![طرحهای صنعت آب و برق استان آذربایجان غربی افتتاح میشود طرحهای صنعت آب و برق استان آذربایجان غربی افتتاح میشود](/files/fa/news/1403/4/14/153323_238.jpg)
محاسبه جریان De Rate
همانطور که در پست قبل اشاره شد، چنانچه ترانسفورماتوری که برای کار در شرایط عادی طراحی شده بخواهد در شرایط هارمونیکی کار کند، باید De-rate شود.
![](/files/fa/news/1393/11/2/12164_648.jpg)
همانطور که در پست قبل اشاره شد، چنانچه ترانسفورماتوری که برای کار در شرایط عادی طراحی شده بخواهد در شرایط هارمونیکی کار کند، باید De-rate شود. محاسبه مقدار De-Rating به صورت زیر است :
1- ابتدا ضریب K، مطابق رابطه ای که در پست قبل ارائه شد، محاسبه می شود.
2-جریان حداکثر ترانسفورماتور از رابطه زیر محاسبه می شود :
![](data:image/png;base64,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)
که در رابطه فوق، IR جریان نامی ترانسفورماتور ، K همان ضریب K و PEC.R نسبت تلفات فوکو به تلفات مس نامی ترانسفورماتور است.
مثال : در یک ترانسفورماتور میزان جریان نامی مولفه اصلی (50 هرتز) 233.91 آمپر، جریان هارمونیک پنجم 45.84 آمپر، جریان هارمونیک هفتم 31.27 آمپر، جریان هارمونیک یازدهم 19.08 آمپر و جریان هارمونیک سیزدهم 14.03 آمپر است. اگر نسبت تلفات فوکوی نامی به تلفات مس نامی 0.12 باشد، جداکثر جریان مجاز ترانسفورماتور چقدر است؟
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)
1- ابتدا ضریب K، مطابق رابطه ای که در پست قبل ارائه شد، محاسبه می شود.
2-جریان حداکثر ترانسفورماتور از رابطه زیر محاسبه می شود :
که در رابطه فوق، IR جریان نامی ترانسفورماتور ، K همان ضریب K و PEC.R نسبت تلفات فوکو به تلفات مس نامی ترانسفورماتور است.
مثال : در یک ترانسفورماتور میزان جریان نامی مولفه اصلی (50 هرتز) 233.91 آمپر، جریان هارمونیک پنجم 45.84 آمپر، جریان هارمونیک هفتم 31.27 آمپر، جریان هارمونیک یازدهم 19.08 آمپر و جریان هارمونیک سیزدهم 14.03 آمپر است. اگر نسبت تلفات فوکوی نامی به تلفات مس نامی 0.12 باشد، جداکثر جریان مجاز ترانسفورماتور چقدر است؟
منبع:farhadyazdi.com
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