林中鸟sk 发表于 2024-12-9 21:41:42

求助,一种机构,可以自动复位

本帖最后由 林中鸟sk 于 2024-12-9 21:44 编辑

如图1,所示,圆形部分为可运动的物体,它在这个U形轨道内运动,运动到某个地方时,U形轨道内的其他部分就会被可复位的部件挡住,而它本身可以显露出来。data:image/png;base64,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

学渣渣 发表于 2024-12-9 21:53:50

这是U型轨道?

我们一般叫槽孔;你说的自动复位,自动遮挡,那就是伸缩风琴罩了吧??

cdhcn 发表于 2024-12-10 08:47:54

最后一段表述看不明白,再弄个示意图好点。

林中鸟sk 发表于 2024-12-10 09:19:16

学渣渣 发表于 2024-12-9 21:53
这是U型轨道?

我们一般叫槽孔;你说的自动复位,自动遮挡,那就是伸缩风琴罩了吧??

表达的可能不是很清楚,圆形部件是在槽孔范围内做直线运动,伸缩风琴罩这个可能不太行,只能说类似,但是要不能压扁,在圆形部件运动的时候其他部件是挡住它的运动路线,但是边运动边退出运动路线

wtangzz147 发表于 2024-12-10 10:03:22

苹果手机侧面的静音键那种?

林中鸟sk 发表于 2024-12-10 10:17:07

这种可伸缩或者可复位的机构,有大佬用过吗

林中鸟sk 发表于 2024-12-10 10:37:32

现在有一种想法;就是圆形物体上(类似卷尺),两头固定那种皮带,一拉一缩

学渣渣 发表于 2024-12-10 11:24:55

cdhcn 发表于 2024-12-10 08:47
最后一段表述看不明白,再弄个示意图好点。

同看不明白。估计lz自己也迷糊。

cangzhoumj 发表于 2024-12-10 11:58:19

很多种

林中鸟sk 发表于 2024-12-10 14:06:53

cangzhoumj 发表于 2024-12-10 11:58
很多种

可以举例一下吗
页: [1] 2
查看完整版本: 求助,一种机构,可以自动复位