Questão de dinâmica tópicos de física
3 participantes
PiR2 :: Física :: Mecânica Geral
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Questão de dinâmica tópicos de física
Uma partícula de massa 2,0 kg, inicialmente em repouso sobre o
solo, é puxada verticalmente para cima por uma força F, cuja intensidade
varia com a altura h, atingida pelo seu ponto de aplicação, conforme
mostra o gráfico:
![Questão de dinâmica tópicos de física 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)
No local, |g| = 10 m/s^2 e despreza-se a influência do ar. Considerando
a ascensão da partícula de h0 = 0 a h1 = 6,0 m, determine:
a) a altura em que a velocidade tem intensidade máxima;
b) a intensidade da velocidade para h1 = 6,0 m.
dúvida: Estou com dúvida do que acontecerá quando a força F for menor que o Peso. A partícula vai descer já que a força peso vai ser maior que a F ou a particula vai continuar subindo mas agora com uma desaceleração? Se for a segunda opção, por que ela continua subindo?
solo, é puxada verticalmente para cima por uma força F, cuja intensidade
varia com a altura h, atingida pelo seu ponto de aplicação, conforme
mostra o gráfico:
No local, |g| = 10 m/s^2 e despreza-se a influência do ar. Considerando
a ascensão da partícula de h0 = 0 a h1 = 6,0 m, determine:
a) a altura em que a velocidade tem intensidade máxima;
b) a intensidade da velocidade para h1 = 6,0 m.
dúvida: Estou com dúvida do que acontecerá quando a força F for menor que o Peso. A partícula vai descer já que a força peso vai ser maior que a F ou a particula vai continuar subindo mas agora com uma desaceleração? Se for a segunda opção, por que ela continua subindo?
@j_freitasz- Iniciante
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Data de inscrição : 09/07/2024
Re: Questão de dinâmica tópicos de física
A partícula irá acelerar até o instante em que a força F for igual ao peso (nesse instante a aceleração é nula e a velocidade é máxima, e a altura é h=3m), depois que a força F for diminuindo, ocorrerá um movimento retardado e a partícula irá subir desacelerando até atingir a altura máxima (h=6m), nesse altura, a velocidade é igual a 0 m/s
Alfaia- Iniciante
- Mensagens : 16
Data de inscrição : 02/04/2024
Re: Questão de dinâmica tópicos de física
mas o que faz a partícula continuar subindo?Alfaia escreveu:A partícula irá acelerar até o instante em que a força F for igual ao peso (nesse instante a aceleração é nula e a velocidade é máxima, e a altura é h=3m), depois que a força F for diminuindo, ocorrerá um movimento retardado e a partícula irá subir desacelerando até atingir a altura máxima (h=6m), nesse altura, a velocidade é igual a 0 m/s
@j_freitasz- Iniciante
- Mensagens : 4
Data de inscrição : 09/07/2024
Re: Questão de dinâmica tópicos de física
A Lei da inércia explica
Na altura h = 3 m a partícula possui velocidade máxima Vm
Ela não para instantaneamente, devido à inércia.
A partir dali o movimento é uniformemente retardado, com a velocidade chegando a zero em h = 6 m (altura máxima)
Na altura h = 3 m a partícula possui velocidade máxima Vm
Ela não para instantaneamente, devido à inércia.
A partir dali o movimento é uniformemente retardado, com a velocidade chegando a zero em h = 6 m (altura máxima)
Elcioschin- Grande Mestre
- Mensagens : 72411
Data de inscrição : 15/09/2009
Idade : 77
Localização : Santos/SP
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