Merhaba ,
Son 3 bar içinde gördüğü en yüksek seviyenin üzerine çıkanlar ve aynı zamanda düşeni kıranları aynı anda taratmak istiyorum
yada şöyle anlatayım süper trend değerleri (3,1) olacak şekilde ve düşeni kıranları aynı anda taracak bir ıq formulüne ihtiyacım var
yani aradığım görseldeki şart olacak.<img alt="" src="denied:data:image/png;base64,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
