Na Figura 7, as esferas m2 e m3 estão inicialmente em repous...
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Ano: 2017
Banca:
UDESC
Órgão:
UDESC
Prova:
UDESC - 2017 - UDESC - Vestibular - Primeiro Semestre (Tarde) |
Q1264622
Física
Na Figura 7, as esferas m2 e m3 estão inicialmente em repouso, enquanto a esfera m1
aproxima-se, pela esquerda, com velocidade constante v1. Após sofrer uma colisão
perfeitamente elástica com m2; m1 fica em repouso e m2 segue em movimento em direção a m3.
A colisão entre m2 e m3 é perfeitamente inelástica.
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questão](data:image/png;base64,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)
Assinale a alternativa que representa a razão entre a velocidade de m3, após esta colisão, e a velocidade inicial de m1.
Assinale a alternativa que representa a razão entre a velocidade de m3, após esta colisão, e a velocidade inicial de m1.