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1,099 kez görüntülendi
Merhaba ,

Ema 5 Ema 13'ü  kessin ,  fiyat 10-20-50-100-200 günlük Hareketli ortalamalar üzerinde olsun , MA 50 > MA 100 > MA 200 ,Fiyat > HULL Hareketli Ortalama (9) olsun şeklinde matriks formülü yazılabilir mi acaba ?

 

Saygılar,
Kurum Analizleri kategorisinde (74 puan) tarafından | 1,099 kez görüntülendi

1 cevap

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merhaba,

cross(mov(c,5,e),mov(c,13,e)) AND c>mov(c,10,s) AND c>mov(c,20,s) AND c>mov(c,50,s) AND c>
mov(c,100,s) AND c>mov(c,200,s) AND mov(c,50,s)>mov(c,100,s) AND mov(c,100,s)>
mov(c,200,s) AND c>mov(c,9,hul)

formülünü kullanabilirsiniz,

bilgilerinize
(40,149 puan) tarafından
0 0
Merhaba,

 

Yazım hatası vermektedir,

 

Teşekkürler
0 0
merhaba,

bizlerde düzgün çalışmaktadır,

isterseniz eğitim birimine ulaşın arkadaşlar kontrol etsinler,

bir  sorun gözükmüyor formül yönünden
0 0

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