问一个SW斜面装配时配合选择的问题,求助帖
画了一个V型的架子,中间需要放一层物料板,架子的斜拉杆跟水平面呈100度角,板子的侧面画的钣金折弯,也是和水平面100度角。板子的宽度我是随意给的一个差不多的值,现在我想让板子的两侧都和架子的内面贴合住,这种怎么给约束啊?
现在给了一个板子的上面和架子的上面平行,红圈处给了个对齐,还给了板子关于中心面对称。板子的中心面和架子的一致。
现在板子可以上下移动,我该怎么操作能让板子两侧和架子贴合住呢?
我现在再添加板子的侧面和架子内侧重合就提示过配合。不会弄了,,,大神们,教我一下吧,不胜感激
为什么不直接用两个重合配合,如果角度都是一样的话,软件应该会自己求解配合位置才对吧 EnochGo 发表于 2024-8-8 19:11
为什么不直接用两个重合配合,如果角度都是一样的话,软件应该会自己求解配合位置才对吧
不行的,只能重合一个侧面,再重合另一个就过定义了
马九五 发表于 2024-8-9 08:40
不行的,只能重合一个侧面,再重合另一个就过定义了
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
楼主想要的是这种配合型式么,类似于人字梯的结构?
我这个就是用两个重合配合做出来的,软件自动计算在一个合适的高度上贴合。
如果楼主操作不了,我怀疑是多了一些多余的约束,或者钣金折弯的时候角度发生变化,建议先排查下这两个问题
基准面配合 用基准面吧,想要精确形状就在装配体里编辑零件,草图关系相关 基准面配合
EnochGo 发表于 2024-8-9 09:07
楼主想要的是这种配合型式么,类似于人字梯的结构?
我这个就是用两个重合配合做出来的,软件自动计算 ...
我又画了两个相似的简单零件放一起装配了一下,确实可以装配上,然后我就去排查看是不是架子草图问题,两侧不对称的问题,是不是钣金后的板子角度和架子的角度不一致的问题,然后发现没有问题,但是它就是不能用两个侧面重合来约束……头都大了
白的透红 发表于 2024-8-9 11:35
基准面配合
基准面配合不是只能让他两个都关于中心面对称么?怎么让他俩的两个侧面重合在一起呢?我没明白,还是我理解错了?
马九五 发表于 2024-8-9 22:22
基准面配合不是只能让他两个都关于中心面对称么?怎么让他俩的两个侧面重合在一起呢?我没明白,还是我理 ...
在装配里面你不就是想让它固定住吗,基准面配合给个你想要的距离不动不就行了。没必要一定两边重合,也重合不了,你实物里最后还是要焊接的嘛?你保证实物里能装的起来就行啊
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