Associaçao de Resistores
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Associaçao de Resistores
Na associação de resistores abaixo:
![Associaçao de Resistores 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)
Todos os resistores têm valor R.
Determine a resistência equivalente entre os pontos A e B. Se a
tensão aplicada entre os terminais A e B é igual a U, assinale a al-
ternativa que corresponde à potência dissipada pela associação.
Gab:11U^2/10R
Todos os resistores têm valor R.
Determine a resistência equivalente entre os pontos A e B. Se a
tensão aplicada entre os terminais A e B é igual a U, assinale a al-
ternativa que corresponde à potência dissipada pela associação.
Gab:11U^2/10R
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» associação de resistores.
» Associação de Resistores [4]
» Associação de Resistores
» Associação de Resistores
» Associação de resistores 2
» Associação de Resistores [4]
» Associação de Resistores
» Associação de Resistores
» Associação de resistores 2
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