关于题目公式的疑问
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这里我不懂。如果调频斜率如1式中是γ的话,为什么到了2式中变成γ/2了?
这个和频率的定义有关,可以认为是信号指数上的斜率 A题专家 发表于 2022-10-9 09:32
这个和频率的定义有关,可以认为是信号指数上的斜率
谢谢老师!
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