ddp em um circuito........
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ddp em um circuito........
No circuito a ddp entre os pontos A e B é:
![ddp em um circuito........ 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)
R/4,8V
estou com dúvida com relação a quando se pede a ddp ou a corrente eu sempre tenho que considerar todo o circuito e achar resistência equivalente?
R/4,8V
estou com dúvida com relação a quando se pede a ddp ou a corrente eu sempre tenho que considerar todo o circuito e achar resistência equivalente?
jesy- Jedi
- Mensagens : 433
Data de inscrição : 27/03/2012
Idade : 30
Localização : itumbiara goias brasil
Re: ddp em um circuito........
So se for necessário, às vezes vc calcula a req entre dois pontos de ddp conhecida so para achar a corrente, que daí possibilita calcular outras coisas...
Nessa questão 2 esta em série com 10 -->12 ohm (AB)
E 5 em série com 3 --> 8 ohm ( AB)
12.8/(12+8 ) = 4,8 ohm
agora vc tem uma malha única com o resistor de 1,2 ohm ao lado do gerador de 6V e o resistor de 4,8ohm em paralelo.
i = E/(∑R)
i = 6/(1,2+4,8 ) = 1A
Uab = 4,8;1 = 4,8V
Nessa questão 2 esta em série com 10 -->12 ohm (AB)
E 5 em série com 3 --> 8 ohm ( AB)
12.8/(12+8 ) = 4,8 ohm
agora vc tem uma malha única com o resistor de 1,2 ohm ao lado do gerador de 6V e o resistor de 4,8ohm em paralelo.
i = E/(∑R)
i = 6/(1,2+4,8 ) = 1A
Uab = 4,8;1 = 4,8V
Luck- Grupo
Velhos amigos do Fórum - Mensagens : 5322
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Idade : 31
Localização : RJ
Re: ddp em um circuito........
Com uma imagem:
![ddp em um circuito........ Trik](https://2img.net/h/s19.postimage.org/byplhynyb/trik.png)
![ddp em um circuito........ Trik](https://2img.net/h/s19.postimage.org/byplhynyb/trik.png)
____________________________________________
In memoriam - Euclides faleceu na madrugada do dia 3 de Abril de 2018.
![assinatura 1](https://i.servimg.com/u/f38/20/15/60/36/assina10.gif)
Lembre-se de que os vestibulares têm provas de Português também! Habitue-se a escrever corretamente em qualquer circunstância!
O Universo das coisas que eu não sei é incomensuravelmente maior do que o pacotinho de coisas que eu penso que sei.
Euclides- Fundador
- Mensagens : 32508
Data de inscrição : 07/07/2009
Idade : 74
Localização : São Paulo - SP
Re: ddp em um circuito........
gente muito obrigada, estou com um pouco de dificuldade em reordenar o circuito com resistência em serie e paralelo em identificar cada uma delas me ajudaram muito .
jesy- Jedi
- Mensagens : 433
Data de inscrição : 27/03/2012
Idade : 30
Localização : itumbiara goias brasil
Re: ddp em um circuito........
Luck escreveu:
Uab = 4,8;1 = 4,8V
mas por que usou a resistência que estava em paralelo e não a que estava ao lado do gerador para achar a tensão (1,2Ω )?
jesy- Jedi
- Mensagens : 433
Data de inscrição : 27/03/2012
Idade : 30
Localização : itumbiara goias brasil
Re: ddp em um circuito........
4,8 Ω e 1,2 Ω estão em série. A Req=6Ω, i=1A,
UAB=E-1,2.i --> 6-1,2=4,8V
UAB=E-1,2.i --> 6-1,2=4,8V
____________________________________________
In memoriam - Euclides faleceu na madrugada do dia 3 de Abril de 2018.
![assinatura 1](https://i.servimg.com/u/f38/20/15/60/36/assina10.gif)
Lembre-se de que os vestibulares têm provas de Português também! Habitue-se a escrever corretamente em qualquer circunstância!
O Universo das coisas que eu não sei é incomensuravelmente maior do que o pacotinho de coisas que eu penso que sei.
Euclides- Fundador
- Mensagens : 32508
Data de inscrição : 07/07/2009
Idade : 74
Localização : São Paulo - SP
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