圆柱度两点法测量计算原理
1、两点法按下图所示方法测出各给定横截面内零件回转一周过程指示表的最大示值与最小示值, 并以所有各被测截面示值中的最大值与最小值的一半作为圆柱度误差值。
我认为所有各被测截面示值中的最大值与最小值差值作为圆柱度误差,因为最大包络面和最小包络面半径之差,就是圆柱度误差的。 请继续。 好方案 发表于 2013-7-18 13:25 static/image/common/back.gif
请继续。
没有实际测过,以前使用过百分表,校零后,测得最大和最小值之差,不是圆柱度误差吗?
这个只能说近似测量,准确严谨的测量方法应该是用专业的圆柱度仪 自己顶一下,为什么是最大值与最小值的一半啊,没实际动手做过,看书很不明白,求指导? 看的不仔细:)半径和直径的关系,所以除以二,你再仔细看看 :o 圆柱度包括圆度和直线度,检测起来很麻烦。还不如用圆跳动,可以控制的更多,检测也方便。
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
好像确实不用取一半 圆柱度测理视频
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