问一下怎么样绘制跟法线带有一定拔模角的曲线呢?
问一下,怎么绘制跟法线带有一定拔模角度的曲线呢?有参的可以标注切线角度尺寸,然后更改数值自动调整。那像这个无参曲线的怎么绘制?data:image/png;base64,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截图看看哪样的? 就是怎么绘制跟法线有一定拔模斜角的曲线呢?比如说拔模斜角5°的曲线。 Harry 发表于 2023-8-9 10:39
就是怎么绘制跟法线有一定拔模斜角的曲线呢?比如说拔模斜角5°的曲线。
参数软件的绘图思维是先把草绘绘制准确,不然后期参数约束了,修改很麻烦
OSD的思维就不一样了,可以先绘制大概的,后期再修改,修改方便。
如果确实要草绘准确,你截图的这个,先做一条5°的辅助线,然后再用相切和过交点圆弧,绘制圆弧线 是这样的,比如要绘制带一定拔模角度的曲线。你用绘制辅助线的方式,估计还是不好用吧?参数软件直接角度定义就行了,OSD就没有简便的方法? Superman 发表于 2023-8-16 16:15
参数软件的绘图思维是先把草绘绘制准确,不然后期参数约束了,修改很麻烦
OSD的思维就不一样了,可以先 ...
我看他们用的是样条曲线,不是多段圆弧线。 Harry 发表于 2024-9-10 09:04
我看他们用的是样条曲线,不是多段圆弧线。
如果是样条曲线,可以直接输入相切角度的,如下图所示,与竖直线相切角度为5°的样条曲线
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