Questão sobre Circuito Elétrico.
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Questão sobre Circuito Elétrico.
No circuito a seguir, a resistência interna da bateria é desprezível.
![Questão sobre Circuito Elétrico. 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)
a) Calcule a resistência equivalente desse circuito.
b) Se a corrente tem intensidade i = 0,4 A, calcule a força eletromotriz da bateria.
Gabarito
a) 24Ω
b)24 V
Duvida na letra b. Nesse caso a ddp não é igual a força eletromotriz? Pois admitindo que sim, chego por U=Ri em 9,6V
Material gratuito do professor Boaro disponível no site dele
a) Calcule a resistência equivalente desse circuito.
b) Se a corrente tem intensidade i = 0,4 A, calcule a força eletromotriz da bateria.
Gabarito
a) 24Ω
b)24 V
Duvida na letra b. Nesse caso a ddp não é igual a força eletromotriz? Pois admitindo que sim, chego por U=Ri em 9,6V
Material gratuito do professor Boaro disponível no site dele
IcyTheBandito- Iniciante
- Mensagens : 15
Data de inscrição : 24/05/2024
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Re: Questão sobre Circuito Elétrico.
30 // 20 ---> R' = 12 Ω
12 + 12 ---> Re = 24 Ω
Seja i' a corrente em 20 Ω e I a corrente total do gerador
30 Ω ---> U(30) = 30.i ---> U(30) = 30.0,4 ---> U(30)= 12 V
U(20) = U(30) ---> 20.i' = 12 ---> i' = 0,6 A
I = i + i' ---> I = 0,4 + 0,6 --> I = 1,0 A ---> Corrente total em Re
E = Re.I ---> E = 24.1,0 ---> E = 24 V
12 + 12 ---> Re = 24 Ω
Seja i' a corrente em 20 Ω e I a corrente total do gerador
30 Ω ---> U(30) = 30.i ---> U(30) = 30.0,4 ---> U(30)= 12 V
U(20) = U(30) ---> 20.i' = 12 ---> i' = 0,6 A
I = i + i' ---> I = 0,4 + 0,6 --> I = 1,0 A ---> Corrente total em Re
E = Re.I ---> E = 24.1,0 ---> E = 24 V
Elcioschin- Grande Mestre
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