纵向求和
竖着的一列,求和,除了接口的合计,还有excel的求和公式,用值变化怎么实现data:image/png;base64,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
这位云友,明细可不兴用值变化啊,同时执行行数多了慢得很。。。
值变化实现的话,添加明细的数据项,然后对合计进行赋值。
例如:合计数量=本表单.合计数量 - 本表单.明细.数量旧值 + 本表单.明细.数量
然后来个赋值公式本表单.明细.数量旧值 = 本表单.明细.数量
页:
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