1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)

来源:学生作业帮助网 编辑:六六作业网 时间:2024/12/25 09:38:05
1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)1/(5×9)+

1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)
1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)

1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)
原式=1/4*(1/5-1/9+1/9-1/13+1/13-1/17+……+1/101-1/105)
可以发现,中间的全部可以抵消.
=1/4*(1/5-1/105)
=1/4*4/21
=1/21

1/(5×9)+1/(9×13)+1/(13×17)+⋯+1/(101×105)
=(1/4)*(1/5-1/9+1/9-1/13+....+1/101-1/105)
=(1/4)*(1/5-1/105)
=(1/4)*(20/105)
=1/21

上边是对的

首先观察一下,分母数字刚好是4为公差的等差数列,
1/5-1/9=(9-5)/(5×9)=4/(5×9)
1/9-1/13=(13-9)/(9×13)=4/(9×13)
...
1/101-1/105=(105-101)/(101×105)=4/(101×105)
所以:
原式=1/(5×9)+1/(9×13)+1/(13×17)+...+1/(10...

全部展开

首先观察一下,分母数字刚好是4为公差的等差数列,
1/5-1/9=(9-5)/(5×9)=4/(5×9)
1/9-1/13=(13-9)/(9×13)=4/(9×13)
...
1/101-1/105=(105-101)/(101×105)=4/(101×105)
所以:
原式=1/(5×9)+1/(9×13)+1/(13×17)+...+1/(101×105)
=(1/4)*[4/(5×9)+4/(9×13)+4/(13×17)+...+4/(101×105)]
=(1/4)*(1/5-1/9+1/9-1/13+1/13-1/17+...+1/101-1/105)
=(1/4)*(1/5-1/105)
=(1/4)*(4/21)
=1/21

收起