HC32L130J8TA TIMER4无法输出PWM
本帖最后由 t9080350 于 2022-4-22 14:00 编辑21ic问答首页 - HC32L130J8TA TIMER4无法输出PWM
HC32L130J8TA TIMER4无法输出PWM
t90803502022-04-22
使用hc32l13x_ddl_Rev1.9.2 Lite\example\adt\CompareOutput工程官方描述:
1)示波器分别连接PA08(TIM4 CHA)与PA11(TIM4 CHB)
2)打开工程编译并运行
3)示波器两个通道波形相同,都是占空比50%的方波
按照上述步骤操作,示波器中没有出现指定波形,更换了3个芯片依然没有结果,应该排除芯片问题。
打开调试窗口,定时器4有正常计数
有没有高手可以指点指点呢,感谢!
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
请问有高手指点指点吗 目前也卡到这个问题,猜测是每次匹配后翻转,所以是方波,周期减半 实际波形是怎么样的?发图看看。
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