为什么边角是这样的?
本帖最后由 xiaoyanmo329 于 2022-1-21 16:23 编辑data:image/png;base64,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为什么是这样的边角?如果四条边一起边线折弯就不是这样的?有没有大神可以解答一下。
看不见 第一条折边,使用前边红圈这个操作,第二条折边使用后边这个红圈操作就可以了。
不知道你是不是想要这种效果。 注意边线折弯时候,折弯是有选择的
本帖最后由 xiaoyanmo329 于 2022-1-21 16:55 编辑
长涯 发表于 2022-1-21 16:49
不知道你是不是想要这种效果。 注意边线折弯时候,折弯是有选择的
这样尺寸应该就不对了吧?并不是我想要这种效果。我想问我发的边角在钣金设计中是正常的吗?
oh小二 发表于 2022-1-21 16:45
第一条折边,使用前边红圈这个操作,第二条折边使用后边这个红圈操作就可以了。
这样我的折弯后的尺寸就不对了?
这种边角在实际折弯操作中是不会存在的,所以肯定是不正常的。 噩梦醒来 发表于 2022-1-21 17:20
这种边角在实际折弯操作中是不会存在的,所以肯定是不正常的。
那用软件折弯,正常应该是怎么样?四条边一起折吗?
这个折弯没有做到底,导致R角处有尖角 xiaoyanmo329 发表于 2022-1-21 16:54
这样尺寸应该就不对了吧?并不是我想要这种效果。我想问我发的边角在钣金设计中是正常的吗?
尺寸你得在边线法兰输入长度时候就把这一块凸出来的减去啊。肯定得是我们这种了,你那样折弯根本折不出来的
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