|
Мектеп:
|
Күні:
|
Мұғалімнің есімі:
|
СЫНЫП:
|
Қатысқандар саны:
|
Қатыспағандар:
|
Сабақтың тақырыбы
|
Центрге тартқыш үдеу
|
Сабақ негізделген оқу
мақсаты (мақсаттары)
|
9.2.1.15 центрге тартқыш үдеу формуласын есептер шығаруда қолдану;
|
Сабақ мақсаттары
|
Барлық оқушылар:
|
Центрге тартқыш үдеу жайлы мағлұмат беру
Центрге тартқыш үдеу формулаларын есеп шығаруда қолдана білуге үйрету
|
Оқушылардың басым бөлігі:
|
Центрге үдеуі шамасымен танысады.
|
Кейбір оқушылар:
|
Білімді сыныптастарына түсіндіріп оқулықтан тыс ресурстар қоса алады.
|
Бағалау критерийі
|
Центрге тартқыш үдеу жайлы мағлұмат алады
Центрге тартқыш үдеу формулаларын есеп шығаруда қолдана білуге үйренеді
|
Тілдік мақсат
|
Оқушылар:
Центрге үдеуі шамасымен зерттеу.
Негізгі сөздер мен тіркестер:
Үдеу, центрлік бұрыш
Сыныптағы диалог/жазылым үшін пайдалы тілдік бірліктер:
Талқылауға арналған тармақтар:
Сіз неліктен... екенін айта аласыз ба?
Жазылым бойынша ұсыныстар:
|
Құндылықтар
|
Құрмет, ынтымақстастық, өмір бойы оқу, азаматтық жауапкершілік, ашықтық.
|
АКТ дағдысынқолдану
|
Осы сабақ барысында оқушылар Power Point бағдарламасынан тақырыпқа қатысты көрнекі құралдарды пайдаланып, интербелсенді тақтаны қолданады.
|
Алдыңғы оқу
|
Сызықтық және бұрыштық жылдамдықтар
|
Жоспарланған
уақыт
|
Жоспарланған жаттығулар (төменде
жоспарланған жаттығулармен қатар,
ескертпелерді жазыңыз)
|
Ресурстар
|
Басталуы 5 минут
|
Топқа бөлу 2 минут
Себетпен конфет әкелу. Оқушыларға себеттен конфет алуларын сұраймын.Конфеттің түрлеріне қарай 3 топқа бөлініп отырады.
Психологиялық ахуал қалыптастыру:
3 минут
«Қызыл гүлім-ай» би
сұрақ-жауап (фронтальды түрде)
Үй тапсырмасын сұрау (4 минут)
Үй жұмысын тексеру кезеңі.
Физикалық диктант.
1.Теңүдемелі қозғалыс үшін жылдамдық формуласы
2. Теңкемімелі қозғалыс үшін орынауыстыру формуласы
3. Бастапқы жылдамдық 0-ге тең кездегі орынауыстыру формуласы.
4.Үдеудің формуласы
5.Түсу уақытының формуласы
6.Бұрыштық жылдамдықтың периодпен байланысты формуласы
7.Сызықтық жылдамдықтың жиілікпен байланысты формуласы
8.П-дің мәні неге тең?
1.Теңкемімелі қозғалыс үшін жылдамдық формуласы
2.Теңүдемелі қозғалыс үшін орын ауыстыруформуласы
3. Бастапқы жылдамдық нөлге тең кездегі жылдамдықтың формуласы
|
1-топ «Сары кәмпиттер»
2-топ «Көк кәмпиттер»
3-топ «Қызыл кәмпиттер»
|
Ортасы
20 минут
|
Жаңа сабақты түсіндіру кезеңі.Бұрыштық жылдамдық деп дененің бұрылу бұрышының осы бұрылуға кеткен уақытқа қатынасымен өлшенетін шаманы айтады.
Өлшем бірлігі:![](data:image/png;base64,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)
Сызықтық жылдамдық:
Сызықтық жылдамдық пен бұрыштық жылдамдықтар арасындағы байланыс.
Шеңбер бойымен бірқалыпты қозғалатын дененің үдеуі шеңбердің кез келген нүктесінде радиус бойымен оның центріне қарай бағытталатын үдеу центрге тартқыш үдеу деп аталады.
Үдеу векторы материялық нүктенің шеңбер бойымен қозғалу жылдамдығына перпендикуляр болады. сол себепті центрге тартқыш үдеуді нормаль үдеу деп те атайды.
Жұптық жұмыс «Пилот - Штурман» (5 минут)
(Штурман – басқарушы, пилот – орындаушы)
Берілген суретті түсіндіру, яғни штурман айтып отырады, пилот қағаз бетіне түсіріп отырады.
1) 2)
![](data:image/png;base64,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)
Жеке жұмыс «Кім білімді»
Модулі тұрақты жылдамдықпен шеңбер бойымен қозғалатын дененің үдеуі қалай бағытталған?
Центрге тартқыш үдеу дегеніміз не?
Неліктен центрге тартқыш үдеуді нормалыь үдеу деп атайды?
Центрге тартқыш үдеудің формуласы қандай?
Центрге тартқыш үдеуді айналу периоды арқылы қалай өрнектеуге болады?
Центрге тартқыш үдеуді жиілік арқылы қалай өрнектеуге болады?
|
«Әлемді шарлау» әдісі арқылы түсіндіріледі.
«Интервью» әдісі
Оқушылар өз оайларын стикерлерге жазып жабыстырады.
|