T+12.2标 固定资产T+12.2标 固定资产 客户情况是这样:比如
在用友畅捷通T+财务管理软件的用友T+资产管理模块中碰到如下 问题,T+12.2标 固定资产,详细问题描述如下:T+12.2标 固定资产 客户情况是这样:比如,我有个固定资产原值是10000元,预计净残值是5%;500元。现在需要减值2000,原值相当于变成8000,但是预计净残值还是500不变;请问这样的情况在软件如何去处理?(客户以前用的是NC,可以直接录入减值,但是T+好像没有,通过原值变动,但是净残值也跟着变动;)
计提折旧后如果折旧额不与之前完全一致的话,可直接在折旧清单上修改月折旧额,后续再计提时就会按照这个数据计提
净残值是根据原值和净残值率计算得出的,做原值变动单时,在原值变动单中还需要输入变动后的预制净残值率,使预计净残值=原值*预计净残值率,但是可能变动后的预制净残值如果可能会有小数点的误差,可能不会与之前完全一致:
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
把预计净残值率修改后可以保存。预计净残值率变动了,会不会影响后面的折旧?
不可以这样操作的,不能保存。
https://sto.chanapp.chanjet.com/4a47ecad-3fcd-422b-879b-b2df91606e00/attatchment/2018/01/29/1517188219xX3O.png
可做原值变动和预计净残值变动单
页:
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