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1,095 kez görüntülendi

ott indikatörünün pembe çizgisinin kapanış değerleriyle kesilip kapanış değerinin tamamıyla çizgi altına inmesi durumunda sat, üstüne çıktığında al sinyali üreten formülün yazımı konusunda yardımcı olabilir misiniz. tşk

 

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