ppk计算单边公差
请教:以下数据计算PPK,数据波动很大,结果PPK达到3.5,这是什么原因??data:image/png;base64,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
?? 数据呢?波动大PPK还那么大,说明公差有问题,该调整公差规格 不好意思,刚截图发表后没有图片,现上传数据 :) 1 C3,256 偏大 2 全数据不成正态分布
3 生产数据呈现 混合性 以上,做过程能力分析 没有意义
MONEY0524 发表于 2021-12-20 17:00
以上,做过程能力分析 没有意义
算PPK不用吧,CPK是需要在上下限范围内的