两个法兰连接对不上?
说是反口,什么叫“反口”。什么样的?止口做反了呗,本来一公一母,你做了两个公的 联接件一般都是相配的,比如螺纹联接的螺栓螺母的旋向,齿轮副的旋向等等! 螺纹反口?
反口是什么意思?第一次听说法兰反口 正口长啥样?^_^ 是不是“反扣”啊? 法兰的实物图片传上来,看看是什么样的? 用户x 发表于 2020-1-20 11:32
止口做反了呗,本来一公一母,你做了两个公的
支持这个说法。
法兰不偏口,不错口,不张口,不反口
晓昀 发表于 2020-1-21 10:11
法兰的实物图片传上来,看看是什么样的?
所指的反口就是塑料件和钢件直接的位置。正在喷水~~~
这是我在百度上找到的一句话如图data:image/png;base64,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有提到反口这个词
现在这个实际存在的问题就是两个法兰对中,不仅有位置的偏差,还有角度的偏差。当时这个大国企的老师傅说的“反口”,反正我是不知道什么意思,但是我也不知道他知不知道反口这个意思。
一段是热熔pvc,另一端是钢衬胶的。我们领导的意思是多加两个垫紧一下。我怕把塑料件紧碎了。再一个方案就是重新做那个pvc直管,毕竟这个“反口”是因为这个直管太长导致的,但是这样比较麻烦。
页:
[1]
2