真空皮带阻力计算?求解
有什么公式或者方法可以计算真空输送皮带中需要克服的负压力是多大?data:image/png;base64,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如图真空输送皮带的真空负压需要多大的力去克服,这个如何计算
图呢?
力乘以摩擦系数 刷下威望,不够下载,楼主担待 为了提携年轻一代的机械设计水平,回馈社会。
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