деп қабылдап және -ға ақысқартсақ,төмендегіше аламыз;
7.16-теңдеу жылу өткізгіштік арқылы жылу берілетін дененің кезкелген нүктесіндегі температуралардын таралуын көрсетеді және қозғалыссыз ортадағы жылу өткізгіштіктің дифференциалды теңдеуі немесе Фурье тендеуі деп аталады.
температура өткізгіштік коэффициенті деп аталады.
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Өзінді тексеруге арналған сұрақтар.
1. Негізгі критерилері қандай? 2. Олардың есептерде пайдалану әдістерін көрсетіңіздер?
Ұсынылатың әдебиет: 4.1.1. 201- 233 бет
Достарыңызбен бөлісу: |