Considere a análise de circuitos pelo Teorema de Thévenin e ...
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Q2439969
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Considere a análise de circuitos pelo Teorema de Thévenin e analise as afirmativas abaixo e dê valores Verdadeiro (V) ou Falso (F).
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questão](data:image/png;base64,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)
Figura – Circuito Equivalente de Thévenin
( ) Qualquer circuito linear com dois terminais pode ser substituído por um circuito equivalente, contendo uma fonte de tensão e um resistor em série. O circuito da figura com seus dois terminais de saída, pode ser substituído por um gerador de tensão ETH, em série com uma resistência RTH.
( ) O Gerador Equivalente de Thévenin ETH é igual à tensão em curto-circuito entre os dois terminais do circuito. A orientação (polaridade) de ETH depende da polaridade dos terminais.
( ) A Resistência Equivalente de Thévenin RTH é igual à resistência equivalente entre os dois terminais do circuito, quando considerarmos os geradores de tensão em curto-circuito e os geradores de corrente em aberto.
A alternativa que apresenta a sequência correta de cima para baixo.
Figura – Circuito Equivalente de Thévenin
( ) Qualquer circuito linear com dois terminais pode ser substituído por um circuito equivalente, contendo uma fonte de tensão e um resistor em série. O circuito da figura com seus dois terminais de saída, pode ser substituído por um gerador de tensão ETH, em série com uma resistência RTH.
( ) O Gerador Equivalente de Thévenin ETH é igual à tensão em curto-circuito entre os dois terminais do circuito. A orientação (polaridade) de ETH depende da polaridade dos terminais.
( ) A Resistência Equivalente de Thévenin RTH é igual à resistência equivalente entre os dois terminais do circuito, quando considerarmos os geradores de tensão em curto-circuito e os geradores de corrente em aberto.
A alternativa que apresenta a sequência correta de cima para baixo.