算压力
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
你是要算静压力? 前景钱 发表于 2018-11-10 08:25
你是要算静压力?
是的
负载受力多少? 远祥 发表于 2018-11-11 16:01
负载受力多少?
不考虑负载,只考虑变形量,通过变形反求压力
ygang86 发表于 2018-11-10 21:47
是的
这个好像以前有算过,是材料力学里的,需要查手册。
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