Questões de Concurso Público Prefeitura de Porto Belo - SC 2019 para Orientador Educacional
Foram encontradas 14 questões
Ano: 2019
Banca:
FURB
Órgão:
Prefeitura de Porto Belo - SC
Prova:
FURB - 2019 - Prefeitura de Porto Belo - SC - Orientador Educacional |
Q1800968
Pedagogia
Para Freitas (2014), os atuais reformadores da educação grassam que a questão se resolve por meio de uma
gestão eficaz, que associada ao neotecnicismo, constitui-se como um grande movimento para adaptar as escolas às novas exigências de reestruturação produtiva. A partir da afirmação do autor, analise abaixo as afirmativas e identifique as corretas:
I- O novo cenário da educação brasileira está propício ao avanço dos reformadores empresariais devido à abertura do campo educacional para “empresas educacionais confiáveis” do mercado de consultoria, dispostas a implantarem materiais didáticos, avaliação, venda de tecnologia, organização de “big date”, entre outros, que operam na difusão de métodos tecnicistas dentro das redes públicas. II- O Estado vem sendo cada vez mais disputado por empresas sem fins lucrativos que pretendem subordinar o processo pedagógico a seus interesses. III- O objetivo dos reformadores é o controle ideológico da escola, reeditando a teoria do capital humano como base da organização da formação humana. IV- Os novos reformadores vão subjetivamente impondo um ritmo único à aprendizagem, fator importante para a educação, uma vez que o rítmico único é uma das vias de inclusão. V- A segunda onda do pensamento neoliberal é vista pelo autor com uma positividade, assim como valorização do trabalho coletivo e o respeito à diversidade cultural, revisitando a não padronização da cultura escolar.
Assinale a alternativa correta:
I- O novo cenário da educação brasileira está propício ao avanço dos reformadores empresariais devido à abertura do campo educacional para “empresas educacionais confiáveis” do mercado de consultoria, dispostas a implantarem materiais didáticos, avaliação, venda de tecnologia, organização de “big date”, entre outros, que operam na difusão de métodos tecnicistas dentro das redes públicas. II- O Estado vem sendo cada vez mais disputado por empresas sem fins lucrativos que pretendem subordinar o processo pedagógico a seus interesses. III- O objetivo dos reformadores é o controle ideológico da escola, reeditando a teoria do capital humano como base da organização da formação humana. IV- Os novos reformadores vão subjetivamente impondo um ritmo único à aprendizagem, fator importante para a educação, uma vez que o rítmico único é uma das vias de inclusão. V- A segunda onda do pensamento neoliberal é vista pelo autor com uma positividade, assim como valorização do trabalho coletivo e o respeito à diversidade cultural, revisitando a não padronização da cultura escolar.
Assinale a alternativa correta:
Ano: 2019
Banca:
FURB
Órgão:
Prefeitura de Porto Belo - SC
Prova:
FURB - 2019 - Prefeitura de Porto Belo - SC - Orientador Educacional |
Q1800971
Pedagogia
Por trás de toda avaliação, existem condicionantes que configuram diferentes concepções de homem e de sociedade. O modo como os professores selecionam suas técnicas de avaliar estão implicados em propostas
teóricas de educação que se diferem entre si. Identifique-as relacionando a segunda de acordo com a primeira:
![Imagem associada para resolução da questão](data:image/png;base64,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)
Assinale a alternativa que apresenta a correta associação entre as colunas:
Assinale a alternativa que apresenta a correta associação entre as colunas:
Ano: 2019
Banca:
FURB
Órgão:
Prefeitura de Porto Belo - SC
Prova:
FURB - 2019 - Prefeitura de Porto Belo - SC - Orientador Educacional |
Q1800972
Pedagogia
A escola é a instituição por meio da qual é transmitida de forma intencional e sistematizada a herança social. O
fenômeno educativo está em permanente construção e com diferentes causas e efeitos que variam de acordo
com a dimensão enfocada. Sobre as diferentes abordagens educacionais, relacione a segunda com a primeira:
Assinale a alternativa que apresenta a correta associação entre as colunas:
Assinale a alternativa que apresenta a correta associação entre as colunas:
Ano: 2019
Banca:
FURB
Órgão:
Prefeitura de Porto Belo - SC
Prova:
FURB - 2019 - Prefeitura de Porto Belo - SC - Orientador Educacional |
Q1800976
Pedagogia
No paradigma da inclusão, à sociedade cabe promover as condições de acessibilidade necessárias a fim de
possibilitar às pessoas com deficiência viverem de forma independente e participarem plenamente de todos os
aspectos da vida. Isso posto, analise as afirmativas abaixo e identifique a(s) correta(s):
I- A transformação da escola passa obrigatoriamente por uma política de formação e educação continuada dos professores, verdadeiros pilares para a construção da inclusão escolar. II- A legislação brasileira garante o direito ao atendimento educacional especializado aos portadores de deficiência. III- Na perspectiva inclusiva, o projeto político-pedagógico pressupõe a adoção de parâmetros individualizados e flexíveis de avaliação pedagógica, valorizando o progresso de cada estudante em relação a si mesmo e ao grupo escolar.
Assinale a alternativa correta:
I- A transformação da escola passa obrigatoriamente por uma política de formação e educação continuada dos professores, verdadeiros pilares para a construção da inclusão escolar. II- A legislação brasileira garante o direito ao atendimento educacional especializado aos portadores de deficiência. III- Na perspectiva inclusiva, o projeto político-pedagógico pressupõe a adoção de parâmetros individualizados e flexíveis de avaliação pedagógica, valorizando o progresso de cada estudante em relação a si mesmo e ao grupo escolar.
Assinale a alternativa correta: