INSTRUMENTAÇÃO INDUSTRIAL
Marque a alternativa correta.
Os termopares possibilitam a medição de temperaturas muito altas, dependendo do seu tipo podem medir valores acima de 1200 °C.
Os termopares possuem maior precisão se comparado às Termoresistência, considerando toda faixa de temperatura medida.
Os termopares são imunes à corrosão, em qualquer condição de instalação.
Diferentemente das Termoresistências, os termopares fornecem um sinal de saída totalmente linear.
Os termopares não apresentam desvios de temperatura e são limitados por suas pequenas faixas de medição.
Qual sensor de temperatura possui seu valor de resistência reduzido com o aumento da temperatura?
RTD - Ni500
RTD - PT1000
Termistor PTC
Termistor NTC
RTD - Ni100
Na figura abaixo, os termopares estão medindo aproximadamente 44 °C e 29,3 °C respectivamente e a diferença será medida pelo voltímetro. Qual será a diferença de temperatura entre os pontos 1 e 2?
![TermoDif.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/TermoDif.png)
Avalie as opções abaixo e assinale a alternativa correta:
73,7 °C
29,7 °C
14,7 °C
44 °C
0 °C
O termopar é um instrumento de medição de temperatura utilizado nas indústrias e ele pode ser utilizado em uma associação em série simples (termopilha) que é muito utilizado em pirômetros de radiação total. De acordo com a figura abaixo e a tabela (mV x °C), calcule a f.e.m. medida pelo voltímetro e assinale a alternativa correspondente.
![termoparTermopilha.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/termoparTermopilha.png)
9,514 mV
25,190 mV
27,744 mV
26,467 mV
10,791 mV
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é um documento que cada planta industrial possui com os diagramas de operação de todo complexo;
II - Agente de controle consiste na medição da variável do processo (PV), que será comparada com um valor pré-estabelecido (set-point) e, em seguida, prover a correção da diferença dos valores atuando em uma saída: variável manipulada (MV);
III - Elemento primário é o componente que está em contato com a variável do processo (a que está sendo medida);
IV - Controlador dentro da automação é o equipamento responsável pelo controle, seja ele contínuo ou lógico.
É CORRETO apenas o que se afirma em:
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
Os termopares possibilitam a medição de temperaturas muito altas, dependendo do seu tipo podem medir valores acima de 1200 °C.
Os termopares possuem maior precisão se comparado às Termoresistência, considerando toda faixa de temperatura medida.
Os termopares são imunes à corrosão, em qualquer condição de instalação.
Diferentemente das Termoresistências, os termopares fornecem um sinal de saída totalmente linear.
Os termopares não apresentam desvios de temperatura e são limitados por suas pequenas faixas de medição.
Qual sensor de temperatura possui seu valor de resistência reduzido com o aumento da temperatura?
RTD - Ni500
RTD - PT1000
Termistor PTC
Termistor NTC
RTD - Ni100
Na figura abaixo, os termopares estão medindo aproximadamente 44 °C e 29,3 °C respectivamente e a diferença será medida pelo voltímetro. Qual será a diferença de temperatura entre os pontos 1 e 2?
![TermoDif.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/TermoDif.png)
Avalie as opções abaixo e assinale a alternativa correta:
73,7 °C
29,7 °C
14,7 °C
44 °C
0 °C
O termopar é um instrumento de medição de temperatura utilizado nas indústrias e ele pode ser utilizado em uma associação em série simples (termopilha) que é muito utilizado em pirômetros de radiação total. De acordo com a figura abaixo e a tabela (mV x °C), calcule a f.e.m. medida pelo voltímetro e assinale a alternativa correspondente.
![termoparTermopilha.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/termoparTermopilha.png)
9,514 mV
25,190 mV
27,744 mV
26,467 mV
10,791 mV
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é um documento que cada planta industrial possui com os diagramas de operação de todo complexo;
II - Agente de controle consiste na medição da variável do processo (PV), que será comparada com um valor pré-estabelecido (set-point) e, em seguida, prover a correção da diferença dos valores atuando em uma saída: variável manipulada (MV);
III - Elemento primário é o componente que está em contato com a variável do processo (a que está sendo medida);
IV - Controlador dentro da automação é o equipamento responsável pelo controle, seja ele contínuo ou lógico.
É CORRETO apenas o que se afirma em:
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
RTD - Ni500
RTD - PT1000
Termistor PTC
Termistor NTC
RTD - Ni100
Na figura abaixo, os termopares estão medindo aproximadamente 44 °C e 29,3 °C respectivamente e a diferença será medida pelo voltímetro. Qual será a diferença de temperatura entre os pontos 1 e 2?
![TermoDif.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/TermoDif.png)
Avalie as opções abaixo e assinale a alternativa correta:
73,7 °C
29,7 °C
14,7 °C
44 °C
0 °C
O termopar é um instrumento de medição de temperatura utilizado nas indústrias e ele pode ser utilizado em uma associação em série simples (termopilha) que é muito utilizado em pirômetros de radiação total. De acordo com a figura abaixo e a tabela (mV x °C), calcule a f.e.m. medida pelo voltímetro e assinale a alternativa correspondente.
![termoparTermopilha.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/termoparTermopilha.png)
9,514 mV
25,190 mV
27,744 mV
26,467 mV
10,791 mV
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é um documento que cada planta industrial possui com os diagramas de operação de todo complexo;
II - Agente de controle consiste na medição da variável do processo (PV), que será comparada com um valor pré-estabelecido (set-point) e, em seguida, prover a correção da diferença dos valores atuando em uma saída: variável manipulada (MV);
III - Elemento primário é o componente que está em contato com a variável do processo (a que está sendo medida);
IV - Controlador dentro da automação é o equipamento responsável pelo controle, seja ele contínuo ou lógico.
É CORRETO apenas o que se afirma em:
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
![TermoDif.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/TermoDif.png)
73,7 °C
29,7 °C
14,7 °C
44 °C
0 °C
O termopar é um instrumento de medição de temperatura utilizado nas indústrias e ele pode ser utilizado em uma associação em série simples (termopilha) que é muito utilizado em pirômetros de radiação total. De acordo com a figura abaixo e a tabela (mV x °C), calcule a f.e.m. medida pelo voltímetro e assinale a alternativa correspondente.
![termoparTermopilha.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/termoparTermopilha.png)
9,514 mV
25,190 mV
27,744 mV
26,467 mV
10,791 mV
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é um documento que cada planta industrial possui com os diagramas de operação de todo complexo;
II - Agente de controle consiste na medição da variável do processo (PV), que será comparada com um valor pré-estabelecido (set-point) e, em seguida, prover a correção da diferença dos valores atuando em uma saída: variável manipulada (MV);
III - Elemento primário é o componente que está em contato com a variável do processo (a que está sendo medida);
IV - Controlador dentro da automação é o equipamento responsável pelo controle, seja ele contínuo ou lógico.
É CORRETO apenas o que se afirma em:
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAP4AAAE4CAYAAAB7UE5MAAAgAElEQVR4Ae2dC5AVxbnHiUmKAqtEAxQKPnju+kwZN0CpAQRdAmjBzSXA8pLwiCBc3oi4KAZhL4iEUFBQBVkKAyoXRQXlcblaIrUImoLcACprQnhzgyLK2yDgd+sbneOcM2ce50zPd6Zn/lN12Dk9PV9//e/+0Wd6ZvqrQdigABRInAI1EldjVBgKQAEC+OgEUCCBCgD8BDY6qgwFAD76ABRIoAIAP4GNjipDAYCPPgAFEqgAwE9go6PKUADgow9AgQQqAPAT2OioMhQA+OgDUCCBCoiBP3nyZOrSpYvxqaysNKReunRpKm3SpElGWlVVVSqtZ8+edPnyZTpy5Ah17drVSH/ooYfo8OHDdOnSJerTp08q7+bNm43zdSjno48+ok8++SSB3Q1VjooCYuDv2LGD1q5da3wOHTpk1H/v3r2ptN27dxtpx48fT6Vt2bLFSLtw4QKtX7/eSN+4caMBPR945513jLR169bR6dOnjbw6lPPUU0/R1KlTDX/xDxQohAIi4L/11lv07rvvFqJ+kSwT4EeyWRLllAj46Ojpfer3v/898QcbFCiUAgC/AMrzvAU2KFBIBUTAf/HFF2nFihWFrGekyv7iiy/oyy+/jJRPcCZZCoiAnyxJvWv79NNPU0VFhXdG5IACISkgAj5uX6W3HuY80vXAN3kFRMBPekfnZw741uNzzz1HAwcOpFtuuYVuvfVWGjRoEM2ePZs2bdqUukUp3wVQYhIVAPghtvpnn31GY8eOpQYNGlCrVq1ozJgx9Mc//pH+9Kc/GR/eHz16NLVs2ZKuvfZaGj9+PPFzDNigQNgKiICfxNtX8+fPp3r16hmw//3vf/dsx7/97W80atQoql+/Pi1YsMAzPzJAgSAKiICfpNtXFy9epCFDhtDPf/5z2rNnT85t8/HHH9Ndd91FQ4cOxc//nNXDCX4VEAE/Sbev+vfvT506daKzZ8/6bQNbvjNnzlDHjh2N+QDbQSRAAQUKiICflNtX/NLRbbfdRufPnw/cNOfOnTMmAZcvXx7YFgxAgUwFRMBPwqw+P5BTt25d+vDDDzM1zvv7zp07jXmCU6dO5W0DJ0KBbAqIgP/MM8/QtGnTspUfmzS+VdevXz/l9SkrK6M//OEPyu3CYLIVEAGfR8OTJ0/GWummTZvS9u3bldfx/fffpxYtWii3C4PJVkAEfJY4zjP7R48eNW7DhdWVfvKTn9Cnn34alnnYTaACIuDPnDmT5s6dG1t516xZY8zkh1XBBx54gHixEWxQQJUCIuDHfXJv1qxZNGHCBFVtYrPDT/zNmTPHlo4EKJCvAiLgT5kyhXiCL67bb3/7W+M63FxT0OsvP77bunXr1HqBXvmbN29OXAY2KKBKARHweWHJOC8uyWsHrly5MrVWoLm2oNNfnqnv27ev7/xsmxccxQYFVCkgAr4qZ+NiJ+6XPnFppzjXQwT8ZcuWYQUeSy8C+BYxsFsQBUTAR0dPb1voka4HvskrAPDlNSeAXwDRUWSaAiLg85r6WFf/e90B/vdaYK8wCoiAX5iqRbdUgB/dtkmKZyLgI5JOencC+Ol64Ju8AiLgo6OnNyz0SNcD3+QVAPjymmNyrwCao8h0BUTAj3skHV4+O5ctnxE/1zJy8Qd5k6eACPhxl5Wj4jDMfuHMBXxevLO8vJz4DUdsUECVAiLgxz2SDq+dX6NGDWPtfK6r1+YX/N27d1NJSYlhe+LEiV5mcRwK+FZABHy/Hd231xHLaNZv8eLFxoIcM2bMcB39zfxO1eBRfvr06YatJUuWYE7ASSik560AwM9buu9PtIJ88OBBKi0tdR39rfm/t/LtnjnK8xLdhw8fNhLd8meej+9QwI8CIuDHLZLO5s2bybrsdTYw3Ub/bPkzR3lr42XLbz2OfSiQqwIi4Mdtvb0DBw5Q48aNaeHChYbeTmA6jf6Z+bON8taGzMxvPYZ9KJCPAiLgxzGSzv79+1Pwe4GZOfqb+d1GeWtjmvmtadiHAkEUEAE/rpF0TPg7d+5MU6dOdW0H6+g/bNgwGj58uDFjb72WdzIA8J2UQXq+CoiAH7WOW1VV5Xu9O6/18O677z7jdlubNm18tQFfHvCtP/4sWrTI1zkDBgzIaU0/L59zPc6TlS+99JIvX5FJDwVEwI9aJB2OQe+0Hl6u6RzVtnbt2jRixAjPFjev5YuLi6moqMh15t9qbPz48Tmt0ZdrHbzyt23b1vMXjdVf7EdfARHw4xpJZ/78+dSkSRMaOXKkKxhO1/KZ1/5O3aXQv5gKXb6TLkjPXwER8Nm9uM3sm9DzDL8bGOYo73Qtb732d3rqz81+/k3v/8xCl+/fU+T0q4AI+HGLpMNRbXikZ+h5ywaG0yjv1DBuo382+052wkgvdPlh1CnpNkXAj1vH4QCg1lh2mfXzGuWdOp3T6J9p3+n8sNILXX5Y9UqyXRHw4x5JxwQj11HeqeNljv6mfaf8YacXuvyw65dE+yLgxz2SDoPRo0cP3/fl/XQ06+jfvXt318lDP/aC5AH4QdSL5rki4Eez6uq8+sUvfmHcl+c36VRvPPrzPf9CvpYL8FW3auHtiYAf90g6PMm3Z8+e0FqTR/+NGzeGZt/LMMD3Uki/4yLgo+Po1zGsHqP9rGrEYx/gx6MdQ60FwA9V3oIYFwEfkXQK0rbKCgX4yqSMjCER8CNTWziSlwIAPy/ZIn2SCPiIpBPpPuDpHMD3lEi7DCLgo+No1y/SHEb7pckRiy8APxbNmF4J1b+wpMFX7X+6OvjGCoiAH/dIOlHrSqpBVW3PSy/p8rz8ieNxEfDjKFyU66QaHNX2vLSTLs/LnzgeFwE/7pF0otYxVIOj2p6XXtLlefkTx+Mi4KMhZbtOUL294gZUVlbStm3bQqtUUP9DcyxGhgF+jBrTrEpQcMy4AQsWLDBMWu2ZKw+ZUX7MMlX+tZan0i5sfa+ACPhxi6TzvXzR3FMBzr59+4y4AQy/ac+E3lx5KKzam+WFZR92hWb147beXtQ7jipwTPg5bgAvyW1dbixMDVT5H6aPutsWGfHjGEknyg2vEhyGv2bNmlSrVq3UGoNh112l/2H7qqt9EfDjGkknqo2uGpydO3fSrl27xKqr2n8xxzUqSAR8NKRsj9Bdb939l23t/EoTAT9qkXTyk0qfs3QHR3f/degpIuDHNZJOVBtYd3B09z+q/cLqlwj4XCBm9q2yh7uvOzi6+x9u66qxLgJ+3CLpqJE+PCu6g6O7/+G1rDrLIuCjIdU1mB9Luuutu/9+2qjQeUTAj3sknUI3Ymb5vxn1BD0wqJye23Jay0+HARNpyLinMquF7woVEAE/7pF0FLaHElPdh06in/aaRP1WfaHl545fT6CyEU8q0QJGsisgAn72opEalgIAPyxl42NXBPy4R9KJWncA+FFrkej5IwI+JmtkGx7gy+qtY2kAX8dW8/AZ4HsIhMMyi20iko5sTwP4snrrWJrIiK+jMDr7DPB1bj0Z30XAxzrpMo1plgLwTSXw10kBEfAxueckfzjpAD8cXeNkFeDHqTW/qwvAj2GjKq6SCPiIpKO41TzMAXwPgXBYZlYfOssqAPBl9daxNJERH5F0ZLsGwJfVW8fSRMDH5J5s1wD4snrrWBrA17HVPHwG+B4C4bDMNT4i6cj2NIAvq7eOpYmM+FhvT7ZrAHxZvXUsTQR8RNKR7RoAX1ZvHUsTAR+RdGS7BsCX1VvH0kTAx6y+bNcA+LJ661iaCPiIpCPbNQC+rN46liYCPiLpyHYNgC+rt46liYDPwmBmX657AHw5rXUtSQR8RNKR7R4AX1ZvHUsTAR+Te7JdA+DL6q1jaSLgI5KObNcA+LJ661iaCPiIpCPbNQC+rN46liYCvo7C6Oxz0sCvqqqiLl26OH5atWpFrVu3djzO527evFnnJs/ZdxHwEUkn53YJdELSwD9+/DitXbvW8VNWVkZ9+/Z1PL5u3To6ffp0IM11O1kEfEzuyXaLpIHvpS76n10hgG/XRPsUgJ/ehAA/XQ/+JgI+IunYhQ8zBeCnqwvw0/XgbyLg24tFSpgKAPx0dQF+uh78TQR8RNKxCx9mCsBPVxfgp+vB30TAh/B24cNMAfjp6qL/pevB3wC+XRPtUwB+ehMC/HQ9+JsI+IikYxc+zBSAn64uwE/Xg7+JgG8vFilhKgDw09UF+Ol68DcR8BFJxy58mClxB//SpUs5yZcP+LmWkZNDEcgsAn4+wkdAG21dYPCv+NGPqeHPSiPxqdvsLqrbvMS3Lz+44odUNuJJR/0rKiqI+5RfOHPpfxcvXqTy8nLiNSTivAH8GLZu1Y6Pad6y1ZH5/LJbT+r8q945+bP1r9WOLTN27FiqUaMG8cs3/GvSa/ML/u7du6mkpMSwPXHiRC+zWh8XAR+RdLTuI4Gd9wue34JMe4sXL6b69evTjBkzXEd/M7+TfR7lp0+fbthasmSJ8Wti6tSpTtljkS4CPtbbi0VfybsSXuDlathq7+DBg1RaWuo6+lvzZ5ZljvKdOnWiw4cPG4fd8meer+v3UMDn1yTXr19PvKx27969qWvXrsaH96dNm0YbNmwgzoMtGQoEBYnflV++fHlKrGz23Eb/bPkzR/mUcSKM+FYxvPZZyFdeeYXatWtHV199Nd1///30+OOP0wsvvEBr1qyh1atXG/t87dShQweqU6cOtW/fnl599VXXn2le5eJ49BXIBl4uXh84cIAaN25MCxYsME5zsuc0+mfmzzbKW/3JzG89Fpd9JSP+qlWr6IYbbqA2bdrQypUrif8T8Nq+/vprWrFiBd17771044030muvveZ1Co5rqoAKkPbv35+C38te5uhv5ncb5a3SmvmtaXHbDwT+iRMniFc3KS4upvfeey9vbXjppBYtWhirpHCATWzxUkAVSCb8nTt3Jq/JN+voP2zYMBo+fLgxY2+9lndSWZW/TvajkJ43+IcOHaJmzZrRmDFj6Pz584Hrcu7cORo5ciQ1b96cjhw5EtgeDERHgcGDB1NRUZHrmndua+ZZj913333G7Tb+delnW7hwoZGfb/8tWrTIzyk0YMAAYyCylpvLPk82vvTSS77KKlSmvMA3oZ87d65yv2fPng34lataWIN79+41LgHd1sXze2zo0KFUu3ZtGjFihGelzGt5/kXK//H4ve8/fvx41zX6vHxt27at5y8ST+dDzpAz+GfPnjVEDAN6s6583//mm28m/hWADQqYCsyfP5+aNGli/DJ0+6nvdC2fee1v2s38G/SnftDzM/0J43vO4PO10sCBA8PwJc1m//79adSoUWlp+JJcBUzoeYbfDSxzlHe6lrde+zs99edm308LBD3fTxlB8+QE/ttvv23MwJ86dSpouZ7nc4Td66+/njZt2uSZFxnirQAvf80jPUPPWzawnEZ5J2XcRv9s9p3sZEsPen42m6rTcgK/ZcuW9Prrr6v2wdEePxdw9913Ox7HgWQocPLkSfr0009Tlc0Ey2uUT52YseM0+mfazzjN82vQ8z0LUJDBN/gffPCBMYsv+fgtv31100030Y4dOxRUFSbiooAJVq6jvFP9M0d/075Tfq/0oOd72Vdx3Df4Dz/8MPGMu/TGr0cOGjRIuliUF2EFGKwePXr4vi/vpyrW0b979+6BZuVjBX69evXo6NGjfjRUmodvHV533XVKbcKY3gqYr+VWVlYqrwiP/nzPnx89z3eLDfj8xFTDhg0ddbj85T/oL9WfUea6KBeOfUw791tikl34J/31f1bRS//1Jr1/0P+tugYNGuChHkf1k3eAX/Iy36QLo/bV1dXEvwDy3WIDPk+ydevWzVGHr9YMoOsfqqQv03JcpiPzHqCbR347K3/uf+fTr26/je4fMJYmjulHv2h+Oz38wj9s/1mkmfjuy4MPPig6qZjNB6RBAb8KxAb8Z599lh577DHHenuCf3E3VdxTRP1e/idd/s7KV9ufprYty+m9C45mUwfGjRtH/FAPNiiggwKxAf93v/sdTZkyxVFzL/Av7ZtN7Zo+Qv/9L0cTrgf4Db6OHTu65sFBKBAVBWIDPi+eMXnyZEddvcC/uP1JuuuuybTd+23drGXw21VPPPFE1mNIhAJRUyA24M+bN894rdFJYC/wLx9bTF1u7EevnbVYuHSA3vrTa7TLMvdnOZq2yy9mmIswpB3AFygQQQViAz4vfeT2BJ0X+HT5CC3p1pTuf24nfTuXf5mOrX2EbrllNL37lXfL8RODQd739y4BOaCAOgViA/6ZM2foyiuvdFxZh8FvUKcRFRUXG4tyFN9aShV//iptVv/S/lX0H3c3oWYl7emBNrfSjUUP0n9WfZGa7HOS/cKFC8ZrmCre+XcqA+nxVkA6WrNq8MPw3/eTe7fffjtt3bo1YA+5SF8e2kMffnKUzmTe9HewzKvz3HnnnQ5HkQwFvBVQDaJXiarLU22P/fcN/qxZs4yVSbwqrfp43759ac6cOarNwl6CFAgDHDf5VJen2h777ht8Xl/vmmuuEV0W+9ixY0aZ/IouNiiQrwJhgOPmi+ryVNtj332Dz5kfeeQR4uekpTZeiIMX/sAGBYIoEAY4Vn+81v3ndwq2bdtmPSWn/TD8zwn8zz//3Hhmn6+7w97effddYyEOrLobttLxtx8GOFbV3Nb9N1cOCvJuQRj+5wQ+V/aNN94wFsPkxRHC2vinfdOmTY1oPGGVAbvJUSAMcDLV27dvn23dfxN6c+WgzHP8fg/D/5zBZ2d5FVJesTQM+Bl6jlga92ilfhsd+YIrEAY42bwy4ed1/3k5butyYdny+00Lw/+8wGeHR48ebcDPP/9VbRxPj6Hn/1iwQQFVCoQBjpNvDH/NmjWpVq1aqTUCnfL6TQ/D/7zBZ6fLy8uNa/4333zTbx0c83FsPV5wgyuJDQqoVCAMcNz827lzJ+3atcstS07HwvA/EPjsPc9ockQdvt+eT2VZJI6iyxF0JCYNc1IcmWOhQBjgSAoThv+BwWcBOMgGv8HXqFEj4igizz//PPEqJt98841NH07bs2cPLV261AiyyUtoV1RUIHiGTSkkqFIgDHBU+ebHThj+KwHfdJ5XPX355ZepZ8+exsQGh8Lml3v4up0/vH/VVVcZM/a9evUijrLLK+ligwJhKhAGOGH6m2k7DP+Vgp/pMD/tt2XLFurTpw9xZBze5zRsUEBSgTDA0d3/UME3xXnxxRdpxYoV5lf8hQKiCgB8u9wi4NuLRQoUkFMA4Nu1FgGfgxN+8skn9tKRAgUEFPjNqCfogUHl9NyW01p+OgyYSEPGqb3NLQK+7v/jCvRNFBGiAt2HTqKf9ppE/VZ9oeXnjl9PoLIRTypVCOArlRPGoqgAwLe3igj4vCY+1sW3i48UGQUAvl1nEfAlI+zaq4iUpCsA8O09QAR8fqceq+jYxUeKjAIA366zCPhPP/208ViuvXikQIHwFQD4do1FwMesvl14pMgpAPDtWouA/8wzzxgv8diLRwoUCF8BgG/XWAR8vr4PY7Uee3WQAgXsCgB8uyYi4HOxmNm3i48UGQUAvl1nEfBnzpxJc+fOtZeOFCggoADAt4ssAj4m9+zCI0VOAYBv11oE/ClTphBP8GGDAoVQAODbVRcBn9/Mw9t5dvGRIqMAwLfrLAK+vVikQAE5BQC+XWsR8JctW4YVeOzaI0VIAYBvF1oEfEzu2YVHipwCAN+uNcC3a4KUmCkA8O0NKgI+R77lDzYoUAgFAL5ddRHw7cUiBQrIKQDw7VqLgP/WW29hxLdrjxQhBQC+XWgR8DG5ZxceKXIKAHy71gDfrglSYqYAwLc3qAj4iKRjFx4pcgoAfLvWIuDbi0UKFJBTAODbtRYBH5F07MIjRU4BgG/XWgR8TO7ZhUeKnAIA3641wLdrgpSQFaiqqqIuXbo4flq1akWtW7d2PM7nbt682beXAN8ulQj4iKRjFz7JKcePH6e1a9c6fsrKyqhv376Ox9etW0enT5/2LSHAt0slAj7W27MLjxRnBVRfGgJ8u9Yi4COSjl14pDgrAPDTo/pqGy0XkXScOzmO2BUA+DEBX3VD2rsKUuKkgOr+gp/69t4h8lMfkXTswiPFWQGAH5MRH5F0nDs5jtgVAPgxAZ+bFjP79g6OlOwKAPyYgI9IOtk7OFKzKwDwYwK+6obM3l2QGhcFVPcXTO7Ze4bI5B4i6diFT1LKpUuXcqpuPuC7lQHw7fKLgI9IOnbhk5RSUVFBDLMbnFY9cgH/4sWLVF5eTnw56bQx+Ff86MfU8Gelvj51m91FdZuX+Mrr12aQfD+44odUNuJJp+rllS4Cfl6e4aTYKDB27FiqUaMG8cs3/Iq21+YX/N27d1NJSYlhe+LEiY5mq3Z8TPOWrfb9+WW3ntT5V71958/Fdr55t/612rF++RwQAR+RdPJpmvicY4K8ePFiql+/Ps2YMcN19DfzOynAo/z06dMNW0uWLDF+TUydOtUpe87pXuXnbDCCJ4iAnwQhI9i2kXHJ2v4HDx6k0tJS19Hfmj+zEuYo36lTJzp8+LBx2C1/5vl+vqu256dM6TwAX1rxBJaXDSS30T9b/sxR3ipjZv7Kykratm2bNUtO+5n2cjpZk8wi4COSjia9ISQ3nUByGv0z82cb5a2uWvPPnz+fmjRpkvo1YM3nd99qz+85uuUTAV83UeCvWgW8QMoc/c38bqO81UMzvwn9gQMHrIdz3jft5XyiRieIgI9IOhr1iBBc9QOSdfQfNmwYDR8+3Jixt17LO7nG9nk5Lh7pg0LPZfjx18kXXdJFwE+CkLo0eD5+vvDCC8aEnNs6eW7HmjdvTgMHDvRV9MKFC43bc3z7b9GiRb7Oueeee4xz2rdv77pOn5uP1mMtWrSgwYMH+ypb10wAX9eWE/Sb/+NmqNzWyXM7xmvo8UM2Xpt5LV9cXExFRUWuM/9WW0OGDKHatWvTo48+mrePVv9XrlwZaI7A6ltU90XARySdqDa/P7+C/mLzOt/pWj7z2t/JW7Y/ZswYaty4MS1YsMApG9ItCoiAbykPuxoq4AWuV5XczjdHeadreeu1v9NTf6b9ffv2AX6vxvjuuAj4iKTjszUims0EK1/3sp3vNMo7leE2+lvtm/DzEtzYnBUQAd/aMM6u4EhUFQjafpnne43yTjo4jf6Z9k+cOEEnT550MoN0IgL46AaeCmSC5XlCRgbz/FxH+Qwzqa+Zo79pP5UBO54KiICPSDqe7RDpDEHB4vN79Ojh+768HzGso3/37t1J5Us6fsrXPY8I+FhvT+9uEhR887VcfoZe9cajP9/zb9eunWrTsbYnAj4i6ejdh4KCv2HDhlDvi1dXVxP/AsDmXwER8BFJx3+DRDFnUPCjWKek+yQCPjqO3t0M7ad3+2XzXgR8RNLJJr0+aQBfn7by66kI+Iik47c5opkP4EezXYJ4JQI+O4iZ/SDNVNhzAX5h9Q+jdBHwEUknjKaTswnw5bSWKkkEfN06zvHjx2n9+vXEcxO9e/emrl27Gh/enzZtGvHtKc4jtRV6IZOg7Vdo/6XaSadyRMDXIZIOP076yiuvGA+CXH311XT//ffT448/TrwIxZo1a2j16tXGPq/f3qFDB6pTp47xjvqrr77qulS0is4QFLygPgQtP+j5Qf3H+XYFRMCPeiSdVatW0Q033EBt2rQhXoSB/xPw2r7++mtasWIF3XvvvXTjjTfSa6+95nVK3scLDU7Q8oOen7dwONFRARHwHUsv8AF+i4tXh+EVX9577728vamqqiJerqlv377ETymq3goNTtDyg56vWk/YE3o7L4qRdA4dOkTNmjUzVm45f/584L5w7tw5GjlyJPH6ckeOHAlsz2pAGpzNmzfT8uXLUy5klp/ruvWZ56cMY6dgCoiM+FFreBP6uXPnKhd+9uzZyuGX1o9XqrUuY2Ut31zC2oxi40dA6/l+8iNP+AokDvyzZ88aCzmGAb3ZXPwa8s0330z8K0DFVghwzJVseA07s3wT+lyXsDbPV6EFbKhRQAT8KEXS4fXa/S71HETi/v3706hRo4KYSJ1bKHBM+Dt37hxo3fpC+Z8SEDs2BUTAt5VaoIS3337bmIE/depU6B7wY8rXX389bdq0KXBZhQSH4a9ZsybVqlUr72AVhfQ/sPgxNSACflQe4GjZsiW9/vrrYk3JzwXcfffdgcsrNDg7d+6kXbt25V2PQvuft+MxPlEE/Cg0/AcffEBNmzYVfWfg0qVLdNNNN9GOHTsCdaEo6BekArr7H6TuUT03MeA//PDDxDPu0hu/pzBo0KBAxeoOju7+B2q8iJ4sAn4UIunUq1ePjh49Kt4MfOvw2muvDVSu7uDo7n+gxovoySLgF7ru+/fvp0aNGnm6cfnLf9Bfqj+jS9ac//o/+vCDbbRtm/XzPv1ln/912xs0aBBozTndwdHdf2t3iMu+CPiFjqTz8ssvU7du3Tzb7Ks1A+j6hyrpS0vOy/98g6b0K6Oysn+jn19Xh4of6EVlZX1o+B93WnK57z744IOBJhV1B0d3/91bV8+jIuAXuuGfffZZeuyxxzxbKBv4qZMuH6Q/tC+i/3jnX6kkvzvjxo0jfqgn363Q+uXrt3me7v6b9YjTXzHw+V4wP+bJM919+vRJxTHn58J5mzx5cirNXH996dKlqbRJkyYZ+fiFGDOWec+ePY1Zen42nt+Z5/SHHnrIVg6/QDNgwADPdgsL/DvuuIN4jsH0O9e/jW5qRiVd+tFzW05r+ekwYCINGfeUp/7IIKeACPj8Wu7GjRtT762/8847RhxzDmx4+vRpo7Z8y8uMUc4TYrzt3bs3lcbx1njjBTDMfFu2bDHSLly4YCycwenZyunXrx9NmDDByOv2T1jg8386HEnG9DvXv/d07kG3/ftY6rfqCy0/d/x6ApWNeNJNehwTVkAEfOE62YqbN28e8aO6XltY4A8dOjRQ3PbuQyfRT3tN0osoRY8AAAcGSURBVBJ6/s8K4Hv1PPnjiQCfLyf8PEEXFvj8xGCQ9/0BvjwYcS8xEeCfOXOGrrzySs+VdRj8BnUaUVFxsbE4R/GtpVTx5wvf9oE8J/f4MqR27doU5J1/gB93DOXrlwjwWdbbb7+dtm7dKq4wT0beeeedgcoF+IHkw8lZFEgM+LNmzfI1s59Fo0BJvBzXnDlzAtkA+IHkw8lZFEgM+Ly+3jXXXCO6LPaxY8eMMvkV3SAbwA+iHs7NpkBiwOfKP/LII8Sx2qU2XojDz90EL38AvpdCOJ6rAokC//PPP6eGDRsSX3eHvfGqQ7wQh4pVdwF+2K2VPPuJAp+b94033jAWwzx50v9LNrl2C/5pz+/+czQeFRvAV6EibFgVSBz4XPnx48dTq1atKAz4GfqSkhLiiDuqNoCvSknYMRVIJPhc+dGjRxvw889/VRs/TszQ838sKjeAr1JN2GIFEgs+V768vNy45n/zzTcD9waOrXfdddcZS1EHNpZhAOBnCIKvgRVINPisHj/OyxF1+H57PgtK8kKUHEWXI+iENWkI8AP3cxjIUCDx4LMeHGSDw1/zKj1t27al559/nqqrq+mbb77JkIuMtD179hC/MsxBNnnmvqKiQlnwDFuBRATws6mCtCAKAHyLehwll1fr4ff8mzRpYoTC5pd7OnbsSKWlpcaLPldddZUxY9+rVy/iKLu8vkDYG8APW+Hk2Qf4Lm3OT/vxO//8jj9/eJ/TpDeAL614/MsD+Bq0McDXoJE0cxHga9BgAF+DRtLMRYCvQYMBfA0aSTMXAb4GDQbwNWgkzVwE+Bo0GMDXoJE0cxHga9BgAF+DRtLMRYCvQYMBfA0aSTMXAb4GDQbwNWgkzVwE+Bo0GMDXoJE0cxHga9BgAF+DRtLMRYCfR4NZ4/dli4PHi3y0bt3aNVaeGTPQT/EA349KyJOLAgA/F7W+y2uN35ctDl5ZWZnxmm+2Y5xmjRnop3iA70cl5MlFAYCfi1o+86oOCw3wfQqPbL4VAPi+pfKfEeCnR/VF0Ez/fUcqJ8APQWmAD/BD6FZKTQJ8pXJ+awzgA/wQupVSkwBfqZwAv9+qdOj5O37qh9DJApoE+AEFzHY6Rvx0+AF+tl5S2DSAH4L+AB/gh9CtlJoE+Erl/NYYwAf4IXQrpSYBvlI5AT6u8UPoUCGYBPg+RM11Ce18Rny3MvAAj49GQpacFAD4PuTigBkMsxucVjO5gM9r+XMor5kzZ1pNpO0z+Ff86MfU8Gelvj51m91FdZuX+Mrr12aQfD+44odUNuLJtDrhS2EVAPg+9B87dizVqFHDCLL50UcfeZ7hF/zdu3cbQTbZtlt03aodH9O8Zat9f37ZrSd1/lVv3/lzsZ1v3q1/rfbUDRnkFAD4PrQ2QV68eDHVr1+fZsyY4Tr6m/mdTPMoP336dMPWkiVLjF8TU6dOdcqec7pX+TkbxAmxUwDg+2hSK0gHDx40wmnxq7dOo781f6Z5c5Tv1KkTHT582Djslj/zfD/fVdvzUyby6KVAIsCvrKykbdu25d0y2UByG/2z5c8c5a3OZOYPw19rediHArEHf/78+UYATHN0zafJM8E0bTiN/pn5s43ypg3+a80fpr/WMrGfbAViDb4J0YEDBwK1shXMbIYyR38zv9sob7Vj5pfy11o29pOpQGzBVwURdwsTTLcuYh39hw0bRsOHDzdm7K3X8k7ns31ewotDcwf9T8qvv06+ID0ZCsQS/EmTJhm339q3b++67l229fKypTVv3pwGDhzoq0csXLjQKJtv0S1atMjXOffcc49Sf1u0aEGDBw/2VTYyJVOBWIK/fft2qlevHj366KPktO5dLum8hh4/ZOO1mdfyxcXFVFRU5Pu+/5AhQ6h27drK/F25cmXqjoGXzzieTAViCT435b59+6hx48a0YMGCwC3r9VPf6Vo+89rfyRG2P2bMGGX+OpWDdChgKhBb8LmCquB3A98c5Z2u5a3X/l73/VX5azYu/kIBJwViDT5X2oSJl7TOd8sGvtMo71SG2+hvta/CXycfkA4FTAViDz5X9MSJE3Ty5Emzzjn/tYLJJ3uN8k4FOI3+mfaD+utUPtKhgKlAIsA3K5vvXxNM6yjPT9flu2WO/qb9fO3hPCiQqwIA34diDGaPHj1835f3YZKso3/37t1J5Us6fspHnmQrAPB9tL/5Wm6QUd6pGB79+Z5/u3btnLIgHQooVwDg+5B0w4YNod4Xr66uNn4B+HAFWaCAEgUAvhIZYQQK6KUAwNerveAtFFCiAMBXIiOMQAG9FAD4erUXvIUCShQA+EpkhBEooJcCAF+v9oK3UECJAgBfiYwwAgX0UgDg69Ve8BYKKFEA4CuREUaggF4KAHy92gveQgElCgB8JTLCCBTQS4H/B6jdQnhLgHdTAAAAAElFTkSuQmCC)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
![termoparTermopilha.png](http://sga.uniube.br/images/uploads/17927/Instrumentacao/termoparTermopilha.png)
9,514 mV
25,190 mV
27,744 mV
26,467 mV
10,791 mV
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é um documento que cada planta industrial possui com os diagramas de operação de todo complexo;
II - Agente de controle consiste na medição da variável do processo (PV), que será comparada com um valor pré-estabelecido (set-point) e, em seguida, prover a correção da diferença dos valores atuando em uma saída: variável manipulada (MV);
III - Elemento primário é o componente que está em contato com a variável do processo (a que está sendo medida);
IV - Controlador dentro da automação é o equipamento responsável pelo controle, seja ele contínuo ou lógico.
É CORRETO apenas o que se afirma em:
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
Apenas as sentenças III e IV são verdadeiras.
Apenas as sentenças II e IV são verdadeiras.
Apenas a sentença I é verdadeira.
Apenas a sentença IV é verdadeira.
Apenas as sentenças II e III são verdadeiras.
Com referência as terminologias, julgue os itens abaixo e marque a alternativa correspondente:
I - Processo é uma operação ou uma série de operações realizadas em um determinado equipamento, que varia pelo menos uma característica física ou química de um material;
II - Agente de controle é a energia ou o material do processo, da qual a variável manipulada é uma condição ou característica;
III - Elemento primário é o componente principal, com o papel de transmitir os comandos para os devidos equipamentos;
IV - Controlador dentro da automação é a pessoa responsável pelo processo, que utiliza um sistema de supervisão.
É CORRETO apenas o que se afirma em:
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
Apenas as sentenças II e IV são verdadeiras.
Todas as sentenças são falsas.
Apenas as sentenças I e II são verdadeiras.
Apenas a sentença III é verdadeira.
Apenas as sentenças II e III são verdadeiras.
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 35 mm escoa óleo combustível com uma vazão de 85 m³/h. Considere a viscosidade absoluta de 20 cp e a massa específica de 898 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
Rd = 19667.69
Rd = 50133.33
Rd = 38564.10
Rd = 48976.40
Rd = 28151.79
O coeficiente de Reynolds é um número que determina o regime de escoamento de um fluido. Calcule o número de Reynolds sabendo-se que em uma tubulação de 60 mm escoa óleo combustível com uma vazão de 60 m³/h. Considere a viscosidade absoluta de 12 cp e a massa específica de 866 kg/m³. Assinale a alternativa que contenha o resultado correto:
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
Rd = 25522.46
Rd = 18376.17
Rd = 19397.07
Rd = 17610.50
Rd = 14547.80
É correto afirmar que, Pressão Absoluta é:
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
O resultado da soma de duas pressões medidas.
A pressão medida a partir do vácuo, ou seja, considerando-se a pressão exercida pela camada gasosa que envolve a terra.
A pressão medida em relação à pressão atmosférica existente no local, podendo ser positiva ou negativa.
A pressão resultante da somatória das pressões estáticas e dinâmicas exercidas por um fluido que se encontra em movimento.
O resultado da diferença de duas pressões medidas.
O sistema a seguir mostra um diagrama P&ID sistema de controle de nível. É correto o que se afirma:
![](data:image/png;base64,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)
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;
LT pode ser substituído por um LI sem prejuízo na função de controle do sistema;
LIC pode ser substituído por um LI sem prejuízo na função de controle do sistema;
É possível estimar os níveis dos dois tanques superiores do sistema conforme montagem acima;
Um controle puramente proporcional geraria um erro de estado estacionário no nível do sistema;
A transmissão dos sinais da malha de controle é feita através de mecanismos pneumáticos;