Сабақ жоспары
Сабақ:№13
Пән: математика
Тобы:__________
Күні: __________
Сабақтың тақырыбы: Туындының физикалық және геометриялық мағынасы.Функцияның графигіне жүргізілген жанама.
Сабақтың мақсаты:
1.Білім берушілік: Туындының физикалық және геометриялық мағынасы, жанаманың теңдеуі.
2.Дамытушылық: Формулаларды есеп шығаруда қолдану, білімдерін дамыту..
3.Тәрбиелік: Оқушылардың ойлау қабілетін жетілдіру,шыншылдыққа, жауапкершілікке, еңбек етуге тәрбиелеу.
Сабақтың түрі: Аралас сабақ
Сабақтың көрнекілігі:
Сабақтың барысы:
І Ұйымдастыру кезеңі:
а) Сәлемдесу
ә) Оқушылар тізімін тексеру
б) Сабақтың мақсатын нұсқау
ІІ Өткен тақырыпты қайталау:
![](data:image/png;base64,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)
![](data:image/png;base64,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)
( ) ,2х, , ,
ІІІЖаңа сабақ
функцияның графигіне жүргізілген жанаманың бұрыштық коэффициенті.
жанаманың теңдеуі. Лагранж формуласы.
ІV Дамыту кезеңі. Есептер шығару:
Тақтада орындалатын тапсырмалар: №192, №193, №194
Орындарында орындалатын тапсырмалар: №№195, №196
Өзіндік жұмыс
Функцияның графигіне жанаманың теңдеуін жаз:
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
,
|
Сабақты қорытындылау:
Туындының физикалық және геометриялық мағнасы неде?
Жанаманың теңдеуі
Жанаманың бұрыштық коэффициентінің формуласы
Лагранж формуласы
Оқушыларға сабаққа қатысқанына сай баға қою.
Үйге тапсырма:§ 15, №197, №198
Достарыңызбен бөлісу: |