Merhaba,
Resimdeki gibi bollinger kolları içe doğru, aşağı bakan ve fiyat alt banda çok yakın olanları taratabileceğim formül için yardımınızı rica ederim. Teşekkürler.
(Bollinger kolları içe doğru için, daha önce 2 ayrı formül oluşturmuştunuz. "BBandTop(c,20,s,2)/BBandBot(c,20,s,2)<=LLV(BBandTop(c,20,s,2)/BBandBot(c,20,s,2),40)" "BBandTop(c,20,s,2)/BBandBot(c,20,s,2)<1.08 AND BBandTop(c,20,s,2)/BBandBot(c,20,s,2)>0.92")
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