kompozit rsi

Question

merhaba

 

grafikte aşağıdaki indikatörlerde rsi açtığımda

rsi grafiğinde hem tl rsi grafiği hem de kompozit rsi grafiğini tek bir indikatör olarak görmek istiyorum.

rsi 50 çizgisinide eklerseniz memnun olurum teşekkür ediorum

Answer 1

Merhabalar,

Aşağıdaki şekilde deneyiniz,

RSI(C,14);
RSI(C/Security("XU100",C),14);
50

iyi çalışmalar

Comments

bu şekilde builder attığınızda kompozit rsı degeri günlükte 2023 ten sonra hep düz bir çizgi olarak görülmektedir.

bir yerde yanlış mı yapmaktayım.<img alt="" 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