Questões de Vestibular URCA 2021 para Prova I - Física / Matemática / Química / Biologia
Foram encontradas 60 questões
Ano: 2021
Banca:
CEV-URCA
Órgão:
URCA
Prova:
CEV-URCA - 2021 - URCA - Prova I - Física / Matemática / Química / Biologia |
Q1675952
Física
Uma das aplicações
científicas/tecnológica do conhecimento da
eletrostática foi a invenção da impressora a jato
de tinta. Esta impressora usa pequenas gotas de
tinta que podem ser eletricamente neutras ou
eletrizadas positiva ou negativamente. No
funcionamento da impressora essas gotas
penetram as placas defletoras onde existe um
campo elétrico uniforme “E”. As gotas atingem
o papel formando as letras. Observando a
figura a seguir nota-se o percurso de três gotas
atravessando a região entre as placas até
atingir o papel em baixo. Na figura abaixo a
direção do campo elétrico está indicada
emergindo da placa A para placa B. As gotas 1, 2 e 3, observando seus desvios, respectivamente
estão:
![Imagem associada para resolução da questão](data:image/png;base64,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)
Ano: 2021
Banca:
CEV-URCA
Órgão:
URCA
Prova:
CEV-URCA - 2021 - URCA - Prova I - Física / Matemática / Química / Biologia |
Q1675953
Física
O circuito de uma lâmpada piscante, bastante utilizado como sinalização nas obras de estrada, é apresentado na figura abaixo. Nele, um capacitor C = 0,3 μF, inicialmente descarregado, é ligado em paralelo com uma pequena lâmpada fluorescente L (de capacitância desprezível). O funcionamento do circuito se dá a partir de ciclos de carregamento e descarregamento do capacitor, durante o qual a lâmpada pisca uma vez por ciclo. Há passagem de corrente através da lâmpada sempre que seus terminais atingem a tensão de ruptura VL = 86, 0 V. Qual deve ser a força eletromotriz (fem) da fonte para que, durante a etapa de carregamento, a corrente final seja 60% da corrente inicial que atinge o capacitor?
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/79513/a92d4319c9011342f052.png)
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/79513/a92d4319c9011342f052.png)
Ano: 2021
Banca:
CEV-URCA
Órgão:
URCA
Prova:
CEV-URCA - 2021 - URCA - Prova I - Física / Matemática / Química / Biologia |
Q1675954
Física
Dois longos fios A e B, retos e paralelos, situados no vácuo, separados um do outro por l = 2 cm , são percorridos por correntes contrárias, ambas de intensidade i = 0,4 A, como mostra a figura. Considere que a permeabilidade magnética do vácuo é: μ0 = 4π x 10 -7 Tm/A. A respeito disso, marque a alternativa correta:
Ano: 2021
Banca:
CEV-URCA
Órgão:
URCA
Prova:
CEV-URCA - 2021 - URCA - Prova I - Física / Matemática / Química / Biologia |
Q1675955
Física
As ondas constituem os
elementos/objetos físicos indispensáveis em
qualquer descrição realística de nosso mundo. São fenômenos fundamentais encontrados em
todas as escalas do universo, desde a escala
microscópica, passando pela escala do mundo
cotidiano e até a escala astronômica. Por isso, as ondas representam conceitos unificadores
que são estudadas em todos os domínios da
física, desde o clássico, o quântico e até mesmo
o relativístico. De modo simples, ondas são
perturbações oscilatórias no espaço e
periódicas no tempo que se propagam com
velocidade bem definida. Entre as inúmeras
características notáveis das ondas, marque a
alternativa correta a respeito desse fenômeno
físico.
Ano: 2021
Banca:
CEV-URCA
Órgão:
URCA
Prova:
CEV-URCA - 2021 - URCA - Prova I - Física / Matemática / Química / Biologia |
Q1675956
Física
A física quântica e a física
moderna são ramos da física que tem suscitado
muito interesse nos últimos anos em virtude de
sua influência em muitos setores da vida
moderna (aplicação e construção de vários
dispositivos e instrumentos de medida
relevantes em áreas como a medicina, biologia, química, geologia, matemática, ciências
humanas, etc). Marque a alternativa correta
em relação a aspectos conceituais desta área do
conhecimento científico: