6. Үй тапсырмасы: 9.3. тақырып. Сұрақ 3. №61, №62
Сабақ №__44__
Күні:______
Сынып:_11___
Сабақтың тақырыбы: Шардың көлемі.
Мақсаты:
Типі: Бекіту сабақ.
Сабақтың көрнекілігі: Шар демонстрациялық плакат.
Оқыту әдісі: Практикалық
Сабақтың барысы:
1.Ұйымдастыру кезеңі
Оқушылардың сабаққа дайындығы және оқу бөлмесінің, ақпараттық техниканың дайындығы тексеріледі. Оқушылармен сәлемдесу.
2.Үй тапсырмасын тексеру
1) Үй есебінің орындалуын тексеру және шығару жолын талдау.
2) Өткен тақырыпты қайталау:
Шардың көлемінің формуласы?
3.Есептер шығару
Тақтада есептер шығару: №63, №64, №65
Өздіктерінен есептер шығару: №66, №67
5.Бекіту
Шардың көлемінің формуласы?
Диаметрі 4-ке тең шар бетінің ауданы көп пе әлде көлемі көп пе?
Диаметрі 10-ға шар бетінің ауданы көп пе әлде көлемі көп пе?
6. Үй тапсырмасы: 9.3. тақырып. Сұрақ 3. №68, №69
Оқушыларға сабаққа қатысқанына сай баға қою.
Сабақ №__45__
Күні:______
Сынып:_11___
Сабақтың тақырыбы: Шардың бөліктерінің көлемі.
Мақсаты:
Шардың бөліктерінің көлемі формуласымен таныстыру. Есептер шығару дағдыларын қалыптастыру.
Кеңістікті елестету арқылы бейнелеу дағдыларын, талдау жасай білу, жалпылау, жүйелеу және қорытынды жасай алу біліктерін дамытуға жағдай жасау.
Оқушыларды белсенді танымдық іс-әрекетке жұмылдыру арқылы пәнге деген ынтасын, қызығушылығын арттыруға, кәсіби бағдар беруге мүмкіндік туғызу.
Типі: Жаңа сабақ.
Сабақтың көрнекілігі: Шар бөліктері демонстрациялық плакат.
Оқыту әдісі: Түсіндіру
Сабақтың барысы:
1.Ұйымдастыру кезеңі
Оқушылардың сабаққа дайындығы және оқу бөлмесінің, ақпараттық техниканың дайындығы тексеріледі. Оқушылармен сәлемдесу.
2.Үй тапсырмасын тексеру
Үй есебінің орындалуын тексеру және шығару жолын талдау.
3.Жаңа тақырыпты түсіндіру
28- теорема. Шар сегментінің көлемі мына формуламен анықталады: V═ Н 2 (R - ) , мұндағы R- шардың радиусы, ал Н сегменттің биіктігі
98- теорема. Шар секторының көлемі мына формуламен анықталады: V═ ![](data:image/png;base64,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) R 2 Н , мұндағы R- шардың радиусы, ал Н сегменттің биіктігі
.
4.Есептер шығару
Тақтада есептер шығару: №70, №71, №72
Өздіктерінен есептер шығару: №73, №74
5.Бекіту
Шар сегментінің көлемі?
Шар секторының көлемі
Достарыңызбен бөлісу: |