(11x11)+1/(12x12)+.+1(1000x1000)]

"什么意思啊

应该利用以下两式:
1/[(n(n+1)] < 1/n^2 < 1/[(n-1)n]
1/[n(n+1)] = 1/n - 1/(n+1)
则原式 > 1/(10x11)+1/(11x12)+1/(12x13)+.....+1/(1000x1001)
= 1/10 - 1/1001 = 0.099000999000999...
原式 < 1/(9x...

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应该利用以下两式:
1/[(n(n+1)] < 1/n^2 < 1/[(n-1)n]
1/[n(n+1)] = 1/n - 1/(n+1)
则原式 > 1/(10x11)+1/(11x12)+1/(12x13)+.....+1/(1000x1001)
= 1/10 - 1/1001 = 0.099000999000999...
原式 < 1/(9x10)+1/(10x11)+1/(11x12)+.....+1/(999x1000)
= 1/9 - 1/1000 = 0.110111111111..< 0.111
以上可以证明原式< 0.111,但还不能证明原式 > 0.0999.所以要考虑更精确的.先把头尾两项去掉,求出剩余的取值范围,再把头尾两项加回.
1/(11x11)+1/(12x12)+....+1/(999x999) > 1/(11x12)+1/(12x13)+....+1/(999x1000) = 1/11 - 1/1000 = 989 /11000
则有: 1/(11x11)+1/(12x12)+....+1/(999x999) > 989 /11000
把头尾两项加上得:
原式 > 989 /11000 + 1/(10x10) + 1(1000x1000) =
0.099910090909>0.0999
所以, 0.0999<[1/(10x10)+1/(11x11)+1/(12x12)+.....+1(1000x1000)]<0.111

收起

这是一个很简单的数学公式而已啊