[b]Passa no caderno os seguintes conceitos:[/b]

As retas não verticais podem ser definidas pela equação [math]y=mx+b[/math], em que [color=#0000ff]m é o declive[/color] e [color=#ff0000][b]b[/b][/color] é a [color=#ff0000][b]ordenada na origem[/b][/color].[br]Esta equação designa-se [b][color=#38761d]equação reduzida da reta[/color][/b].

Para [b]representar graficamente uma reta [/b]basta determinar dois pontos da reta. Por exemplo, os pontos de interseção com os eixos coordenados.[br][br][b]Exemplo: [/b]Representa graficamente a reta de equação [math]y=-2x+3[/math]. [br][br][img]data:image/png;base64,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[/img][br]

[b]Responde o teu caderno à seguinte questão:[/b]

Usando o teu caderno, representa graficamente as retas definidas pelas seguintes equações: [br]y=x-1; [br]y=2x+3; [br]x+y=3.[br][br]No final, confirma utilizando o geogebra seguinte.

[b]Passa no caderno os seguintes conceitos:[/b]

Para determinar uma equação de uma reta, começamos por identificar se a reta é horizontal, vertical ou oblíqua.[br][b][br]- Retas verticais: [/b]a reta é do tipo[b] [math]x=a[/math][br][/b][br][b]- Retas horizontais: [/b]a reta é do tipo [b][math]y=b[/math][br][br][/b][b]- Retas oblíquas:[/b] a reta é do tipo[b] [math]y=mx+b[/math][br][br] 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[/img][br] 1º passo[/b]: encontramos o valor declive m.[br][b] 2º passo[/b]: substituir na equação y = mx + n o valor encontrado para m e o valor de x e y pelo valor de um dos dois pontos.[br][b] 3º passo:[/b] resolver a equação para calcular o valor de b.[br][b][br]Notas:[br][/b][img]data:image/png;base64,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[/img]

[b]Responde no geogebra às seguintes questões[/b]