有没有MACD不论什么位置只要交叉就开平仓的EA
有没有MACD不论什么位置都是交叉就开平仓的EA。就是不管是在0轴上还是在0轴下,只要交叉就开平仓。类似于这个,只要交叉就开平仓?data:image/png;base64,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现在有macd的交叉开仓,你把水平线设置成永远满足的值就是,交叉就开仓了。
上水平线设置成很小的负数,如-999999,这样macd的值永远会大于上水平线,相当于这个参数无效,下水平线设置成很大的正数。+
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