circuito
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circuito
dado o circuito da figura determine os potenciais elétricos nos pontos a e b
![circuito 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)
resp: Va = 10 V e Vb = - 6 V
resp: Va = 10 V e Vb = - 6 V
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Re: circuito
i = U/Req --> i = 18/9 = 2A
Uab = r.i = 8.2 = 16 V
Va - Vb = 16
Se no meio tem zero volts o potencial de A será: 5.2 = 10 V
logo Vb = - 6V
Uab = r.i = 8.2 = 16 V
Va - Vb = 16
Se no meio tem zero volts o potencial de A será: 5.2 = 10 V
logo Vb = - 6V
____________________________________________
Thálisson.
Thálisson C- Monitor
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Re: circuito
valeu!
Kowalski- Estrela Dourada
- Mensagens : 2053
Data de inscrição : 20/10/2013
Idade : 25
Localização : Rio de Janeiro - RJ
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