aspen exchanger design对热虹吸再沸器设计
各位前辈,小弟想问问在aspen exchanger design&rating软件中,核对好了热虹吸再沸器,其中对interval Analysis-shell side中的表格不是很了解,求解释,data:image/png;base64,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对于这个图中,有12行,是不是代表这把再沸器分成了12段,每一行代表1/12管长,其中有数据的代表着蒸发段高度,显热段高度为1/12*3000,我的管长为3000mm,是这么回事吗,求解释。
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