求助:弧形齿条的绘制和校核方法
请教各位,类似这种弧形齿条(塑料材质,不是标准的圆弧),怎么绘制和校核,谢谢!data:image/png;base64,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
为什么要校核,它受力吗,图中显示有哪些零件对他有作用力吗 你这个属于非圆齿轮,变节圆的,不好画。
逆转的月亮 发表于 2023-12-16 08:41
为什么要校核,它受力吗,图中显示有哪些零件对他有作用力吗
常规的直尺圆柱齿轮与之配合,塑料零件,受力很小,强度啥的可以不用校核,主要是怎么绘制不大明白
斯文棒棒 发表于 2023-12-16 14:20
你这个属于非圆齿轮,变节圆的,不好画。
有没有什么方法啊,大佬
没画过;猜测是,先评估处 运动分度曲线,按常规齿轮方式 沿曲线偏置阵列齿形
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