单元格值为零打印空白时的问题
页面或RDL单元格属性Visibility的Hidden设置为:=IIf(Fields!AmountFirstBal.Value=0,True),造成同一列行之间的线条消失:data:image/png;base64,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
我想保留“期初余额”列之间的行线改如何设置?
您好!
您能通过截图来展示你想描述的问题,我不是很清楚您想要具体实现的效果。 图片
问题收到!正在验证 是矩表控件 您好!
不好意思,您能把您的报表模板发给我发给我下嘛!我不知道报表的具体设计,没办法很好的还原你的问题然后去实现。 模板 本帖最后由 KearneyKang 于 2018-4-11 10:49 编辑
您好!您的意思是这样是吧,当单元格的值为0的时候想数据不显示,但是单元格的边线什么都要有,是这个意思嘛!
如果是这样,您可以通过表达式设置单元格字体的颜色来控制,当为0的时候字体颜色跟背景色一致,也就是您当前显示的颜色为白色 White,如果不为0就是黑色 black
是单元格Values属性的值里设置表达式吗?能提供一下写法吗?谢谢! 已找到解决办法。
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