如何变齿轮传动为同步带传动
如题,机器台板下面是机械传动机构,其中主电机齿轮带动了2个从动齿轮,现在想把这种结构改成同步带传动的形式,怎么改?齿轮传动是主轴和从动轴反向,同步带则是同向,怎么简单实现这种传动形式的更换?
同步带传动转到方向相同,所以必须要加一个过渡,另外还要考虑传动比,原来机构是最简单的。 大侠先说说为何要改? UVW里换试试,奇迹也许就在你眼前,还那么简单。。。
Cavalier_Ricky 发表于 2019-9-12 20:42
UVW里换试试,奇迹也许就在你眼前,还那么简单。。。
大侠,lz说的不是这个意思哦
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
双面同步带 这个需要再增加一组转向的同步带轮。 Cavalier_Ricky 发表于 2019-9-12 20:42
UVW里换试试,奇迹也许就在你眼前,还那么简单。。。
大侠,已经好久没来了!
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