|
Оқушының оқу жетістігін өлшейтін бағалау критерийі
|
бет | 9/10 | Дата | 12.03.2020 | өлшемі | 1,29 Mb. | | #60067 |
| Байланысты: 4 сынып өзгертілген бжб Бағалау критерийі | Тапсырма | Дескриптор. Білім алушы | Балл | қозғалысына берілген есептерді шығарады | 1 | -жақындау жылдамдығын табу өрнегін құрады; - өрнектің мәнін табады; -өрнектің мәнін табады; - есептің жауабын жазады; | 1 1 1 1 1 | Қозғалыс графигі бойынша есептеулер жүргізеді | 2 | -жаяу адамның жылдамдығын анықтайды; -велосипедшінің жылдамдығын анықтайды; -арақашықтыққа қатысты уақытты анықтайды | 1 1 1 1 | Барлығы: | | | 9 |
«Қозғалысқа, өнімділікке берілген есептер» бөлімі бойынша жиынтық бағалаудың нәтижесіне қатысты ата-аналарға ақпарат ұсынуға арналған рубрика
Білім алушының аты –жөні: .......................................................
Бағалаукритерийі
|
№
|
Оқужетістіктерініңдеңгейі
|
Төмен
|
Орта
|
Жоғары
|
Қуып жету қозғалысына берілген есептерді шығарады
|
1
|
Қуып жету қозғалысына берілген есептерді шығаруда қиналады
|
Жақындау жылдамдығын/ уақытты табу өрнектерін құрастыруда, өрнектің мәнін табуда қателіктер жібереді.
|
Қуып жету қозғалысына берілген есептерді дұрыс шығарады.
|
Қозғалыс графигі бойынша есептеулер жүргізеді
|
2
|
Қозғалыс графигі бойынша нысандардың қозғалысын анықтауда қиналады.
|
Қозғалыс графигі бойынша қозғалыстағы денелердің жылдамдығын/ жүрілген қашықтықты/ жұмсалған уақытты анықтауда қателіктер жібереді.
|
Қозғалыс графигі бойынша дұрыс есептеулер жүргізеді
|
«Қозғалысқа, өнімділікке берілген есептер» бөлімі бойынша жиынтық бағалау
ІІ нұсқа
Бөлімше
|
5.1 Есептер және математикалық модель
3.3 Нүктелер координаттары және қозғалыс бағыты
|
Оқу мақсаты
|
4.5.1.9**Артынан қуып жету, бір бағыттағы қалып қою қозғалысына берілген есептерді арифметикалық және алгебралық әдіспен шешу
4.3.3.1 Қозғалыстың басталуы мен бағытын пайдалана отырып, нысандар қозғалысы сызбасын құру, сәйкес есептеулер жүргізу;
|
Бағалау критерийі
|
Білім алушы
|
Ойлау дағдыларының деңгейі
|
Қолдану
Жоғары деңгей дағдылары
|
Орындау уақыты
|
20 минут
|
2-нұсқа
1.Сызбаны пайдаланып, есепті шығар.
70км/сағ 50км/сағ
![](data:image/png;base64,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) ![](data:image/png;base64,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)
S=60км/сағ
2.Берілген график бойынша сұрақтарға жауап бер.
Достарыңызбен бөлісу: |
|
|