Ters çekiç mum

Question

(H/O>1.03 AND H/C>1.03)

bu şekilde deneyiniz,

 2 gün önce Sibely tarafından yorumlandı

 

Verilen yukarıda aşağıda istediğim.

Cevapla

https://hizliresim.com/ntkciqi 

 

vermiş olduğunuz taramada çıkan sonuçlar

 

https://hizliresim.com/mpxaalz

 

bu doji için ideal ben ters çekiç mum istiyorum tekrar size ilgil ifotoğraf linkini atıyorum. Açıklaması da gövde boyu altta olacak

 

https://hizliresim.com/8ekiqre

https://hizliresim.com/nc053ln

 

Teşekkürler

Answer 1

Merhabalar,

Sizlere attığımız formül gösterdiğiniz barlar da şartı sağlamaktadır.

NOT :

alt pin

(H/O>1.03 AND H/C>1.03)

üst pin
(L/O<0.97 AND L/C<0.97)

iyi çalışmalar

Comments

Buyrun sonuç

 

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