全都是是±公差?那加工中全部都为正公差,这要是拼出来,也是神奇了
data:image/png;base64,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
这样嘛
都选择激光开孔了,谈毛有精度的配合呀,轴负10丝就可以了 冷水黄金 发表于 2024-4-8 10:40
3mm板子,激光切小尺寸位置公差一般正负5丝,孔公差一般是5丝,如果要取正的话得与他们说。
你这直接按 ...
根据实践偏差,切割软件上设定矫正值可以解决;只针对薄板,厚板还是要钻
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