同步带的选型设计——求解
小弟在选型同步带时,发现实际中心距α不可调整时,需要知道小带轮的包角α1,但是手册中并未告知如何求得或查得小带轮包角;请大佬解惑包角跟中心距和大轮小轮的直径有关系。 包角就是你自己是怎么样就怎么样啊,两个轮一样,不就是包了180°吗 斯文棒棒 发表于 2025-2-28 16:00
包角跟中心距和大轮小轮的直径有关系。
大齿轮的和小齿轮都已经定了,中心距只有初定的,现在就是要计算实际中心距
一展刀锋 发表于 2025-2-28 16:07
包角就是你自己是怎么样就怎么样啊,两个轮一样,不就是包了180°吗
传动比是定的,初始中心距也是定的,没有加惰轮的情况下,这个包角应该是个固定数值吧
枭枭冲 发表于 2025-2-28 16:52
传动比是定的,初始中心距也是定的,没有加惰轮的情况下,这个包角应该是个固定数值吧
画一下不就知道了么?
没看到图片最右侧时,我真以为你不知道;看到图片最右侧时,我觉得你应该配一副眼镜
本帖最后由 并没胡闹 于 2025-2-28 23:09 编辑
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
先按这个式子算出这个展角的数值
2、data:image/png;base64,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
渐开线函数表自己查下就行了
页:
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