请教各位达人一个调整级别的问题?
本帖最后由 rexgao 于 2016-5-27 17:19 编辑如图,假设w4尚在运行中,而且并未破掉w1高点,如何分辨w4是针对w3的调整还是针对w1+w2+w3的调整,时间上有什么讲究?在此谢过
data:image/png;base64,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
图终于出来了,真不容易 有人指教一二不 本帖最后由 ktvsir 于 2016-5-29 15:39 编辑
这个,可以从W2开始的浪数起,有一个上升5浪,就有一个相对应的调整3浪啊。按着顺寻数就是了。我就是这么做的。还有就是注意交替原则。结构就这么点,不可能忽然多出点什么来的啊。要是还不行,就只能等了。不过,既然知道了W3,应该是看戏的时候吧,那么W4如何,并不影响操作吧? 这个,可以从W2开始的浪数起,有一个上升5浪,就有一个相对应的调整3浪啊。按着顺序去数就是了。我就是这么做的。还有就是注意交替原则。结构就这么点,不可能忽然多出点什么来的啊。要是还不行,就只能等了。不过,既然知道了W3,应该是看戏的时候吧,那么W4如何,并不影响操作吧?
顺序那个打字错了。 :wanzuixiao
页:
[1]