各位前辈请教一个基础问题
本帖最后由 清粥小菜 于 2024-5-1 23:52 编辑各位前辈,今天学习了缠论K线处理,请问我这样处理对不对?
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
“处理方式
先按照方向,再按照时间,处理到相邻两根K线之间不存在任何包含关系为止。
按照方向:分为向上处理与向下处理;
1、存在包含关系的两根相邻K线的第一根K线的最高点,与它前面不存在包含关系的K线的最高点进行比较。存在包含关系的第一根K线的最高点比不存在包含关系的K线的最高点高时,为向上处理。
反之,则向下处理。”
页:
[1]