如何检测砂轮的实时直径尺寸
预做一磨削设备,磨削大小不同的工件外圆柱面,圆柱面的高度相对于砂轮的厚度有的大些有的小些。为了便于装卸工件,砂轮需要相对于工件轴线——垂直后退+平行于轴线后退。如采用半自动操作:手动装夹工件——启动机器,自动开始磨削——磨削完成后砂轮自动退回——自动停机
问题
砂轮直径会越来越小,砂轮进给的距离是变化的,如何实时检测这个变化量的大小呢?
data:image/png;base64,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
测转动惯量就好 1、叉型开关,精度大概在2mm左右;2、使用伺服电缸+压力传感器,进给方向,做到大致的恒压 原点砂轮后面装个激光位移测距传感器砂轮启动之前测一下,理论精度0.1mm或者
测工件高度按照砂轮完整尺寸进给,工件实际磨削量和进给量的差值就是就是砂轮磨损量,数据保存用作下次砂轮尺寸参考 采用非接触拍照式或者激光测距仪都可以,不过这类传感器都比较贵。 对射激光传感器。 数控工具磨床砂轮测头了解一下。某波斯/某尼绍等等,取点测量砂轮外径。 不行加一个2D视觉判断? 心随你~~ 发表于 2021-5-5 21:08
数控工具磨床砂轮测头了解一下。某波斯/某尼绍等等,取点测量砂轮外径。
请问老板,有性价比比较好的磨刀机品牌推荐么?还有就是新手学习操作数控磨刀机的难度有多大?希望大侠能指点一二。
页:
[1]