圆周上的槽怎么标注
请问各位老师圆周上的槽该怎么标注?
标角度 不在中心线的话就标角度,多少个均布,多宽多深 找一个标的详细点,然后EQS 角度、大小、所在圆直径 社区能人不少呀 trongtrongtrong 发表于 2025-7-15 17:05
角度、大小、所在圆直径
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
这样标注可以么,我这个不在轴线上
标角度,分布圆,以及槽宽,然后均布或则
页:
[1]