(1 сағат)
Жоспары:
1.Ом заңының дифференциалдық формасы
2. Джоуль-Ленц заңының дифференциалдық формасы
Пайдаланатын әдебиеттер:
А.Н.Матвеев “Электродинамика и теория относительности” Москва “Высшая школа” 1964
Ж.Абдуллаев “Физика курсы” Алматы “Мектеп” 1998 ж
Ландау Л.Д., Лифшиц Е.М. “Краткий курс теоретической физики” - Москва ,”Наука” 1969, 1972 Том 1-2.
Ландау Л.Д., Лифшиц Е.М. “Курс теоритической физики”-Москва “Наука”1964
Пеннер Д.И. Угаров В.А. “Электродинамика и специальная теория относительности”. –Москва ;Просвещение. 1980.
Лекция мәтіні:
(1)
(2)
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)
Бірлік ұзындықтағы өткізгіш үшін ток тығыздығы яғни Ом заңының деференциялдық формосы төмендегі формуламен өрнектеледі:
(3) Е- Электр өрісі кернеулігі.
- меншікті өткізгіштік коэфиценті.
Токтың тығыздығы электр өрісі кернеулігіне тура пропорционал болып өзгереді. Джоуль –Ленц заңы диференциалдық формасының формуласы төмендегідей болады
(4) Джоуль-Ленц заңы бойынша бірлік уақытта өткізгіштің бірлік ауданынан ажыралып шығатын жылу мөлшері кернеуліктің квадратына тура пропорционал болады.
Достарыңызбен бөлісу: |