METROLOGIA
Muitas vezes nos deparamos com exercícios que para sua resolução, necessitam realizar algumas conversões para que as unidades informadas sejam compatíveis entre si, ou seja, para que a equação seja homogênea. Dessa forma, conhecer as regras de conversão entre unidades é fundamental para desenvolvermos corretamente de situações problemas no dia a dia do engenheiro. A conversão de 8 1/2” (oito polegadas e meia) equivalem em metros a:
Dado: 1 pol. = 2,54 cm
21,256 m
0,2159 m
2125,2 m
212,54 m
2,1258 m
Devido ao intercâmbio internacional de produtos e informações, estabeleceu-se em 1960, por meio do Bureau Internacional de Pesos e Medidas – BIPM – um conjunto coerente de unidades, o Sistema Internacional de unidades (SI). O comprimento do trajeto percorrido pela luz no vácuo, durante o intervalo de tempo de 1/299792458 do segundo, de acordo com o material de estudos, representa o (a):
Unidade de comprimento m (metro).
Tempo de ida e volta da luz no vácuo.
Tempo de reação da luz no vácuo.
Tempo que o reflexo da luz irá atingir um aparato em um segundo.
Fração do tempo de uma hora, na emissão do sinal de luz.
Esse relógio transforma deslocamentos lineares de um fuso móvel em movimentos circulares de um ponteiro que se move sobre um marcador com graduação. O relógio mencionado anteriormente trata se do (a):
Cronômetro comparador
Medidor de tempo comparador
Relógio comparador
Medidor dos ângulos de um deslocamento
Medidor em ângulo de um ponteiro comparador
Podemos definir que layout é a disposição física dos equipamentos, máquinas e ferramentas para realizar um determinado trabalho de forma mais rápida, com menor custo e melhor qualidade e com a preocupação de eliminar ou minimizar as condições inseguras dos postos de trabalhos e áreas de circulação.
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)
O tipo de layout mostrado na figura acima e que evidenciou a sequência de processo de produção do produto B, está na alternativa:
Alternativo
Alternante
Funcional
Simplificado
Fixo
O layout fixo é disposto de maneira que a organização e otimização de máquinas, equipamentos e trabalhadores fiquem em torno de um produto quando ele possui dimensões elevadas. Assim, uma de suas vantagens está na alternativa:
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
21,256 m
0,2159 m
2125,2 m
212,54 m
2,1258 m
Devido ao intercâmbio internacional de produtos e informações, estabeleceu-se em 1960, por meio do Bureau Internacional de Pesos e Medidas – BIPM – um conjunto coerente de unidades, o Sistema Internacional de unidades (SI). O comprimento do trajeto percorrido pela luz no vácuo, durante o intervalo de tempo de 1/299792458 do segundo, de acordo com o material de estudos, representa o (a):
Unidade de comprimento m (metro).
Tempo de ida e volta da luz no vácuo.
Tempo de reação da luz no vácuo.
Tempo que o reflexo da luz irá atingir um aparato em um segundo.
Fração do tempo de uma hora, na emissão do sinal de luz.
Esse relógio transforma deslocamentos lineares de um fuso móvel em movimentos circulares de um ponteiro que se move sobre um marcador com graduação. O relógio mencionado anteriormente trata se do (a):
Cronômetro comparador
Medidor de tempo comparador
Relógio comparador
Medidor dos ângulos de um deslocamento
Medidor em ângulo de um ponteiro comparador
Podemos definir que layout é a disposição física dos equipamentos, máquinas e ferramentas para realizar um determinado trabalho de forma mais rápida, com menor custo e melhor qualidade e com a preocupação de eliminar ou minimizar as condições inseguras dos postos de trabalhos e áreas de circulação.
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)
O tipo de layout mostrado na figura acima e que evidenciou a sequência de processo de produção do produto B, está na alternativa:
Alternativo
Alternante
Funcional
Simplificado
Fixo
O layout fixo é disposto de maneira que a organização e otimização de máquinas, equipamentos e trabalhadores fiquem em torno de um produto quando ele possui dimensões elevadas. Assim, uma de suas vantagens está na alternativa:
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Unidade de comprimento m (metro).
Tempo de ida e volta da luz no vácuo.
Tempo de reação da luz no vácuo.
Tempo que o reflexo da luz irá atingir um aparato em um segundo.
Fração do tempo de uma hora, na emissão do sinal de luz.
Esse relógio transforma deslocamentos lineares de um fuso móvel em movimentos circulares de um ponteiro que se move sobre um marcador com graduação. O relógio mencionado anteriormente trata se do (a):
Cronômetro comparador
Medidor de tempo comparador
Relógio comparador
Medidor dos ângulos de um deslocamento
Medidor em ângulo de um ponteiro comparador
Podemos definir que layout é a disposição física dos equipamentos, máquinas e ferramentas para realizar um determinado trabalho de forma mais rápida, com menor custo e melhor qualidade e com a preocupação de eliminar ou minimizar as condições inseguras dos postos de trabalhos e áreas de circulação.
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)
O tipo de layout mostrado na figura acima e que evidenciou a sequência de processo de produção do produto B, está na alternativa:
Alternativo
Alternante
Funcional
Simplificado
Fixo
O layout fixo é disposto de maneira que a organização e otimização de máquinas, equipamentos e trabalhadores fiquem em torno de um produto quando ele possui dimensões elevadas. Assim, uma de suas vantagens está na alternativa:
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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Y6/qHAy6BuGgaNOwNQ+sRoj54S6CIrli3VRkFaGh5h50BG7wYZHY96GTr+Xp4qh5p3GjT4eFZHPI2sd6Y1DNqBS2EV4wQ6/GtSdLl23RHWIn3i6FGpE1gDbojl+C2AWquR0a3Urb+3b93AQOsb/aIYhadkPTqzoNlIlNY/t5DfIL4pTQcRV6CbtC5BTGlUt7bGdHDPktEhuiQDOvI2euRImYUBthXXSosy+n4MRpkwecDyToP4NAmWUK5pO7KQqTemFx+fm4EOHewpk6MdlUWeJ2EWYz6sbyDzkvnKXvToUydBRk8BdPhRR3soDA2sirKqm0Dv2hEDV8dlVW4S5PHqcvfuXeOsljs+nl5WIo7K5rBrKAZwy/BVcV7wC8DA8jqA7siQ3jmArYcpS0OffvPj5gPow51RzcPNG9cV6Jchjpke/QnkbTPrwnAsK2m1xDTnurW/WXQdBAh02nPyssoqcvH8eWlcrx5d1J13zrr4YX7fFej05kzKXMzkaF4doevXrYfB6H59UwogPBm2n1Ogw+4azhE8U29MLz4+FwN9F6b+aENpLhZ4IebEtVc09Yea2rd3t6zA5zzlpVN7YZjxQDzzO3f2nJqc8Z2XuXNaj4NCcz2CimtIULAFPI1vzS0MGThADX1NOAJl8MBBGtfQotvBA/ulQb06znTpt33bdh0E0t/1ohFxwW++wWD7ojM8jRlojkYVXV6MQhotmjeFgcU6K5z6iESOCH/PJwRk0SgGNcH0qRWTfxPRGK/KL61aOdPQ6AgcGR4OffM5TppMp2uXLnIC4hcvzS7cotHxcHaG/uqmvpn/h+nFx+dioCtDUUhz8X0+KoTGA4bTJoy5m7C8c6YmwjFvbdxNON55mXfOFT+4/8AE08Hju7fv1N9SObWAPhiGEatXrnCGS8JsRgLD4W5o0nPf3r2Yp69nxUdm4as9qdHddhLAwzUYVBT85mu5euWyMz+0vXz37o2TpuHCT02bwOrI0Xs7iFAN9+3b19YbArJoXLZv2rCB9QIfWu9zTpwW/abMGgGBw4cPw+JVnNOd/jQIeYtGpmEZEG7jx47W8ZDTTQlk/h+mF5/XgB4HK/MoTPGZilemgxH4r5Vi2E5/zluPhLUO+58Pw1sujE8ge2E5/REWbsz1ni5pO+jDc0D/fpjiXGWCOfysMJoJh89ufI2aNrR61JS0nJEdD1evxMt3mHXhVKAzLPOs6TryybB4bNakiWzbutXyc8Q34wUNgjCIJqdPn5ZmjRprHFIwtFzvVniMOyAKLl6wwEnTNYw+azpJMg5TizNjHLK8umXNH+YhPj4X9+gp2cgCc/pt1MjIlF4fvAMmUBOIlahwrOQRMB+EsBzoR5mVeiMcAKZ1mfi0uF8Hs7FPXdu3b5Nmja0eNe3ULSqXL12W/N/k07l45ifNC15NAN4d263V3NTCMTZ/p7BTQLMmP6QWJJkbw3Jwv2wxrPhT4ZOhx8Y0BnyfjTHOR/OYjHrGvDC9PAV0ApKf9wsXMGj7GCDAX/o/x5L8k8dPPhqWNBPwmwpVg5dQNWDFptkq4LVu3RqVfxksrYtZu3z5EgafXOJPLtKkFuchRKYRERHyBDsCfKxcHKiGDhqMharjOnZIjZZx4z4tw8KGfrQsJuysWTPReDDXDz58cKEsCnaIUosWxGHLi40fzeMH8TPAgTyJj88jPTrBwwIb4PD9Y5cV1hJLzHNq4Y0f7yqLs1o/QpyyM38fuxjdomuBnM8fu1LmIa2wOiPDOXmOB3D/2OVK89PhmE8Xu0/XCJoM+W6V29B1DZLZz0wzzwCdzHQy+RPAcWU845i4ru7m2dB03q3+y3h/cEeVaz4+8Ejh4KSXjrw68wga5jkFOX1VP9AztFMLY9xMmI83Byu0Ccs3TcMQUQfzAkrpTNvEyKg78xSfV3r0jGKaTSfnccAG+kfqjMxJ6/eRaLZXGhwgL3kZnqYRLJmzCWviJvP8Gy+Mb/foaTCMzOEGnkeOHNEfN96hG3/29XkcsPhngT09FDKK36RjAz0NjnPQum/vHun+azdMM87GauZy5ypnGlFs51Q4QJCdP3callrdpW+v3rpYpgPTVMKmdGLcWEzxGrVpvlNpzhrvp7/TYTwb6Cm5a97BHE7vzZsbq3sS/sWpuxSrlyaofU+bAwTZgOB+chHmedxBbOaM6ZidwgxM2lGcPozLfSO51d5taGhew4LYQRiRcPtr+qX3Ylgb6Glwi8wZN26MjMdvKmwiO0Nj0SzppxHFdk6FA5xb79yhrUyFQlfvXr0whw/zwXQCnV13OPT347GmEDp4gO75SP0hGpHYQE+F2Z/jRNGFBr2Wvkii9OzeXf507On9OfTyahzq5tT095Wzp0/KM2x6yk1LuZtvevtjbl3NQwC4osyDArifegOYMBLo6QU7w9k9ehoIJHOiRo5QlVYaMbfGFsscnKaXuWmQzXPOXJjq3LGTnrRBc7wObdpaogc48WmwYyUXQKc1FE/NoBH4xQsXob5c1wZ6RiGJPfqrVy8A9gjh3tt/QkYkyG2g/z0OE+hb/9gintU9pD3sbqdEQ+xwrMp+Gugig2ANRiMQ9ug8lubChQswSIGhN+oivRfD2j16GtyyGJl+ZqZBxnZ2sJCG1zTSZq+eXpAyHPWNqFNPtV+KQTxL6a8nKVSFP8Fl0rGB/gkm2d4ZwwGCzfWncssn+hHX8M5nfA34RTDv6ckdw9pATw+n7DA5mgM20HN09dmZTy8HbKCnl1N2uBzNARvoObr67MynlwM20NPLKTtcjuaADfQcXX125tPLARvo6eWUHS5Hc8AGeo6uPjvz6eWADfT0csoOl6M5YAM9R1efnfn0csAGeno5ZYfL0RywgZ5B1QdVilQVlcjgzL0snQ/XNDI/TdfUkj9ndmmTp5b+t1wN9MyucNLn6W2N69fRM4devXyFna3CVG+ap1rwmJbMygPp8sfT9lSFGOcDWW4JMBa5LXVqBagJWmalT4iZPNCCiBZAGzes0w2c3rx5LeOwmegY7LM4ccJY1T78p/kwaX3qnhb0GS/XKnWxcJl5cRNOHmHoVrmi7jDLg664eScQIEOwF2E8jkbJrDyQLn9hOFSgSeOGcgtHJXKXsMTEBBk6dAiOdHHDlnaZlz75avLAfdx//rG5TMCxknS7dfOG6pDzOJgb2LddrYng/jmXlUai8vcIzod6DlXd58+fYeu9x3IauzI8huovz37iM9NBBlJNhnRyNdBZwMy6qBv9DFso8xS4Z0+faiW/fPkSh21FyQ/YbvnlC+zDmEnpky5/rNywIYMV6Hznfu47d26XHxrV170bM6/0FtDJW56DdPb0KZngOLJlyx+/S0ucqvErzm2diP3Q+WVLdU/GdFQMy3QIR1o2w1bXq7DVNmmuXrUCh/P66pbePEx4Gs417YsOZ+6ctDcvJZ1cC3QecZKZF5n37C8C3d0JdPaoBP/4MWMydTNNpm1+YaEA+q2bsKe8J61a/hdHR+7FwWHeunOBhskkJpA2L955nPr48WNVxfwq9mrnBqkvsOd6LZxmx31xTNi/mxVaeY1Gx7Ft6xbQSESjuo9jaVbJMHy1kLKe9/ry5XM5dvSIREaEMzOpJsH0cy3QP5e5qXIqFUeylMa+PtU9VUbnqXWbN23WSl29cpXMn88DuVJnfCrk/pYTqVqUk3D0DHv0Gzg/6ZZMgqU9T5Tgke5TJ/MIFVjz/C3Knxf4HMYqEwB0XkcPH9ZjbZh2R5jO7dix47P5QP6NjholW7dsVRoENI/bofxPDvTo1hXjlJdy6vgxiSLQ07hIxwZ6Gsz5lDOZ9/L5Cxzb2A291wt5jUNsBwaHyIjh4djsP0jdGCYzLkOV9GNx7ul9WMfza0Jw8U47y1s4wMs0h8zIg6HJPFzE2UnTceAZn0+fPCG9uv+KYxZH6bGOHDB/Nh9Q0EsXL1nnl06fIQOCgmT9+nUyeZJ1LlVIUH8dkJ+BjD5x/DiTpQ/uTN8G+gdsSZ8DmZfs5zDv+icyafpSfh9Ke2wFuEte0NPR1IxyMfOX2RfTeIezSF+8eKbp8QiYJzi/ieJUgiNvn5sH5S/K8gpjHx5m9hbyPndiYMdCP7UjRTnfYWMkHi+fVnnpnquBnlbBP5fxrvFImzDSu+uzw801bIY/a8JMm2C2AO2aD92nnXnCL7MvKw2m5cgHEnTyhY3un2QAkV3tQ51ldJSN765lTau8dI+PzyMHAfwTfttxczYHbKBnQP2Ria6/DCD5t0m4ps/n7LhS5iG78pFa2ZkXu0dPjTN/w42ysJ519Inzg/4Gyb8d1ICMEbMLYOTDKwzIs3KMkl5G2UBPL6fSCGdk0SWY8hqEg3IVcGmEzUxnrUishDb9oUm2AZ156Ne3j4wZM9r5hcvMMv8d2jbQ/w63UglrhIQVy5fK4AHBGsK4pRI805xYkTy+3N/HO9uAzsL169VTRo6I4Gcl08r6OYRzPdBZQNeL764/+pkwrncTxvgbvw9oOeKvWrkcc+j9LdqugbLomfm7At0af28vZ3myKOlkyQSjR48YzlO5k/M9WaBseCF/4nPzrAsLyJ+5zHtKN/qn5mbcXf0MLfVzxPtt1UoJ6d9HabxPzTVk5j4zf9euXBE/b0/kIZWzPjM3eSd1noodjiPl0+KXM2AWPzA/uRboLNwJLA2fOnFCZ3O5crly2RLdsPLdu7c4u36e3Fatv0RdeFi1fJkuslAxK27eXF1tJI0De/dCseiAVh735+YR61zt4+G1XHpmmLW/rZZgKBbxmfO6jx89gFrAE6XHxY67uhOv1ZjuQcvRWi1MlMfYBvnhg/saj3m6fiVeF0VI5+H9e/Lk4SPN+0sskNy4fk1XPTnou6VagQmaFrX5CO7rOBnCx9ND02SYw/v3O9JJkmOHDzoVv+5AVeAwysMwPIFi1/Zt8tQxkL5x45ocP3pY80N+HcbpEmZ+/PyZM3IDGonMG4+CP3PqpD7zNIoH0LOBswwMCZJwqCrzJTsafFrth3nO1UCfHB0tUyZOACAAKqh0erpVsWYGsLpWrEgh2QFlIQLzJnRFqIXInV65B3eRQgXk6KFDWpGhISHQMw/VhYtjAEGhb7/RMAcPHpTWLZorb9evXSv9evdUUJKp4cPCHKc+J+FE5e3SpEE9yw+hWzT9QY4fsxSdwqGcNNgxiL1544bk/+o/WPK+iHQTpVunjjI2KkrzsH3LFilTqqSqqL5981aqVqqgq4+vUA4P92rQlHwB8N8QLyiYEcDUavStXl3u3rmj743q1dZzmJi3ZRg4B0DE4Q61VHctmO9rC/jwi5kxDZqX1ib7f96+jXDeiG8do9IHByFMmUj9mSTZtXOHdGj7iz5v2/oHTrToqOULRVmGhYJXCGMDPa1m9979X+8fP/+JzJ4OFc5oVR9Nkr9w1LmXe1UA/SWmwF5L6ZLFZevvUMJCEjzZwtOtmgL98eNHUqJoETmEHpE0hg0ejIFmiFbkSfTgBPqD+/fl6NGj0vLHpprBjevXSx8cRsXqZZyRI8KdaqN7du+GcQaBjo4O/1q3+EmOHD6k8UZCEWlgSLDG4f7rBPqF8+f0vTf0RUZHRmqcXTu2a36fP3+qvbBH1Sro8R/oVF51PFNPm/E93dFYAXSC09/TE4peNMhIlOZNGsqsmTGag1UrlomPhzuAniB/QfuyeMHv5MC+vdrgqTfTqF4dzeu9u3fE38vLCfSgPr1l4lhLQ3Hv3t3S7pfWoC0A/Xbp2K6dxgkLHSRhgwZp2WygKxs++ieDgC7aQ03gdBeSo0otgc5P7VvoZpT9vpT8vnGDAuk+Pr0ED0HCXq5U8WKyHyILQRuBT3EITlvgRYUlAp0izPFjx+W/zZqo+2bQ6dWjm6bDOKOjImX27BiNv2/vPgs8yASB3ubnn+XQgf0abwzCBUOu5cXGRqCfO3tWw/UHsKLCI/R5766dUqJYUYhYBPo7NMqqcv/uXQv01aqqmvBdxPeAO8vAPAR4eeoBV3xugXzG4JAs5oDjCVnwtfQAAA/MSURBVC806rfccxx69CWLFJS9e3ZrnLmxs6RBnUB9pqKYH0QhYzgR0q+v9YUBlQP790mblj8z24i7S9q3aQPKIsPxhQodkH3TrJqhVP6QB7lWdJkzaxZ69KkybtRIPfLvyqXLAHo1BRl1tiuULyuboAm3bPEiuRYfL9WrVJYjkF33o9LLoLffuX2rLFowX0YMHSpBOPHi902bZMsfm6Xwt/ll84YNauDQ/IfGch3616tXLJcev3ZVIF6BLvY46FATWFevxmtv2aBObZXF78LMrV3rlvrpvwV5mI2wP2Yq2HDiL1+Ub77+D74Uh+U2FKJ4lEnE8GFyE/I481KiSGGMKW4IZXwClelS951foif4Ct1FD+xWrYocwzE0lOEDMNXIL9DpE8el5U/NZAa0C/fu3oVxylKpXrUSjkg5pwYTpYoW1vzsRmOai8ZZt1YNnBN0FmOb4+LtWR3i0lPZAzCHYFZp1MhI6Jcfkq1b/5AWsCrikSvMW9tWLfWrEjE0TAZB1COw7B49lRaXwilDevTihQupOucYHM1Sv3ag7Nm1S7zxaZ88YbxERUZIVZjArV+7RnzRa52EnrM7gD42aqRMgrpnWcjDm2AD6ValkowMHy59evXA2Tu/QM6dJUW+/VYC/f31uTEsiSg69MZZpLR+2YA45UqXUqBHw7rGDX57Ic/WQ/qjQbtH107SqV0bHOk4B718II45mSB9+vSUQegFY6ZPk6//83+yEIPkn5o3lSEQA4ZD1m8I+X4BBsdFCxaQGTgdbzjM53w9PNR8jbapPpDFmbdJENE8qlaVzu3ayvw5sVLD10fv3bt0RuP6WaZCtZVljcOZqdUqllNLqIkwfyuLRk3DBsr60ydHS+2a/moKGAOxzxPjlqtX4sXHy0NFrBFI78dmP8g8DMhr1fCX/N98JfNA70csVPl4VJfBEMOoomwDPQWi03jNEKCXRA84bcoUKOQPl/r4HO/dtfs90HEIF3u/tbBW8cMn/gx6LwJ9DHosNoTyZUrLhnVrpBrcRmEBhL01wcQzRwvnzy+1/Pz0uRFA6AHRoW+PHtKtSycYCK+XimW/13EBj22sjt52P3rKurVqqqVMz66dpUuH9jIX4KBR9fTJk6QXZPvBAwfKnJkxkg9AX4BGQBvMcPSOw2Am16RBfVmCL0shfEkI9PCwIRApPOUnAI5AJ+hbNofN5qhR4kmgt20rC+fOlcAAf5k3exYaVxcYQLSWyRPHa1kXotFUKldGxo6OkmgYS5QvU1L++P13gNpdZk6bjBPkfIRWS7OmTYMoZH052ECGYKDJtFs0ayqkUdPPVwrmz6fPTRs1VEsrhgnuZ4lido+eBrpdnDME6OzRZ0yfLpHDwxTo+yBze7m5aY89CrIxK3Y17BAJ9LOQvQn00ZEjcB7mRKnwfRlZv2Y1enSrlyeICXQesEuga2+J5wZ166jo0B8rgl0wS2KAzsZCKxgC/SBOn65TswZ69CjpiV7/184dZfasmQr0WejFu3fvJqEA+jyIWpTR42bPlp+bN9MvSdiggWp/ugy2oAXyfaMNg+IBF4aaN2ksI/C1oRzN8BNhvsevSycCHUCsXSNAGw+B3rVjOxgmjNWyLp4fh69OCe3RJ+GrU7FsaVhGbVR+xMZMkwBfLwmDcXcseMdxyzX06GxYwwD+oXAn0BfHxWkeCubLJ6THxkiTQoYJ6tNXq9IGugui03jMEKBTpp0dEyPh6BUpIx/Yt0888CmmyReB7ovFlRVLl74HOiqVsyVT8PmuWKGcGuFWhegyFpYyHTu0w4CrNSp1Lnqxr1HJHrJoYZzUqV1LPPFlCIL40Qk99UbI7uXLlgWNSdpoKD8fwcCzVoAfenSKLl0A9q44PXmaAn0OZOJu6OUHDxqgIsV333yt4GSPzq8LRQGCaAXm/ym/M28UZwJ8PKVpo/raiP28qstPTZtqA2Zj7di2jSyKmyf1AmsJGxLNzX7t1hnlGC2+Pl6yZPFCKVOiuIppnHqtUqG8ilzkzVx8AXwhpvDIw1g0xmpVKwPol5VHERhoMj8EOhueL0QV9uh8bogGT6Czx+/LaVbM9IhgUKy/7IS8Ix84wJe7MhTM95X+0sBdljtnGNDnQKYOw4nD9erUkoMH9+v0G7dlGAN5mZ/epRiIskc/h8UPiiCR6CFpc1mlYgXhNBx79ImQfdsB5O3btJKlADeB7uvpjrgLtaf2ANBD+vbCFFtbyPXrpQJElxmQbynbk+ZxTCUyLc7E9OjSRfpg2nAGRATObS+YF4svQQcJBdApV1M8ITh//hE9NPLJlUYCnXn5+v/+V6ZMmqgiTQ30uhR9RoYP1UZHGZljC/bo/PKwR2fjppzdA1+R3j0wVYky++FLsGLpYimFGRw2JAK9WqWKepaqF4DOPHhhHBM6METFHo5RrmJwTR6xPFzi/wnrACuXLtEvGYG+AvPybFQEeiQGz7169nDK6NkJcVfU5upZF/bo8+PmYF43GD1OoBw+dFArhwAaP3qUys2LIfvys3zp3Fn1o4HtzGlTtfJXoRd1r1IRA8bxOpjrCKCvWrrIAjr2TWFlUw7mlOVgnHXfqd0vOl1Z4fvSEjtzhoxEpXtWqyZnIf/XwAzI2FGR0gs9a1DvHpgNipYmAOqyRfOlc/t2MgQiyqJ586RogQKQjadifr4ZRKjx2oCaNqwnv0GX5uv//be6URSrCSt/An30iOEQoywxhiKXAfoSDGjZkGKmTsJAuQsA2ksH4Oz9f0OjKVmkiAJ9Bo4ar16liqxb85sCden8+chzVcjjwWgssVr+a5cuKI8o1lFEa4Gvx28Q+TjwLQhxavXy5VIXopm3u7uMwbx/bywsfYnXFYhgubJHLwbQuKG3qoTBVplihfVTy5mLKuXL6+e6ROHC4l6pkpRCpXNhhOErlyuLGYmKUqTAd+JeuRKm9AoifFkpXaKoyrWcliOzihX6DqCqLMULFZJiBb+TCqVLyvcliqGxVMH0Yz6pilmNit9/rzT9MFgsXrCgDgDLlSou5SEfVwbNkkULKZAoRnBM4Ia8FILMWxX5K12siFStUFbDMhzT/e6b/yDe9ypTlyhcQOe/K0G+Ls5nLHBVLl9OiqB8pOeOXQBKIR5pmDQrlS3jyDfTyS+VIGIxraLfsSxVUI6Cyo+iKHsFrDG4YfW1SIFvwRsP9auE8pQrWVJKFy0q1StX1niU0dlQSpAP5B9olitVAl86f/1xBqcO9l7Jvp8jHzX8oNnpmTuBfga6GWfxS+1u3OhvfnRL+UsZP2W8lO+u4Q1d42Zom3fj70rDPLvezbOJx3fj5np3dTe007q7xjNhjJt5N3dD1/invJtwrncTxtUtu59d8/SlfHEyREbXuVwuXNg/mwcpMJCrgP6lFMbOh82BtDiQIT16WsRtd5sDXwoHbKB/KTWRWj4cc4a8mV9qwdJySxbH8WLczF3jJntJi1rOdreB/iXXHwFIiEPu1SfHXV/S8YdjJquJ8EY6jlc+6s8aVznd00EzpwaxgZ4NNUcActsOC4hpZ8CyOEpQVeckrDi+gfHHp+KQmlEffgqNS9oDMC5/vLgbFw9SoAEJf9ySOy9cNtA/p5YdvaGJ+r7nZJfJ3tK6m2e+mzDmuR1Wd1O6GT8lonQSodP/XIaGheoqLXe3tcJwuZ1pJJ/pUie4Euix0OPh4liH9m2hinwD8Szd+RfYrNXP2wcruD2gKdpL7kAVWWmayCnomnRMWiDvyMP7MtLtS79soH9ODaGON0C/Pnz4UN0++jxWe4P691XdGNq3Uud9MEAWEhwEffPz2qtS8awf9HSom0OrpPZQIU6EGR431Scwt0PX/AjsTZ/CQGPokDDo5fcXWlM9eHBP9WF4rAw1RBPRA3OD/j5Y9R00KAT68Q9lH3SLFi9ebGESQKVNLPVwSHfTxvUa3zSiS9Br/6FJIzl4YB/06v+EtVOCrFmzGkfEjAHNnjBH3Kr6+TExM9QwZiTUrKm5ORR6TFTz6A7t0k2bYETj0pg/h4VZHccG+mdyPArqx8thWMHPfwfo5/yFXW1pLkg9+Nkx02XXjm1qqjcLKgprsew/E25E4ggosx0AyAj0hLdvpCs0LAkamt9xuX/qlKnYo3yLgrRP7944WWOBbr7PbHZB2CtQ/GIvTWuk/TBqIRC50y1Pw7DAlyRP/3oiXaHXw3fuc94casZ85m/zpk3yfZlSqg9EvfYHaJTUhGTeV8KohSdcUNxpCztVGoEXx8oxj43haR/cU4e0O3Vs/5lcy75oNtA/k/cEOi2H3mCXgkCo6UZCF38INBGpOEYLpg4AcjB6eVoTjYO+/HFYI1F8+AOAioPaMYHOLaC7QuWYAJwFK6k1ML0L7h+khtYKTPTIV6AJyAO5IqFrw3R2w26U9OhPGZwamRrWAWQ2Jm4r3RlaoHSnKV5bNEQ+s4fnzgvPYSaYhK/KbDQuGolEose+Biuq7du26oFkDEvjFrr5+Xrr9tHRUEo7CV0ifo06o4w57bKB/pk1FgWNRIoBiYnv5JfWLVXEOIpDrqZNnSqbN2/SQ60O7t+P3QLcZBkU1LitB8UOgnYXwG9EF9qDvgb4giGarAXQJ4wbrxZabASR6K0pEtHAm8e3NMGuATzDiCDk9hk8vCscCm1/PfkLW4bcU9HFAn0ivhSddPeCqdAQpbrwq1cvVaTauHGD0FCF4s0QWFax4VE04RYf27EdRzA2/CeN7kiDFk8B/n66LUg0diU4BVsCAp32ADntsoH+mTU2efJk2KleVaAfP35U9e/rw6qftqr37t0RHm7lDSWt3bt2AJSvFdjuMKimPSjFjn7Ym4bInDF9qlAXvydUijdu3Ki2qbQlpaLbsiWL1Jia+uuNAPK+fXrJ9etX9cQLWm01qFcfW4s8hhH2anxRRjhLQqAeO3ZMqsNkryfUhtkYz509rXL2Kxiss0dmfJrr8SsTDYso2s7uhcFMRAS2ucM1aOAg2MPehDlfc938f/bMWXL+7DlJwjYlIUHBzrRyyoMN9H9QUwQUezhO3RG8FA3MO+90o5/lxk2MeB4qZz84pYe4uJMG931RWnhOAo3NsIdtigHjS/TiDJ+A3teKRzmb8S1aTM9s3g9H7dFZHHXHu5UnpsGNo57C4Px3FVn4zh6ddzYCps1n3nlZ78yL4x13deOdbnR2hNUIOeCPDfR/UEmsfANsG+j/gJFZENUGehYw2U4i+zlgAz3768DOQRZwwAZ6FjDZTiL7OWADPfvrwM5BFnDABnoWMNlOIvs5YAM9++vAzkEWcMAGehYw2U4i+zlgAz3768DOQRZwwAZ6FjDZTiL7OWADPfvrwM5BFnDABnoWMNlOIvs5YAM9++vAzkEWcMAGehYw2U4i+zlgAz3768DOQRZwwAZ6FjDZTiL7OfD/XluDjSBaKIkAAAAASUVORK5CYII=)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Cronômetro comparador
Medidor de tempo comparador
Relógio comparador
Medidor dos ângulos de um deslocamento
Medidor em ângulo de um ponteiro comparador
Podemos definir que layout é a disposição física dos equipamentos, máquinas e ferramentas para realizar um determinado trabalho de forma mais rápida, com menor custo e melhor qualidade e com a preocupação de eliminar ou minimizar as condições inseguras dos postos de trabalhos e áreas de circulação.
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)
O tipo de layout mostrado na figura acima e que evidenciou a sequência de processo de produção do produto B, está na alternativa:
Alternativo
Alternante
Funcional
Simplificado
Fixo
O layout fixo é disposto de maneira que a organização e otimização de máquinas, equipamentos e trabalhadores fiquem em torno de um produto quando ele possui dimensões elevadas. Assim, uma de suas vantagens está na alternativa:
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Alternativo
Alternante
Funcional
Simplificado
Fixo
O layout fixo é disposto de maneira que a organização e otimização de máquinas, equipamentos e trabalhadores fiquem em torno de um produto quando ele possui dimensões elevadas. Assim, uma de suas vantagens está na alternativa:
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Apresenta grande flexibilidade na variação dos produtos
Desfavorece grupos, multitarefas
Visão do processo e produto em vários pontos do produto
Ajuste rápido a diferentes mix de produção
Apresenta alta flexibilidade de processo e produto
Certamente, você deve conhecer o transferidor de grau, aquele instrumento de medir ou verificar medidas angulares. Esse instrumento de medida é conhecido também como:
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Transferidor de medidas
Relogímetro de anglo
Paquímetro
Régua reta angular
Goniômetro
A elevada qualidade na indústria mecânica exigem medição rápida, confiável e, se possível, com a mínima influência do operador, são requisitos do (a):
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Desbaste da peça
Usinagem rústica
Forma como o cavaco se prende na peça
Medição diferencial
Cálculo do cavaco
Todo processo produtivo ou de prestação de serviço deve ser planejado para obter melhor eficiência e eficácia nos resultados. O estudo do layout, ou arranjo físico, é de suma importância para obtenção dos resultados, pois determina a disposição física das máquinas e equipamentos de qualquer local de trabalho, melhorando o rendimento das atividades executadas. Um outro aspecto que deve ser verificado na elaboração do layout é o (a):
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
A preocupação com a integridade física do trabalhador.
Deixar que o trabalhador desenvolva sua atividade fora do alcance das máquinas.
Manter as máquinas em local separado da unidade produtiva.
Deixar as máquinas bem próximas uma das outras para aproveitar a rede elétrica.
Substituir a posição das máquinas pela posição de trabalho do funcionário, assim as máquinas não poderão atrapalhar a atividade do operador.
Ao fazer medições precisas como por exemplo o diâmetro de um alfinete, é necessário um dispositivo especial que permite medir frações de 1 mm com bastante precisão. O paquímetro é um dos instrumentos de medida que possui esse dispositivo, ele está descrito na alternativa:
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha
Analise a figura abaixo.
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)
A figura acima representa a seção de uma régua graduada, quais outros instrumentos de medição linear que utilizam do mesmo princípio de medição da régua linear?
Sondeli
Bico fixo
Sondeli milimétrico
Vernier
Orelha