马丁对冲ea均线分离平仓有一个bug
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均线分离平仓按照上图这样的设定后,单独自己一个条件平仓没有问题,但是如果搭配一个没有设定盈利平仓的条件,选择满足2个条件后平仓,这样会亏损平仓。请老师查看修复一下。
谢谢
好的,会砖给相关的老师的
如果没有选择某一个平仓条件为必选条件,那么满足任意一个条件就会平仓
EA邦高老师 发表于 2023-1-9 21:26
如果没有选择某一个平仓条件为必选条件,那么满足任意一个条件就会平仓
...
我选择了满足2个条件才平仓,如果一共才两个平仓条件,这就等于必选了吧。
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