zxp19851224* 发表于 2023-7-7 08:47
1、UG没有和workbench中的弱弹簧功能,但是有类似的处理功能。比如打开矩阵的稳定性,以便于计算初始时收 ...
查看结果出现这个,是什么bug?
data:image/png;base64,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
龙三儿 发表于 2023-7-9 14:52
查看结果出现这个,是什么bug?
图呢?
zxp19851224* 发表于 2023-7-4 08:50
你这个是疲劳安全系数结果,那么最小的安全系数应该大于1。
好吧不懂
古月123123 发表于 2023-4-13 17:03
模态频率,不懂的可以先百度一下
好吧{:smile:}
有2个不同载荷,如何先后施加?如图所示应该是同时施加,建立子工况应该是分别施加
data:image/png;base64,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
仿真收集结果时总是出现错误。没有其他提示
你好!做应力分析时,库里没有要常用的材料,比如 Q355D,这时添加本地材料要填写哪些参数,LZ有常用材料属性表吗?
大神 有限元分析后 结果文件格式错误什么情况
阿邦的 发表于 2023-8-15 23:37
大神 有限元分析后 结果文件格式错误什么情况
没有结果。查看f06文件,查找关键词fatal,看是不是有错误。
老哥 有没有运动仿真的学习资料 付费也行