TP fiyatını bulma

Question

Merhaba,

aşağıdaki tp satırı olduğunda o andaki kapanış fiyatını nasıl elde ederim.

 

Teşekkürler

h0:=h;
h1:=ref(h,-1);
h2:=ref(h,-2);
h3:=ref(h,-3);
h4:=ref(h,-4);
h5:=ref(h,-5);
h6:=ref(h,-6);
h7:=ref(h,-7);
h8:=ref(h,-8);
h9:=ref(h,-9);
h10:=ref(h,-10);
tp:=if(h3>h2 and h3>h1 and h3>h,1,0);
dp:=if(h3>h4 and h3>h5 and h3>h6 and h3>h7 and h>h7,1,0);

Answer 1

Merhaba,

Şu şekilde yazınız:

h0:=h;
h1:=ref(h,-1);
h2:=ref(h,-2);
h3:=ref(h,-3);
h4:=ref(h,-4);
h5:=ref(h,-5);
h6:=ref(h,-6);
h7:=ref(h,-7);
h8:=ref(h,-8);
h9:=ref(h,-9);
h10:=ref(h,-10);
tp:=if(h3>h2 and h3>h1 and h3>h,1,0);
dp:=if(h3>h4 and h3>h5 and h3>h6 and h3>h7 and h>h7,1,0);
valuewhen(1.,tp=1,C)

İyi çalışmalar

Comments

Merhaba, 

valuewhen(1.,tp=1,C) komutu ile güncel kapanış değerini alıyorum. hatam nerede acaba?

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

---

Merhaba,

tp verisini grafik üzerine atarsanız, son barda 1 sonucu verdiğini görüyor olmalısınız.

En son hangi barda 1 değerini aldı ise, o barın kapanış verisini görürsünüz.

Bir hata olduğunu düşünüyorsanız, eğitim birimi ile irtibata geçiniz.

İyi çalışmalar