5. Тест жұмысы
1. Егер өткізгіштің актив бөлігінің ұзындығы 0,1 м болса, ток күші 50 А болғанда өткізгішке индукциясы 10 мТл магнит өрісі әсер ететін күш (Өрістің индукция сызықтары мен ток өзара перпендикуляр)
A) 40 мH B) 100 мH C) 60 мН D) 50 мH E) 20 мН
2. Біртекті магнит өрісінде индукция сызықтарына 30 ![](data:image/png;base64,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) бұрыш жасай орналасқан ұзындығы 0,5м, бойымен 3А ток өтіп жатқан түзу өткізгішке 9Н күш әсер етеді. Магнит өрісінің индукциясы
А) 5Тл В) 6Тл С) 12Тл D) 5,5Тл Е) 0,5Тл
3. Ұзындығы 40 см, бойындағы ток күші 2А, магнит өрісі индукция сызықтарына 30ғ бұрышпен орналасқан өткізгішке 0,4 Н күш әрекет етеді. Магнит өрісінің индукциясы
А) 4 Тл В) 1 Тл С) 105 Тл D) 2 Тл Е) 3 Тл
A) оң қол ережесі B) бұрғы ережесі C) сол қол ережесі
D) оң нормаль ережесі E) Ленц ережесі
5.Сымының орам ұзындығы 0,2м, электрқозғалтқыш якорінің орналасқан жеріндегі магнит индукциясы 0,25Тл. 20А ток күші өткенде, орамға әсер ететін күш
A) 2Н B) 1Н C) 3Н D) 5Н E) 4Н
6.Біртекті магнит өрісінің күш сызықтарына перпендикуляр орналасқан ұзындығы 50см өткізгішке 0,12Н күш әсер етеді. Өткізгіштегі ток күші 3А болғандағы, магнит индукциясы
A) 0,8 Тл B) 0,08 Тл C) 0,04 Тл D) 0,4 Тл E) 8 Тл
7. Ампер күшінің бағытын анықтайтын ереже
A) Оң қол ережесі B) Сол қол ережесі C) Ленц ережесі D) Бұранда ережесі
E) Архимед ережесі
8. Индукциясы 7,5 Тл біртекті магнит өрісіндегі түзу өткізгіш арқылы 4 А ток өткен кезде 20 см ұзындығына 3 Н күш әсер ететін болса, оның магнит күш сызықтарымен жасайтын бұрышы
A) 600 B) 300 C) 500 D) 400 E) 200
9. Магнит өрісі индукциясы сызықтарына 300 бұрыш жасай орналасқан ұзындығы 20см өткізгішке 0,4 Н күш әсер етеді. Өткізгіштегі ток күші 4А болса, магнит өрісі индукциясының шамасы
A) 2Тл B) 1Тл C) 3Тл D) 5Тл E) 4Тл
10. Біртекті магнит өрісінде индукция сызықтарына 30 0 бұрыш жасай орналасқан ұзындығы 0,5 м бойымен 3 А ток өтіп жатқан өткізгішке 9 Н күш әсер еткендегі магнит өрісі индукциясы
A) 10 Тл B) 12 Тл C) 14 Тл D) 8 Тл E) 6 Тл
6. Қорытынды
1. Қандай жаңа мәлімет алдыңыздар?
2. Ампер күші дегеніміз не?
3. Магнит индукциясының өлшем бірлігі қандай?
4. Сол қол ережесі қалай тұжырымдалады?
7. Үй тапсырма: оқу, «Ампер күші» тақырыбында реферат жазу.
10 сынып.
Сабақтың тақырыбы: “Кинематика және динамика негіздерін қайталау”.
Мақсаты:
а) Білімділік: “кинематика” және “динамика” тарауындағы негізгі физикалық ұғымдарды қайталап еске түсіру және оларды есептер шығаруда қолдана білуге үйрету.
ә) Дамытушылық: оқушылардың жеке тұлғалық қабілеттерін, белсенді сөйлеу қорын, есте сақтау қабілеттерін дамыту.
б) Тәрбиелік: оқушылардың белсенділігін арттыру, өз бетімен ізденуге, оқуға тәрбиелеу.
Сабақтың көрнекілігі: интерактивті тақта, арбаша, таразы, секундомер.
Сабақтың түрі: қорытындылау, білімді жинақтау сабағы.
Сабақтың әдісі: сұрақ-жауап, топпен жұмыс.
Сабақтың барысы
Ұйымдастыру кезеңі.
1. Викториналық сұрақтар
2. “Кім шапшаң?” тест тапсырмасын орындау
3. Қорытындылау тарау бойынша есептер шығару
4. Бағалау
5. Үйге тапсырма беру
Викториналық сұрақтар.
Кеңістікте белгілі пішіні мен нақты көлемі бар жеке тұрған нәрсені не деп атайды? (дене)
Дененің немесе материалық нүктенің санақ денесімен салыстырғандағы қозғалысы кезінде сызық түрінде қалдырған ізі қалай аталады? (траектория)
Механикалық қозғалыстарды сипаттайтын шамалар арасындағы байланысты қарастыратын бөлім (кинематика)
Өзінің сандық мәнімен қоса кеңістіктегі бағытымен де сипатталатын шамалар не деп аталады? (векторлар)
Жылдамдықтың өзгеру шапшандығын сипаттайтын шама (үдеу)
Ортаның кедергісі болмаған кездегі денелердің түсуі (еркін түсу үдеуі)
Периодқа кері шама (жиілік)
Денелердің өзара әрекеттесу заңдарын зерттейтін механиканың бөлімі (динамика)
Бүкіләлемдік тартылыс заңын кім ашты? (Ньютон)
Дененің салмағы нөлге тең болатын дененің күйі (салмақсыздық)
2.«Кім шапшаң?» тест тапсырмасын орындау.
1. Берілген шамалардың қайсысы скаляр шама болып табылады?
А) үдеу Б) период В) уақыт Г) жылдамдық
2. Қозғалыстың шапшаңдығын және бағытын көрсететін физикалық шама?
А) орын ауыстыру Б) жылдамдық В) үдеу Г) күш
3. Траектория дегеніміз не?
А) дененің бастапқы және соңғы орнын қосатын бағытталған кесінді
Б) дененің жүрген жолы
В) дененің кеңістіктегі жүріп өткен ізін көрсететін үзіліссіз сызық
4. “Кинематика” сөзі қандай мағына білдіреді?
А) траектория Б) сызық В) еркін түсу үдеуі Г) қозғалыс
5. Бірінші ғарыштық жылдамдық:
А) 7,9 км/с Б)11,2 км/с В) 7,8 км/с
6. Бүкіләлемдік тартылыс заңын кім ашты?
А) Галилей Б) Ньютон С) Архимед
7![](data:image/png;base64,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) 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) . Ньтонның екінші заңы:
А) Б) В)
8. Тіректің немесе аспаның үдемелі қозғалысынан туындайтын дене салмағының артуы
А ) салмақсыздық Б) дененің салмағы В) асқын салмақ
9. ненің формуласы?
А) Ньютонның екінші заңы Б) Бүкіләлемдік тартылыс заңы
В) Ньютонның үшінші заңы
3. Есептер шығару.
Автомобиль орнынан қозғалған сәттен-ақ тұрақты үдеуге ие болады. Ол қанша уақыттан кейін 54км/сағ жылдамдық алады?
36км/сағ жылдамдықпен қозғалып келе жатқан троллейбус тежелгеннен кейін 4с ішінде тоқтайды. Тежелу басталғаннан кейін ол қандай тұрақты үдеумен қозғалады?
Массасы 3кг дене 4м/с жылдамдықпен қозғалады. Дененің кинетикалық энергиясын табыңдар
Ү лкен мұз кесегінің салмағы 9кН. Мұздың массасын табыңдар
( )
М ассалары 20кг және 15кг қандай да бір дене қозғалып келе жатыр. Жердің радиусы . Жерге тартылу күшін табыңдар.
М ассасы 5кг дене 7м биіктікте тұр. Дененің потенциалдық энергиясын табыңдар.
Достарыңызбен бөлісу: |