7. қисығындағы токтың максимал төмендеуіне сєйкес келетін нүктеден
перпендикуляр түсіріп, оның горизонталь осьпен қилысу нүктесі бойынша Кюри
температурасына сєйкес кернеуін анықтау.
8. қисығының абсцисса осімен қилысу нүктесімен кернеуінің тағы бір мєнін табу.
9. -ні анықтап, формуласымен термопара спайларының температураларының айырымын есептеу: ![](data:image/png;base64,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) .
Бөлмелік температураны Кельвинмен көрсетіп кестеге енгізу.
Кюри нүктесін анықтау:
БАҚЫЛАУ СұРАҚТАРЫ.
Заттардың магнит қасиеттері бойынша классификациясы қандай?
Материалдардың магниттік қасиеттерінің табиғатын түсіндіріңдер.
Ферромагнетик Кюри нүктесіне жеткенде не болады?
Ферромагнетиктер жєне ферримагнетиктер құрлысында қандай айырмашылық бар?
Қандай заттар қатты магнитті жєне жұмсақ магнитті деп аталады?
Гистерезис құбылысының мєні неде?
Ферромагнетиктер қасиеттері оның құрамына жєне өңдеу єдісіне қалай тєуелді?
Ферромагнетиктердің техникада қолданылуы.
Әдебиет
Детлаф А.А., Яворский Б.М. Курс физики. учебное пособие для втузов /А.А. Детлаф., Б.М. Яворский. – М.: Высшая школа, 1989. – 607 с.
Евграфова А.Г., Коган В.Л. Руководство к лабораторным работам по физике. – М. : 1970. – 350 с.
Иверонова В.И. Физический практикум. Механика и молекулярная физика.– 2-е изд. – М. : 1967. – 280 с.
Кортнев А.В. и др. Практикум по физике. учебное пособие для втузов.– М. : 1965. – 509 с.
Майсова Н.Н. Практикум по курсу общей физики. учебное пособие для студентов заоч. втузов и факультетов. –2-е изд., перераб. и доп. – М. : 1970. – 447 с.
Савельев И.В. Курс общей физики. – М. : 1989. – 350 с.
Трофимова Т.И. Курс физики. учебное пособие для вузов. –7-е изд.: – М. : 2003. – 542 с.
Достарыңызбен бөлісу: |