电机怎么选?
本帖最后由 huaiming764 于 2021-8-26 11:18 编辑data:image/png;base64,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工件带转盘的重量约200kg,转速100r/min.电机选多大?
摩擦力乘以旋转半径就是负载扭矩,然后用公式T=9550*P/n计算负载需要的功率。再考虑设计裕量系数乘以1.1-1.2就是需要的电机输出功率,最后靠电机功率档,选择合适型号。 电机转矩大于轴承摩擦力矩就能转起来,而轴承摩擦力矩是很小的,所以可以说无论多么小的电机都能转起来。而真正要考虑的是启动时间。电机越大启动的越快。
T=Jw。 怎么图片看不到呢?
转动惯量,加减速时间,电机类型,运转精度 主要考虑转动惯量 算上减速器,粗略估计750W的足够了
转速从0达到100r/min所需时间是关键! 啥 也没有啊,不加 减速机 。1800w的普通电机够用了 放了4倍安全系数 200-300瓦足够
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