Dois magnetos longos em forma de barra e idênticos são colo...
Próximas questões
Com base no mesmo assunto
Q1170320
Física
Dois magnetos longos em forma de barra
e idênticos são colocados sob um pedaço
de papel horizontal, como mostrado na
seguinte figura. O papel é coberto com
limalha de ferro. Quando os dois pólos
SUL estão a uma pequena distância e
encostam no papel, as limalhas de ferro
se movem em um padrão que mostra as
linhas do campo magnético. Qual das
alternativas a seguir ilustra melhor o
padrão resultante?
(S = Sul; N = Norte) ![Imagem associada para resolução da questão](data:image/png;base64,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)