资产负债表为什么资产负责表不平
在用友畅捷通T3财务软件的用友T3总账系统模块中碰到如下 问题,资产负债表,详细问题描述如下:为什么资产负责表不平
资产负债表不平一般从以下几个方面检查:1.检查凭证是否都已经记账了,软件默认取凭证记账之后的数据;2.没有完成期末结转操作导致的,生成报表前需要期末结转操作,如:期间损益结转和制造费用结转;3.新增了一级科目但报表中没有设置此科目的取数公式,具体操作步骤可以在机器人中继续搜索【新增一级科目后如何在财务报表中体现该科目的数据】;4.检查报表模板的行业性质是否与建账时选择的行业性质一致;5.检查报表中“未分配利润”这一项的公式是否正确,有些报表中只有未分配利润的科目,通常需设置为未分配利润科目+本年利润科目的数;6.如果以上方法都没有检查出来,那么可以用资产负债表和账套的余额表进行核对,查看是哪个科目取数不正确,找到问题所在后进行修正。图文并茂形式操作步骤点击这里为您呈现!
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
为什么资产负债表不平
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