Жаңа сабақ
Техника және тұрмыста әр түрлі тұтынушылар: қыздыру шамдары, үтіктер, электр пештері, электрқозғалтқыштары және т. б. қолданылады.
Өткізгіштерді жалғаудың тәсілдерін қарастырайық.
1- жағдай. Егер бірінші өткізгіштің соңы екінші өткізгіштің басымен, екіншінің соңы үшіншінің басымен жалғанса, онда мұндай қосуды тізбектей жалғау деп атайды.
Бір секундта өткізгіштің көлденең қимасы арқылы бірдей мөлшердегі еркін заряд тасушылар өтсе, өткізгіштерді тізбектей жалғағанда, өткізгіштердегі ток күшінің шамасы I бірдей болады. Алайда өткізгіштің ұштарындағы U1 және U2 кернеулері әр түрлі. Тізбектің әрбір бөлігіне Ом заңын қолданамыз. Демек, U = IR .
U1 = IR1; U2 = IR2 ; U = U1 + U2 екенін ескере отырып:
U = IR1 + IR2 = I * ( R1+ R2) аламыз.
Егер R арқылы өткізгіштердің жалпы кедергісін белгілесек, онда
R = R1 + R2.
Тізбектей жалғанған бірнеше өткізгіштен тұратын тізбектің кедергісі жеке өткізгіштер кедергілерінің қосындысына тең.
Өткізгіштерді тізбектей жалғағанда ток күштері тең, ал тізбектегі жалпы кернеу оның бөліктеріндегі кернеулердің қосындысына тең болады, ал жалпы кедергі әрбір өткізгіштің кедергілерінің қосындысынан тұрады: I = I1 = I2 = … = In;
U = U1 + U2 + … + Un;
R = R1 + R2 + … + Rn .
2-жағдай. Егер өткізгіштердің басын бір ғана А нүктесінде, ал ұштарын екінші бір В нүктесінде жалғасақ, онда мұндай жалғауды өткізгіштердің параллель жалғау деп атайды.
Электр тізбегінің екі өткізгіштен артық өткізгіштер түйісетін нүктесін түйін (суретте А және В нүктелері) деп атайды.
Тізбекті параллель жалғағанда, екі параллель арнаға тармақталған су ағыны тәрізді, ток өткізгіштер бойымен тармақталады.
I1 және I2 тармақталған ток күштерінің қосындысы тармақталмаған бөлігіндегі I токтың шамасына тең, яғни I = I1 + I2.
Ом заңының негізінде бірінші өткізгіштің ұшындағы кернеу:
U1 = I1 + R1, ал екінші өткізгіштің ұшындағы кернеу: U2 = I2 + R2 болады.
U1 және U2 бір-біріне тең, себебі, олар А және В бір ғана нүктелердің (түйіндердің) арасындағы кернеу болып табылады, осыдан U1 = U2 = U екендігі шығады.
Жоғарыдағыны ескеріп және жалпы кедергіні R
арқылы белгілей отырып, I1 = U / R1 , I2 = U / R2
формулаларын аламыз.
Бұл формулалардың оң және сол жақ бөліктерін қосамыз, сонда
I1 + I2 = U / R1 + U / R2 немесе I = U / R1 + U / R2 .
Демек, U / R = U / R1 + U / R2 немесе 1 / R = 1 / R1 + 1 / R2 .
Өткізгіштерді параллель жалғағанда, тізбектің барлық бөліктерінде кернеу бірдей, ал жалпы ток күші әрбір өткізгіштегі ток күштерінің қосындысына тең, жалпы кедергі әрбір өткізгіштің кедергісінен кем болады. U = U1 = U2 = … = Un;
I = I1 = I2 + … + In ;
1 / R = 1 / R1 + 1 / R2 .
Денгейлік тапсырма
1. Суретте тізбектей жалғанған үш өткізгіштің сұлбасы берілген. Кедергісі R1 = 36 Oм өткізгіштегі кернеудің төмендеуі U1 = 9 B . Кедергісі R2 = 64 Oм болатын өткізгіштің кернеуін және олардың ұштарындағы кернеу 120 В болғандағы өткізгіштің R3 кедергісін анықтаңдар.
Берілгені:
Табу керек: R3 - ?
I1 = I2 = I3 = I
U1 = I*R, I = U1/R1 = U/36 = 0.26A
U2 = I*R2 = 0.25*64 = 1.6B
R3 = U3/I = 120/0.25 = 480(Oм)
Жауабы: 16 В, 480 Ом
2![](data:image/png;base64,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) 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) . Суретте параллель жалғанған екі өткізгіштің сұлбасы берілген. Кедергісі өткізгіш арқылы ток өтеді.
ток өткендегі өткізгіштің кедергісін анықтаңдар.
Берілгені: R1 = 44 Ом U1 = U2 = U
I1 = 5 А U1 = I1*R1 = 5*44 = 220(B)
I2 = 0.8 А R2 = U/I2 = 220/0.8 = 275(Ом)
Табу керек: R2 = ? Жауабы: 275 Ом
3. Кедергілері 20 Ом және 30 Ом болатын екі резистор кернеуі 24 В электр тізбегіне жалғанған. Тізбекке екі резисторды тізбектей және параллель жалғағандағы ток күші қандай?
Берілгені: R1 = 20 Ом I1=I2=I R1=R2=R U=I1 (R1+R2)
R2 = 30 Ом I1=U/R1+R2=24/20+30=24/50=0.48A
R2 = 30 Ом
U = 24 B U=I*R U1=U2=U I1+I2=I 1/R=1/R1+1/R2 Табу керек Im - ? In - ? I1=U/R1=24/20=1.2A I2=U/R2=24/30=0.8A
I=I1+I=1.2+0.8=2A
Жауабы: 0,48 А; 2 А.
Балама тесті (иә, жоқ)
Өткізгіштің материалын сипаттайтын шаманы кедергі деп атайды.
Ток күшін өлшейтін құралды вольтметр деп атайды.
Электр тогының қуаты деп уақыт бірлігіндегі жасалған жұмысты айтады.
Уақыт бірлігіндегі өндірілген токтың жұмысы кернеу деп аталады.
Шамалар
Физикалық шамалар
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Белгіленуі
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Өлшем бірлігі
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Ток күші
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I
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A
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Кернеу
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U
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B
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Кедергі
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R
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Ом
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Меншікті кедергі
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ρ
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Ом/м
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Формулалар
Шамалардың арасындағы байланыс
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Формуласы
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Өлшем бірлігі
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Ом заңы
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U = I*R
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B
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Өткізгіштің кедергісі және оның өлшем бірліктері
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R = U/I
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Ом
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Электр қозғаушы күш
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Е = I*R + r
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B
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Сабақты бекіту және қорыту:
Аккумуляторды зарядтау кезінде оның қақпақтарын ашып қояды неге?
Жауабы: аккумуляторды зарядтау кезінде сутегі мен оттегі бөлінеді. Егер қақпақ ашылмаса жиналған газ аккумуляторды жарып жіберуі мүмкін.
2. Қараңғыда қант сындырғанда әлсіз жарқылды байқауға болады. Осыны түсіндіріңдер.
Жауабы: Қант сындырғанда зарядталады.
3. Неге электр сымдарына қонып отырған құс, жоғары кернеуді қосқанда ұшып кетеді?
Жауабы: Электростатикалық өрістен құс қауырсындары өзара әсерлесіп аралары ашыла бастайды. Осы қолайсыз әсер құстың ұшуына себеп болады.
4. Электр желісіне ұшып келіп қонған құсқа токтың әсері неге білінбейді?
Жауабы: Құстың денесі мен оның аяқтары арасындағы өткізгіш бөлігі өзара параллель. Мұндай тізбектегі ток күші кедергіге кері пропорционал құс денесінің кедергісі АВ өткізгіш кедергісінен анағұрлым артық болатын, ондағы ток күші аз. Ол құсқа қауіпті.
Үй тапсырмасы:
§41.
20 жаттығу.
№4 - №6 есептер.
Достарыңызбен бөлісу: |