Үйге тапсырма беру: Центрі В(4; 5; 5) нүктесінде жататын, радиусы 3-ке тең және хОz жазықтығына параллель орналасқан шеңбердің қиғашбұрышты фронталь диметриясын сал.
Сабақ: №
Сабақтың тақырыбы:
Геометриялық денелердің аксонометриялық проекцияларын салу.
Сабақтың мақсаты:
а) Білімділік: Сызу және техника жөнінде оқушыларға қысқаша
мәлімет беру.
ә) Дамытушылық: Оқушылардың жалпы сызу жөнінде сана-сезімін
дамыту.
б) Тәрбиелілік: Оқушыларды ұқыптылыққа, жүйелілікке тәрбиелеу.
Сабақтың көрнекілігі: А4 пішіміндегі қағаз, қарындаштар, сызғыш, өшіргіш, шеңберсызар және тағы басқа.
Сабақтың өту барысы:
Ұйымдастыру кезеңі.
Үйге берілген тапсырманы тексеру.
Жаңа тақырыпты түсіндіру.
Тапсырмаларды орындау.
Сабақты бекіту.
Үйге тапсырма.
Сабақтың барысы:
Ең алдымен геометриялық денелер жайлы оқушыларға түсіндіріп, тақтаға сызып көрсетемін. Геометриялық денелер жайлы алдағы сабақтарда өтетінімізді және де олар жайлы атап айтқанда пирамида, призма, цилиндр, конус, шар жайлы қысқаша ғана айтып өтемін. Және де олардың аксонометриялық проекциясын салуға бірнеше жаттығулар орындаймыз.
![](data:image/jpeg;base64,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) ![](data:image/jpeg;base64,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) ![](data:image/jpeg;base64,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)
Оқушыларға бірнеше жаттығу жұмыстарын көрсете отырып, оларға аксонометрилық проекцияларға арналған жаттығу жұмыстарын беремін.
Тікбұрышты аксонометрияның абциссалар және ординаталар осьтері бағытындағы бұрмалану көрсеткіштері и=0,6 және v=0,8 болсын. Аппликата осі бағытындағы бұрмалану көрсеткішін анықта.
Аксонометриялық перспективалық сурет бір және екі нүктеден
![](data:image/jpeg;base64,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)
Аксонометриялық проекция изометриялы
диметрия
Достарыңызбен бөлісу: |