受压力分析,求教
新人第一次发帖,求教压力方面的知识,如下图,客户需求压装力1000N,因为避位问题,现在压缸和产品受压点偏心88mm,压装块有四根导向柱,采用压力传感器检测力,客户感觉偏心对产品实际受压力有影响,要求计算产品受到的压装力,实在不会,特来求助,只求个大概压力data:image/png;base64,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
条件不够,无法分析 石松ss 发表于 2024-3-19 19:53
条件不够,无法分析
请问还需要哪些条件
导向柱的位置,肯定有影响,多大就不知道 了 客户要求就改!!!:)偏心无法纠正过来吗?有导向影响可能不是非常大,但终究还是有影响的。 肯定有影响,偏心会导致导向柱每个受到的弯矩都不一样,而导向轴是有间隙的。那么产品受到的压力就会不均匀 少条件无法计算 仿真一下呗 才1吨而已,导向柱做强壮一点,这点偏移量没多大影响,压力多大产品受力基本上也多大
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