zxfjm 发表于 2024-8-30 16:05:47

VDA6.3检查表

本帖最后由 zxfjm 于 2024-8-30 16:12 编辑

各位老师,在这个网站下载了几个VDA6.3的检查表,内容基本相同,但是在评价表中的产品EG(PGN)[%]始终没有数值显示。其中的公式实在是太复杂了,哪位大神可以指教一下如何更改公式,显示产品的满足度,感激!data:image/png;base64,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

qlong 发表于 2024-9-1 10:42:00

这个问题就像:在路上捡到一张银行卡,插入取款机后输入密码总是错,哪位能提供一下正确的密码?

zxfjm 发表于 2024-8-30 16:08:48

本帖最后由 zxfjm 于 2024-8-30 16:11 编辑

C:\Users\ZHAOXIN\Pictures\Camera Roll

zys 发表于 2024-8-31 10:37:04

{:1_180:}

samtang 发表于 2024-9-1 08:12:35

:)

nikoyang 发表于 2024-9-1 08:38:56

{:1_180:}

一米林夕 发表于 2024-9-2 08:56:36

qlong 发表于 2024-9-1 10:42
这个问题就像:在路上捡到一张银行卡,插入取款机后输入密码总是错,哪位能提供一下正确的密码? ...

{:4_138:}

jerry_zyc 发表于 2024-9-2 09:26:58

:)

jh02041982 发表于 2024-9-2 12:03:26

:)

65537558 发表于 2024-9-2 14:49:49

qlong 发表于 2024-9-1 10:42
这个问题就像:在路上捡到一张银行卡,插入取款机后输入密码总是错,哪位能提供一下正确的密码? ...

O(∩_∩)O哈哈哈~哈哈哈

最佳答案:神经病:lol
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