yang986717285 发表于 2023-11-8 16:52:04

行星齿轮的计算(求助)

本帖最后由 yang986717285 于 2023-11-8 16:53 编辑

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

wryp 发表于 2023-11-8 17:00:25

本帖最后由 wryp 于 2023-11-8 17:01 编辑

你就给点这条件就要模数?
仔细看了一下,要齿数条件也不够。
先把问题整明白吧

leioukupo 发表于 2023-11-8 17:09:10

直接CAD参数约束,就知道齿数比了
具体齿数,你一个齿数都没有,算不出来,还有模数和这也没关系

cp4240 发表于 2023-11-8 18:21:12

一上来就整行星轮系,太难了,建议还是从课本二级减速箱开始吧。

yang986717285 发表于 2023-11-8 18:32:45

wryp 发表于 2023-11-8 17:00
你就给点这条件就要模数?
仔细看了一下,要齿数条件也不够。
先把问题整明白吧

NGW系的行星轮系我可以算出来,但是这个因为加了一排行星轮,因为是公用一个行星架,所以不知道怎么算,没看过这方面的双联行星齿轮的资料。

yang986717285 发表于 2023-11-8 18:54:07

leioukupo 发表于 2023-11-8 17:09
直接CAD参数约束,就知道齿数比了
具体齿数,你一个齿数都没有,算不出来,还有模数和这也没关系

那这个是不是应该要初始给定一个齿轮的齿数?就是因为我感觉这三个齿轮的齿数都不会相同,所以难到了,就不会。

hl90 发表于 2023-11-8 22:51:07

我一个不懂机械的都不知道你在说什么

FKUEDEJXSQ2 发表于 2023-11-9 08:10:01

条件不够,你可以初定再验证。

leioukupo 发表于 2023-11-9 09:28:13

yang986717285 发表于 2023-11-8 18:54
那这个是不是应该要初始给定一个齿轮的齿数?就是因为我感觉这三个齿轮的齿数都不会相同,所以难到了,就 ...

对啊,你网上先搜几个行星轮系的例题计算过程学一下
我只记得系杆什么的了
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