Minitab 的排列图,如何才能在累积线上显示出累计百分比?
data:image/png;base64,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Minitab 我用的是的排列图,累积线上,需要显示累积百分比,哪位高手能告诉我,怎么显示出来?
这么多人,没人知道解决办法吗? 自动的好像没有这个选项,只有坐标下面有一行累计百分比。要再累计线上显示,可以手工做,数据表中加一列累计百分比,柏拉图做出来后,右键-添加-数据标签-使用右列值作标签,选择累计百分比那一列就好了
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