h118
发表于 2017-4-21 08:26
李红明
发表于 2017-4-21 21:59
如何看待突破后的走势?在100一线还得磨叽几个月啊?
h118
发表于 2017-4-22 17:22
h118
发表于 2017-4-22 17:24
chenzhen6062
发表于 2017-5-19 20:19
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
主跌浪,三角形破位了,103.820前面是1浪,现在处在3浪5还是?
页:
[1]