stokastik+ema14

Question

MAtriksde ; Aşağıda ekran görüntüsünde göründüğü gibi stokastik üzerine ema14 eklenip tek pencerede izlenebilir mi ? ayrıca yapılabilirse Ema14 ün stokastiği yukarı kesmesi AL aşağı kesmesi sat formulü yazılabilirmi. 

<img alt="" src="denied:data:image/png;base64,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

Answer 1

merhaba,

öncelikle gönderdiğiniz resim tarafımıza ulaşmamıştır,

bir indikatör üzerine başka bir indikatör atabilirsiniz,

indikatörü atarken sadece bölge seçimi yapmanız gerekir,

ancak bazı indikatörler sabit bir değer arasında giderken(stochastik 20-80 arasında değer elır genellikle)

bazıları fiyata göre hareket ederler(hareketli ortalamalar fiyatı takip ederler 1000 tl bir senedin ortalaması 1000 değer alabilir)

 

dolayısıyla birbirlerini asla kesmezler

belirttiğini kesişim stoch ile mov(EMA) asla olmayabilir veya beklediğiniz sonuçları vermeyebilir,

resimde de görüleceği üzere stoch ve mov aynı yerlerdede gözükse değerleri birbirinden çok farklıdır,

bilgilerinize

iyi günler dileriz