geçmişe yönelik tarama

Question

Geçmiş Tarihli tarama yaptığımız da mesele 01.09.2023 tarihinde. bu tarihten 1 hafta sonraki fiyatı ve fiyat değişimini yüzdesel olarak görmek istiyorum. <img alt="" src="denied:data:image/png;base64,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

Answer 1

Merhabalar,

2 tarih arasındaki değişim için

15 şubat 2024 bar kapanışının 1 eylül  2023 deki bar kapanışına göre değişimi

a:=valuewhen(1.,YEAR()=2023 AND MONTH()=9 AND DAYOFMONTH()=1,c);
b:=valuewhen(1.,YEAR()=2024 AND MONTH()=2 AND DAYOFMONTH()=15,c);
(b/a-1)*100

deneyebilirsiniz,

bu şekilde yuzdesel değişime bakacaksanız bist analizler->performans tablosundan bakmanızı öneririz.

iyi çalışmalar