平面度和平行度
本帖最后由 haoaj 于 2021-8-4 10:37 编辑两轴承间的垫圈, 材料316L 不锈钢,厚度2, 主要问题在平面度和平行度要求。怀疑是设计多加了个0,
data:image/png;base64,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
PDF 图纸显示不了, 就是一个简单的垫圈, 外径21,内径18,厚2, 单面平面度0.005, 双面平行度0.005
英寸呢? 轴承间的垫圈,高精度的是有可能的,不过一般,平面度要比平行度低才可以啊呀 UCHIHASASUKE 发表于 2021-8-4 10:50
英寸呢?
都是公制 毫米
giants 发表于 2021-8-4 10:51
轴承间的垫圈,高精度的是有可能的,不过一般,平面度要比平行度低才可以啊呀
是的, 不过很奇怪的是厚度公差只有+/-0.1
楼主好:
你这个精度问过你们磨床师傅没?不一定做得出来呢。2个厚有点内应力就变形了。
他随便标,你随便干,不太离谱就行。 轴承垫圈一般等厚度保证就行了 制图的人在提前挖坑……万一将来东西做出来产品有缺陷,就甩锅说是加工没有按图纸要求做出来。要是遇到一个外行老板更有这种可能。 这么高的平行度,平面度不会差的,标注有点奇怪,多此一举
页:
[1]
2