Quatro bolas são lançadas horizontalmente no espaço, a parti...
Próximas questões
Com base no mesmo assunto
Ano: 2015
Banca:
UERJ
Órgão:
UERJ
Prova:
UERJ - 2015 - UERJ - Vestibular - Segundo Exame - Francês |
Q1283242
Física
Quatro bolas são lançadas horizontalmente no espaço, a partir da borda de uma mesa que está
sobre o solo. Veja na tabela abaixo algumas características dessas bolas.
![Imagem associada para resolução da questão](data:image/png;base64,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)
A relação entre os tempos de queda de cada bola pode ser expressa como:
A relação entre os tempos de queda de cada bola pode ser expressa como: