Retas
Vais utilizar sistemas de eixos coordenados para obter equações e inequações que representam retas e domínios planos. 1. Retas no plano 2. Interseção de retas não paralelas. 3. Domínios planos
Table of Contents
- Retas no plano
- Retas Paralelas aos Eixos Coordenadas
- Retas oblíquas
- Interseção de retas não paralelas
- Interseção de retas não paralelas
Retas Paralelas aos Eixos Coordenadas
Exercício 1
Na parte esquerda da apliqueta do Geogebra encontram-se representadas os pontos [math]A[/math], [math]B[/math] e [math]C[/math].[br]Os pontos [math]A[/math] e [math]B[/math] são fixos. O ponto [math]C[/math] pode ser deslocado.[br][br]Encontre a posição do ponto [math]C[/math] para que as equações das retas definidas pelos pontos [math]A[/math] e [math]C[/math] , reta [math]r[/math], e pelos pontos [math]B[/math] e [math]C[/math], reta [math]s[/math], sejam as que se encontram do lado direito da apliqueta do Geogebra.[br][br]Desloque o ponto [math]C[/math] para a posição que considerar correta e de seguida prima o botão "[b]Verificar Resposta[/b]". Será de imediato informado se a sua escolha está ou não correta. Caso a resposta esteja errada poderá repetir o procedimento até encontrar a localização correta do ponto [math]C[/math].[br][br]A qualquer momento pode pressionar o botão "[b]Gerar novas retas paralelas aos eixos coordenados[/b]" e será exibida uma nova configuração do exercício.[br][b]Repita este exercício[/b] até sentir-se confiante com a representação de retas horizontais e verticais.
[b]Copia para o caderno os seguintes conceitos:[/b]
Num referencial o.m. as retas verticais (paralelas ao eixo Oy) têm de equação x = a. O eixo Oy tem de equação x = 0.
Num referencial o.m. as retas horizontais (paralelas ao eixo Ox) têm de equação y = b. O eixo Ox tem de equação y = 0.
[b]Responde no geogebra às seguintes questões.[/b]
QUESTÃO 1
Qual é a equação da reta vertical que contém o ponto de (-5, -2)?
QUESTÃO 2
Qual é a equação da reta horizontal que contém o ponto de (-5, -2)?
QUESTÃO 3
Indica a equação de cada uma das retas a, b, c, d da figura:[br] [img]data:image/png;base64,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[/img]
Interseção de retas não paralelas
[b][color=#6aa84f]Responde às seguintes questões no caderno[/color][/b]
Questão 1: Determine o ponto de interseção das retas p e q, definidas pelas equações x+2y=1 e x-y=3.
[b]Processo 1: [/b]Recorrendo ao geogebra.[br]- https://www.geogebra.org/classic?lang=pt-PT[br][br][b]Processo 2: [/b]Recorrendo à calculadora gráfica (Passa no teu caderno a resolução)[br]No final, [b]recorre à calculadora gráfica[/b] para determinar o ponto de interseção e coloca a resolução completa no teu caderno indicado:[br]-as funções colocada[br]- o esboço dos gráficos[br]- assinalando o ponto de interseção e as respetivas coordenadas[br]- dando resposta à questão.[br][br][b]Processo 3: [/b]Analiticamente (Passa no teu caderno a resolução)[br]Podes também [b]resolver analiticamente[/b], resolvendo o sistema seguinte pelo método da substituição (página 36 do manual).[br][br][img]data:image/png;base64,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[/img]
QUESTÃO 2: É possível determinar a interseção das retas de equação r: y=2x+1 e s: y=2x-1? Justifique a sua resposta.
QUESTÃO 3
Recorrendo à calculadora gráfica, resolva o exercício 3 do manual da página 36.
QUESTÃO 4
Recorrendo ao geogebra seguinte, resolva a seguinte questão do seu manual, página 37.[br]Responda no seu caderno.[br][img]data:image/png;base64,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[/img]