солға
оңға
жоғары
бақылаушыдан
бақылаушыға
$$$ 46
Парамагниттердің магниттік өтімділігі.....:
Бірден кіші
Бірден кіші немесе тең
Бірден үлкен
Бірден көп есе үлкен
Бірден кіші немесе үлкен шама бола алады.
$$$ 47
Біртекті магнит өрісте зарядталған бөлшектің айналу периоды оның массасына қалай тәуелді
Тура пропорционал
Кері пропорционал
Тәуелді емес
Массасының квадраттарына тура пропорционал
Барлығы бөлшектің зарядына тәуелді
$$$ 48
Скин эффект байқалады, егерде өткізгіш арқылы ток жүрсе....:
Тұрақты немесе айнымалы
өте тез айнымалы
кез-келген күш арқылы бірақ мына шарт орындалса өткізгіштің көлденең қимасы көп болса
Және өткізгіш осы жағдайда сыртқы магнит өрісінде орналасқан
Және оған айнымалы сыртқы магнит өрісімен әсер еткенде
$$$49
Ферромагнитті Кюри температурасына дейін қыздырсақ....:
Балқып кетеді
Магнит қасиетін жоғалтады
Парамагнитке айналады
Диамагнитке айналады
Ферромагниттердің магнит қасиеттері температураға тәуелді емес
$$$ 50
Эйнштейн-де-Газ тәжірибесінде затты қайталап магниттеуде неліктен айнымалы сыртқы өріс пайдаланылады
Сыналатын заттың айнымалы тербелістерін көбейту мақсатында
Сыналатын магниттеу үшін
Сыналатын заттың катушканың магнит өрісімен көбірек әсерлесу мақсатында
Сыналатын заттың магнит векторының бағытын өзгерту мақсатында
Мұндайды тәжірибеде пайдаланбайды
$$$ 51
Атомдармен электрондардың магнит моментімен механикалық моментінің арасындағы байланысты жүргізген мына тәжірибелер тағайындалады
Толмен және Стюартпен
Столетовтың
Эйнштэйн де Газа, Барнетпен
Кавендиш
Механикалық моментпен магниттік арасындағы байланыс жоқ
$$$ 52
Орбитаның радиусы 2*10-10м болса, электрон қандай жылдамдықпен айналады? Орбитальды магниттік момент 6,4*10-23А*м2
2*106м/с
3*106м/с
4*106м/с
5*103м/с
дұрыс дауап жоқ
$$$ 53
Кедергіге өткізгіштік ток ығысу тогымен толықтырылады, егерде тізбек мынандай болса:
Тізбектей қосылған кедергілер және конденсатор
Паралель қосылған кедергілер жіне конденсаторлар
Тізбектей қосылған кедергілер және айнымалы ток көзі
Айнымалы және тұрақты ток көздері болса
Физикада «ығысу тогы» деген жұмыс жоқ
$$$ 54
Максвел теңдеулерінің жүйелерінде Фарадейдің электромагниттік индукция заңының өрнегі қайсысы:
A.rot![](data:image/png;base64,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)
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