节流口流量系数仿真中为什么不是定值呢
AMESIM中对节流口的描述说, However, if Cq is taken to be constant, the equation of Q against ΔP has infinite gradient at the origin which is numerically dangerous and physically unrealistic.
但是明明在ΔP为0时是有梯度(导数)的,为0 呀,求教。
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
请问,您这个问题解决了吗 您好,请问这个问题解决了吗
页:
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