关于图示中信号的处理
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各位大虾,小弟想仿真一个开环控制的内容,又想要这个转角差,如何将图示中红色的部份变绿?
见附件中的图片信息
zjw139 发表于 2015-8-17 22:08
见附件中的图片信息
已找到信号截止方式
页:
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