Lei de Faraday-Lenz
2 participantes
Página 1 de 1
Lei de Faraday-Lenz
A figura mostra uma espira condutora que se desloca da esquerda para a direita com velocidade constante v, atravessando uma região com campo magnético uniforme B que está entrando na página.
![Lei de Faraday-Lenz WXBpP7KrmP0bgAAAABJRU5ErkJggg==](data:image/png;base64,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)
Assinale a alternativa que representa corretamente a corrente I que circula na espira, em função do tempo, enquanto a espira se desloca.
![Lei de Faraday-Lenz B8jHzxiQkNiWAAAAABJRU5ErkJggg==](data:image/png;base64,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)
Por que a corrente induzida surge "de imediato" na espira? Por que o gabarito não poderia ser letra B, por exemplo?
Assinale a alternativa que representa corretamente a corrente I que circula na espira, em função do tempo, enquanto a espira se desloca.
- Gabarito:
- D
Por que a corrente induzida surge "de imediato" na espira? Por que o gabarito não poderia ser letra B, por exemplo?
guuigo- Padawan
- Mensagens : 61
Data de inscrição : 20/08/2023
Re: Lei de Faraday-Lenz
Como a velocidade é constante, o aumento de campo segue um valor constante, isto é, a derivada do fluxo no tempo não depende do tempo. O ângulo e o campo são constantes, o que muda é a área: S = xy = y(vt), daí a derivada do fluxo é sempre Byv (uma constante), então a corrente é constante. Nota que num primeiro momento ela está para um lado, lutando contra o aumento das linhas que entram no plano, gerando campo saindo (corrente anti-horária). No segundo, toda a espira está dentro e a corrente para. Por fim, luta contra a diminuição do campo que entra no plano, gerando campo entrando (corrente horária).
Lipo_f- Recebeu o sabre de luz
- Mensagens : 125
Data de inscrição : 16/05/2024
Idade : 19
Localização : Belém, Pará
guuigo gosta desta mensagem
![-](https://2img.net/i/empty.gif)
» Lei de Lenz e Lei de Faraday
» Faraday-Lenz
» Eletromagnetismo - Indutância, Lei de Lenz, de Faraday
» Sobre Lei de Faraday e Lei de lenz.
» Leis de Faraday e Lenz
» Faraday-Lenz
» Eletromagnetismo - Indutância, Lei de Lenz, de Faraday
» Sobre Lei de Faraday e Lei de lenz.
» Leis de Faraday e Lenz
Página 1 de 1
Permissões neste sub-fórum
Não podes responder a tópicos