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)
A) АО.
B) АD
C) СO.
D) AB.
E) AC.
13. Тербеліс амплитудасының артуына байланысты дыбыс қаттылығы:
A) Өзгермейді.
B) Кемиді.
C) Артады.
D) 2 есе кемиді.
E) 2 есе артады.
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14. Изотермиялық процесс кезінде газға 2108 Дж жылу мөлшері берілген. Ішкі энергияның өзгерісін анықтаңыз.
A) 108 Дж.
B) 0.
C) 4108 Дж.
D) 2108 Дж.
E) 6108 Дж.
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15. Ұшақ “өлі тұзақ” фигурасын орындаған кезде белгіленген нүктелерде ұшқышқа орындық тарапынан әсер ететін минимал серпімділік күші
A) 4-нүктеде.
B) 1-нүктеде.
C) 3-нүктеде.
D) 2-нүктеде.
E) Барлық нүктелерде бірдей.
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16. Екі өткізгіш тізбектегі қосқанда 27 Ом, ал параллель қосқанда 6 Ом кедергі береді. Әрқайсысының кедергісі.
A) 38; 16.
B) 36; 18.
C) 9; 6.
D) 19; 8.
E) 18; 9.
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17. Көлемі тұрақты болған жағдайда, газ қысымы 2 есе артатын болса, онда сол газдың температурасы
A) 2 есе артады.
B) өзгермейді.
C) 4 есе кемиді.
D) 4 есе артады.
E) 2 есе кемиді.
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18. Салыстырмалық теориясының ядролық физика және элементар бөлшектер физикасы үшін ең маңызды салдары.
A) .
B) .
C) E0 = m0c2.
D) .
E) .
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19. Кернеу көзінен ағытылған зарядталған конденсатор астарларының арасына e=5 диэлектрик орналыстырса, конденсатор энергиясы:
A) 5 есе азаяды.
B) өзгермейдi.
C) 25 есе артады.
D) 5 есе артады.
E) 25 есе азаяды.
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20. Элементар бөлшектерді тіркейтін құралдардың газдың екпінді иондалуы кезінде ток импульсінің пайда болу құбылысына негізделуі
A) Қалың қабатты фотоэмульсияда.
B) Вильсон камерасында.
C) Фотокамерада.
D) Көпіршіктік камерада.
E) Гейгер есептегішінде.
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21. Төменде келтірілген заттардың қайсылары үшін Ом заңы орындалады:
1. Металдар;
2. Вакуум;
3. Газдар.
A) 1, 2 – иә, 3 – жоқ.
B) Тек қана 1.
C) Тек қана 3.
D) 1, 3 – иә, 2 – жоқ.
E) Тек қана 2.
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22. Сыйымдылықтары С1=1 мкФ, С2=2 мкФ, С3=3 мкФ үш конденсаторлар берiлген. Осыларды қосқанда алынатын ең аз сыйымдылық:
A) 1/2 мкФ.
B) 6/13 мкФ.
C) 3/11 мкФ.
D) 1/6 мкФ.
E) 6/11 мкФ.
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23. Оқушы горизонталь жазықтықта жіпке ілінген шарды бір қалыпты радиусы 0,5 м шеңбер бойымен айналдырады. Шар 60 с-та 30 рет айналса, оның үдеуінің модулі
A) 11 м/с2.
B) 0 м/с2.
C) 5 м/с2.
D) 10 м/с2.
E) 0,8 м/с2.
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24. h биіктікте тұрған денені жоғары көтеріп қойғанда, оның нөлдік деңгейге қатысты потенциалдық энергиясы 2 есе артты. Дененің биіктіктерінің өзгерісі
A) 0,4h.
B) 0,2h.
C) 0,6h.
D) h.
E) 0,8h.
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25. Толќын ұзындығы 0,5 мкм жарыќтың бірінші дифракциялыќ максимумы 30° бұрышпен байќалуы үшін, дифракциялыќ торда 1мм-дегі штрих саны
A) 500.
B) 106.
C) 2·106.
D) 103.
E) 2·103.
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