定义了交叉表 但是想做个小计 为什么公式总是不计算呢
定义了交叉表 但是想做个小计 为什么公式总是不计算呢这个我遇到过。表格触发公式的方式我使用有两种:
1.Excel表格直接输入公式。这个方式需要事先将参与计算的数据项定义在主表中才能触发,如果是定义在明细表中如你发的图所示,是不能触发计算的。
2.使用平台的值变化功能-赋值公式。这个方式可以将定义在明细表或者主表的数据项都进行计算。就是定义比较繁琐。
个人踩坑经验分享,求采纳。 我在统计交叉表时,用的是接口统计,你的接口就应该有支行、网点的归属,支行的合计,分别赋值,像你的所有营业点和支行都在左侧一栏列表里有点困难,有一个思路是按支行不同,多次运行行交叉表。data:image/png;base64,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,或者用数据字典作接口,两个字段,支行+营业点,最后添加一个支行+支行,这样就能实现左侧列表有支行合计,但这样会有当营业点没有数据时也存在,不知用清空没有匹配上的这个有没有用 交叉表下方和合计不能用excel公式,得用填表公式取数计算
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