Conservação do momento angular carrossel
PiR2 :: Física :: Mecânica Geral
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Conservação do momento angular carrossel
Uma criança está em pé na borda de um brinquedo giratório, um carrossel que tem a forma de um disco sólido, como mostrado na figura. A massa da criança é de 40 kg. O carrossel tem uma massa de 200 kg e um raio de 2,5 metros e está girando com uma velocidade angular de
= 2,0 radianos por segundo. A criança caminha, então, lentamente em direção ao centro do carrossel. Qual será a velocidade angular final do carrossel quando a criança chegar ao centro? (O tamanho da criança pode ser negligenciado.)
![Conservação do momento angular carrossel 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)
JaraBR- Iniciante
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Data de inscrição : 22/03/2022
Re: Conservação do momento angular carrossel
Resposta 2,8 rad/s
JaraBR- Iniciante
- Mensagens : 5
Data de inscrição : 22/03/2022
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» Conservação momento angular
» Conservação momento angular
» Conservação de Momento Angular
» conservaçao momento angular
» Conservação do Momento Angular
» Conservação momento angular
» Conservação de Momento Angular
» conservaçao momento angular
» Conservação do Momento Angular
PiR2 :: Física :: Mecânica Geral
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