Questões de Vestibular UCPEL 2008 para Vestibular
Foram encontradas 2 questões
Q1359269
Física
O gráfico abaixo representa a velocidade de uma p(atm)
partícula, que se move em movimento retilíneo, em
função do tempo.
![Imagem associada para resolução da questão](data:image/png;base64,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)
Com base nesse gráfico, podemos afirmar que
I. entre t = 2,0 s e 4,0 s a força resultante atuante sobre a partícula é constante e diferente de zero.
II. entre t = 6,0 s e t = 10 s o movimento é uniformemente retardado.
III. a energia cinética da partícula é máxima em t = 10 s
IV. o trabalho realizado pela resultante das forças que atuam sobre a partícula entre t = 6,0 s e t = 10,0 s é um trabalho resistente.
V. o trabalho realizado pela resultante das forças que atuam sobre a partícula entre t = 2,0 s e t = 4,0 s é nulo.
É(são) correta(s)
Com base nesse gráfico, podemos afirmar que
I. entre t = 2,0 s e 4,0 s a força resultante atuante sobre a partícula é constante e diferente de zero.
II. entre t = 6,0 s e t = 10 s o movimento é uniformemente retardado.
III. a energia cinética da partícula é máxima em t = 10 s
IV. o trabalho realizado pela resultante das forças que atuam sobre a partícula entre t = 6,0 s e t = 10,0 s é um trabalho resistente.
V. o trabalho realizado pela resultante das forças que atuam sobre a partícula entre t = 2,0 s e t = 4,0 s é nulo.
É(são) correta(s)
Q1359274
Física
Considere as afirmações abaixo:
I. Se um elétron penetra em um campo magnético uniforme, com velocidade paralela ao campo sua trajetória é retilínea e o movimento uniforme.
II. Se um elétron penetra em um campo elétrico uniforme, com velocidade normal ao campo, sua trajetória é parabólica.
III. Se um elétron penetra num campo elétrico uniforme, com velocidade paralela ao campo e no mesmo sentido do campo, sua trajetória é reta e o movimento uniformemente acelerado.
IV. Se um elétron penetra num campo magnético uniforme, com velocidade perpendicular ao campo, sua trajetória é uma circunferência e o movimento é uniforme.
V. Se um elétron penetra num campo elétrico uniforme, com velocidade paralela ao campo e no mesmo sentido do campo, sua trajetória é reta e o movimento uniformemente retardado.
É (são) correta(s
I. Se um elétron penetra em um campo magnético uniforme, com velocidade paralela ao campo sua trajetória é retilínea e o movimento uniforme.
II. Se um elétron penetra em um campo elétrico uniforme, com velocidade normal ao campo, sua trajetória é parabólica.
III. Se um elétron penetra num campo elétrico uniforme, com velocidade paralela ao campo e no mesmo sentido do campo, sua trajetória é reta e o movimento uniformemente acelerado.
IV. Se um elétron penetra num campo magnético uniforme, com velocidade perpendicular ao campo, sua trajetória é uma circunferência e o movimento é uniforme.
V. Se um elétron penetra num campo elétrico uniforme, com velocidade paralela ao campo e no mesmo sentido do campo, sua trajetória é reta e o movimento uniformemente retardado.
É (são) correta(s