0 beğenilme 0 beğenilmeme
760 kez görüntülendi
iki tarama formulü hakkında yardımcı olurmusunuz

bir önceki mumum kapanışından daha aşağıda açılış yapıp (gapli) yine kendi açılışının üzerinde kapatan mum şeklinde,

birde önceki mumun kapanışının daha üzerinde açılış yapıp (gapli) yine kendi açılışının altında kapatan mum şeklinde
Grafik kategorisinde (12 puan) tarafından | 760 kez görüntülendi

1 cevap

0 beğenilme 0 beğenilmeme
merhaba,

1. için

o<ref(c,-1) AND c>o

2. için

o>ref(c,-1) AND c<o

deneyebilirsiniz,

bilgilerinize
(40,149 puan) tarafından
0 0
sanırım bi hata var tüm bisti listeliyor günlük tarama yapınca
0 0
merhaba,

explorer filtre kısmına yapıştırın,

 

sorun olmayacaktır

bilgilerinize
0 0
bu şekilde çalıştı fakat ben biraz eksik iletmişim size koşulu aşağıdaki gibi revize yapabilirmiyiz

1. için

o<ref(c,-1) AND c>o

bunda kapanışını baz aldığımız mum düşüş mumu olmalı

2. için
o>ref(c,-1) AND c<o

bunda kapanışını baz aldığımız mum yükseliş mumu olmalı
0 0
merhaba,

 

1

o<ref(c,-1) AND c>o AND c<ref(c,-1)

2

o>ref(c,-1) AND c<o AND c>ref(c,-1)

 

deneyebilirsiniz,
0 0

1 de bi yanlışlık olabilir mi 

4 saatlik şimdi taradım aşağıdakileri verdi sonuç uymuyor

2. doğru olarak tarıyor 

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

0 0
merhaba ,

gönderdiğiniz resimi maalesef görüntüleyemiyoruz

o<ref(c,-1) AND c>o AND c<ref(c,-1)

bu formül size

açılış fiyatı bir önceki kapanıştan küçük ise şimdiki fiyat açılıştan büyük ise ve mum rengi kırmızı ise sonuç verecektir

farklı birşey istiyorsanız görsel ile destekleyerek egitim@matriksdata.com mail atabilirsiniz,
Hoş geldiniz, Matriks Destek Platformu sizlere sorularınızın hızlıca cevaplanması için bir ortam sağlar. Sorduğunuz ve cevapladığınız soruların ve yorumlarınızın aldığı oylar üzerinden puan kazanırsınız. Puan sistemine bağlı kampanyamızla ücretsiz kullanım avantajlarından faydalanabilirsiniz.



8,639 soru
8,593 cevap
4,826 yorum
19,834 kullanıcı