请教如何做出图中尺寸?
圆筒割了一个缺口,只能做半标注。请教大侠,在sw工程图中如何实现?谢谢! 剖面视图,不是标的很清楚吗 选中标注,右键点按需要隐藏的延长线、尺寸线,右键菜单选隐藏尺寸线、隐藏延长线就可以 本帖最后由 深蓝深蓝 于 2022-4-26 08:41 编辑2011ayoon 发表于 2022-4-26 08:11
选中标注,右键点按需要隐藏的延长线、尺寸线,右键菜单选隐藏尺寸线、隐藏延长线就可以
您好大侠!这个筒子下面是个缺口。所以一开始标注的时候,60和40的尺寸标注不出来。我这是用caxa画的。在caxa中,半标注,点一下中心线,点一下它的一条边会出现一个整圆的尺寸。在sw中,不知道怎样能标出这个60的和40的圆。因为他下面有一个缺口,不能直接量取出来。
手改吧,SW貌似没这功能 先标注直径,再选中尺寸线进行隐藏,然后隐藏延伸线
实现不了..不过也不用非得在这个视图上标注吧..data:image/png;base64,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 好像有个把尺寸从这个视图移动到另外一个视图的命令。快捷键,可以试试
yshshsh 发表于 2022-4-26 15:44
好像有个把尺寸从这个视图移动到另外一个视图的命令。快捷键,可以试试
说是按住shift左键拖动尺寸到下一个视图。我用14版本不行啊,你用高版本试试
韶华易逝gogoing 发表于 2022-4-26 09:22
先标注直径,再选中尺寸线进行隐藏,然后隐藏延伸线
请问这个40是直接标注出来的么?