dinâmica
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PiR2 :: Física :: Mecânica Geral
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dinâmica
No esquema da figura, tem-se o sistema locomovendo-se horizontalmente, sob a ação da resultante externa
F→
. A polia tem peso desprezível, o fio que passa por ela é ideal e a influência do ar no local do movimento é irrelevante. Não há contato da esfera B com a parede vertical
![dinâmica 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)
Sendo
A=10kgm
,
B=6kg
,
C=144kg
e
g=10m/s
determine a intensidade de F→que faz com que não haja movimento dos dois corpos A e B em relação ao C.
F→
. A polia tem peso desprezível, o fio que passa por ela é ideal e a influência do ar no local do movimento é irrelevante. Não há contato da esfera B com a parede vertical
Sendo
A=10kgm
,
B=6kg
,
C=144kg
e
g=10m/s
determine a intensidade de F→que faz com que não haja movimento dos dois corpos A e B em relação ao C.
o terror das bancas,vinny- Iniciante
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o terror das bancas,vinny gosta desta mensagem
Re: dinâmica
Questão existente no fórum:
https://pir2.forumeiros.com/t11055-poliedro-sistema-em-locomocao
Por favor, sempre pesquise ates de postar.
https://pir2.forumeiros.com/t11055-poliedro-sistema-em-locomocao
Por favor, sempre pesquise ates de postar.
Elcioschin- Grande Mestre
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PiR2 :: Física :: Mecânica Geral
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