Questões de Concurso Público Prefeitura de Teresina - PI 2019 para Professor de 2º Ciclo (6º ao 9º ano) - Geografia
Foram encontradas 3 questões
Ano: 2019
Banca:
NUCEPE
Órgão:
Prefeitura de Teresina - PI
Prova:
NUCEPE - 2019 - Prefeitura de Teresina - PI - Professor de 2º Ciclo (6º ao 9º ano) - Geografia |
Q1729025
Geografia
Ao longo da etapa chamada pós-industrial ou pós-moderna, iniciada com o declínio do modelo
socioeconômico industrial tradicional, a partir dos anos de 1970, algumas áreas urbanas vem
passando por importantes processos de transformação, caracterizados normalmente pela ocupação dos
centros das cidades por uma parte da classe média, de elevada remuneração, que desloca os
habitantes da classe baixa, de menor remuneração, que viviam no centro urbano. O deslocamento vem
acompanhado de investimentos e melhorias tanto nas moradias (que são renovadas ou reabilitadas) quanto
em toda área afetada, tais como comércio, equipamentos e serviços. Isto implica, portanto, mudanças no
mercado de solo e habitacional, de modo que desempenham um papel decisivo os agentes do solo:
os proprietários, os promotores, os governos – locais, estaduais – e as instituições financeiras, assim
como também os moradores – em regime de propriedade ou de aluguel. Em conjunto, o fenômeno
proporciona uma maior estima das áreas renovadas e, inclusive, uma recuperação do valor simbólico dos
centros urbanos.
Fonte: BATALLER, 2012. (Adaptado)
Denomina-se esse processo de reestruturação das áreas urbanas a que se refere o texto como
Fonte: BATALLER, 2012. (Adaptado)
Denomina-se esse processo de reestruturação das áreas urbanas a que se refere o texto como
Ano: 2019
Banca:
NUCEPE
Órgão:
Prefeitura de Teresina - PI
Prova:
NUCEPE - 2019 - Prefeitura de Teresina - PI - Professor de 2º Ciclo (6º ao 9º ano) - Geografia |
Q1729041
Geografia
O forte crescimento da urbanização que se verifica a partir do fim da Segunda Guerra Mundial, conforme se
verifica no gráfico, é contemporâneo de um forte crescimento demográfico, resultado de uma natalidade
elevada e de uma mortalidade em decréscimo, processos que foram ocasionados ![Imagem associada para resolução da questão](data:image/png;base64,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)
Ano: 2019
Banca:
NUCEPE
Órgão:
Prefeitura de Teresina - PI
Prova:
NUCEPE - 2019 - Prefeitura de Teresina - PI - Professor de 2º Ciclo (6º ao 9º ano) - Geografia |
Q1729045
Geografia
Com a modernização contemporânea, todos os lugares se mundializam. Mas há lugares globais simples e
lugares globais complexos. Nos primeiros, apenas alguns vetores da modernidade atual se instalam. Nos
lugares complexos, que geralmente coincidem com as metrópoles, há profusão de vetores: desde os que
diretamente representam as lógicas hegemônicas, até os que a elas se opõem. São vetores de todas as
ordens, buscando finalidades diversas, às vezes externas, mas entrelaçadas pelo espaço comum. Por isso a
cidade grande é um enorme espaço banal, o mais significativo dos lugares. Todos os capitais, todos os
trabalhos, todas as técnicas e formas de organização podem aí se instalar, conviver, prosperar.
SANTOS, M. A natureza do espaço: tempo e técnica, razão e emoção. São Paulo: Edusp, 2008.
A partir da compreensão do fragmento de texto e da organização dos espaços urbanos no Brasil na contemporaneidade, deduz-se que as metrópoles
SANTOS, M. A natureza do espaço: tempo e técnica, razão e emoção. São Paulo: Edusp, 2008.
A partir da compreensão do fragmento de texto e da organização dos espaços urbanos no Brasil na contemporaneidade, deduz-se que as metrópoles