Алгебра
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Екі айнымалысы бар теңсіздіктер
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Сынып:
9
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Қатысқандар саны:
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Қатыспағандар саны:
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Сабақ негізделген оқу мақсаты
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Оқушыларға екі айналымы бар теңсіздіктер үғымын түсіндіру, теңсіздіктерді шешу жолдарын, теңсіздік шешімінің геометриялық бейнесін салуды, теңдеудің графигін дұрыс тұрғызуды үйрету.
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Сабақ
мақсаттары
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Барлық оқушылар: Теңсіздіктерді ажырата біледі, теңсіздіктердің шешімдерін табу тәсілдерін меңгереді.
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Оқушылардың басым бөлігі:
Есепті әртүрлі тәсілмен шығарады.
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Кейбір оқушылар: Саралау тапсырмаларын толық орындап шығады.
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Тілдік мақсат
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Негізгі сөздер мен тіркестер:
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Теңдеу. теңсіздік
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Жоспар
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Жоспарланған
уақыт
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Жоспарланған жаттығулар
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Ресурстар
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Басталуы
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Ұйыдастыру кезеңі: сыныпты түгелдеу,сабаққа дайындығын қадағалау Топқа бөліну:
Екі айнымалысы бар сызықтық теңдеу
Екі айнымалысы бар сызықтық емес теңдеу
сөздерін құрастыру арқылы 2 топқа бөлінеді.
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Қима қағаздар
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Білімдерін жан-жақты тексеру:
«Саралау тапсырмалары»
1тапсырма
Төмендегі функциялардың графигі қандай сызыққа сәйкес келеді? (формулалары беріледі)
ПАРАБОЛА
ТҮЗУ
ҚИСЫҚ СЫЗЫҚ
ШЕҢБЕР
ГИПЕРБОЛА
Дұрыс жауап көрсетіледі
2 тапсырма Теңсіздіктің жауаптарын сәйкестендіріңдер:
) х² -7 <0;
2) 49 - х² ≥0; б) (-∞;1)U(0;+∞);
3) х² + х>0 ; в) (-√7; √7);
г) [-7;7].
«Артығын алып таста»
Тақтадағы жазылған теңсіздіктің ішінен бір айнымалысы бар теңсіздік алынып тасталынады қалған екі айнымалысы бар теңсіздіктер қалады.Жаңа сабақтың тақырыбы анықталады,мақсаты айтылады.
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слайд
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Ортасы
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Екі айнымалысы бар теңсіздіктер
Екі айнымалысы бар теңсіздікті шешу алгоритмі:
Теңсіздікке сәйкес теңдеудің немесе функцияның түрін анықтау;
Ол теңдеудің немесе функцияның графигін координаталар жазықтығына салып, жазықтықты бөліктерге бөлу;
Жазықтықтың қай бөлігі теңсіздіктің шешімі болатынын анықтау;
Жалпы сыныппен алгоритм бойынша есептер талдау
2x + 3y ≥ 6
х2 + y2 ≤ 4
Берілген нүктелердің қайсысы теңсіздіктің шешімі болады? 3х+7у > 9
А(2;1) В(1;-2) С(0;1) Д(4;0)
Оқулықпен жұмыс. №101
Топтық жұмыс№2 «Ойлан, жұптас, бөліс»
(bilim land сайтынан тест)
Геометриялық кескіндерге сәйкес берілген теңсіздікті жазу (әр топ екі есептен талдап,түсіндіреді)
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)
Жеке жұмыс.
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