O gráfico abaixo apresenta os dados referentes à frequência...
Próximas questões
Com base no mesmo assunto
Ano: 2018
Banca:
INEP
Órgão:
IF Sul Rio-Grandense
Provas:
INEP - 2018 - IF Sul Rio-Grandense - Vestibular Segundo Semestre - Língua Inglesa
|
INEP - 2018 - IF Sul Rio-Grandense - Vestibular Segundo Semestre - Língua Espanhola |
Q1344059
Matemática
O gráfico abaixo apresenta os dados referentes
à frequência de crianças na escola de acordo
com a faixa etária. O gráfico compara os dados
dos anos 2001 e 2012.
![Imagem associada para resolução da questão](data:image/png;base64,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)
Fonte: PNAD/IBGE
Com base no gráfico, é correto afirmar que
I - a taxa de frequência de crianças de até 3 anos aumentou mais de 100% entre os anos de 2001 e 2012.
II - a taxa de frequência de crianças com idade entre 4 ou 5 anos teve um crescimento inferior a 50% entre 2001 e 2012.
III - houve uma redução na taxa de frequência, maior que 10%, comparando-se alunos com idade de 6 a 14 com os alunos de 15 a 17 anos, em 2001 e 2012.
IV - a taxa de frequência de crianças entre 6 e 14 anos aumentou menos de 5% de 2001 para 2012.
Estão corretas
Fonte: PNAD/IBGE
Com base no gráfico, é correto afirmar que
I - a taxa de frequência de crianças de até 3 anos aumentou mais de 100% entre os anos de 2001 e 2012.
II - a taxa de frequência de crianças com idade entre 4 ou 5 anos teve um crescimento inferior a 50% entre 2001 e 2012.
III - houve uma redução na taxa de frequência, maior que 10%, comparando-se alunos com idade de 6 a 14 com os alunos de 15 a 17 anos, em 2001 e 2012.
IV - a taxa de frequência de crianças entre 6 e 14 anos aumentou menos de 5% de 2001 para 2012.
Estão corretas