美国黄金期货中对量学的运用
A:顶底互换,误差一美分,误差率万分之一;B:顶底互换,误差一美分,误差率万分之一;C:为一剑封喉,王子说过,先取实后取虚。对于国际盘,取虚实一点问题都没有;D:是跳空,元帅授权前一交易日,回踩又是误差一分钱;E:为价升量缩,择机做多或者价升量缩,渴望新高;E:E下降趋势的斜率明显比A要小,所以E的一剑封喉力度会比A要小。欢迎吐槽。data:image/png;base64,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
谢谢楼主分享 美国黄金期货中对量学的运用 谢谢楼主分享 谢谢分享辛苦了。。 hyh2000 发表于 2017-4-3 18:36
谢谢楼主分享
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谢谢分享辛苦了。。 谢谢楼主分享
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