关于滑动率的大小范围及其来源
关于滑动率的大小范围是怎么来的?有谁知道?data:image/png;base64,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拍脑袋拍出来的! 滑动率怎样计算出来的? liuguangro73031 发表于 2023-9-11 21:11
滑动率怎样计算出来的?
这个有专门的计算公式呀。找一本《机械原理》教科书找找就有了
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