结果验证方法
本帖最后由 无法言喻 于 2023-8-26 10:33 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
环境试验设备建标的技术报告中,使用比对法进行结果验证时,1号实测值1.2,二号实测值1.0具体是哪个差值呢?因为如果检测温湿度检定箱的话,要测9个点,每个点测16次,所以这个实测值是9个点的平均值再平均,然后与设定值作差呢,还是直接取温湿度检定箱中层中心的那一个点的均值与设定值作差呢
file:///C:\Users\FY-230~1\AppData\Local\Temp\SGPicFaceTpBq\11500\005AFE8E.png 图片看不了,就是比对法中的y是1.2,1.0 9个点中的最小值或最大值与设定值的差值(取偏差较大者) zhou18yu 发表于 2023-9-11 14:23
9个点中的最小值或最大值与设定值的差值(取偏差较大者)
好的,谢谢
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