两笔资料比对后反颜色
若想从Sheet List 中"Lot No-1" & "Lot No-2" 与Sheet 1 比对,若有资料显示蓝色,再与Sheet 2 比对,若有资料显示黄色,该如何比对?谢谢本帖最后由 zjdh 于 2024-2-1 21:54 编辑
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 zjdh 发表于 2024-2-1 21:50
谢谢版主的帮忙,终于解决这个问题
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